Pre-Calc Area What is the area of a rectangle {x} feet long and {y} feet wide?

]]> 1.0000000 0.3333333 0 0 0 abc 0 {x}*{y} 0.01 1 1 2 Solid!

]]> 1 0.5000000 2 0 1 square feet 1 feet 1 there aren't any units private x calculatedsimple uniform 1.0 10.0 1 20 1 6 2 10 3 5 4 3 5 4 6 6 7 2 8 3 9 8 10 9 11 10 12 8 13 4 14 1 15 9 16 2 17 4 18 2 19 2 20 5 20 private y calculatedsimple uniform 1.0 10.0 1 20 1 5 2 6 3 7 4 4 5 2 6 10 7 2 8 4 9 3 10 5 11 5 12 4 13 6 14 6 15 3 16 8 17 7 18 8 19 7 20 8 20 Area and Perimeter Find both the area and perimeter of a rectangle that is #a ft by #b feet.

]]> 1.0000000 0.3333333 0 0 area = #cperimeter = #d]]> Sweet!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>4</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>,</mo><mn>15</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>b</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mn>2</mn><mo>*</mo><mi>a</mi><mo>+</mo><mn>2</mn><mo>*</mo><mi>b</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mi>r</mi><mi mathvariant="normal">e</mi><mi>a</mi><mo>&#160;</mo><mo>=</mo><mo>&#160;</mo><mo>#</mo><mi>c</mi><mspace linebreak="newline"/><mi>p</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">i</mi><mi mathvariant="normal">m</mi><mi mathvariant="normal">e</mi><mi>t</mi><mi mathvariant="normal">e</mi><mi>r</mi><mo>&#160;</mo><mo>=</mo><mo>&#160;</mo><mo>#</mo><mi>d</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer><correctAnswer id="2"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputCompound">true</data><data name="gradeCompound">distribute</data><data name="gradeCompoundDistribution">50 50</data><data name="inputField">popupEditor</data><data name="casSession"/></localData></question> Calculated MC What is {a}^3 ?

]]> 1.0000000 0.3333333 0 0 1 abc 1 {=pow({a},3)} 0.01 2 1 0 Nice!

]]> {=3*{a}} 0.01 1 1 0 {=3^{a}} 0.01 1 1 0 private a calculatedsimple uniform 1.0 10.0 0 10 1 7 2 7 3 2 4 7 5 9 6 5 7 7 8 1 9 2 10 8 10 Calculated Short Answer What is sin({a})  ? 

]]> 1.0000000 0.3333333 0 0 0 abc 1 sin({a}) 0.1 2 1 2 0 0.1000000 3 0 private a calculated uniform 1.0 10.0 1 1 1 3.4 1 Calculated Simple What is ({a}+{a}) ?

]]> 1.0000000 0.3333333 0 0 0 abc 0 ={a}+{a} 0 2 1 0 0 0.1000000 3 0 private a calculatedsimple uniform 1.0 10.0 1 10 1 22.8 2 7.4 3 6.1 4 9.1 5 1.2 6 4.4 7 3.7 8 8.0 9 9.9 10 3.3 10 Identify Movie Name this movie:

Moodle%20Quiz.wav

 

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1.0000000 0.3333333 0 true true abc Your answer is correct.

]]> Your answer is partially correct.

]]> Your answer is incorrect.

]]> The Blues Brothers

]]> Caddyshack

]]> The Notebook

]]> School of Rock

]]> Elf

]]> <question><correctAnswers><correctAnswer></correctAnswer></correctAnswers></question> Most likely be become a princess...... Most likely be become a princess......

]]> 1.0000000 0.3333333 0 true true ABCD Your answer is correct.

]]> Your answer is partially correct.

]]> Your answer is incorrect.

]]>

]]> 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NUQTjB78elLgE5pEiMo9KpSRAngUwM2a3XHSs2S3A6CmMy5oQAc1nLF83SmiWX4ozj0q4sY75rQkk2AConj4pgVHiI7Yqt5VSOx8frEN3y80x4m39OK/mVPU/srl0LEcSt8pHNU5rfDdKE9SpQTR4r8Q5ALlYQeleaIQWr9Sy9Ww6P52zqXNjJLsOBG4nmmGR0kDRsQR3r2z5Q6fT9dvbfALbx713Fh4oiYATqVNaqRDR1dnr1g5A8wCutsr23lUbZVP41umZtM6CCQHoc1pwtzWqINi2JretmyQDWyJOktVJ4rahGOorZGTNGM4FaEJJPJ6VuYNF5VyKXyzg5pgM8sFTmqcsePWkykZLryaqsuOfeoLHEcfWoJBjtmpGVioPFQkbTkCkMtwMQwHSugt3+YVQjoIXwK04iWpsC8itjNS7friuaTN0hpGOD3qk4Occ8Vl1NQC5GSKY0QPQdKtEkDREnGKaYcgkDmrJK0kXPIqiIeeh461SJJUhIPtSvHjn0phYqOvFUyMN0rYyJ41z+Fa8QKgVZBoR9avqMipKGFecUmznmgZYjA5GKvxj0qgHlc8Ypoj54oRLLMURqyIsdasyE8s4ziozH1J61JRBJECMYrImj4IxmrEYdwnUY6Vn7AOopoZNGBipVqiSVeRTyBjpmmMjEecg1H5QqWhnxWiuGyq8VaCluvWv5kfc/syN9i1DGOpXGBUVyEXLDoKhbnRK3KfK3ja5EutyYPC1xUb/vDzX7FhVy0YryP5bzGXPi5vzLGQFqruJfivQPFRJJKkQ+Y1myX/ADgUANW+kzxWpbatcxHKSuv40XHY7PS/FuoW5H7zd9a9P0bx1ESFu0x71vGZk0ex6Lren3qgxXC5PYmu5tXBxggj1rti7oxsdhZOuzr0rV8wcY71umYtFyJq04GGcVqjGxsQnpVpcVdxiMAOM1UuE4FAGJMnJwKqMlSUiPHahowc8GgCk6bWqN14pBcfEvzVqwNjFMZtQNk4roLU8DJ46UMEbUZGKnx/dOK45HUiB19qgdAO9SUMIAXvRGvqeKYEgUZyaNvemIryR8/Wo/JxnArRE2GmLjpVCcDmtUQzKc5yCarFfmzWqMSzGOa1kUgDuKsgvIvNX4xikWTBc9Ke0fAxQA1Vwc1djFMRaUdsUoQjtmpAtRADrVsqPSqMmJt4pjIOtArleQDHHpWPcJ7VSGYs0fOTVB4xVjK5XB449aMUwHrwasgcUDH7cj6UzB9BQxHxFDK6gA1bRi0gOOK/mdrXQ/stPQ1lAJ4rI1vENnI+MYU1nH4rGtaSUGfGmryedqMr5zlq52R9s2M9a/aaatBI/lKtLmqyfmy3I2IwOeaqvL5MfqxrY5CgsU07ZY4FX47WJepzQDLaQw56U8QxelOxI8QKTkHFKsTr0NMC9a3NxbsDHIyH1Br1Lw5431CwZVmbzUHXNXGVhWufRHhjxrpuoIqGXY56gnFeq2dwJFDq+VPcGvRjK5zNHQW8gIFbEBzjpW6Zk0asLnv2NX434qhExbmlblSKpMky5lAY1lsMnBFAkBj5pMHnIoC7KEgO7FQkZOaAJEqcHnimIvwMQa6S2lwoFSzSJrRS9Oatq/PWuZnSidG3Dk01qzKICOakVe9MCRRx0qTGWHFICRo89qf5PFWmIoTgLxXPTsCa6ImTMqQDdSgZ5roOcu265PX6VqRgHgUDLka1ejGKBlpBz71PtzmkIa0dPjBqhF2NR6dKnEZ4PrUMYoBFSKeoq0YskHNOK/lV2MypMOOazZVzSLM+aPIzWZIhqyipIufeoQuKYw2kVKB8uO9SUWYhng9am8n2rJvUux8DQzxE/eq0lxEGwDX868rP67U1Y14LhcZrkfHF6sOiSsG5IPeqowvURyYqrajJ+R8ju4OWPesRjuuRX7CfzJ1LbNlyfSqpwW3Nz6UCLaFj7CpBgGmInFSjpQBIoOOKkBIpkkm71FAANMCaOR433IxUjoRXp/hbxvqWlsqSOZYx2J5rROxNj6f8JeNtM1RVVpRHJ6E16/bXCugZGBB7ivRhK5zNGrFL3PetCOXHFakFiKQluvFXg2Qe1UhFS4BZSehFUCBk5qiRQDioWU9QKZBQlHzZNQe1AABjg08GmIso/wDOtaGUhcZqDRGpBNj/AArSjl3dKxaN0y+j4XGalDZArA1HdT1qTqKBjwORVqJcPnsKANWKIMOR1qWSLanFJPoDRyd8GBPrWFLEW5xXfE5mZsi4J4pUHArYxLUYx2zVtDhiaANGFufp7VoIc/hQUW0OAKuJj8qQiTZ7U8KQelMgmVeenSrajipYyu5xkVHu5962RhItxEHsatPgqa0sY31M+RaqSDmszdbFV19BmqE0fGQKZRQZPrVUrzVFDGHHAPFPiXPNSykaMcQyD3qxsH+RXM7XNkfkC2tuPunFaVnrZHJf9a/H3hnbQ/eVj43s2bceugf8tB+dcb461oTWIhDct15ooYd+1joY4zGp0JJPoePSSYTrWfE2ZSc196fjxZkfEf1psXLZNAi0ZOcCpUwDkmgB7TKO9PWUUAS+dgU9ZulO4rFhXz2p4bI6UxC5xTSTTJJ4J5YXDIzKR3Br2Hwh8QtS0xljuWM0Q4Oeoq4ysDR9VeEvGelaxEoSdUkP8JNeoRThlBBBB9K9GMrnI1Y0YHrTjc9K1JJSMjPeq0i5HTmtCGRAEdeKQr7UEspSpyarbBVECFe3NQNximK4gOCOatRvjHPWpZojXhYkfSta3JBGelZM3RpxnK1KDisDQnVuatp971qSy3GvfHParMAw3zc1IzobVflp9wuAc1C3LexzF1Duboc5rPa3I5xntXpxOJmNdWx546VQMRHFbIyALipkzximSXojg5rQQ4GCKRoW0PNX4WzxQI0F5HAzUqrzSMyUDilYkdKBFGU5OTmnoMjrXUloc7ZYjHerJPy8VdjnuQNyfSqzD0rFo6IshK1A6Dms7m+hRljAwaz2Qkng1ZQnlkHGKnWLByP1qGWi0q4HPFOx7/rXMbn4ZlmPU0u4gHk185GCirHrTqykyPznDY3GkmUzqN5Jx60+VXFzyta5l3FpkfKayHgljbpmmzIhmJCgEYp8bHoOaALSpIelDRzHvQACKQdqcS69VNACCQ5xg0pu9jbVXJoAlWe4foAKlAuj0amSO23Y6HNJ51yn3l/SmBKl50DLV1Z4m5JxTuIvWlzJBKJbedkYdCDXvngr4k32nlYNRzNFwN3cVrGVmZtH114T8T6TrMKtb3Kbj2Jr0eMYx3985r0Yu5zNE/emnke9amdiPtz+dRc1ZmxpFQug/CqIG+V09Kqyx4zWliGykVojJDYzWbNEatuxzity2bK4NYyOiLNKM1bYEc+tc5uNBIq7C2RjNIZfjJxV63yT0oKOktwNoGaklXcMe9R1H0Ifs4JyR0NSyWqFCAMDtW/MYHMXMAPasie1746mutMxaMySIqcVGF/KtSC0iYOMVaUc4xTAsxjBxV1B0NMTNWBTV8LioJbAiq7kjvTM2VX4p6HFdSOdlhWH5VMGFaGDIm571ATzVNCTsIeaaQOtcklqd0GV5Fz2qDy+elQbCmL2pNny8ce1Q2WhpU46VATz1FYXOg/DM9ahlOBgV4R2oqKTnNXkbAqSmDc1AUOOlMRC1uHHIpqWiqcikBZEQpxjG71oC4uAKcQCOQDTEIYYz/DULWkZOQOaBXGm3K/dpyqwPINBROFOODUchYD5hTJKD+QxwTikEEJ6SUhjvJwflkqRVnUHDZoEaGm6xe6fcCSCZ4nXupxXuXhz4ua3ZbUuCJlH51pGVhNXPfvDPxg0i7ZUvVMLngk9K+gNG1jTtUgElncI4PYGvQjO5ySjY2yPyqBh7V0o52NQZHNOI9RWiMx6AGlkjDDgV0owZkzRYY5qsseDyKzkiky9bp81bMQxXLI7ImpD2J4q833a5WdREPftU8fB5pgXoeD1Na1uRuGDQBu271oDBrO2pZKnXk81Mc7MVRmc/dL+847cVXaPKdK609DFmJNbnByO/aqckOB0rpRiQhDmrca5FWItJHz0q1Gmcc0CNi2j45q64xxUdSGRYwKqSVRBUYUi8dK6UYtCq3FSq3vVmTQMx9ahLDJrVGTQ7NHAGM1EkaRdmKBRjBriSO65JtBqFlGeRWTNojJFx2OO1USOelc51H4X5xVKbk4rxDrQiCpwKRTJBTs81RI4GlGKCRRj8qRqYETDFKBxSActSCgBy0pAoGAApwAxg80ySnNaxPyVrPksgvKk4pWKuQrEw4BzU6OY/vA0gHMEk6HmqhjIbkUBsW4wF7mup0TxJqujOHsLp0x/DnIqk7CsfW3wt+LMd6VsdcYRydA5PBr6rsrq3u4RLbyLIh6FTXpU53RxTjYshdvbilb7tdiOZjM4NWI84roic8hJ0B7VRMfGOa1aM0PhXa2cYrSjPNeZI9OBfiOKtk5Fc7OhC5qVTjt0pjL0XIrQh4PWgDWiD4wOTWtbkkc1FyrFwB8+1TgHFMixRli61GI/WuhGTKM0fXis6SI56flXSjB7lQwnPSrEcWO3WtLkk4TC+9Kgx060EmrbHI5qy9UjJkT1RkPXFAFNyccioWPbBFak2Gk8f1p6mtEZtEhPy8VUZiDzW6MB8bknvVxRkdOa0sZbE+OMioT1rmasdCkSZxUZOTXG0d8RrLkc1UI56GuJnYfhM3HFVm5PWvFO5EiCpcYH0pksQ8A44qsHHmhScUmNEoVmcqhz9aj/AH3TbUcxfKCs+7BGDU4SYngZp8yFyitHOD8yGkxKP4DVXuTaw4eZn7jflVhY5yOIX4/2TRe24WGb8ZBBBp6sCOaYDgaXPNMgdnIyaOMUAV5IgxyODVJgVOHXIoAcscbfMtSFQOvNIdysyqc4OKYVP1FIZFjnuDXuXwu+IWoeH75Le7laW0YgHcfu1cZWZDV1Y/RLQtTtdW02O7tJFdHGeD0rUfivaTurnmvsMX0FXYV+XJrqgc0y5IuV4+tZ7Lg810yRzIixinq2K8mR60S7DJ2q8rgjGelYs6EOV6nVsmnYC3E3YGtOFsYHakBqxMevpWvHJwCOtZtGqZoQyFj1rSiwR1pCHMoJJqhImO1bRMWVXjyajMQ7iuhMwsQPCMnio/LrQzYx04zUW3BNWiOhYh4arjVqjJleQjoaoSnPtSGijJnaetVmY5rVCHKxHWpVbvWiIexJnIqu+RW6OcjXIOa0Y2GK1RhInLcdajzzipktAi9RHJ9c03Pb1rilE9GLLCAlaaVrzZbnpLY/BRuRSADNeGd5OBxRVEEErYU1ThAZyWGalloeGVWO0lfpSFyG4kP5UrId2BOTksT+FOWZl6OfypWQ7ssG5kI5kP5UG6k7kflQkJtsv22otEeVVse1dTa+JFijKm0Q5GDWVSHNGxcJcruYcmoRSzNI8I+Y9quaXFY3VyfNPlgfhVpcqsJu7KWpi3iuWWCXcoNUc5NaJ6GbWo7NLmrIEzTTgjkUCKrR4OUpuSOtIZBIgbrwar7Jk6NkUiiVWz98Yprrxkc0gPaPhT4/vPDd6ltcOz2jHBBP3a/Q/Q9TtdX06O7tZFZHXPB6V6FKXQ46kepux/yrTgFexA8uZbYZGMVUmTNdktjkjuUXGOxqrKSOleRJHsRY1HKv34q1HNwSSazsaXLMcnPXrVtX4+lBRowP81a6HvmpZaLsbkd6vRS5OBmiwGjDJ8wFdRaEbBWbRVzSVM1Wmj7UkwaKLJg01gCK3MmVnHzYpm32rW5kQstVJBjnFaIysMj68Vf7VsjGRVmFUWXPA6GhgivIvpVdkOO9WmU0Q7cDpTRkGruTYcretDHit0c7QwnpinxyYrZGDROHzS7u/wClbGK0F3Uzdjsa5pI6YstxNwBmpc+9ebJanoxeh+DBxSdq+aPYFzimkkUxFOZh0q/Z25ZN2OKnqWthskSDIqt5ak5pkEgRfSk2rnpQMXavpS7Vz0FAChF9KdsX0piG+UPeoZIpB9xiKkaZSaMryScirEN0ANrDp3oWhW6LySKwyCDUwatGuxmOzzSN/KpENJwaacMMUDIWXB5puCORSKQm5Twwpdo/hORQSV5o9y5HWvfvgX41l0jVU0y7lJt5ThcnpVxdpEySaP0RspFlhWSM5VhkEVrxHFfSQZ4cy2DkUyTpXf5HEZ7iqjLlq86UT0IyKzLjPFVmJHArBo3TJY5MEVqRuSOPyqTU0bc/nW7C5wKho0RcXkcVKjbTSRRoRv3zXTafNlRntSa0BM6GObA61MZFIrnsaEMm0jgjNUJBg4xWyMmRHr/hTD04rYyIm+tZ8p54rVGbII8hsVdRuK2MWIw4quyc0XBIYycYquyVKuWVJFPaq0igD61qmTYrZxwaXOOprouYtCg0xuOR1rZHOxVY7s81KxPWuhGD3DIIpA3J5qGOO5JGwGKd5v1rhlHU7ovQ/CgUor5E98TvSN0pgUghklwK6dT5dqFx7VK3K6GQ5yTUYFMgcPWimMZ0oHWkBJn1pwpiFBqQZoAGVWXkVSaBVyQOtIaZjqWim2kEZ6VrhnUeoqkxtEiSKe+Ksqw71TRmBGRUbKeoqCyMnHWlzQIVkVhzVRg8R9RQBLG6sOv4VUlV4plljOGU5BFIZ+i/7P8A4pGt+HltZ3zPANpGea+jEOK96jK8UeRVjaRbRulD/WvTT0PPa1KbDnBqI1izZFWTGDVSRc1ztG6ZBnB+lXIX96yOg1rVsNz3ro7YZUetQzRGpGABStjr6VKNB8T84zWxay7DTEbSTcdfpVmOb3rKxRZDg+1Dt700JkWc8UHNaGbI2Hy1QmA5xWqMmiDHOKlTitDMsKM0m32oJsMZarOtBRXK5PP4VSmHatEIz3B3VAD2zXQjOw9c9fWpDkVujmYmBT/XmtkzBojJ560wtWjIQgbHWnbhXK0dSZ+GopQK+JPpxwFMfGKZIulSRrdHzB16Vq3rqzHb0zULc0exmkClAqjIaRSFaYDWGKZ7YoGOxxR060gHK1TrTAXkU1qYiBlVnyRmnA9qQDGjVvr7VHtdO+RTTAVZAT3BqcN6807dUA1gDzmoGyKgYB8daSRweM0gIXicAOFK56ZHWhXz8rjmnsB6z8GtbfRPGUB34inbawzxmv1BtpFlhSVfuuMivUw70scNZdSyGwaV24r1k9DzWtSBjnvzUTHik2NaFOQ8mq7VkzZIjPJpVOOtZGiNG2fBArrNPbIpM0RtAAf401s9+PrUGhEuQ/WrkTnPU8UxmhHLg8E81dilyeuKQF9JRn1qwZBgVIh8ZBOc1bx8tMCBxwfaqZHUYz71ZFiN1xSA+laIzZIjDPIq2uDSYkgdcj0qjIuBSTLexmzNgdKzpG7E10RMWVHb3quOvWuhGb2JQDmpcHb0rZHO+4xuO9NBPY4rVGLWgjdM1ASc1oZ9RM8UzP1rOxrc/EAGndK+FPqhQfWhx8uaZJinP2pecDNdncwwLaK6S7mI5Gaz6mvQyMgd6N1WZC5oVqYBxTMc0ALg44pNtADSp7U0ErQMsqwIoOMUCIWIzSDrmgYuQKkDA0CIXCNTMFehyKadh2HZB9jTGP41TV9hFKckDAogQjDMayLPp/xJp9nq/wAH7fVbC3VZrTDSbeuBw3+favmZ0DruHWu6tHSL7mSG2kzw3SSAkMjAj8K/Vv4XamNT8HWs+csEANKg/eMqq0PRyKjc4WvbR5TK+4GmA0DK8nSqp/lWbLGk4yKcDzzzUlliM4YGujsZAGxk1LNEdTBIGXGalYAjrUmhUkO1uagmm2DcBWcnYuJVsdRSaYqD90881pTXe35kJrHn0NeXUIdVETDzOKtz6xCCDv4NSqiG4Glaapa4BMy8+9dRBdwSRgrIp+hrTmRnZ9R5ZSvB4qID5uOK1Mx0i5qsQRWiM2iEA/rU0bEGqJRaDAjFQTLwcVBoY0oycYrMkHPNdMTBlGQYqDPzdq6TOxchORzVzHy9K3RyyKzjHT8agJrQxEzkc1Wfg1ZHUFPFJmoZZ+H6Gnk18KfWCikkPy5piMuIbp8etdDcWvkwK4zzULct7GcATTsAd6szHBhSjrQFh2abmkFh60vJNMQoHNOwM0hjJTheBULPtWmIj3dyKkHIpDGn2pm00ANKt6UmGFIOohYjqKq+Yd+FNO5VifIYbWGKgIeNvVarfUk+jfghr9qq3Ph3UCPIu1Pl7umccivJfGOktoWuzWRyYt2Ym9V7V3P3qK8jP7RyEwGNw619e/s0+LPLuG0S7fg/czXHTdpFTV4n3JI22oZD8te+meS9zMaTHFQTXCRwlnbAFK4WKcF/BNwkgOPehriPn5ulZcyZpysybO++0XLIo4XvXQJ97/GiLuU1YmbIUkdqpW+rRRT7GYbvSonLlNIK50o1y0hh3SSYqvF4otWU7ZCx9qxdRI2jTb2L0GsJOPTPrUWraikNo2T24xXK6yaOxUJroeO6J4gkttTl85W2seDXU6h4tVIsxxlh61xqodLpu5yVx41jmBRhtbtmuavvE9yoIVsqfes+crkOH1TxjdRNsWZlP1qPRviJq9rNn7SzKD0zRzsnkT0PozwN8T7e5lWG8faWOMk19O2OoW1zbLLFKrKw4Oa9SlU5kefUhys1PMBXINIGUniuxHKx2wHpSbSDmqEKRioXbHXpTJM2YZPH4VTkUHtzW0SGZcijJqkwFdKMS1Dwa1FHy10I5JkMqcVRdSM9a2MkQNmoGOaYEecHmmFuf8/41Iz8Rlp+K+FPqhwqKU4SqEzOtQwn3DnBrrrm6ElqI9uCPaoS1LZlYAqhcMQetUZkcTZNX16c0imPNOApiH456U/FMkbijH1piGS54FQTqABSGKYt0Qwaob2ifawOKRSLUZBpd5BxQKw4O1MMozgikUQyyx7cE4NZfOcikBYimw2GFXCQRlT+FUnYGie1cxTJNGSkiHKsOxrb8SatdawIzc4LRjANb3sml1IOLUyRthhkV0fhfUH0vXra9iYr5cgzj0zXOtGW9j9Z9Cv01Dw7bXcbbi6DOPWrvmEY3d+xr2PaJI8/2d2PlgwhfHWuB8Xq7aRKkbFXwcGk5popQsz528K67PZao1tfFupAJ716ZcawJLSTy3+bHFcEJ6WOyUdTC8H+I1TUTbzNgk9TXvUF1Eyg+YORXRTqK2pjOm29Cw95EV2hhXNXVjZyzee8nI7CvlMZmGrhE/UctyJOMatXr0K0cdhLKVmkLIO1a9udHthiNB9a8WOIqT+Nn0tXBUKTapRHNcxeYTEcA1FM7XJA3ZxXVBq97nkVOdRacRwtrML+9jUtWLewW4yEA2n9K9X2kT5SWHm+h4t4qs8Ss0akfSuNk+1LBhs1SmmzllRlFao5K/jafk/eFZIikifJBxWpxW1LMF6A23OCvQivXfBfxHv9IuI7e5lZ4MgZzWlOTiyKkeZH2noPjWx1GxjkhnXJHIzXoemaik43Bgfxr34zueLKNjq45dwGO9Xhz7V0GBIq5HNZ92pTtxTW5L2MiRqoySc9a6EjNlV2B6HmqbD5q2RkyxEPXiryMBwSK6UcstSVhkcCqrpniruZFOSPGeelU2XBzVAVWPf1qHI9P1p3Cx+JqjFP7V8MfUijpVGckigktaUAHy1X5cF+KSLZWbgdaxrl8vtFNkoswAgVeXmkhslAyakHXmqJHgAUpFAJDadnimIryffHFQTtk4pDJomwAKguwrrjHNAGbBLtfy3yD2rSQBeSM1I2VpZwDwKqiXLZoKARiQ5IqTy8cDpSAjaEdcUoUrQMVZsNtYVcDVcWS0DAEcjNT2Fkbm5WNeBkZNDQI/SX4SX9tH4Yhs/OVpYgBgmvS7R/tNwzEH5TUSbZtFWudeLdpIxggcdK4zWtPad/IIwvrioc7Gihdnl3iXwN9qh3WsYMw5DDrmuctvh/rcbhnmO3+7XnTrqmrnr0MK68lFG/Y+B0hcTNGxcHrXaQaZLGoG04Ar4evmdRtpaH7Dg8lw8EnJXJpLTGcxtVRooQ21gfxNeK5yep95TpJaJD4rGGSTgcVv2uiJIenFaxmzatRio3saEvh6No8xy49a5ae0FvPsWX5hW6qtHz0oxl0KNxbXajcckGs35yMGup1H0ZxQpQ2aM6ew87qBVO40NHTJTtXJ9YnF7nfLAUprVHIah4ajUlsYz7Vymp6AfszGMc17+Hx99JHwuOyS15UzwfVbeeyvSHBFUUuQ0w3dK+sTUldH5dOLhLlkeg+HtWmsWDRStgds19N+A/HZ3LHMxAOB1rqpzaZyVIXV0fYnh7Uoby1SRWHI9a7eIjHtX0Cd0eI1Zl1KrXqZQmqRPQ465ZlY1k3D+ldqOdlSOY55Pepd4PTvWqIZIkg7fSrKyA9q0uY2LccnbPFPMgJ96dzNoDzn3rOmTOcmtEZNGbKuB0qoQc9KCkfigKK+KPphGOFxVUjNAGpolu1zOY061PeRtDcNG/VTUp62G1pcxbybauM81mwAs240MEa8YqdOppiZMKlX6VRI/6GjrQIToaQ0AR98VGYwTkmgBMbWz2qKQ4lyKBkV5DuAkAwRTrd98W1hyKQdCCW3BbcKWGEk4VSTUNpGiTbsjbttNupOFjIH0rqtP8K3ly4GxufavKq4uED63C5RWrb6I9f0P4YySIsl0Cq+9dk3w60fAiZcHHLV888bUnK8dkffvJ8PQp2kryZx158LrSaV1gmYY6YIr5/wDFeg3uhXjW80bsg6Ptr3KGLjUfKfn2LyutQhzuOhxaXG07H/Ct/T75LcAA8k9a9290fKJWZ9BfD7UWfUIjbyMCTyM8Gvv3wpDmzWWRMlhzXJKVmehCN0dj5Sy/6shcD6Vh3cdzC5LJuUdOc1hKWh0RhqaNlPA1uRwHHYipIrtVB3gGvDryVtT6bCxaehz+pa5bW6kFFyar6XqkV0w3RYB74r4+th7u6P0vDYu1oyO3t7K1mj4AJ9KwdV0ENlo1Ga5VHQ+7o1LPU40WMttN8wIArqrWYxwELzmnFHo17ShoXoLctbtJk5Nea+J9DvTAdQt5Quw5wT1rupUXVkonxOKrRw8JTZ6T4asP7U8NCZl+ZV+avJri2P8AarxxgkK2OO1OdNxRz0aqnNWN7+zSpDe2aZFGrkoV5HrXjs+yjqjOvbHcp+WuQu7XZkFKmLswlBSVjzHxN4ft7+NvkAf1r5u8SaLPpkxBB254NfdYDEc3uM/Gs9y7k/exXqcxBO8bkkmu00XUCrghsHNfTM/MUff3ws1MSaRHmTnA719F+HNRW5jK7s4r6Ck7o8SotWdpE4J61YdcjFdZynLajBycCuUuozzxxXZFnOzCkBUnFKJD3NbEi+ZzweasRzHHXmmQWY5uetW0kB5zSFYuRyelSyDIz6VaZlJGROAR0rNJOa2Zkj8T/wAaSviz6UOvFRuuF5oEWdI1FtMvPPUbsjFT6ndvf3T3O3BbHGaytrc2v7tjkpxI02GBGKv24ULjNUQaCVMv0qyWSg0/NMQ8GlFBI0mozzSABUhHFMCJhUTAelIZIhzwapEeVP7GgEXD7V6r8NrPTr66+z3JCvnvXm4vm9i3E+kyrk+uQU9mz6q07wppscYbaCa6+z0+ytcFY1GPavyeVaTep/VNLCwgtEbwma5xDGu1OhIH+f8AIreOmRS2oCr82K7W3CHL3PHp04VsQ6nSOhxckT2N3iRPl+la81hoeqW+Lu1ic45yBXHCTiz6SdKM4WaPO9a+HfhW5Rm+xov0FeQ6j8M9DDN5RK+lfQ0sdWh1ufneNybB1NeWzNnwx4e0vw+4ffuYdMmvpTwZ4mt5T9myCB0r16WJlUnqfA4nLqVCFoHqWnyqZi4zg+9dSscEkRZjz6EU6uMhF2OOhltWS5mjhdRhEVwzRVyuofa9hYHFfLVsZd2PusNlytqeJ+LLq4idSx79a6TwdqjK8cb8g120JKULnDi6UqVVH0RY4kiBifa2KzrrWZbC5CXKkqT1rypJxZ+j4a00kzbkFnqlrvhK7sVHotkjuYH4YVas2jqlJxi12NmeH7IjxMOK8T8U3txGHhLkRFT2zX0WBtGukz81z5yeEco+R6b8F59/hS5ibOAWC5rlNLsJP7dmATcGckVx4izqSiu7Ky69ot9l+R2uoWBjA4xxXMiwPnk4rw6lN81j9EpTTVzaj0xTCWK81wWsWIVmG3H4VlKHKddOV5WPNtQt1jkIxzXm/inSor60fKjcBxxXRQk4zTRzY+hGrQlFnyhrmnvbXbJjgH0rJim8uRVBxiv0+LvG5/KtSLhNo+mvh5r8lvZiMyY4wK+wPhpqJliyz8sa9SjLVHmVVufRFg4OB61ujp9K9g8so3UYIJxXGaiACa0iZNHJXK+1ZvQ+1daM2NLe9JvzwKoknjlG4VoxPlakZoRN361fV/loIaKF0DjrWVs9zXVocup+J9LXxh9GOBxTHOaYjNkALYPSq8kxjbEZ5rNmgwTSk5Zc1qWV1AvE8JPvtzUW7F3RtQ/2fL0coT71YezQAtHOCPQikpNbluKexWEEvJABA96YVZeqGtVJM53Gw3cPWlJGOtWSxv407H40CQuRSFhQMYTzxSfjSEIOKrXYygYdqYE9ud8QP51fsrmWyu0uIWKshzxUNJqxvGTjJSXQ+yvh94oTVLJI2f8AegYIr0i+mcIFBxmvx6vh3TxDpn9a4LMI1sAq/lr6nRaRK0cKiQDPevR9GYSuBmipK8ztwVLkoLz1+86a40a1uoj5oGfWuSvNEtbR8s2B9aTWhqqjWhx2qsjkwWg3GuafSJ3GXJye2KalY82pFzOR1fQJ2HcVY8B6eLPUWZ2yRXXGs0rI+brYVN6n0bZzgKNorVF2wTGcV4krvU96NNJWRiSGZpC5YlawtXmPlEL2rKEbs2Ss7HgviIPdS+WegPWtbQLYDaVJytfUUfdikeNnNKyUj1bR726VfnJG2qGpahdXt8kAi8wdM4rnmj2sJZ0l3Ogjt7+xImXci9cVPDr0sN2smCD3rF02rM932XOrnfnV4dStPvAPiuK1TTHngbjOfSuxVLNSR8fiaEXTlSnsdv4StTpuhi2jUhm612PhnTljvjI65JpU23K54yio3saPiODbLuxxXKwQA3IOOK1mvfPew8/3Z1k1qqwggDGK848Q2qbWbFZ1Y6G1Co+Y8U1WDMpJHFcbd26DcD0NeZBan087OB8rfEeAwXTEDrXhM0jGXIPNfpWHd6aP5WzSHJiZI9B8LXzIygsfSvtn4V6g2EUt1r1Kb94+cqfCfWum3xEka564r0eGTKivoDxh8uCnrXH6ogySK0juZs4+4U5wazpEOM12mJRkGPzzVdunWkSIGIPWtG3kwBSGasEgzir8bdM0xCSZPbpVLb71tcwsfiKKQ18ge+FMcjnNAGRPIS21adFGOrc5qSi0AvoKlUDPSgCZY1PVRVhIwp4JH0NMkmUyL92QgVG8s49DU8qHzMalzjiSI4/Or0clk+Nw2n8qWo7o1bezsZVJW5wcdAaw51CXQhWTILYzSUmFkLq8X2Mp82dwr234AWfh3Vtfax15U2ScKzjI/wDrV10bOauZyWhm/Gzw7o/hzxebXRLnzbaRd4Xfu2844P4V499a0rJKbSJWwpORUT4KmuYZDZnBKVeYZFSaHSeFtVl0nUknUnbn5hX1Zp+urq09sIGHONwFfLY7D81SNVdD9JyfMOTDTwze+36nt1tB+7TnoK39OuXguFyOBX563qf0bRilFLyPZ9IZbqINu+teYfEG4CagkEUhx3rfoebO6nYw9NhVPn6k9a0HmAfB7VjuWrWOT8UXfl2rOOwrz/wdO092xJPzNW8FuePXeqSPozS4wEGaL+aOJDznFEY6HoRWtjmJNRYfKOlU2nEgYMOKIQsaqOx5rraJ5nBxzVnRLlLd14yTXtRitDys6dqa9T1d7i3bSXlKBSBWL4N1Gza/BdlJDd6557I6sE0kke7+IJrSexQoVxivF9RFsZCMitKsk0j6PBcyjZjbJdjApJj2zXpnhoS3J2PyK8xXaOXGUYyi2eqw2GzacDHtXXadbxj5u4r0KEHfU/O6vw6HJeIpMz4HOKxrKPdIu6tpazPXorlpnQXJKx7Qc8V53q3Vg2fxqK2xrQWp5Xq0ancBzXnt9Dwa85LU+rfwnyv8WYWDEmvm3afMyK++wj9w/m3O4WxLN6yPlSKRxzX2Z8MLmMG3AOcYzXsU9z4iex9neHVaedZsHYvSvUopPlHNfRR2PGluW0fPU1lX8QbkVa0ZmzlLmHnis2SIDOa60ZGRNHg1mzDFUIpk4ar0TjZUiNW2PTithQNo5xTbBID9KrEL/kVojOx+H46UHpXyZ7Y0nHWs64l/hWkMgiXuatgUhiMwWrNv81AF9aUHmqMxc0E45piGHB7UnlL1NIZRnCqflqnESs6M+doPOKktHoHiQ2V3Z2/2QfvOhpYdH1PTNOGo28pUqM5Q8irhB2uNtXORm1O5u7rfclpJDwWb0q31qb33CUbEkUTyyLHEjO7HAVRkk0+/s7mzkEd1A8TEZAcYrSztcyMlfluM9jWmp5rMsdgGvVPhTqEVn4jjFxJhG4GTxXPVXNBo78NLlrRb7o+87JkdRLG25G5FdLBAsp+tfjfU/sim/dVjrNHaazypyUNYEunrqWpyFz8wHy5rToebWdpXKx0y5tiQM46Csa7t51JJU1mtzNSTPOPGUhFi6tkcYrE+HijG7rzXZHSLPKqa1In0lpsiNFtb0qjqcKGFiGrFaI9hfEeeTbg52ngVWe8CQsCeRVQkafaSPNtcvFaXIbpWpod0kkYYgcdc17kVdaHz2dVUkkzq77UhJpkkKeleMQT3drrCeQWwTk1lvdMdCT9nGUT0+58U3EMPkyMeOKyBqtxcIZfm9a4bO1z7KGIUdFua9hrUigA5yK9Y8I+IWjbnrWKTRz4itFxaPd9B1mS6ADGvTdNJKFieK9TDyuz8/wARaOxw2uOFuj160lm64HPNN/Gz1Yfw0TXcrAYriNZGQSaiozsoJXPL73AZjXIXpB4NcSep9LJ6Hy18XXQgqDkivm/Tod8zA819thNKR/Omda4osXC+XcBR2NfXfwN0y4vWRiCEUjmvdpq7PgKmlz9BtHthbWyxgcAVsjgj2r6WOx4b3LcT54qyw3LTEZNzFyTjrXPXSY7YraJkzCnXHUVg3PU5rUky3PPFSRyEHDGkBrQzBe9akdwOBmqEWg/Gaj3P7VSJZ+IK9KQnHNfKHsmfcS5+Vaiij5y1Ios8KOagklAoAhTLt7VtQqFWhCZMDTs7asgYXpmSemakofkIMk1UlmLHC0xDY4yxya0UhUjBFAjr/B/h+XWtVWyhdxxklQTive/Gnw81zw54IOqSaklxBtDKCMEAkDH15r1qUE4OTFFOU1FHz/pvlRMPPts/QZravrK0uLUyxQupHcKa+NSnKpzUmf01Gjgf7NdDHw5ZdH527n0f+ySPC7eIJ4ddhjMgPyu6A8f0qj+11p2jxeIobjRmgMIGCIuAP8a+3jb2DTP5jkrT0Pi5xyDV1W+UGvDNR6ydqsQyMjhlJBByDQM+yfgx4oF7bDT7qQeYvC5NfUli/lDJr8ox1L2WIaWz1P6syPFfWcDGT3Wj+R2GlXsEw2SYFSXypZ3iXMZ+Vuteanc9mtFqRq3Vzbui4I5rF1V4Ps3QZqEedyu54d4ysWurRzGOvSsHwFYTwqUMZ685r1PZP2bZ5E60fbKJ7nZoI0+YEGs/UYJJUYocLXlt2R9DCa3OEnUqxWuG1tZY89cGopvU0lLVM8k1CR2vxGpPJrsNKt5cgFtvtX2FKPu3PzrOKvNWUT0LT7TbZspGS1cneW5s5zJ5eTXmTerR97h6ajQix+naLeatIJmjKx5ySR1rpJNIfcLeBenBxXFJ7ROtK7cjqtM8KSso8xdo9TW5FoaWUybJM561u1Y8StPmk7Hd2ry6bMjbso3Oa9e8OayJ4GUHJFaU9JaHjzXtImPq04a45NVLe4Hmja1O/vHuwh7iNG6uACCfSuF1m4LyEA4FTUZ00I6nneoSDJ5rlrxgYmz1Armjue5Ne4fJPxNy8z8145oq/vGB9a+3w38I/nXNv96Lq2vmaoif3jX6K/CnTHsvDsZhwGIr6KgrnwNfQ+iNKN2LYGTmttJN2MjBr3Y7HjyLUZwRVxTWhmI+COaxLqPP0rREM5S8GDgetc7ODXQiDJkBDGqpPzc07CJ4n5HNakWSc5pAa8b5UAU4tz0piPxHqjcSn7q18qewMhjx8zdanJGPYUAZ08vOBUCAu1Io2oIwtXAaZIpbFVnl5wKYWHIpPLHpTZJlTheaBFcLJIcmr0USqOaBFgEdFFTIdoyaoR91/si6LBPJPqGoWweBmypPBOPQ/nWz+07q2n3N9aaPo96Zo5JQZEU9QPX8a91+7hJX6o7cF/vdP1X5nmEvhnSv7Mjl/wCWvU+3T86+5/h/8PPBmreAI/JWOWcxfOVbnOP518zgYxhWuux+45vXq18pnGS1jU19LaH58fE3wXLp3j17LR5ijeZgMh2EfXHSuK+JHhnXdJsEuNVnnnTAId5d4/xr1qMvae0Tezsfmuf5bHAVaSj9uEZfff8AyPDiNw+U1bg4UA1yNdj4pMc+A2afnjNZlnQeHtSn0zUoruFiChyfcV+kXgLW7fXfD8c8bguFG4CvkM2o3iqi6H69wrjOSpKg+uqOzs4mcFUOGB9asTXTPbvaS53ryM18Ej94mudWOcnuLn7IfLY7o+K5G18SyG9+y3alT0BxXXCF2eRXmqcGz2bRbWy1BFRnBr2DSvDOmqgdEANff0aceSzPwDGYuaruSL154dtyh2ICTXOXPhpo4wD3rx6+CT1R9Bhc3klaR59r3hnY/mRj8q8e8TWDRxMsiH8q+Xnh3F6H31HGwnDU8POnM+peZtKqp44r1TS9NWXy27cV9LB8tLU+KrP2+LTR7RpOk2zQBFUsQOeKll8Jwz3IedQEHavA5m9T9UjKySLmqizsLP7NbKoGMZFJ4Vs7bmeUAnrSj8RtNS9k31Zu6lKrOI48KCcCo/E+l20Oirdx3A39fxr2qNL2raPi8ZilhIxb6sxtZSQ+DVu8cqMiqPgHUNsJkdsZHrXn25WbUXzNpGzqN/vuCwPFLYXIa4GDXHzXkfVqNonTSsGXJOa891ycIzAGtJsdBe8ed3FxgnnJrH1KZI7NmJHSohqz1aztC58peO51k3n614zYT7bojOK+6w6/d2P5rzSd8Rc6W1uFj1KKQ44bNfffwu1j7VZxxj7gHNe/RZ8VWV2fVumtG8A2EEVoGNSOMV7R5JXYH8qIXOea3Mh8jc5PTtWfPJxk1aIOfuV3N061j3EJXkc10IzZj3Cc1jSr1ODzVEjI+vetGF8HFQUaiScc1GXOTxVXA/Eu4l/hXrSQxhRubrXyx65Nn8qo3Um0YFAjNjBdua27dAo6VIy6DSM2O9UIqu5ZsCpo1CDLUARvI8jbU6VJHGq9eTQIsZPYVIoJ6mmBaQAVYt4muLqKBOsjhRx61RJ+mvw91G08GeAhb28iszx/MjHPOOuOMda+fbGW11TxZNrElgxd254zzmvcr2VNQCjNwmprodt4tuEstM80WZHAXhM49f5GsLwr411Xw6+dLkbybj70bdM+or4nEzlRSnHdH9NcKKjjsVUw9V3jUV36jFF/rfi6K6mDNKzb3IGcfWtH9o5ra28KxWu9luW2hkYdfUj8u1e7l0ZfVpVJdbs+E47xNKrm/sqXw04xj92v6nwRIjIcrTI2kz96sz8h3LPmMD8wzVhZUYYzirVmLVEoIz1zXs/wj8VSaJrSwSSEQSnGD2NcOIpc9KUT2MvxH1fEwqdmfoX4WvYbsCSNgVYZBroNc0zeq3MP315NfkMVZ2Z/WqqaKSOKuD5b+YBj+8tcjrFvbzsHQDeORXRH3WmcVaKnFpnT+DleCcPNMVUe9fRNh4itIbcLG27HXBr7+hL3Ufzxj6dqrSNKLxLvfCAk+lT3OrtKOTgnpiumWx5FNWZz815EzETOK4PxEtrcg424xXjzgktT6alUnJ6HiGsWkbSbUXJ9hXYeGNKmKK0nypnNeLiaqjHlR9hl2HlKpzy2R69Zz2ljBtBBNYWqa6pBCt+VeOnZH6hTptu7PNr++eefqetbem6h5eELYpxep6dSKUC9ql23lblbmvINR16/+0/ZHdm3vgc9q+ty+STk32PxTiOEpRpqPc+hby5U+B47U8MUFeV6HcJb5iLYxXz9WWh9XhYcsjckuBIflPSp9PeUPnPFeXG9z6xPTU121NkQhjxXmmt6pvnIDd6ucnY6aKSdzlHuS8wG41zviW8KWbIGzxW1KOphjKijTZ8y+IrjzMhvWuAaJBOHXpX6HQVon80Y2XNUJ5kcTo4zgGvqz4R6wbRokJyjYBr0qbsfP1EfcuiXDR+XNGxMbjkGvRwQV3Kete7E8iSIWG7imFdo4NdCMGRlvxzVSYDk9q1RBnyJzVOZCVzWiJZy98dp5Fc/K3JxmtGZlfcRn2qaN/mzUjNRH460u+gD8UYkCcnk1LktXzB7BHK21TWHIxeTjpSA0bdAByK0VNAC7uM1XdiTimBYRQi7jURzI2TwKBFtFwMDinrtXqaYgDZ6U9TigBUkO7Fdf4V1CHS9dgv5ovMWI52n1q4uzJPa/HHjjSNd0vNtFJbzrHtG3IOfqO2a6b4b+MdGs9HW1uwqycAk12Vaik1YmKsZvxO8bwSXMcFkyPCzEuO+K5O48X2K20YhgBlHoO9ebUgp6M+kwGY1cFJypOzPpH4DaXfXs763eFomHzIh7r7DvXjv7S/iKLV9bhs49jG3yS6dD2/PIP6V9Il7LDWPnalSVWq5yerPlFyNxqs8QbocV8+NFYCRX29qseTmkUN8uRfutU8MskbgnscgitE+jJPqj4T/ABDNkyWd4+B0DGvsnRvFtrcKuJVcEetfmWYYZ0arktmf0lkWYRxWGUJP3o6GX4nnVs3FsRg9QK4WF3ceaCR7Vw0I87PYxtR0oFi1muprgIQxUV6XpkN1KqxqCqDqa+wo6Kx+N41pyuj03T4YrG23sRuA71ymseIEi3LGct2rqnKyPCpwc5WPL9Y8RyxWxYtlz2zXMx+JpHGJCa+UxVZ7I/SMuwkV70i/a6rbbg7cmt648TeXAEQ4Ar5V8zep+kU1BRsjm7jxIWbHmH86rDU5JjgHJNdkYu2p7EKkeh1elxnGXOSatahDImJY+QK10RvVloR3l6ZbP5OGWvMLdJJ9dFzKMBD0rshVcNEfE4mnGrZPo7np2paz/oYUtgKMAVxFtdq85lL4yelc89dDqpRS1OlsrvJ4PX3rpLe8VYjlgK5dj2Le6c3qGofeG7ivP725LyHmhK5qp2WhTN0I0yTz2rg/EV6zIQT1r06K95HgY+p+7Z4XrUu+U4NY0fzdu9fd09In8+Yh3qM6exijkAVzXrHhu1ktVSQEhWPFd8djypbn354Bf7T4ejDHJGOter2kZEYU9hxXtReiPKluWfLx14pHTJyeK3TMGVJFweO1VmHHFbIzZAyVWkQAcVomI5W/t95JxxXNTQkA47VsY7GbKmFqqr7WoBFyOXil872/WpGfjYiljk5q0QAtfMnrGFePk7ahgXHNIZoIT2qwv1oACeKI+SSaAJCC7Y7VYC+lMkew7ZqJgqjJNAFcydkFTRo5PzcUDLUahTyaslgeM0ySRMdjTmUnoasknsLG4vLyO2t42klkbaqjvX2n8KfhBbQMmpeLZljAAaOMMNo+vqf88134elzyu+hEnoesfFjxPoujeF3t9GuVjliHyBGxuPT8PpX5ua9fyXl5LdzuTJKcnJrqxk7tRQoI5cPlqnVsV4ZtYF+aT6VbyM0xkZ68U3PrTEGCp3KSDXoXhbWtTtmAinZgOxNc1WEZwcZHr4LEVKFZSpvU958P+NWci3u22t0INejaZrECzB2wyHtXwboOhU8j9t+tRxuHt1R6npmtaUyDyVUN3rppNdigtMx7RXrKaPgp0Jt2Zwuq+KpJF2iQ/QV5DrGt3v2guv3a5p1rqx6lHAyi+Y4+bWp53IlJ4qZL0leleLOF3c+sovljYuR6jtxntWzHdCdeXA/GuNwse1Gp0HxQqz7utb1s6Rc5AqGz1qWh0cOogADfgfWtu31RZE8suMd6m3c9GrUXLY0Wmsltzl1DHrXl2rXMMUpaKWtIx1ufMzl0OQvtUaRdu8n8aqW+oSBuM8etdjijnhUeyOjstTdeWJFbyanu4315klqe7CppqZl1e7gRn9awJbks+0DitYoblYpXUwVSWNeY69fBiQGr2MPC8j4/Mq6jTseTvI8l0248ZqIyFZtoNfapWR+ITk22zqdLYswwa+lNDjN5aW8Ea/MMZxXTDU55n2J4EVrXTljfqBXrWnzhiFY/SvbS908pu7Nw8DrkVA5HpQmQyhMfSqDNg4rpRiQF+vaqs0gC1oIwbmbOc8VgznrxWyMmZMwBzWHJw1MQwtx0pPMNJiPyE8zFMmmwlfMnsGGG3SbiKlBJbAzxSA0EIA5qbcCKAImNWI+EpgWIxUhznigkhlkCDrzVHLStycCgaJ2+RcpUImkI70AM86TvmnC4cUATrdEdauR3Yp3FY39J1WSxvEubdwJIzkE17fd/E/U9R0MWt9KTLGMIVGB7fjXXTquGxm0eP6vqlzfy+bcSF2A4rkJlllesJNtlIBAy9adtIzmsxktsOpqdxVAVmBxxUZLAc0gEjlwcGtG3naNxJE2CKRSbTujrLa5XUMIx2SjoQa6ey1DU9JcC6Vni/vDmvGqQi/3cvkfc4avOK9vDpuj0/TtW+0QiS3cgn3q9NrN4AElkYL9a+cmnG8Wfd0pQnaothsN+JCPn5+taAYSkhmBFeTJNH08XGSMq8sVPzIPyrJUNG2D2q4yutTnqU7O6JSAwJB6VADJG2VY8UGdmtS4urTRDrmqkutz561PsztjiGlYkg1iViNxrfs9WccgmpcLGrq8wt7qU7rwxA+tZJWWTBLHBpx0ONrmY6KB/OGeRW9FbLjgc03qdVOCirsVrd16DrUD+YgwM5rPkH7RCeYyr89VWudvOK0jAyqVkkchrd6204OBXkOo3zPKVVj719LhafU/MczxN3ZGPbvmQk05fmuCfSvePgTqtIUmUBetfaPwv0wxwRzSDJbFdFJamdR2R9N2aiOMKtbtpOUYH3r3eh5XU6iC8Yj5qsNKCDiotqMrPJnvms+aTB6VsiClJKc1Qnlwp96sk5+eTJOSaz3cnvXQjAquR3/Ksa460DKQJFQFhnrSJ1Pybmg3tkcUgghA+fmvmz1iRUtwMBamWCIj7uKYinPag5MZrEbKNtNS0NCh6uqwKUhk8Mo9adJLxgGmIzXZQcscmoyzyHCjApDNOOFgmOpNW44VVcEc0ySYQoeMUjW6Y4xVCKz2foartZuDxSHcgMMy9jSbpV6g0gJUuHB5q9DdjgGmFi/HcKwol2lDimI+nPhl4S8L+KvDZt/tnk6go/vYYH6dxXnHjvwJrvhedmu7Yy22fluYhlT9fSvV9kp0+aO5lez1PLitQOnBrzDQzpI8HpTYyVPWoKL8UjKwdDgjpXsfhXW4b2D7FeqrHoCa83FU3KF1uj6XLMQqdXkltLQ07/T7vTn+0WGTH1K1PBrNtcxbLhfLkHBBrwpNVocy3R9vC+Eq8kvhexUmu4UJaOYfnUcGvJC3zTA/jXD7Jy6HpfWY03dPQ6C28R2snHmj86fPf28pyjj8DXFKjKL1Pap4unVWjKq3AB4emvP3VutPlNVNFRndqjQEn5hxWttCDQt4Vdto71vRWcyEHaQKhQcnoE60Yas0PJPAYfhWtbWpbAHSn7FoxWLg9jbisQuM4rUtrQSPtA6VpGiRUxiS0NQ2SKcZBx1rHvLeJWPA4rvVA8GWN0ON1J4lbAOcVw+s3wiTCda6o4dHjVsezy3Vb6aVigOc1zE0ZVcnvXrQioqyPkKtRzldlW2DBsdzVtUKyjPU1scR6t4K0ye6v4sRkjPpX3z4SsPs1lHnjAr0KETnqs9EjbtWpb/Mw5r1TgN+EgcZB4qcsRUlEBkOMVC5Hr+NWiLFOTseAKzLhwOKtEswLlsEms8tzzW5zlV35PNUJDmmIrN7VW3f54oEfkjLcsxwopY1kc8180euXVCRjnrUDSs77UGKYGhGu1Md6iezRzk9aYriiwTsKkWxjAxRYLg1ko+7UBttv3lOKLCuKbSF+2DVZ7cxdBkUrBcI5QOCcVaTDdGoGLJFJjKvUHlzY680DK8rXKds1Gl84OCCDQBaW8yeRUqzxN1H6UXJsSFIJKj+xoR8poErkbW0icg0is6nDA0FGrpt5cWV0l1ZzPDMhyrI2CK+tfh/8XVnt10jxbCk0DjZ55XPH+0K7aFXkl5GcldE/jz4XQ39u2teDnSaJxvNsG4P+6f6V8oXtrPaXL29zC8MsZwyOuCDXTiKVvfWzIi+jMyZcrWY4KmvLZsSRN2q3E7xSiSMkMvNTui02mez+G/EizW4guT8wGOazvE02nFDISFb2r46VGdOv7p+rQxdKvg71N0eIX15I0pEMrbe3NUyJ8bt7HPvX1NlY/M5Tbe5t6PBNLkhmHvWlO91bHCzE1LinuXCpOGzKqaxeRNyxP413vg3WFvNTW3u8gN0rzauHhyto+kweYVPaxjJ6M92j0aOWXKHah9akvtFEEBcPkCvlJT1P1nka2KNnY7JBIMmutmufLhwyYwK7qNRR0Z85jKE56owxejzdxHFbNnqUOcEYr04tS2PlJqVPc3luoHXPmD86uwXkUafK3PtW8aaOWeIbViZrwbCckDuTXD6pqStmOJvxrs5UeY6jZwV9eAnapJPrXD6pLwxY1WhzvU4WOTzLg45qTUHHCKOas5yG1t5C4wpzXsngTwRfavfJNNGwiz6VvGLbMpSsj7S8PeErXTI02xjIHpXoMKbAFAwB0r3IRsjy5O7LiNitG3fB5qyTobY9CDVtjz61maFckdqruAKskozuB0FYsz45rRGbMuds9azGOGOK3MGV3PqaqMc1QiE4xmq340DPydigSNctyaGkJ4QYr5s9QjKHqxqW2Qbs0DNNfXvVhBVGZKtOPtQIcCKccfhTArSIp9qpvuT3FIZRmhSYZXg1ksssT4OfrUlFqK4kUc81dW7U8mgY9rhD261E0UEvIwDTERfZMdOaT7MO1KwDhA6nINTR7170CL6uQvXNVGmRmwy0wAIp5U0FT6GkB6l8PPHmt+ErofZ5jNaE/PbyH5SPb0r66B8EfFfSOiWmqovUYWRT/UV7eGqpr2ctjCS6o+Q/iD4N1bwpfmC+hLQsf3Vwo+Rx/Q+1eWTLXnVabhKxpF3RVRSGqyGwK5TQQSbWyDg1k6g08jZZyy1LSvc0UmlYzdpx0rV0qJ5nKZ4qJbFR3PV9FjtobTy3Az61hazbxhj5JLVlfQ3tYw00yZo/MkXaoqtbq1pdrLByyHNU10Ii2ndH0P4Z8WpJFHFcqVYDGa9GluftMPyMNpr4XEUXTlrsfuuX4yOKp6brcfZRTIc4DCreqWk0sIdvlXrxXFGZ9FOmuQ8z1G48mYoOgrAkvZNxI4Ar6TD7XPybMNJtIntdWZOC2a6KLXkiTJGfrXrpHyLkZ194nLjbu2genWuak1l3ysI5PU02SjPnvWVCWbk9a4XUL1pZCobIoiiZyLumW88mBDCzFvavWvDfgPUb6RZZoiF68iuyEHJnHKSij3Lwr8Pl+2q00XyqR1FfV+j6Ta2NqscMSrgelexTp2PPnK5sNENvSqjRCukyKZTafar0FJjRt27Yq1vyeOaxNCJvWq8nTgGmBl3LALmsGaTrW6ZkzLkeqJbPNamOpA8gBxVZ2HrVEke7jioC3PX9KYj8okVnOTVsRqgr5w9UqSnPFWIhhRQD2L0a8VOo9KsgcOOKcKBC0HpigCA5xTD05oAz54yp3LTFZJl2v1qSzPnieFsgZWmtEJE3IaQ0VRG4OCDUg3oeppAXoLog4atJHSQcHmqTEybaR0qNh2IpkEGcHHan+Wjj3qSim6NEeCaWO52n5qBlxJYZBzgVLZX1zpl9Hd2Nw8UsbZVkOCKdxH2x8OfiPovi3TR4d8YxRb5BsErj5W/wNeZfFr4XXOgl9S0Rjeac3zYBy8Y/qK9/SvS80c3wyPmKQ7SQe1UpZD2NeAzqKpY561YjfIw1SUO8kHla9Q8FeDtW1KNbqKBxCx4bHWjlvoNOzPXLz4eajaIJU+fIyQa4PUNGv7ZjmzbcPasnCzOlTTRnWGm6lqk7W3lsgHBGK2ovCZS9S2wWdjg0rE3Pa/E/gqy0fwbFP5X79gOcc1yeiaJqzKhhyQw4FOvh41Fys68JjKmGnzxZ2v8AZ2tWnMsD465AqnqV5dG3KMxHHQivj62BnTe2h+sYbN6WIha9meP6mxM5O7PNcne3gQkA16VGOh8hjprnOeN8wYnmqtxqEr/Kpr1rHyTlqRxXAHLncavLesq4jFLluHNYLSy1bVpvKs7aR89wOK+jvh58Hby8C3OqkqOu2vTo0HNnn1ayjufVmifDzSdPC4gBK+or0e30y3t4wkaAAe1e8qKieU6jka8FvHGvyqBn0q6FAX+lZM3Q1hkVWZeayZZWZB1pwU0ii9GQBjFTBqgoUtk9cVGxGMZpAY95y5x0Fc5dHH4VsjJmTI2PbFUpGrYzKUj1WZ8d6okRX560bh/k1RB+XyKFSqFxJk7VzXzp6iFijOMmp5RtwKENluIgrUwqiBQMmgdaQh+abTGNIBqs4waBCqQRg1nXUBU7k4pMa3I4ptw8uSoniaJt6crUlFlCsi5xzTxGr8UySnLb4zgVUw8Z4qSjStrnsa0g4IziqJaICydDSqAehoGPfGMGqMtuG6UDM+W1ZBkE1QLOpwSakCaKZkcMhwRXu3hD4oavpdkNPvXa7tcYCuclRXRTqODuiZRurFdxoPiPViYITHLKeiAitlfhJrt3dj7GP3LcguORW7ip6oi/KeseHvgKx2tqd2x9QOK9l0v4MeFrZF82ESHHORmuiNFLcxlNs6RPg94SkYMLZBg/3a9bsfDun6dpgsrOBFRRxxW/s0jLmdzFn0ZZWO89OAK5rVvCfmWzyLGCQp7VxOmdKkcNoPh22sdMuLp0DS5IyRWV4R0ZZtSN7Kmd0hxx0rm5dUjfm0Z6X8T9HnvtBSC2TLKRgVY8I6J5NnC08YDKoBGK9NU7zucDnaJ3s1lFJHtaNSPpXnuteFIJ1YxwqMjnArqqUlJGFOq4s8W1X4fqHdzGeegrzaP4aXFxNIzIwHYV5Dw2uh6jxLerZlXHwk1KdwtvlQT1IrstE+BEoIa9uSR3FdEcE29Tklikj0CH4G6QMHcxrtNP+Dnh63jCtCGPqRXpRwcFuefLGS6Hquh+DdG0mBUtbVAV74rtI7dI49qKAB6CvTjBRVkec6jk7srSjB71Dtzj2rlkd8dR44GcVKv4V50kehFiMMVWkGegrBmxVPWgelSMlWrMYyakoWZcAEZqsW/SkBmXIIyawbhMqc1qjNmJMCDWfJmtkZFOYYBrLkfHfFUIZvx3NRGRs9B+VaIhn5qXDYSqMMeW3NXzh6a2LbMAcVDOcsKYiWLg4q7mgQBqbu5oAcxxSBqBDs+9NcBhTAqspU1MjBlwaBGZd25zuXiq8ExU7HHFQaostGPvxn8KfC+G54NMktkhh71G0St1piKM1tjlc1AjSRHBzipGi8Ckq9cGq0iSRnKmgZB5z5+bNX4phjFIY2dxjrWQ4ByaYigwO7A5ra0iwnvbtLaBC8khwAKS3Gfob8IPAVnounJdXkKyXEgydwr6as9iABFCgDAwK9ynHlR50ndmm0oxUSzdBk10EF+3mIJwa01YsuKAsXoYU6kfWtCNFYEEZBHIxUWGebeI9DlFvMLUEK3YVheHtKki01QR86Nk4rjcfeOlS9074AvCN68j1qDGBx2r1IHnyBSc8UrPj611I5WQNCj/AHh1qSK2iU4Crz6CrSM5SNOGFF+6gH4VbEfIrrWxwyepZQD0qYDuKoyBhkdKXGRUlIzrhRis/vk1wVFqepTeg9RmngEda42jvixSMgkdqgccVxvc60VHGOKjGagolXqKsIcYzUjFkbK4zVGU4wfWkMqyEEdKz5U+WrRJgzx8kkGsmSPr9a3Rk0VJl+UVh3Ckd81RJm7u2abz2H6VoZn5vyEY5NVi248V88ekRSEhhmiZuA1SUyyvIBxVxTxVEDhUTCmIYW7Gk69KQByKmR6BinmoGUjkUxDo2zwap3duCMikykZyO8T47VpRskn1qSiwo28VJnFWZgGGaayqwwRSAzpIip3JUkcoK7WpFDZUU9Kz3BXpSGV3c+tQFmY4WkMtQxHIVQSzHAr7V+B/g1LWFdUvkBlflQa6aUbyMZuyPrOFscDpWvBJ2r2kcBYaXC4NQCQ468UwNaykzJXRRNyKBmvC4q7A/Oc0hGqFD25DdxiuQhtHhuXAPysc1mlqXsTuoGR3rOkUEZBrrRzspMcUzPeuhHNIeGxip4yc966UczNSF8cZq0DkVujkktR4P41aTNUZMlK8etIV4OKkaKF2McVmKu49K4p7nqU3oSrgcUhrnaOpPUjY4/Gm5zXDJHcmV3HUCq2AOhrBmw4HFSAnvmoGLjPU1FOMpx2pDMZm2ttPams2RVCM+YZrMkUD0rRGZk3PTGK5+7JBxitUQZDnJPFQFjnpWhk0fmqzMzVPGNo96+ePTIZ+cGkcFoeO1IZJaNuXae1aKkiqRA8kdaUEYoEQyLnpUBypoAkVs9aCvfNAEZZhUiyA8GgdgIHVTUiv2YUCK08Qbp1rKZWibvSZaLqTBkyTzUi3CngmlcLDie4pvmUyRpkqlKRnI60hkPmEcVE8maRZWALtgVbVRGMdTQSe7/CHwq2pX6310h8lDlQR1r7r05I4YkijUKqjAAr1aMbK5yTepuRnAq7G5FdxzlhpMio9+OM0DLttLhutdRaTAqBk9KYjSjlIOCavwS89aBHQ28uYBzVKds5qFuD2MeaTse1Zkkv4V0oyKLtlqcldMTlkW4wM+tWljGcg4NdqRwtlyNSDVkKQcZNWYtluKM5+lX0THetLHPJkmCO1RsBjipaFFmbOM9RVFU+tcjWp6cHoI68e9Ui+DWLR0xYxz3FRBjXBJHoRHAkioTxXEzrRExAJz0o3mpKJQaeT8v8AjUjMi8UZJHBrODfLz2pkkMh7g1l3D4JANaITMS4fuax5jkHmtTMyZlx3qmRz0FaozPzajAzU2a+dPRRDIMrTYDkEGkUMUGOTI6GtFXyKtGY7nPFHOKBCbiKTINAxrLjmkV8HFAEhIK1GyZ6UhjVJWpCQfrQAAkHFMkQOKYjKljK5xVAhjUGhJDcPG21+laQKyDKGgVis5YdRUBegCItmlWNm68CkMtLhRgCvRfAXhe613UEPlsIAeWx1rSMbuxDdkfdGg6dDpliltAgUKB07119qcGvcSscBtxnipQcCtCB28ilZs/hQMkicjkGtmzuCHoJN+Nxt3dauxymmBsQ3GBjNWHkG3mgDPuORmseTuPStUZMpk+9SqwA4rqicki1HIAauRy8iuxHIzRjlGeM1oxOpxmtUcrRqxAEcdKmYYHFbpaHA3qQM4HU81V8wZI9KTNIkTkVWIGOByK52juTKc5xzWM5wwrkkd8GG8HmkJ+XivPkejEQHPSncZrjZ1ojcZ4quxIaszQlVsAZpHf5akZmzOTxWYxwfWmhCNyDWVKDyMVoQYV0MHg1kScZ9qsgzpc88VS/E/lWqIPzbA2jr0pNxr549ANwPWoAcPxSKLgwwp2KZBYiPY1OcVZJC4B//AFVXYYPBpDESTHBp5APSkOwwEr61MrAimITrUTjApDQwOR1pwcetIYSsuzk1kkrnrQCGuqMOtQIrI2UakMuK5YYaoiqdc0gEBVeAM0oLOwVQTnsKBns/w/8ABF3q06T3aFIAc4I619j6JplrpdotvbRhQOCQOterShZXOOcruxtDg59K0IDgjNdpibETcYzVwGmIaSck1EzY60CGo5z1q/BJgjmgR09nJmPGavK+MZqhF2KUBhzWi0oKkZHFAEBmG3k1Vcg1dyGUJOGxUW4dM9K6YnNJB5uKkWY4611JnK0Wo5znOcVfiusEc4xWyZg0bVvfYxzW954ZOCM10pnnzjYz55OveqRkw2aGOKsTLID19acD7/nUGpWnGRjFYUykE8VyyR3wZVBNPB5rzJHqxJAacD2/nXHJHWmJzjFQS464rI0K+7A5NQu2TxUjKkxwvU1ls3OfSqQhwaoJslDiqJexz9ypOcisSZSOcZrQgzZBzVT/AICa0IZ+b7DiqrZFfPHooTNRt1zmkMkRyKnD0CJVenlziqIG7jTDkmgCJxjmoA5DUiiysoPBqUEdQaYEmfWkIoERMPaoNvpSAozk5xVVxSLIyDScjjNIBMn1p6ZJwMk0AdfoPh3VNUmVbe2cA/xMMV9O+CfhxBZFbjUf3kg5wRXZTpt6sxlLoe/WltFbxKkSBVA6AVdAz3zXq2OQVRz3qyp5yKokuI1Xonx3pDsTkgrVZ+O9UQRg4PSrcTUgNizmKtzW6XDDimA1pCOQasrMcgZpiIfOPmYzjNWxJwKZPUkkwQDmqr9elaxZnIpykgcVXDEHGa6zkZOrnB5qZZDx7VujAuQy88mugtbrjGa6EznkrlqSUFc81ReUA4zV3MlEkSUkDnrWlE2aQ2SS9Pasi4+6aylsbQ3MfJzShvmFeRLc9qOwu7HOacHzXO0bpj91IWJHNc7N0Z8pw1QO2O9QUUZX+U5rPZup6UxCg578U5uRTAzrleOaxJlHTNWQY06hQec1mHOetaEn5vBs1FIM14B3kBBFRnrSGICKlzQAZx0qUMPSgklDUuc0xCkZqu6UDKjZFOVyKQyVZcVZWYGmKxMJVNQTTIopisZDyZOahLZqCxoVmbABP4V0el6Bql8wEFq+D3IxVJN7CuesaH8Mr+42tdvsHfHFe6+Gfhzo1oqtInmuPWvQhStqznc+x6vY6ba2ShbeBUA9BWxt3DpXejnGlflwaYOCe1MRIBzUirzzQBKeKnQ0AWgcUhY9xTEMY4ang80AXoHragkzxmmQSs/HXpQr8UANdyGGat+YAoPHWmIu+YDHj0qMPls1cSJDJADVNhz612I42OXpz0pynvzW5gSowyatRyFT3rVEMvpP15qF5MscH9a0MixE2elbts3Aq0RIuOflrGnPBrKexpDcy2Hzcc1CTzXmtHqp6DSaQP71zNG6bJ0J+tSrx1NczOpGfcMN3ArLdz+NZGhWkNVCc1RJKtS/wnikNFKUj0rJmAx0qkSc7eMQSBWLkep/OtEQz82lJFP3V4B6AhPtUT+1MRDjFOpDHZpM0APDYNPWSgQ8S4o80GgBjMpFQEDtQIjI96jPHU0FDTLjgUxEmmfCIzH0AzSA6rSvC+s6gyiK0cA92FetaH8LryXa17JtHpjFdcKLluYymkew6L4B0jT8FohIw7kV6RZWNtbIFhhRcei16Sgoo5ua5sxr6j9KuRZU8VoIvqQxqQLjnrQA8qpHI6VWZcHiqJGjnvUi+9ADmp0ZpCLg6VGx/WgBoINOU4pgWUOP/r1qwNQSWyeKYjYOKYCsenfFPLfLjNICaGUlSD2qyrgd60RmybORnOahbNdUWc0kMye1NBxXQjnYbhTxJVJkNEiy4bGaf5nzcHNXcixct3+YV0cDfKK2TMmi/uytZtxyeKmWw47mW/3ulV3OOK4Wj0EyBzgYxUW7nFc0jpiWo2x+VTbsjqa5WjpTKUynFZUqndisDYrlSOKgaqEMVsN9KsgkrUsaK8vuDWTdHH4UwOcnXceR1rKKnP8A9etjM/Ou80+WLlRkVjNlTggivCasd6YhNNJxUANzTTnNAxBSnpSAD6UtMBp60mDQIcqO33UJ+grVs9Lv7ltsNrIxP+zVKLewro7Cx8C67dYxDsB9RXdad8J7+XBuZ9oPXAxXZGg3uYOoj0XS/hTpkGGuXMh9zXo2meEtEsQBHaoce1d8aSic7m2dZBawQjEUSqPYVcA9RXQYiOntUW3B6YpMtE8Y571dA4FZmhKhxVteVwKQDsEioXHFUSyrUin60AIxzSxnnNIZdQ5GDUDn3pkiKeakBoAtx9OavRHv6UCLm7NR55zn8qYiYHNRuaAFjfHFPaWmJk0cvI5q2HzjNdEWc8kITzUTnFdRzWIieDTC+DxTEJ5mD6VMsmT1qkQ0aNs2WFdHbtwOa6ImMjQMhxVeQ5HvTYluUnHNUpRiuWSOuLKcvyk1UDc8muNnUh4lxgnNW0k54PFZ2NUy1kFetUpEByT0rlaOpFbZySRWfIpFIDPkIBOKmR/l61LGhZGBGKx7gccc0IZiTjqKzSv+0P1rQg+IF2sMMMis+70yGdTtGDXmWudOxyd5pU8JO0FhWDIjIcMpB9653GxaZAGpcj1qCxVBJwAT9KvRWlzJ92Fz+FNK4rmvb6JqMuNtuea6ex8F6pORuAUVtGm2ZOSR3WnfDk4zcTH3FdlZ+CNKhPzJuI9a7o0ktzFzZ2Fj4c0mIcWyfiK66w0+zg/1dui49q61FI522dHGVUDaADVxZOOa1M9xxbNR7s1QC9TmnDI//VSAmGDUbqM0WAjUfNxWrGDtrJmyG4wcip46gssdBxVVzz1qiWVjUROKYhC3bIFIpwDSAmjmweadI4znNMBpfFSI/wA3WgRciOTWgh6UE7Fjd0OaTdg0wRZjII96ZLkdOKRRU34OaYXPrVITJ0fAq7E+TitFuYNF3PHamdT612o5RkmB1rNkYhqZI0NUqvjj0oFY0LaQhhmujt5c98V1ROeSNIyDHWoi/pVkCMwxzVCc4GawkdEdynIwK9azZHIJFccjrTK5kHelWUg4zWZZq20xI+lWi1YtG8WRMQQcVRn64FYNG5jTjB6fhVdGwOtIYrOcdapu3XNQUZV1xWRk+lWiT4hX1qzGTnivONzQjw3DDNRz6bazj5kGarcDCuPDEDnKNgVZtPCtuGy5zU8iHc6m00WxhxiIH8K6WC1t0xtiUfhW6VjN6m7aoq4AVQfpXSW7YQVumZtG5G2eKjY/OMVrcmxcj4GcVoxnBFNCaLytmn7jj6VdybAHI6VKpJxTuFidAakwR1pk2JsY7UoIJwaAsRSLhgRWrbcr1rJs2SLBj700Jg4NZ3LsOP3eaqP1qkS0Vz6VC3WncmxCx7U3JxQOxVkYq2KnST5BmlcLDTIQcGrULHNFwsaUT45H51oo3ODVImxYU9aTvjrj1pthYtQ9utTSDIxUXHYyXOCc9Kj7/hVJhYsxNzj1q5D97HrWiM2jWTkD3pVAz3rvRxNDJwB0rJnGaG9RJaFU0qt9aB2NCFq2IXIIraLMJI01YlemakUkjFbXIsK+QKoyk45rFs2SsZ7N81Z1y2G71zM6EjPZiOhpA5BrE1sacEh3YzWmrnbk1DKSGlstj9KUgMnHUVzM6EZkydTWey47VJViCQGqUhwKkozZiT3NUSnNNCsf/9kAAgABAAIAAAAEUjk4AAACAAcAAAAEMDEwMAAAAAAAAQAAAAEAAAAEAgIAAAAAAAAAAAAHAQMAAwAAAAEABgAAARoABQAAAAEAAHCMARsABQAAAAEAAHCUASgAAwAAAAEAAgAAAgEABAAAAAEAAHCcAgIABAAAAAEAACvgAhMAAwAAAAEAAgAAAAAAAAAAAAABLAAAAAEAAAEsAAAAAf/Y/9sAhAABAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQIBAgICAQICAgIDAgICAgICAgIDAgIDAwMDAwICAwMDAwMDAwMDAQEBAQEBAQEBAQEDAgICAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwP/wAARCAB4AKADASEAAhEBAxEB/8QBogAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoLEAACAQMDAgQDBQUEBAAAAX0BAgMABBEFEiExQQYTUWEHInEUMoGRoQgjQrHBFVLR8CQzYnKCCQoWFxgZGiUmJygpKjQ1Njc4OTpDREVGR0hJSlNUVVZXWFlaY2RlZmdoaWpzdHV2d3h5eoOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4eLj5OXm5+jp6vHy8/T19vf4+foBAAMBAQEBAQEBAQEAAAAAAAABAgMEBQYHCAkKCxEAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD/AD/6KACigAooAKKACigAooAKKACigAooAKKAP1+b4favbRCNrMzYXh7Y8heOSrHPB9D1zXn2r+J9N8G6xHo2qpeJNJbpPMY4gfsaMTtLDIY78EjYG4x6143DHHmU8QtYWneniEm3B63S3cWtNL6p2flZa/ofHfhNxFwTRWY4mKrYNuMVVi2mm9lOD1TdtGuZd2m0j23wDrVlqkaXVhfWt/aHBPlSIzr/ANM3Q/MjD7uxwDX1V4cnjdU2Dy2+UZyMHHY+/PU1+kYaonyyTPyOtT1akv6/rY+s/AF8klpDBMDuUDpzuOcBgeoPHf0r3e3sxPZp5QO4ZYgH5xyef/1Yr6TC1E0rr+vxPFxNJRnLTf8AE57VdDlYiQhgI243DDNgj+eP1FcTqOkSHbPED5kcg6j7yDsfXv8Ap9aVW6lJ3/r+vM1pRg4pNHonhfUw0MFq+1J4kCOrKyBsADdx/EBj16V7pp1gJ4VYybH2rwo46fXrWVR3gmkbU4RjN2X9f8ENS08rGyjMjHO3IzkcjIHt/SvMdV0S6ncny2PJyF3cY7emetclOreT12OudNJWtv8A1+P9efNpoEvmcKwZXbdxg7ueD3BHr9Peuo0C4vtOu44o5m2mRVKZ4PJGfx/w5rvpvmsrnHUgo30PW7vdf2sbeY25dofrjOcEdOc9/rWnocUts4uEWRim77o3EjPJPt6VtB238/6/D+rClFSWxuXVhFqeSAVZ2LHcvcnoR278emeleU+LPAk9xGwhHyg8MVb+f+TwPx2veKVjm5I813+XY8usvDFxBePGSdqADnAycdznjAreu/DkoQOgwxAZlU5B+XoO/pXVTtFX6mU6cZtxS/rr+R+Tujx6dcsN80W9YiRvkikB655UKxXrgHk9K/Jj42eJV1D4q+LZonWW2i1O90yAKflVLIJbBh7M8R/76r+HPCehOPEuPnKOkMPK3q6lP9L/AIn+if0k8bSlwFk2FpzvKeMg3btGhW/BPlPJ7PWdbimE2lajJpbIxAurYubuRz1CkMoRc9ASW9a9v8HfHH4teFJIns/GM+qwQkZs9btkvoHXP3CzbpVz6o6n0Nf0VSqzpyi4yP4dqQjJNSj/AF/X6n6FfBP9u3w5DcQad8RtDbQJpRHB/bulNJqOi7uhllhwbmAf7vnepwK/Wj4b+PfDvirTLTWtB1jTdc0m7UGC9027gvLV2HVA8ZI3LnDK2Cp4ODX1OXY9VEotWkunf0PIxWF1T6f1oz1m4+x6layCNhuVVZdhHLenTj1rgZ9MUiTKll+bAyQc4yDx9BwemK9b2nOlqcLXs02/6/M560iSC5EoLI6fKOOn19T/AJ7V7x4Q1+2WBVnIaQtg7m+UDHPJP+cfUVE9Kckt2VRnepBvp/wP1PQJDb3IWSJQG5IGfu57jH8qswaSl0wiKCRmwuSgycjgfUkEfWvIU3Cyv/X9fiexZStoY3iLQE0aAqbfE0yk4VDlc5JY89eP5cevm+m2ga6Mj5zuJZgM9D09s9ue3SvYwkueHOv6/Q83EpKXLtb+v6R67pFnDJEiffUkDgjrz82O2T/WuwsdK8qXAUGN8DpkDnp7jpx7evXr2v8A0v1OeUrHSw2cFp8jhWDgHORkf/r5/Kmaxp0bWzARr+9APyjp3yO3WtYRbipnHOqlVcb7+v8AX9fI8V1bw/8AZ5y6Jg5Zs9Nw/uke3HHtVGz093fySm8bh2+715+v59K35uWKaWxrC05PQ/jai+JHjLS5ALTXb8PK4Zv3m8KBxn5sn8M15fqmjXd/dTXsF5M88/ns73W1y80jF2kJ4OSx3E8nmvxHA5Jl2VzqVMFh1Cckk2uqX4LztZH6nnHFmfcQ0KFDNcc6tOnJyhF2tFvTorvTRNtuxFBoepRou+5WN1wo2JvC9eRnufXHera6fq6AGC9hkxjaJlniyemDtJz379cV6tmj5zmguhfjh1kgh5lV+OFt96n6fvc49fmFd78OvjP8S/hDrI1Twb4hvtAuRIn2i3ie4TTdSjU8JcWdxG9tOvUAnJXJ2sDzWkJzpyUk9UzKUYzTVt/61P1v+Cv/AAVC8ES2ttpHxn8Na34a1g7EPiDw1bNrPh67yoP2uS3803Vtz1SL7TnGeOlfpf4F+Jnw8+K+it4h+HXizRfFumjylu30q7D3WnyvDuW2urdsXFpNtGfKuUR8ZOMV9PgMwjXtTkrS/BnkYzDypJyi7r8uh0z6JBLlAyxsw+Xngt1x04yccfX3qnptpe2V8ImU437evB5zjgdh2r3JU+ag6kem540KvLiFBvV/5/1/W3tNjI32WN923aRt53fLjr37/wA69J8MzK09uZCq7GJPHPAwRkdM46e9fPTXM3/X9bn0sNF/XmerXOg6TrbGa5JlIibyNuE28cHj35z2z36DxjWfAK25M9ohCF3JUrtC7X6euf8ADnrXo5fWklGm1ojjxkYvnk35jNK0y6iITY6iNsNzkcdvfvXq+lWbC0WSRt5yFGDvxjnHHTsf5167W9jzKsuWKTfkU7uTyrgs4B2bgQx6D8sDn/OafNfRNAOfu4Xnp16dOtenhowlTjCXU8PEyn7RVFLVP8jKns4L1GG1SDnkHgLjpkevTFUP7FtoAXhCbuoP8Q4AK/icce3qa4sbSqUFUg02v6/yPWwFenW9lrr19T+Ery8yGR+duQgB4HX/ADmoj580sjW6lobVEM2CVQFnGFJyCCVz3r8tadnbdn2S1s29EhsclyjKzRs6ZA2mZk9RuBDHqK1NOuLNJQ1/Y6hcwDA8uy1W1sn6dN8lrKBz2x+NK1RXSlr0v/w5fNSdpctl1t2/T/hh0uo2MFtuZNSiuPNRdskVrNaLblDuleZWVt27aAgiPG47s9HedbXcRB2SKT13Z59QRyD9KuF3zJx2/L/h7mdS11KL+/ozMltFiDJEqHkn5kAYN68YU/UYJ/Wuv+GPxL8ffB3xbYeM/AGvXGia1YTRvLHDNN/Z2sWqvltNvbYnZc20gJDRuWxncpRwGDu4OE4vVdSPdkpJ+mv3H9LH7LP7Rvhr9pfwZF4n02AaL4j0aaLTfGnhaSYzTaHq5TcJI2ODLZ3S7pIZyBkCRGHmRuB9T6naKhE0YGWPfHPGc57Htj196/RMun9byypNO0pLbs1dNfff+rX+Kxl8LmNGLeie/lo1/wAEzLfxDcWmILhFALH5sEttx0P5Hkevr19U8Maz5rbgRlCGAzwT7e/SvHqYdxcu579HEc9j3/wp4hSe5htbnAR2KkEBiHxwx7ZPrzXoeoaTYz4kjkjlj6lVIGeOTjoSPSsYqWGqxS2f4f8ADf1571Gq0GmtvxORuNHt41kKoE6nkYwBn8s/571RtRsimiVujHZ1GPlI7/j7V7mHq3tfY8PFQ5b2e/y7HMalYXMhZ1Zhz0BIGc4zx79xjvXPyTyRZgkHDA46jPPXr1/zivUw1ZJpWOGvS5oyd/MktNReANEeULYD7iR9OBx+dWo9STzkEg+XndljwMH39+hr1sVRjicO+/8AwDysNUeGxT13f9f1/wAE/hIjwQowOgHJGfr/ACp1nOn2K/iKohTUkUyLHcFrlfIyAePLHlkHC5DHdnBAJr8Q2Uba6/5n6pa/NfTTf5oP3TAgBuc8Y6e/PPOKasRG7aw4Occ+vT1z/wDWqtVazMt09CwhZUYSLgcDJIw2e2Ouf89KoLDbJ5nlqUDyF2aFnHzkckYOMd9vTrxVfC01uJ+X9fIcbkD5GkEidi6FHH+16E+/GPSqyTwS3Ftb3M5h0+a6jju7xI1uZLOLeA8yJuUvIq52oWTcQBuFJ9bPXt+q/r8Nmop6N6d/6/rY+8v2PvGd9+zn+13beD9U1iF/DHirUrn4d6tqzSra6ZrVhcv5uheJlG9ozHdTGyuLe43MPs19Jhyr5P8ARzfXqxIiyMMKSoPy8/XJ719lkdT6t9ewfPzck2r91tfd2vZvfrufO5zQc50KyjuvxX/D/kcZqWoWwYs80QTckYJZQA5faIxg8sWIAHXJAwTXZ+Ctat7C9hhu50SOc7EMjCMsw5yMnqPbuR34rrrOEuduWxjhlOLguXr/AF+B643inSrDzr2LU7WSK1ieefybmBpI0TJyQWyvRhk9wKLX9pHwDp1laX1/4n0tLS9s472Jv7SsjKsLR5XMYffjGMtjA74xmvJxOMw1CUYzl+XS3n5rQ9qhha9eMnCP3r1/OzN7wd+1B8C/HOoJ4c0b4keG5vE8r+XHo8159lvJnZTtjj80KsjbsgKhJz68GvZDaeUS8OxywDkZ4GW5xzn8B6V0YTG0ayk6NRNLRnLjMHVp2jUhZ/8ABsPuY0ktmbyxFJg5zgKx9P8AOK8j1pplcl1z8+4HaM49Mj8OM59a9jBz/eO79Dza1K0El8/Uh8lvswmA+UAg8DK+3HB9M/Ssm5uCHB3HI6jOMHsxz+Q/rX1dGVotNnzFZP2jVtUz+HEMI06FmCnqPbp+dTQGSx0Nry4Lpa3Oo3rNIzgwyXUEMZKheoZFnT/vtfw/CrpcsW/61P1Zaqbiun5sztMd5Q80mR57syhjyqdh+I610sUSbTjk59emO5/z2pw1uRPRvWy0/r+vIimAKBVCs27djPBG0/Lz6HnmseeKRBG0CfvYl/fxA/LOi4GRjI3gcj15Hph7t2Errlv/AF/VyzY6T4i169j07w/p99qcssYdFsopr2eReP3gjVDgAkfeA6gZr6E8KfsV/tB+JNMl1iy8KNpWnlZGX/hIryDSjdlcEmNGy4+8MuQqDuQOK+fzfiTKsjcI47E2qS1jFaza726JWeraWj7H3nCXh1xXxrCvWyTLOahTfLOrL3aalZe5dJuU5NxShCMpNyjpqjzvx/8ACX4u+CdWs7X4g+FPGmkzWFrp9tZa8NP1TVdDi01EU262t7CrWzxwrjZHFJ+7IKYRhiv6ef2dfEcvxq+FXh3xbIl6JbrRLHTnkv1CXepaxb2apPqaJlUAnKNKvIOGb5SQa9PA8SYWrQhjMsxsZxq2XutPVK/K1duOm63Xojyc24Iz3KcdXyviDJauGq0r6VISjdX5eZSatJN7OLad9Gef6t+zxLoVxf6zcfGy/wDDWjf2xJ4nuNIvNLd7qw1b7d500cM7uWSBnG4WskMi7WOxgu0L7DL8Ote8ReH7TVNO1Ky8TWrKLi2SKG0S+XMZzeRQTQFtwXIyOcZwa/KeNePuIqMq+XZXJQpS0nUTftOa8pcqs1yp3equ3Z6o/pHwU8JeDczxmEzDiSnKriI3lTo1IxdDkSjF1JJqXtGm07O0Ve/K9yve+A7jSvCc+r2s9zJFZwiW606HTtE0mzaE72lgyDAjsBE7EZy7HavzEZ8n+IvwGvvEd3eaNq8EEEWiS6dd/wBpaLbJZqEutOS6gkBjw2WgljkI5OHGetfH0uLeIsJg54tRTjJ25mr8zilzJ31dlKLbb67n6/m/hRwPmHEX9gzUoShe0Yztywlzck1FRUUpOnJKKsly7I+EPi9+yf4q8IxXOt+DL67k1uG4S7txd5tzfxr/AMs0mUALKMfK7c5A+YHmvVv2Of8AgoJ8SNF8beHPhL8W7++1eBbweHf7Q12dYNX05/NIVZZmH7/a2V3z/vCAMu3Wv0/gLjd5upylD2daHKqkFtKN/ijfs91ra611P5s8ZvCGrwNWwk6VaVfA4nm9jUaXNCpFXdOdtHdWcXpe0tPdbf8AQ9pGpaf4t8OpqekXCXMN5apcWs8bb8gjgkjjnv8Ah1rwzxDql1ZXb2t7CQuSvYbWGBnJ7HHT271/QmXyU3LXs1+GqP5bxVPk0v3/AAuR6f4ntXAgdBg5Xaehb1559Af5VNqUUFxbG4gwqoGL4HIwM49QOO/pX0NLEe8oXPArYVpSknf+vv8A6R/DOZQikucqN2SccYHJ9K5iWQ3Uk5RvLt2b5maOOTzgOhAcFVCnODjPpxX43K1mj9GiuWS8jr9PKrAA9vaupQBJgLiO4I24DfLL5XT/AKZ1eWZQ+zy50TIP7oxXMhHqQxi6euT0/GlCM4pWldef+f8Anf1FOUG7OFvT9U/80WrSIahPJHpBuNReG50m2e3htB/aczXMjo3kW3mF52hdQCsTH768qOa1PE+n+HbTxPqumeCvEN3400G0v/suja9NoFx4bvtUUonEmnSSzS20qyM0RhMjnK5DEEVtBxlSqSkmpJpJW0ejbd9tPd0638iJU3Gzi7pa+e9lp/X4l74YePfEXww8W6f4p8NXDWuq6LdsHhfKQ32nSf63TZl/55uMrg8qVRh8ygj+jH9mX4kW/wATfD+m+PLSye80vWLie0udKnMMt7bwxSiGezbacBldXby/4gUfkMM/jXivk0XSwnEEF79NOjLe7Uppwfay/exezfOux/YH0U+Lq8MzxnAdSV6OIqfXI3SsnTozhVX83NKSw1SK1S9jJ6NnvnjzwtpTX1/pej6ZqFp4RtkgfzrFtRaO7vnto5pbRDI7rDHF5q5jAViecgDFeX/AZrbSPHnxDsNEn1FLOwn05d+oX8t7I1wtk8m2FHISPCy7SFGeDzX43QxVej7aOFrez0avHRpS0aT3W9t9rn9XcQ5fgs6ng45nH2zjUXuys43gnP3o7N3jfa17fOb44+MbTXvD/iWz1O4e1lbzorma48l5rj5iphBIyoxu6EkE5zkisvwV8SvCfh7TPh14f8Q+Kdb0rQb/AFK4mmm0xLa6l0t4LUSRzJKN8kCTFjKWHICYzt4r0MtwkfqGJcqrqc8rybu2+W7T1e6TdjHEYTA5bnHCvsoxhOMsTGKSS93koO1lraMve0/U9d0L4s+FviDcyeAtY8W2Wp+G9U1Blt7+5h+wXUaSEg3AkRCsqlh5n3c78kEE8/oDd+D/AA3a+ELae0a21CXWr/Tbdb/YFVrO20pYIYVZgCUSBY1Ve23k5ruw9R1ZVsJKd6NKNRqMk76pK9ndbKKfojPi7LMBl/EGW5llc481dU4yaabSjLm5Oa92ryqNLvKWrVj53/aL8NaHPo1vDb28cTQ26RBokCCR1jyUPTapbngnGTzX8vX7XVje+FPj1He6G62skOnWWuTPbMA/mx/KZmI53EKp655yDX0nBsYYfiqt7LSM6ck0trJJ/nH8PmfmvjrReN8IYV8RZzo4unUg+t25Q/FTZ/TB+wZ4s13WfgR4L1nVxcixutFtksjdwtC9zh/+PhQ3PlhQAGzyd2OOT9B/EDw6dRnfUIwPJdQ5wN2G2+5/z+lf1rk8rYbBzk/spfdoj/NDMk/b4iMVa0n/AF+Nj5w1Lfpd2qs53B+uOi59/wD6/eu90jU4buyMbXCkuoymVJKD+I+/+PpX0Sk7p3PHnC8ZRZ/DXPc/aFO5itogJ6bTOoH3vZOPqfpWZZSNqUpckxWMblUjU7fNGep7Y9vSvye+ysfZJdH0OkN8ACkIIRSE8zb1I/gQA8sQPp61IhlmxvZ44mxmNWCyPz1dz/JOPc1d9tdiJR7/AHn3X+xT4X8A/wDCTeMfiB8Q/Dek+LtD8CeFWt/CfhbU7NLnT/EfxU1a4+yaDpc/mwTW62yzJPNLJcxTLlIFETu67fszwB8N/h34A1TSfDvg6Xx1pX7S2hePvh5ffDn4jaZrfhm+8O+HtQeGA6xp0+kalC1tve2uHuY4pRP8pkWaOOOIPLeYQr0sHlOIwlD21WNSpKEEr3qSiqOHlJ3TUadW85WafKpXUk7H7T4KYzhZ43i7h/ivNVl+GzHCqFfFtu9PBYdvGY6jRVp054rFUaCw+EhVpSi8VOjOMqdSEG/yL+KsTeH/AIqfEnTri+fV/sXjfxVZNrSWlvpSajLDr06HUfs6BEtvOYGQQBQqBtoUY2j6n/Yn/adh+CnxCTR/EGoPH4E8ZSRWWpt5jodA1jHl23iKMN0EbHypyvWFtxJMSivP4wyiOdYHPsqbvKpzqN39uMnKDurL44xbXVaHwvhxxTU4L4x4Z4mjL3cNVj7SyUm6M06dZWfV0ZzUezsz+hrxh8QfEWlaHbavofiDRrmx1eztJbC9YRXljqMvkf6mYwsGWYxO0fmpklRA+Gw4HpfwV0b4EavpF3rE8OsWHjTxGxutfGkXf9pQRvFCI2uHby0gACAAsGIzgZ3ZFfzlwdkuBzSWY4fMISbcEk07cslL/wBKTSumf3h41cU5lwnSyPM+HZwvKs5TUve5ouLSX+BqTs1/dtc+b/2kfhh8Pddtbi08IeKoJb37WskmkyyQveqgkw0SCM7Qsjqy4IO07s9MVHpfw8+DGi+ENMtPF94bnWba5N2dA0nU498ztGFFhNNDjaj4WN1jJZgpBcE8cmOo4Th+FfJqeMVWc6nNbeUYWej6atr5X7HfwDm+dcdZplmf4jLfYU6FCpCMm3yzq1ZU4znFPXSNNpPu+703n1b4T+DfDC3kfg2Ma1POdNVbNLFLq01iYqun28azqyx20DPECkQ3ld2H7164vxj/ALOk1vwfp2qJqOn6X4rv5dGCyYSPSXgQRQJnKqFyeNx49Kyqyo0Mqw+Mpz/fTnOEo9bJU7Set/ecp+vL5H0mKp4yfH+KyutQ5sLRo06kKnRzlUrR5F9n3IUqb0s/3jf2kl5n8avjXpV5LaadDcSPMIT9qR5FKx/PtIDA4A4LZH93npX8/n7SfimLxV8YNX1HTreO5VrK40oxM+XmQf6sjtzsH4kfj9BwNz4nPq1Xl92MJa/K1u27PifpA4qjgvDXBZepJzq4iD+UW5fotPM/pS/Ye8caR44+B/hSWz09dNutN0y00u6trRXggtLq1sYYzZeX22xGFxnO7cxOCCD9g3dxci1a3dQ+Q2FZQQU7A8dVHX9a/rTKqsZYWi7WVl/k/wAj/NLMIOGIqJq/n/XkfOfjjRPKhlvXWQ73blUO3JzgjHP555rzPRtT+xTmIts5c5YBe+MDHr3r6OMuZRlc8aSUW4/16n8Xl9Z3tzF9iijgQmQiV5bpEeVAOgHLfN9OlVHEulokNwmxmUhGjYPAccHBB6juD+VfmDju7H1qtsuppwXNvHEZGdf3KgBe4yoJI7ZPufSmW9zc3jNJBEXQSBcHfHERgncX6sfYYX0JoDa7ZsQX2r2xQ/YYZAnQW1x86/MDgd855+tfSnwu/ac/4VB4X8UReH/ANlB8UfEkd9pyfFzXpNT1TxB4d0OewWBrLSkdvIsLhcMft8YMxEgVjsRVPdgcY8FiKeJVNTcLuN9UpWfK/wDt16pd0jCpDmvHmPn7SdPufEOqWtnBqulG41i/t7JJtQ1Kz0jTrV5plQPPc3ckdvbxLuy01w6ogyzMACa6Xx14F8Z/DzXbzwz4x8O6j4e1ux2vJpuq2r280kDE+XeQnmO4tplG+K6gLxSoVeJ2UhjnCjVnSrV4xvGLV325r2b62bW+17K92rjcY2ja3/A/r1PZ/gj+0d488E/Y/DMHiWeHRjcRrDYeI7u7u9CgcY8uIgh2tFDABJogUTcRJEyncv6LX/7avirTNDGg6leaZ4MheN49Ths4rTRb50ZBlvl2RTwNjKz225G3MeoIr8t4ky+eX46visqp8lXFXk0l8UlpKSS1ctU52WqalZ8tSR/SHAmeYXiXIcvy7ivESq4bLLU1KU2nCnK7pU5ydkqb5ZKjdvklCVPmiqlCB4w/xe0/Ubo6lpvxDtdbMzAB3vrWe9tG5HktlslQOPXrXQWHxt1bTLlbuzsbW+1BXVjftLcRgYP3h95QfcN61+W4vKK8q854vDyo1dea6s/xWz6H9KcPcQZdhKVCWS4+GJw8LcqhNNLsnZvVa3VvxPZbj4xfELxRpVtp0mj2trdXTQSDULm3ne8WNFzE8T7gMDdweRzn3qXRLT4hWUdxqqavP9p3PJctNMqxGRhllHOd3HfONw56UqWQ4urCWHWEd5bNq2m+n9f5m+K45yqnja+aVs4gnF6xi0/ebSs/S234s8J+KvxbudBt7yS+u1utWdJIIYYZGmVrj0AXng8AsR3r8/tO1DXPFPi2Bore8udT1HVjGltAks8skpVQLdVGWOcMcD61+j8G8OVcrVetiYWlNcsV5b3+8/nLxl8RcNxTLLsty2rzUqLc5Pa8mrJa9tT+rb9kjR7v4V/D/wAPadPGP7T1GCyv9btnPkRfavsUcWxQOF2xoqY65XJ+avszUvEUc8QIQRttBwCu3P1449/pn1r98wdL2FHDx6pXfq9fzf3H8sYqXtalWSfXT0Wi/I8b8YeI5RatHkbcssmNhyhzgnsM/wCRXztr1yGnWSIssg3b8Dbx1z69q9+jP3Fb+v6/rz8itG02rbL+v69T+QT7AYVRE3pNOo+VSXuJB/z1dzz+AwPrXVafbQpBH8iMqjYoIU8DjHPfrX55GO6ufRyfuqyNJoLdkBaGNio+XjDBvQEYI/z1FcrqdiAzTwtJblCWeWJMtGB3kTo6ep+8OuSKpxvfQzi3dX2MJ/tUo8mSysbro7Oo8mUg9JkZMZDcYdOh6gHrbsUtw/ki4vrKcceTNOxDc/dBb5WB9Dg+9ZpdzSTburff/X6mpJbuxAEUJmjwd+1Y5JePu7k6Hr94EV7N4N+O9rpOh2vw/wDi14fn+Ivw0hN3DYaVfytY+L/AjXCASar4X1rY7WDo6pcNplwJtNuWT9/aGRvOTpw2I+rVVNw5ovSUdUpR6p/mnvFpNapGbh7SNk7P8vT79tvMwfHfw302yvrPWvhT4kj+K3hPW7I3+nzaLYyW/i3SPmIl0XXdFVpLnTr63YEM8bT2cy7ZLa6lUkJ1Nh+y1+2B8V7DRbew+EPxYvNIt5YbbSU1fw/qOnabGHcKk4N4kZES5GZXzGiZ+ZQDSxWVQxOIh7Gj7aMHz05Wvy3T36KaTakukr2vo31YbM8Tl9LFRhiXSVaHs6iTa5o8ylZ/3XKKfmtNtD3/AMVf8E9Pjd4b03QdHu/BUEspuUtri80PU0eJLyZ+UuJ5VRVWFyd8lujqERipODj6S+DX7OPxx0rwp4O8KXOm6T4ktfEGna1qulqwNlqek6JZ6wiRiS7uAySpM8rGONlQpHtBYhto+ezrhbGZ1hZ5cnyVU1KD1tzJqKv15fe1+/pr9twRxvh+Dc6pZvKj7bDzi6VaHV03abcbu3OnCLjfR2cW1dtY/wAbPDHxa8A6jbDT/BXi+zmit4oiNPtX1NWugdoihNspi2NtJABJIy3QDHlGj+I/2s/GNn/Zvhz4PfE7UbWZxbT6lF4K8ROs0pfaYlkaNYlUYIZ1cDqCcV5+R8MZ/g6bweLwUnWg2tE5JpaKz10sv6Z7HHvGnDGbZtPMMhxUYYOrFSs/cab1akpcvvXbu9V2b3PYfh7/AME7v2j/AIv3UHiH4ptbfCXw3BLDLb2GsGLU/Fd+5b/XG1t28q2AQ/KtxJuU4zFiv1F+AP7EPwg+BTz6tpunf8JF4mkjES6/ryRz31pHtKyeSCNkbTHLM6AHnbnAr9GwPC1bL6VLF5ivfdmodV5vz8r6aI/I8TxFSzCvWo4F+4tObo/JeW+v3aan0/DpqWF4jREKqHlMnAOeo/DtXaS3xlhU8heU3Z2j7uNo9+P/ANdd9V6q3Qwpq0bM8J8ZalMlxOhZtrOy9DzyODnnPTg+vWvF9R1sLNhvkBYfeHUev5V6OHk+SJw1o+/KzP5T5Lnc8lyi4y8Y3MpyVDAYGMbVxnitDTJwY2Xdgo7Iw6FWD4x9COR65r4RNXPda0i77f8AALMlw8e0hgVyfmH8PU4I6/8A66ja5Q4kYbH5XzVG5GHPDexx6Vd7GXXYxri18rM1qoePczy2mcEHHMkJHTPcdD0xTzeabdjypmSWQ7cJKNk49hjncMdFPb0qNFutGaatK26M65mtYsDzZXjAIRg5W6hH93cD869eG5HrWSW1HWp7fTLKOa/eeeO1too4GmnnndgkdvGigmSRmIVVUZJI61HkiktHfY/oc/YS/Zt0T4CeFoPFOuadbXfxP8RwxyazfyrHPN4csWwyeHLZjkIV4a4kTmSTAyY0jFfplpvi9zqUPmzMICwGQdvzbRzx79R9etfc5dh/q2Fpw5bO136vf7tj5/E1PaVak76foe66e/h/X7R9H1a2guLO9iZLhGOzzH6iQMuGV9w4YHIrl7nTNK8N2FrpdmNkVjCIYdqlUKDaMAEnAY/MecZJOK7qNKP1mNW2q0Xzf/AOetUboThfR/5dPkUrXbeurvDFPsKkCZUdhg4wu71z/PmvS9MtHk8sR26IAiqdmNm0cY6/0719ngqdo83WX3/gfCZnUi24ylblv6fp+ZoarZhLSdQFLsNyqDnBwP8AA+v51xczJZ4RxiQgj5imW+X7uByMHv6Y6YrjzbCud018KO/IcWoxSTvd/gv6/rQwLqSOV1kQndnpnr2zgc46fkO1N+0pLE8IdlG0npja+0jce/H+HSvz6tBwk0folKXNBO55drphuop4rhUZ42bcyjO4Y+9ntkf1r5v8Y+WshEA5iY5yMMAB0HP1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BLcEnotbqjArmtKudjEk4zXQwTrKvBya7qKSikeTXk5zcvMkpCKdilI4rW5lYiNFOxRRcLAWppY0hNMLVBQpam5pM0UxBxTJANpxTs1HLIFU5OKmcU4tMunNwkpLoEQ5FaIcLHj1rMtWDsCOamupjGw9K823vOJ7XtPcUu6LMkqqhGeapxuHfkcVQlvCzHmnJcHHFXaxCqzlsi5KIGJGBmqhKRvjHFNMuDu9aryz5P0p2uEp1I68pq2kqBq0I51bKGufhmGQSatrckEY7UpQfQI4hN+8rEt+mM1lAkE1r3EiyxZ71kykLzWafQ2k9Eyrcnc1VyMGpjlmJqNx1rRGL11LFuxRMk4Bqle3SvMqA5UHmqd1dS7tithRUKBj83U962hDVSZyVq904RXqzq7Gy0+eNSGw2Oa2LS0ht1+Q8VyumiRlDRnkdq24LiVRiRTxXRFrscbRsKQelOK1Xt5HkT5FxVtUYLz1q7k2IttFSEYooAosaZTjmgCkgYlJTsUlMRFKr4+XrWVem4c7egrYYcGs69kVFJLCpkVEl0ds/J1K9a0byEOOaytCyJmYg4boa2pAep6VyTh7za6ndCreEYvoZAs1JJxSLakH2rSRQM+lIUByRXPzNNo9CnK0VZFB7YY6VTnt+a02OM1C8e7k1TkW3fdGcls2eDWjawMw561JFEuQMVpwWyqnPWqhJtnJiIxSvazMuZTGpB6VmTHOa19SUgHArFmOBScbSY4TvBeRF0qKToTUigsaS5ASM0+o3s2Ysw3Sk1LbnDYI4NIihic9TVgxBVHrXV0PLerZY00zLPiM9OcV1VqJ5lG5APU1gaPDukL9hXV2vyqBVxJkWIUES4FOL+1NzTGJrQgV3oqJjRQBWAp2KAKWhCYmKTFOpDTERyglSBWLLp1xLKS5+QHpW21IE3VMlcqLsRWKCJQuMEdKuEtIwTt3pI416kcipY1Vcse9YSRvFjjAAlQFcDAqw0gIwKgJGa46itNnp4d3giq8R3fWkaFlxVshSRSMFJxSaN7jbaABwTzWm8eEBFVLVC0nHatGfiH3Fa0Y6NnFi52aRj3sRILL+NYF+nIA4NdQQsikd6xtQtQrZI6VpKJhSnrYy40CjnrVS/bMZAq5IcZqhcDcGrOO9zqqv3Ld0ZCswbg1aWcsuGPSqhyrEUgzmuo8y51nh6RJE8tRk966WNCqj2rz7Srua2uUMZ4YgEV6HG+6FWPUjJrSGxEh26msaaWpjP6VQgZgKKhd6KAJQtGKdQTV2M7jCKQinE0lSykNK03O3pUhFMYAfMxAx60nsNbgJsdeKnDo3Gaz7q6t0jL7gSOwrIbWXRsk4BrFo2izcu72KFgM1C18jDcDWfM/2mNZBzmp7a33RYIrkqNN3PSoRaVr76lgagnrSi8Trmqj6fzwcUwWDE9TUaG95G/pcySPxzWncEFCPasLT0NuRg1Yn1DbJjsa6adlE8+upSmyNpDHJkHg9abeJ5qBvWqtxKQ+4cg1L5ubfd6UN3JUWmmYd2CrlaqTgJEc9TVy5cFy5PFUQGuZv+ma1CXXojolJtJfaeiKU1ofK39+tU1Uk1sX0qIuwday2ram21dnJXjGMrLtqSWrBbmL0DCvRIWzAhHTArzVWKsG7g5r0HSZhPYRvntWsDnkWGNRk1IwqMirEMNFBooAs7qQmmbqq3mqWtopMjDPpTcibFyopLmCIZdwPxrmL3xLcTErANi+tZM1zPKcyOWJ96hzKUTqNQ8SW8AKwfO9c/daxfXJO5yqnsKp4zyab1OBUttlJFmK6lUEMxYH1pk0hcjnimUigvKijuRSGtXY6myjxaJ9K0rX7vFNhhVbeNSMYAp21oT7GuGTuz3Ix5beg9waltoQw5qLzBj61dtk+TJ4qByKtyPJUsKoRCSZi79O1aV4qngn8KgC8YUYWqUnYXInZtFWQ84PQUyWYiIovSrjWpcZ6KKy9TmWFdi9egq4yey6mVSnFXk9kZd5KZJBCn40k9wltGI4+W71XdvL+cnLtVZmLHLHJroUNl0X4nBOs0218T/8liDOztuY5NNPNBNA5rQ57jCK7DwvI4s/Lf8AAVykcTSyKiDJJrUTUXsLtFP3QPmFOOmomdezVGWqG3u4rmMSRnOe1PJrQkCaKTNFAGTq+vLBmG3OX7n0rmpZJZ3LysWJ9aTliWY5J70vQVm3cqwhwBSAY5NHU5NadlcaXBCGlj8yf35oSv5AVrbT7m65RCE7ueBTLm3S3k2K24jrVu81y4mTy4gIY+mB1rOye/JPWm7dPvADWhpFg1xOkpGEU1mnk+1dPo8bJaKR3rKrK0Wb4aClVintc15XA2ovarX2fzIhnrVS3hLsHbtWkHUIPauJHtS6WKbafJGwYHIqdDM3ydBRJd/wrQj4GT1oJ5WNmSNOvzNUccJZtz9PSkd2ZsnmkknMa7mOAKCrWW5JdyLHGQOBXF6ndl7kgHIWtDVta3qYojz3NYGSxJPU100KbXvS+R52MxCa9nB3/mYruWO41HnJpWoUVucAgFPC+lKBW3oOlo2b+64hj5QHuR/FTjG7FcnsLCHTNPa+ux+9cfIp6jPQVzVzO00zSt1Y5rR1zVnv59qHECcIP/ZqyTTm1stkCLthqM1o4ZDle6101lqkN2gIOG7iuMGRU0M0kTB4zgikpWBo7cvRWLp2sLLiObhvWiruhWMMdcUh5OKVe9C9azKFIFRkkGpDTDQAAZOT0pSQBmg9Ka9ACrXV6Uwe2XHbtXKLXTeH/wDV9/6VlW2R1YS15X7dNzbSUbcDimvMemai/wCWhprda5H5Hqw5rakqdcmn+Z6VEOlNl/1Z6/8AAetIsbdalBaoS5Bb0rnNQ1ee6YgEqnpUeo/64/f/AOBVTNdFH2f/AG95nnYz2/lyf3P/AG4Y57etLTW+8KdXSecNPWnAUlOHSgC5pdg99dLEPuDmRvQVpeIdRSNF021+VEAD4/8AQam8L/8AHvP0/wCA/f6Vz91/x9S/e+8fvdevetF8GnzF1IHAC+9MVSeafL0oT7tZjGEUgODT3phoAeCQcg/jRTV6UUAf/9k=

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 <question><correctAnswers><correctAnswer></correctAnswer></correctAnswers></question>

]]> Solve the problem.To measure the width of a river, a surveyor starts at point... Solve the problem.

To measure the width of a river, a surveyor starts at point A on one bank and walks 75 feet down the river to point B. He then measures the angle ABC to be   Estimate the width of the river to the nearest foot. See the figure below.
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 1.0000000 0.3333333 0 0 34 ft * Vertex Form using a string substitution (difficult) y=#p

y=?

 

]]> 1.0000000 0.3333333 0 0 #pt <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mi>random</mi><mfenced><mrow><mn>3</mn><mo>.</mo><mo>.</mo><mn>7</mn></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p</mi><mo>=</mo><msup><mfenced><mrow><mi>x</mi><mo>-</mo><mi>n</mi></mrow></mfenced><mn>2</mn></msup><mo>+</mo><mn>18</mn><mo>-</mo><msup><mi>n</mi><mn>2</mn></msup></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><maction actiontype="comment"><comment><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>Text</mi><mo>&nbsp;</mo><mi>form</mi></math></comment></maction><maction actiontype="comment"><comment><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>two</mi><mo>&nbsp;</mo><mi>versions</mi><mo>&nbsp;</mo><mi>because</mi><mo>&nbsp;</mo><mi>of</mi><mo>&nbsp;</mo><mi>the</mi><mo>&nbsp;</mo><mi>sign</mi></math></comment></maction><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>pt</mi><mo>=</mo><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">if</csymbol><mrow><mn>18</mn><mo>-</mo><msup><mi>n</mi><mn>2</mn></msup><mo>&gt;</mo><mn>0</mn></mrow><mrow><mi>string_substitution</mi><mfenced><mrow><mo>&quot;</mo><msup><mfenced><mrow><mi>x</mi><mo>-</mo><mo>#</mo><mn>1</mn></mrow></mfenced><mn>2</mn></msup><mo>+</mo><mo>#</mo><mn>2</mn><mo>&quot;</mo><mo>,</mo><mi>n</mi><mo>,</mo><mn>18</mn><mo>-</mo><msup><mi>n</mi><mn>2</mn></msup></mrow></mfenced></mrow><mrow><mi>string_substitution</mi><mfenced><mrow><mo>&quot;</mo><msup><mfenced><mrow><mi>x</mi><mo>-</mo><mo>#</mo><mn>1</mn></mrow></mfenced><mn>2</mn></msup><mo>#</mo><mn>2</mn><mo>&quot;</mo><mo>,</mo><mi>n</mi><mo>,</mo><mn>18</mn><mo>-</mo><msup><mi>n</mi><mn>2</mn></msup></mrow></mfenced></mrow></apply></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>pt</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mfenced><mrow><mi>x</mi><mo>-</mo><mn>5</mn></mrow></mfenced><mn>2</mn></msup><mo>-</mo><mn>7</mn></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer>#pt</correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_literal"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Vertex form using compound answers y = #p

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#8201;«/mo»«menclose notation=¨box¨»«mi»a«/mi»«/menclose»«mo»§#183;«/mo»«msup»«mfenced»«mrow»«mi»x«/mi»«mo»§#160;«/mo»«mo»-«/mo»«mo»§#160;«/mo»«menclose notation=¨box¨»«mi»h«/mi»«/menclose»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«menclose notation=¨box¨»«mi»k«/mi»«/menclose»«/math»

 

]]> 1.0000000 0.3333333 0 0 a=#ah=#hk=#k]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mi>random</mi><mfenced><mrow><mn>3</mn><mo>.</mo><mo>.</mo><mn>7</mn></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p</mi><mo>=</mo><msup><mfenced><mrow><mi>x</mi><mo>-</mo><mi>n</mi></mrow></mfenced><mn>2</mn></msup><mo>+</mo><mn>18</mn><mo>-</mo><msup><mi>n</mi><mn>2</mn></msup></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mn>1</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>h</mi><mo>=</mo><mi>n</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>k</mi><mo>=</mo><mn>18</mn><mo>-</mo><msup><mi>n</mi><mn>2</mn></msup></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mo>#</mo><mi>a</mi><mspace linebreak="newline"/><mi>h</mi><mo>=</mo><mo>#</mo><mi>h</mi><mspace linebreak="newline"/><mi>k</mi><mo>=</mo><mo>#</mo><mi>k</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputCompound">true</data><data name="gradeCompound">distribute</data><data name="gradeCompoundDistribution">20 30 50</data><data name="inputField">textField</data><data name="casSession"/></localData></question> Vertex Form with Cloze y = #p

y = {#1} · ( x - {#2} )2 + {#3}

 

]]> 3.0000000 0.3333333 0 <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mi>random</mi><mfenced><mrow><mn>3</mn><mo>.</mo><mo>.</mo><mn>7</mn></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p</mi><mo>=</mo><msup><mfenced><mrow><mi>x</mi><mo>-</mo><mi>n</mi></mrow></mfenced><mn>2</mn></msup><mo>+</mo><mn>18</mn><mo>-</mo><msup><mi>n</mi><mn>2</mn></msup></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mn>1</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>h</mi><mo>=</mo><mi>n</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>k</mi><mo>=</mo><mn>18</mn><mo>-</mo><msup><mi>n</mi><mn>2</mn></msup></math></input></command></group></library></session>]]></wirisCasSession><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession"/></localData></question> Pre-Calc/Chapter 1: Functions and Graphs/1.1 Modeling and Equation Solving Match the equation with the appropriate graph.f(x) =  Match the equation with the appropriate graph.

f(x) = ]]> 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1.0000000 0.3333333 0 true true abc ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Correct ]]> 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 Incorrect Solve the equation algebraically.x(x - 2) = 35 Solve the equation algebraically.

x(x - 2) = 35]]> 1.0000000 0.3333333 0 true true abc -5; 7 Correct 2, -35 Incorrect 0; 2 Incorrect 5; -7 Incorrect Solve the equation graphically.3x - 2 = x3 - 5 Solve the equation graphically.  Round to the nearest tenth.

3x - 2 = x3 - 5

]]> 1.0000000 0.3333333 0 0 2.1 * Solve the problem.  The following data set gives the average home value, in... Solve the problem.  

The following data set gives the average home value, in dollars, for a city at 5-year intervals.



Determine where f is increasing or decreasing.]]> 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 1.0000000 0.3333333 0 true true abc f is increasing until 1980, then f is decreasing for remainder of x-values. Incorrect f is increasing for the given x-values. Correct f is decreasing for the given x values. Incorrect f is constant for the given x-values. Incorrect Solve the problem.  Use the graph of f to estimate the local maximum and ... Solve the problem.  

Use the graph of f to estimate the local maximum and local minimum.  Answer with Y-values.

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 1.0000000 0.3333333 0 true true abc No local maximum; no local minimum

]]> Incorrect

]]> Local maximum: -1; local minimum: 2

]]> Incorrect

]]> Local maximum: approx. 1.17; local minimum: approx. -3.33

]]> Correct

]]> Local maximum: ∞; local minimum: -∞

]]> Incorrect

]]> Pre-Calc/Chapter 1: Functions and Graphs/1.2 Functions and Their Properties Determine if the function is bounded above, bounded below, bounded on its ... Determine if the function is bounded above, bounded below, bounded on its domain, or unbounded on its domain.

8x + 3]]> 1.0000000 0.3333333 0 true true abc Bounded above Incorrect Bounded below Correct Unbounded Incorrect Bounded Incorrect Determine if the function is bounded above, bounded below, bounded on its ... Determine if the function is bounded above, bounded below, bounded on its domain, or unbounded on its domain.

y = 2x - x3]]> 1.0000000 0.3333333 0 true true abc Bounded below Incorrect Bounded Incorrect Bounded above Incorrect Unbounded Correct Find horizontal asymptotes Find the asymptote(s) of the given function.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«mo»#«/mo»«mi»b«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»c«/mi»«mo»§#160;«/mo»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»-«/mo»«mo»#«/mo»«mi»d«/mi»«/mrow»«/mfrac»«/math»     horizontal asymptote

]]> 1.0000000 0.3333333 0 true true ABCD Your answer is correct.

]]> Your answer is partially correct.

]]> Your answer is incorrect.

]]> y= #e

]]> y= #a

]]> y= #f

]]> y=0

]]> None

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>6</mn><mo>,</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>e</mi><mo>=</mo><mfrac><mi>a</mi><mi>c</mi></mfrac></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f</mi><mo>=</mo><mfrac><mi>b</mi><mi>d</mi></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession"></data></localData></question> Find horizontal asymptotes (none) Find the asymptote(s) of the given function.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«msup»«mi»x«/mi»«mn»3«/mn»«/msup»«mo»+«/mo»«mo»#«/mo»«mi»b«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»c«/mi»«mo»§#160;«/mo»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»-«/mo»«mo»#«/mo»«mi»d«/mi»«/mrow»«/mfrac»«/math»     horizontal asymptote

]]> 1.0000000 0.3333333 0 true true ABCD Your answer is correct.

]]> Your answer is partially correct.

]]> Your answer is incorrect.

]]> y= #e

]]> y= #a

]]> y= #f

]]> y=0

]]> None

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>6</mn><mo>,</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>e</mi><mo>=</mo><mfrac><mi>a</mi><mi>c</mi></mfrac></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f</mi><mo>=</mo><mfrac><mi>b</mi><mi>d</mi></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession"></data></localData></question> Find the asymptote(s) of the given function.f(x) =  horizontal asymptotes(s) Find the asymptote(s) of the given function.

f(x) =  horizontal asymptotes(s)]]> 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 1.0000000 0.3333333 0 true true abc y = 9 Incorrect None Incorrect y = 1 Correct y = -9 Incorrect Find the asymptote(s) of the given function.g(x) =  horizontal asymptotes(s) Find the asymptote(s) of the given function.

g(x) =  horizontal asymptotes(s)]]> 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 1.0000000 0.3333333 0 true true abc y = -3 Incorrect y = 4 Incorrect y = 2 Incorrect None Correct Find the asymptote(s) of the given function.h(x) =  vertical asymptotes(s) Find the asymptote(s) of the given function.

h(x) =      vertical asymptotes(s)

]]> 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 1.0000000 0.3333333 0 true true abc x = 2, x = -2

]]> Correct

]]> None

]]> Incorrect

]]> x = 1, x = -5

]]> Incorrect

]]> x = -1, x = 5

]]> Incorrect

]]> x = 2

]]> Find the domain of the given function.f(x) =  Find the domain of the given function.

f(x) = 

]]> 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 1.0000000 0.3333333 0 true true abc (4,∞)

]]> Incorrect

]]> (-∞,2)  (-2,2)  (2,∞)

]]> 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 Incorrect

]]> (-∞,-4)  (-4,4)  (4,∞)

]]> 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 Incorrect

]]> All real numbers

]]> Correct

]]> Find the domain of the given function.f(x) =  Find the domain of the given function.

f(x) = 

]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAATAC4DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6+StWvtA1BPEHj7xfP8RryDWvGtzoFlp/hjxRqtlaaPDa3seiqXEF5BAFkuLc3B+USZu2ULIImc+geJPF19+zHbal43+Ivi241vwJdwwHWtSNuwXRdQMjIJobVPMcWkwktrYQxl2haCJ3E7XF1cpy3iHwL420j9kT4eeE7fwVqXiHxog0G81y2sLyxWRb2G6tr3UJ5pZ7iNJZZZY5y0is5klkLMcMXqo25o8211f7y4JOVnsbPxN+Hnw2+E+j2Goa1q/wASZVvtRtdMt4LP4heIZJXlnmSFTg34ARS4LMSAAO5Kqew/4Zp8I/8AQX+IH/hx/EP/AMnV5l+1b4R+Lni7StOvfA+mR6nHdtprvoM2l28t1pzQXkN3Iz3Emr28J3GJAUjSTcYgu9Q3mD2vxN4N8Q+MrXSp7Xx54j8DXEcA+022iWumOJZGAJ3i6trraVOQAj45PLcGnaPs/wC9dp+llb166/LoyXbS3X+v69DB/wCGafCP/QX+IH/hx/EP/wAnV2vgrwPp3gDSpdP0y51i6t5ZjcM+t63e6rMGKqpAlu5ZXVcKPkDBQckDLEnj/i/8O38Y/ChPCV3p1x43vblobZNUvmtoZrKboNTZkEQSSE/vB9nUPuACBckhfgH4c1rwt4d1Ow8TaBDY+JEvW+3+ILd4nXxG+AFvyVYyKzIEUxyBfLK+XHmNENR1a7fj/X9dbJ6Wff8AD+v66X9E1bSbHX9KvdM1Oyt9R029he2urO7iWWGeJ1KvG6MCGVlJBUgggkGrdFFABRRRQAUUUUAf/9k= 1.0000000 0.3333333 0 true true abc (-∞,14)  (14,∞)

]]> 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 Incorrect

]]> (,∞)

]]> 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 Incorrect

]]> (-∞, 14]

]]> Correct

]]> All real numbers

]]> Incorrect

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»(«/mo»«mo»-«/mo»«mo»§#8734;«/mo»«mo»,«/mo»«msqrt»«mn»14«/mn»«/msqrt»«mo»]«/mo»«/math»

]]> Incorrect

]]> Find the range of the function.f(x) = (x - 1)2 + 1 Find the range of the function.

f(x) = (x - 1)2 + 1

]]> 1.0000000 0.3333333 0 true true abc [0, ∞)

]]> Incorrect

]]> (-∞,∞)

]]> Incorrect

]]> (-∞,1)

]]> Incorrect

]]> [1, ∞)

]]> Correct

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»(«/mo»«mo»-«/mo»«mo»§#8734;«/mo»«mo»,«/mo»«mn»1«/mn»«mo»]«/mo»«/math»

]]> Incorrect

]]> Find the range of the function.f(x) = 6x + 14 Find the range of the function.

f(x) = 6x + 14

]]> 1.0000000 0.3333333 0 true true abc [0, ∞)

]]> Incorrect

]]> [14, ∞)

]]> Incorrect

]]> (14, ∞)

]]> Incorrect

]]> (-∞, ∞)

]]> Correct

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»(«/mo»«mo»-«/mo»«mo»§#8734;«/mo»«mo»,«/mo»«mn»14«/mn»«mo»]«/mo»«/math»

]]> Incorrect

]]> Graph the function and determine if it has a point of discontinuity at x = 0.... Graph the function and determine if it has a discontinuity at x = 0. If there is a discontinuity, tell whether it is removable or non-removable.

f(x) = 

]]> 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1.0000000 0.3333333 0 true true abc

Yes; removable

]]> 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 Incorrect

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No

]]> 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 Incorrect

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No

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Incorrect

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Yes; non-removable

]]> 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 Correct

]]> Identify intervals on which the function is increasing, decreasing, or ... Identify intervals on which the function is increasing, decreasing, or constant.

f(x) =  - 4

]]> 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 1.0000000 0.3333333 0 true true abc Increasing: (7, ∞); decreasing: (-∞, 7)

]]> Correct

]]> Increasing: (-4, ∞); decreasing: (-∞, -4)

]]> Incorrect

]]> increasing: (-∞, 7); decreasing: (7, ∞)

]]> Incorrect

]]> Increasing: (-7, ∞); decreasing: (-∞, -7)

]]> Incorrect

]]> Pre-Calc/Chapter 1: Functions and Graphs/1.3 Twelve Basic Functions Graph the function on your calculator to determine the domain and range from ... Graph the function on your calculator to determine the domain and range from the graph.

k(x) = ex + 1

]]> 1.0000000 0.3333333 0 true true abc Domain: (1, ∞); range: (-∞, ∞)

]]> Incorrect

]]> Domain: (-∞, ∞); range: (1, ∞)

]]> Correct

]]> Domain: (-∞, 1); range: (-∞, ∞)

]]> Incorrect

]]> Domain: (-∞, ∞); range: [1, ∞)

]]> Incorrect

]]> Domain: (-∞, ∞); range: (-∞, ∞)

]]> Incorrect

]]> Graph the function on your calculator to determine the domain and range from ... Graph the function on your calculator to determine the domain and range from the graph.

h(x) = 

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]]> Incorrect

]]> Domain: (-∞, ∞); range: [0, ∞)

]]> Correct

]]> Domain: [-7, ∞); range: [0, ∞)

]]> Incorrect

]]> Domain: [0, ∞); range: (-∞, ∞)

]]> Incorrect

]]> Domain: (-∞, ∞); range: [7, ∞)

]]> Incorrect

]]> Match the function with the graph. Match the function with the graph.


]]> 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 1.0000000 0.3333333 0 true true abc g(x) = -x2 - 4

]]> Incorrect

]]> g(x) = -x2 + 4

]]> Incorrect

]]> g(x) = -(x + 4)2

]]> Correct

]]> g(x) = (x - 4)2

]]> Incorrect

]]> g(x) = -(x - 4)2

]]> Incorrect

]]> Pre-Calc/Chapter 1: Functions and Graphs/1.4 Building Functions from Functions Find functions f and g so that h(x) = f(g(x)).y =  Find functions f and g so that h(x) = f(g(x)).

y = ]]> 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 1.0000000 0.3333333 0 true true abc , g(x) = 10x + 6]]> 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 Correct ]]> 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 Incorrect , g(x) = 8]]> 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 Incorrect f(x) = 8/x, g(x) = 10x + 6 Incorrect Perform the requested operation or operations.f(x) = 7x + 14; g(x) = 4x - 1F... Perform the requested operation or operations.

f(x) = 7x + 14; g(x) = 4x - 1
Find f(g(x)).]]> 1.0000000 0.3333333 0 true true abc f(g(x)) = 28x + 55 Incorrect f(g(x)) = 28x + 13 Incorrect f(g(x)) = 28x + 7 Correct f(g(x)) = 28x + 21 Incorrect Perform the requested operation or operations.f(x) = x2 + 2; g(x) = Find ... Perform the requested operation or operations.

f(x) = x2 + 2; g(x) = 
Find f(g(x)).]]> 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 1.0000000 0.3333333 0 true true abc ]]> 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Incorrect ]]> 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Incorrect 2 + 2)()]]> 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Incorrect f(g(x)) = x + 1 Correct Solve the problem.  A satellite camera takes a rectangular - shaped picture... Solve the problem.  

A satellite camera takes a rectangular - shaped picture. The smallest region that can be photographed is a 4-km by 6-km rectangle. As the camera zooms out, the length l and width w of the rectangle increase at a rate of 3km/sec. How long does it take for the area A to be at least 4 times its original size?]]> 1.0000000 0.3333333 0 true true abc 9.7 seconds Incorrect 3.28 seconds Incorrect 4.94 seconds Incorrect 1.61 seconds Correct Pre-Calc/Chapter 1: Functions and Graphs/1.5 Parametric Relations and Inverses Determine if the function is one-to-one. Determine if the function is one-to-one.


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 1.0000000 0.3333333 0 true true abc Yes Incorrect No Correct Find a direct relationship between x and y.x = 3t and y = 2t + 7 Find a direct relationship between x and y.

x = 3t and y = 2t + 7]]> 1.0000000 0.3333333 0 true true abc y = 6x Incorrect ]]> 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 Incorrect  x + 7]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAmAA0DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9APjJ4l+IPgq3PiHw9J4eutDspbWOXQruynkv9TMk6RskFysyJDId+1FMMu5toJXdx6nXlHj34c/ELxF4+s9d0bxl4YsdKsIx9g0nWvC9zf8A2ecgh7jfHqMCtIQSqkp8ikhcbnLeqRBxEgkZXkAG5kXaCe5AycD2yaF8P3jla+nb+v6/4c+X/jB8Gfh78N7OXVtJ/Zl+GviLQLFYnvppbGxtbxw8ipss4BZyCeQZ+7I8O4lVUtnj6N8LeE9D8DaFa6J4b0bT/D+i2u77Pp2l2qW1vDuYu2yNAFXLMzHA5LE9TXkHx/8Ag1rPxra40HUPB/gPXdBmgeGw8Q608p1TQXlQLJLbwfZ3Ejgqrqyz2+cKD93cfbdPtP7PsLa186a58iJYvOuH3ySYAG5m7scZJ9aFt/X9afiJ6NJFiiiigD//2Q== Correct y = 6x + 7 Incorrect Find inverse of function Find the inverse of the function.

f(x) =#a x3 + #b

]]> 1.0000000 0.3333333 0 0 f-1(x)=#answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mroot><mfrac><mrow><mi>x</mi><mo>-</mo><mi>b</mi></mrow><mi>a</mi></mfrac><mn>3</mn></mroot></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mi>f</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mo>(</mo><mi>x</mi><mo>)</mo><mo>=</mo><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer><correctAnswer id="2"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"><![CDATA[<session lang="en" version="2.0"><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mi>f</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mi>I</mi><mo>(</mo><mi>x</mi><mo>)</mo><mo>=</mo></math></input></command></group></session>]]></data><data name="inputCompound">true</data></localData></question> Find the (x,y) pair for the value of the parameter.x = 2t and y = t2 - 2 for ... Find the (x,y) pair for the value of the parameter.

x = 2t and y = t2 - 2 for t = 5]]> 1.0000000 0.3333333 0 true true abc (23, 25) Incorrect (10, 25) Incorrect (25, 5) Incorrect (10, 23) Correct Find the inverse of the function.f(x) = x3 + 7 Find the inverse of the function.

f(x) = x3 + 7]]> 1.0000000 0.3333333 0 true true abc -1(x) = ]]> 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 Correct Not a one-to-one function Incorrect -1(x) = ]]> 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 Incorrect -1(x) =  - 7]]> 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 Incorrect Graph the inverse of the function plotted, on the same set of axes. Use a ... Graph the inverse of the function plotted, on the same set of axes. Use a dashed curve for the inverse.


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 Incorrect ]]> 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w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPnXxrrXxTi/an8I/YPBvg+58vwz4kj0/7T4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KfOvjXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAt0UUUAFVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUt1UkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lPn74i+Jru3/AGs/ANjbeLdL1ezeF7S48F2OuXdnqmnyFHlXUJLWCYx3cDKpRhcxqseIyjFnIoV3JRXX/Jv+v8gekW+xW8a618U4v2p/CP2Dwb4PufL8M+JI9P8AtPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kp86+Nda+KcX7U/hH7B4N8H3Pl+GfEken/afFt1D9otft2jZlmxpj+TKMQ4iXzFO+T94Ng8z6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAC3RRRQAVUkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJS3VSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPnXxrrXxTi/an8I/YPBvg+58vwz4kj0/7T4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KfOvjXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJTzXW/wBpj4eaR4qk0SLxh4f1m/tftEF5o2h351PXY7qN0XyY9MtY5Z5do89pSAGiEOSpUu0dST496zqmq27eFfhJ448VeHvJlF1qjWsGiTQ3QaPZCtpqstpLIpRnZplGwEIqmQmTygD1WSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lPNf+Ej+M+scWngfwf4ftLr/U3WreJ7i5vLFG+689nDZCKSVAQWhjvNjMpVbjBElVJPBHxl1rVbe01f4naPpmheTLLJfeDPDi2GpLcBoxFGRfy6hC8DI05chI5FaOHaxVnFAHqskl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KeVSfABtU1W3bxH4z8ceKk8mUPqjeLrrRJoSGj8qFbTSVtLeRTunZpnHmghFzIpXyiT9ln4XT6rb/wBo/DLwv4qR4ZWu9e8Vxf2xq8koaMQo892kss67DIN0k2Y1iiRVZT+7ALet/tP/AAs8P+KpNIv/AIn/AA/sPsn2iDUI73xXaw3lpdRuiiEwE/8AXbeWZWRo1G1t5KWvDfx10rxf4y03RNM0XxRFb3UM7Peav4R1vTVilQK0ab7ixSEKyCbLPKhDJGqq5k+XtdN03/hH/wCytI0jStPsPDdpZNAkds3k/ZPL8tYIYYFj2eVs8zJ3Ls8uMBWDkpbkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAt0UUUAFVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUt1UkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUqa3rf/CP+Zf38mn2Hhu0sri71DVL298n7J5exgSCmzytnnM8jSLs8tflYOSgBbkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJSpret/wDCP+Zf38mn2Hhu0sri71DVL298n7J5exgSCmzytnnM8jSLs8tflYOSnAf2/wDEP4m/L4f03/hXPhuTj+3NfgE2sXMZ/itbDOy23I6ukt4xkjdGSWxI5o039nzwxaeKtK1XVtJ/4Tm/td16PEHjHUZdTvLG/V42SWyt5VaCz8w73c2gt1VoYFWMqF8oA+dfGP7SXj3Xv2kvDN/8M/hpo/xYt7Pw/r9tYT6D4re3tL2ye80otcre3NlHayNG0MUbxW01xseR1dlMfzfRX9o/GfxTxaaR4P8Ah9aP+/hutWubjXrzYfuwT2cP2WKKXBBZ47ydFZCq+aGEi+f+Nda+KcX7U/hH7B4N8H3Pl+GfEken/afFt1D9otft2jZlmxpj+TKMQ4iXzFO+T94Ng8z6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQA8qk+CviLX9Vt18XfETxR4h0iWGW4ubXS9UHh6G1vd0fli2XT4orpoNrXACT3su0CPcJ3xLGSfswfD671W3j1rwhb+OtN8mVvtHjzV7vxFNZS7o9iWseoGcRLIpkMjRvGSYYQVk4Mfqskl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KAFTTdN/wCEf/srSNI0rT7Dw3aWTQJHbN5P2Ty/LWCGGBY9nlbPMydy7PLjAVg5KW5JL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUALdFFFAHzV8OPGvxvv8AxV40XUvCPg+bxJBeiObSL3xzfW8VlYB5RYvbwLpTo0UqB3NyGZpZBKjmI24tbY1rxr8b4vj74NsP+ER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSfStYPirxbZ+CoG1bXb/SNE8K20Dvfaxquoi1W2k3xLCvzrs2Nvky7SKVZYwFfeShsG54RrXjX43xfH3wbYf8Ij4Ph8/wzrk/9lx+Ob77HcbLrSV86U/2UMSx+ZtQeW2Vnm+ZMYkNa8a/G+L4++DbD/hEfB8Pn+Gdcn/suPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEifEb9pjxF4T1vx1c6D/AMIz4o8J2nhHT9e0K/tWlLNc3d1JaxLI8bulxblo2lMieUVXC4fJdfSvg5498TeMl1ey1220mW60DVL7R9S1LTjLbpPPEYXgeG2fzCqPFMxfdMSjxgDzA+5L5Wm097X+V7fm1945Lks31svvXMvvV/u9DzbWvGvxvi+Pvg2w/wCER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSGteNfjfF8ffBth/wAIj4Ph8/wzrk/9lx+Ob77HcbLrSV86U/2UMSx+ZtQeW2Vnm+ZMYk+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUgR866141+N8Xx98G2H/CI+D4fP8ADOuT/wBlx+Ob77HcbLrSV86U/wBlDEsfmbUHltlZ5vmTGJDWvGvxvi+Pvg2w/wCER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KeI/Gj9oO/0a2vIfhrcaB4ouNFmdfFVzaXEeq3XhqJCMyzaZFcQyzDCzBlSVZFKDbHLlgqbt/X4+i6voNJvYw9a8a/G+L4++DbD/hEfB8Pn+Gdcn/suPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEnP8AxGHxh8XftDfC2z1Dwt4Xit9N0zWdcXw9b+PLw6ZqcsE2mxxS3itpGHa3kuElhHlkiTEgeMxhZPqDTr+9vjpc0K2d5pdxZtNNfpK8bmU+WYvLhKsCjq0rEmQFNqAB95KWpJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUpq2hKd1dHzrrXjX43xfH3wbYf8Ij4Ph8/wzrk/9lx+Ob77HcbLrSV86U/2UMSx+ZtQeW2Vnm+ZMYkNa8a/G+L4++DbD/hEfB8Pn+Gdcn/suPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEn0VJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSiGfNWv6/8YT+0l4Fkk8C+B11JfCXiFYLdfGl4YXiN5ovmO0n9kgqysIgqhGDB3JZNgD29a8a/G+L4++DbD/hEfB8Pn+Gdcn/suPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEh411r4pxftT+EfsHg3wfc+X4Z8SR6f9p8W3UP2i1+3aNmWbGmP5MoxDiJfMU75P3g2DzPoqSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAD511rxr8b4vj74NsP+ER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSVPE/xI+NOl/tDfD7SZfB3hdH1Tw/rvlaZaeMdSlsZmjm0xvPuZE0jETRruSNnTaftDr5iMypL9KySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAfOuteNfjfF8ffBth/wiPg+Hz/AAzrk/8AZcfjm++x3Gy60lfOlP8AZQxLH5m1B5bZWeb5kxiQ1rxr8b4vj74NsP8AhEfB8Pn+Gdcn/suPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEnqtv/AMJn8OtCmWf+0PipHB5kkUsf2Kz1mTLQBImQ/Z7OXG66cyhrfakcSCOVy0h5TxD8XPF0Hxn8AabaaONI+Gmv2Jd9e1XSpmubnUHG+GxEXnRy2TeUsjM9zCRuUR4DHhX1S7/1/XnoHRvscrrXjX43xfH3wbYf8Ij4Ph8/wzrk/wDZcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJDWvGvxvi+Pvg2w/4RHwfD5/hnXJ/wCy4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KMD511rxr8b4vj74NsP+ER8Hw+f4Z1yf8AsuPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEhrXjX43xfH3wbYf8Ij4Ph8/wAM65P/AGXH45vvsdxsutJXzpT/AGUMSx+ZtQeW2Vnm+ZMYk+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPnXWvGvxvi+Pvg2w/wCER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSGteNfjfF8ffBth/wAIj4Ph8/wzrk/9lx+Ob77HcbLrSV86U/2UMSx+ZtQeW2Vnm+ZMYkb4q+PXxE0fxb4l8NWVt4ZmlTxlY+GNN1ee1uttmt1b2lzG09qsh+0FYpbkFxPAC8cQC4kOz1X4M/ELWPiZ4G8Oa9d6bY2y3VvdRak8Ny4Md5BOIMQxlDuicpO25nDIFjG197FK5Xa/p+KT/Jr7/Uck4NRfVX+V7J/Oz+7U8s+I/jX432HirwWum+EfB8PiSe9McOkWXjm+uIr2wLxC+e4gbSkRYokKOLksrRSGJEMpuDa3JR+01+0frHwX+I/hHSrLxP4O0nQ7+JJta/t7T7me50y3a7igW8LR3EaeSzyiIBgCH+fLIsnllbUKEsQnKHR22b/JM56tX2UuVq/3fq0fStVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUt1UkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJTnNzz7xP8CPC3izxxrOsaroj6nF4h0STRtYkuddvdjwKyeTAlluMAXD3D+aux435UMZXZej8G+CrP4dWtpofh7TY4dAxc3VzdXWoz3F6908qvudpQ7zmTfMzyyS7gUQYcMSm9JJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSju9htt7/wBdPy0CSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lEIJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU5b4ifDiw+Jstjpmt213P4fWGdrkWWv3untI58tVhkgt2RbmF0M28SvtG1RscSMU6mSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAd7DQLu31C0t7e0tV0kW8nmS+cUlikUxiJEiCFWQqZSWLqVKIAr7yUdJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgIJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPnXxrrXxTi/an8I/YPBvg+58vwz4kj0/7T4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KfOvjXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJTz7xR8BvCPjH4u+HPHGt+GoNe1PRYZZLG91TVLqZNMuQ0PltbWLlrdWbYzNMoR1aGLAcndH6DJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSh5h5HP2/h7X7T4jzaufEmoX3hu6spEbRLhrRbexnBgEbQqloJ33BZyzSXJCk4EbBgYsq31n4h+FtCml1zQtP8AG93beZh/CUgsbi9y0HlbLS8l8qLAkud++8bi3Rl3GcxQ9rJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgByupfE2HQdV8IW+t6fcaDb+IYWUvfJI5sr0tAsNpPLAklrG0jTNGC9wu+VY44ROZMrq2XjGx1bxlf6Bpmo6PqFxpMIbWbaHUla+06WQI1qklsqkqssfnPudkP7tNquHJTVkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJSpc6b5virTr/wDsrT5vIsrmD+1JG/0y33vA3kxDyzmKTy9znzFw0EPyvnMYB59qn7OvhDU9d1959Hu7m08S3Carq17J4m1FbiPULd4TaSWqCTEBVVYeZC8TIIYkCsp/d9z4c8Ow+C7LRfD2g6VZ2PhewsmgQLcOJYGQxiFFjKHerKZS0jSBgUXh97MnO2/wv/4RrQpvDHg6/wBQ8IaLdeZcDULHUftNxpcitAIreytryG4t4rYxrInlKEjhCqI4suWj1Rp3i+x13wnbWmr6ffeG7WynTXbvVrYtql9OFiW2aIw+VBFuPnSSt5ZHCKkahiyO7tYbbk7s6uiiikIKqSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpbqpJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KVtXv8AU9PkaW10oanZx2k8zxwXKpdyTrs8qGKNwsbbwZcu8sYUqgwQ7MnzhrPxC1fWv2mPh1596unLPFLZ3Xw4uPEBttb0uTa8iajNb2F5NbXdu6IQROAI/wB2VJZytCTclFdf8n/l+r0B6Rcu39f1+Gpe8a618U4v2p/CP2Dwb4PufL8M+JI9P+0+LbqH7Ra/btGzLNjTH8mUYhxEvmKd8n7wbB5n0VJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnzr411r4pxftT+EfsHg3wfc+X4Z8SR6f9p8W3UP2i1+3aNmWbGmP5MoxDiJfMU75P3g2DzPoqSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUALdFFFABVSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lLdVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQA+dfGutfFOL9qfwj9g8G+D7ny/DPiSPT/ALT4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KfOvjXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAt0UUUAFVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUt1UkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAD518a618U4v2p/CP2Dwb4PufL8M+JI9P+0+LbqH7Ra/btGzLNjTH8mUYhxEvmKd8n7wbB5n0VJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnzr411r4pxftT+EfsHg3wfc+X4Z8SR6f9p8W3UP2i1+3aNmWbGmP5MoxDiJfMU75P3g2DzPoqSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUALdFFFABVSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lLdVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lADwr9qf4ga1o3w1+JVnJoer+GvD9h4Wvr6Lx5Hr0GnomoIkZs4YBDcC53NIzKSyxjdGqASLLx5PN8VPEOsftMeFY9K8Ty31veJoLaRZWuuStBqGmTQym9uFs1XybpP+PhnuWctC1tbKufOIr7NkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJS4ytbTZp+tuj8ns/L1uVJ3g4eTX321+Vrrz16Hzr411r4pxftT+EfsHg3wfc+X4Z8SR6f9p8W3UP2i1+3aNmWbGmP5MoxDiJfMU75P3g2DzPoqSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lPnXxrrXxTi/an8I/YPBvg+58vwz4kj0/7T4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KQSEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgBbooooAKKKKACiiigAooooAKKKKACiiigAooooA+avGvxH1yw/an8I6avgvULnxJF4Z8SWum28RdtOvY5b7RmguXvhFsgiVInM4dfMiZCiJOZbU3P0rRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB/9k= Incorrect ]]> 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 Correct ]]> 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 Incorrect Pre-Calc/Chapter 1: Functions and Graphs/1.6 Graphical Transformations Describe how the graph of y=x2 can be transformed to the graph of the given ... Describe how the graph of y=x2 can be transformed to the graph of the given equation.

y = (x - 13)2 + 19]]> 1.0000000 0.3333333 0 true true abc 2 up 13 units and then right 19 units.]]> Incorrect 2 right 13 units and then up 19 units.]]> Correct 2 left 13 units and then up 19 units.]]> Incorrect 2 left 13 units and then down 19 units.]]> Incorrect Fill in the blanks to complete the statement.The graph of  can be obtained ... Fill in the blanks to complete the statement.

The graph of  can be obtained from the graph of  by shifting horizontally  ?  units to the  ?  and shifting vertically  ?  units to the  ?  direction.]]> 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 1.0000000 0.3333333 0 true true abc 10; left; 2; upward Incorrect 10; right; 2; downward Correct 10; left; 2; downward Incorrect 2; right; 10; downward Incorrect Find equation for transformation Find the equation of a base parabola that has been shifted up #a units, and left #b units.  Enter equation as y=   .

]]> 1.0000000 0.3333333 0 0 y=(x+#b )2+#a]]> Correct!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>y</mi><mo>=</mo><mo>(</mo><mi>x</mi><mo>+</mo><mo>#</mo><mi>b</mi><mo>&#160;</mo><msup><mo>)</mo><mn>2</mn></msup><mo>+</mo><mo>#</mo><mi>a</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> The graph is that of a function y = f(x) that can be obtained by transforming... The graph is that of a function y = f(x) that can be obtained by transforming the graph of y =  . Write a formula for the function f.


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1.0000000 0.3333333 0 true true abc ]]> 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Incorrect ]]> 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Correct  + 5]]> 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Incorrect  - 5]]> 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Incorrect Pre-Calc/Chapter 1: Functions and Graphs/1.7 Modeling with Functions Alcohol Mixture How many liters of a 10% alcohol solution must be mixed with #a liters of a 80% solution to get a 30% solution?  Round to the nearest tenth of a liter.

]]> 1.0000000 0.3333333 0 0 #answer]]> Nice work!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>45</mn><mo>,</mo><mn>55</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mn>0</mn><mo>.</mo><mn>3</mn><mo>*</mo><mi>a</mi><mo>-</mo><mn>0</mn><mo>.</mo><mn>8</mn><mo>*</mo><mi>a</mi></mrow><mrow><mo>-</mo><mn>0</mn><mo>.</mo><mn>2</mn></mrow></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi mathvariant="normal">s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="precision">4</option><option name="relative_tolerance">false</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Alloy Mixture Anne and Nancy need a metal alloy that is 24.34% copper to make jewelry. How many ounces of a 22% alloy must be mixed with a 28% alloy to form #a ounces of the desired alloy?  Round to the nearest ounce.

]]> 1.0000000 0.3333333 0 0 #answer]]> Great job!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>95</mn><mo>,</mo><mn>105</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mn>0</mn><mo>.</mo><mn>2434</mn><mo>*</mo><mi>a</mi><mo>-</mo><mn>0</mn><mo>.</mo><mn>28</mn><mo>*</mo><mi>a</mi></mrow><mrow><mo>-</mo><mn>0</mn><mo>.</mo><mn>06</mn></mrow></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Investing in Two Accounts Spanky invested $10,000, part at 5.1% annual interest and the balance at 7.9% annual interest. How much is invested in the 5.1% account if a 1-year interest payment is $#a ?  Round to the nearest dollar.

 

]]> 1.0000000 0.3333333 0 0 #answer]]> Nice work!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>650</mn><mo>,</mo><mn>700</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mi>a</mi><mo>-</mo><mn>790</mn></mrow><mrow><mo>-</mo><mn>0</mn><mo>.</mo><mn>028</mn></mrow></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi mathvariant="normal">s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="precision">4</option><option name="relative_tolerance">false</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Match situation with function Match the following:

]]> 1.0000000 0.3333333 0 true Your answer is correct.

]]> Your answer is partially correct.

]]> Your answer is incorrect.

]]> A rectangular building lot is #a times as long as it is wide.  Find a function to represent its area A in terms of the width w.

]]> A=#a w^2 A poster is #b inches longer than it is wide.  Find a function to represent its area A in terms of the width w.

]]> A=#b w + w^2 A height of a cylinder is #c times its radius.  Find a function to represent its Volume V in terms of the radius r.

]]> V=3.14*#c*r^2 A=(#a+ w)^2 A=#b w + #b w^2 <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>4</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>4</mn><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession"/></localData></question> Max Volume of Box (needs work) A square of side x inches is cut out of each corner of a #a in. by #b in. piece of cardboard, and the sides are folded up to form an open-topped box. Use your graphing calculator to determine the dimensions of the cut-out squares that will produce the box of maximum volume.  Round to the nearest tenth.
(Hint: you will first need to write the volume of the box V as a function of x.)

]]> 1.0000000 0.3333333 0 0 #answer]]> Great job!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>6</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>9</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>m</mi><mo>=</mo><mi>maximum</mi><mo>(</mo><mi>x</mi><mo>(</mo><mi>a</mi><mo>-</mo><mn>2</mn><mo>*</mo><mi>x</mi><mo>)</mo><mo>(</mo><mi>b</mi><mo>-</mo><mn>2</mn><mo>*</mo><mi>x</mi><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><msub><mi>m</mi><mi>x</mi></msub></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Rate Conversion A tire of a moving bicycle has radius #a inches. If the tire is making 1.8 revolutions per second, find the bicycle's speed in miles per hour.  Round to the nearest mph.

]]> 1.0000000 0.3333333 0 0 #answer]]> Nice work.

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>12</mn><mo>,</mo><mn>19</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mn>1</mn><mo>.</mo><mn>8</mn><mo>*</mo><mn>2</mn><mo>*</mo><pi/><mo>*</mo><mi>a</mi><mo>*</mo><mn>3600</mn></mrow><mrow><mn>12</mn><mo>*</mo><mn>5280</mn></mrow></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Silver Iodide Mixture In a chemistry class, #a liters of a 4% silver iodide solution must be mixed with a 10% solution to get a 6% solution. How many liters of the 10% solution are needed?  Round to the nearest tenth of a liter.

]]> 1.0000000 0.3333333 0 0 #answer]]> Nice work!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>20</mn><mo>,</mo><mn>30</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mn>0</mn><mo>.</mo><mn>06</mn><mo>*</mo><mi>a</mi><mo>-</mo><mn>0</mn><mo>.</mo><mn>04</mn><mo>*</mo><mi>a</mi></mrow><mrow><mn>0</mn><mo>.</mo><mn>04</mn></mrow></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi mathvariant="normal">s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="precision">4</option><option name="relative_tolerance">false</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Silver Iodide Mixture (Simple Calculated) In a chemistry class, {a} liters of a 4% silver iodide solution must be mixed with a 10% solution to get a 6% solution. How many liters of the 10% solution are needed?

]]> 1.0000000 0.3333333 0 0 0 abc 0 .02*{a}/.04 0.1 1 1 1 Great job!

]]> 0 0.1000000 3 0 private a calculatedsimple uniform 1.0 10.0 1 20 1 5.7 2 2.3 3 9.7 4 2.6 5 4.8 6 1.9 7 3.5 8 4.8 9 5.7 10 3.9 11 8.3 12 4.8 13 8.5 14 2.7 15 4.9 16 4.5 17 6.8 18 7.5 19 2.6 20 4.5 20 Solve the problem.  Anne and Nancy use a metal alloy that is 24.34% copper ... Solve the problem.  

Anne and Nancy use a metal alloy that is 24.34% copper to make jewelry. How many ounces of a 22% alloy must be mixed with a 28% alloy to form 100 ounces of the desired alloy?]]> 1.0000000 0.3333333 0 true true abc 61 ounces Correct 39 ounces Incorrect 44 ounces Incorrect 63 ounces Incorrect Solve the problem.  How many liters of a 10% alcohol solution must be mixed... Solve the problem.  

How many liters of a 10% alcohol solution must be mixed with 50 liters of a 80% solution to get a 30% solution?]]> 1.0000000 0.3333333 0 true true abc 12.5 L Incorrect 17.5 L Incorrect 175 L Incorrect 125 L Correct Solve the problem.  In a chemistry class, 9 liters of a 4% silver iodide ... Solve the problem.  

In a chemistry class, 9 liters of a 4% silver iodide solution must be mixed with a 10% solution to get a 6% solution. How many liters of the 10% solution are needed?]]> 1.0000000 0.3333333 0 true true abc 9.0 L Incorrect 3.5 L Incorrect 4.5 L Correct 5.5 L Incorrect Solve the problem.  Sue invested $10,000, part at 5.1% annual interest and ... Solve the problem.  

Sue invested $10,000, part at 5.1% annual interest and the balance at 7.9% annual interest. How much is invested at each rate if a 1-year interest payment is ]]> 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 1.0000000 0.3333333 0 true true abc $4040 at 5.1% and $5960 at 7.9% Correct $4140 at 5.1% and $5860 at 7.9% Incorrect $3940 at 5.1% and $5140 at 7.9% Incorrect $5960 at 5.1% and $4040 at 7.9% Incorrect Swimming Pool Dimensions A construction company builds a swimming pool with a perimeter of #a m. The length is 5 m more than the width. Find the dimensions of the swimming pool to the nearest meter.

]]> 1.0000000 0.3333333 0 0 Width= #widLength= #len]]> Correct!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mn>46</mn><mo>,</mo><mo>&nbsp;</mo><mn>50</mn><mo>,</mo><mo>&nbsp;</mo><mn>54</mn><mo>,</mo><mo>&nbsp;</mo><mn>58</mn><mo>,</mo><mo>&nbsp;</mo><mn>62</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>wid</mi><mo>=</mo><mfrac><mrow><mi>a</mi><mo>-</mo><mn>10</mn></mrow><mn>4</mn></mfrac></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>len</mi><mo>=</mo><mi>wid</mi><mo>+</mo><mn>5</mn></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>W</mi><mi mathvariant="normal">i</mi><mi mathvariant="normal">d</mi><mi>t</mi><mi>h</mi><mo>=</mo><mo>&#160;</mo><mo>#</mo><mi>w</mi><mi mathvariant="normal">i</mi><mi mathvariant="normal">d</mi><mspace linebreak="newline"/><mi>L</mi><mi mathvariant="normal">e</mi><mi>n</mi><mi>g</mi><mi>t</mi><mi>h</mi><mo>=</mo><mo>&#160;</mo><mo>#</mo><mi>l</mi><mi mathvariant="normal">e</mi><mi>n</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputCompound">true</data><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Use an equation to solve the problem.A tire of a moving bicycle has radius ... Use an equation to solve the problem.

A tire of a moving bicycle has radius 15 inches. If the tire is making 1.8 rotations per second, find the bicycle's speed in miles per hour.]]> 1.0000000 0.3333333 0 true true abc 9.6 mph Correct 11.1 mph Incorrect 10.4 mph Incorrect 5.4 mph Incorrect Use an equation to solve the problem.A construction company builds a swimming... Use an equation to solve the problem.

A construction company builds a swimming pool with a perimeter of 54 m. The length is 5 m more than the width. Find the dimensions of the swimming pool?]]> 1.0000000 0.3333333 0 true true abc 16 m × 5 m Incorrect 21 m × 11 m Incorrect 16 m × 11 m Correct 11 m × 11 m Incorrect Use an equation to solve the problem.A square of side x inches is cut out of ... Use an equation to solve the problem.

A square of side x inches is cut out of each corner of an 8 in. by 12 in. piece of cardboard, and the sides are folded up to form an open-topped box. Use your graphing calculator to determine the dimensions of the cut-out squares that will produce the box of maximum volume.
(Hint: you will first need to write the volume of the box V as a function of x.)]]> 1.0000000 0.3333333 0 true true abc 1.4 inches by 1.4 inches Incorrect 1.8 inches by 1.8 inches Incorrect 1.7 inches by 1.7 inches Incorrect 1.6 inches by 1.6 inches Correct Write a mathematical expression for the quantity described verbally.A salary ... Write a mathematical expression for the quantity described verbally.

A salary after a 4.7% increase, if the original salary is x dollars]]> 1.0000000 0.3333333 0 true true abc 1.047x Correct 4.7x Incorrect 5.7x Incorrect 0.047x Incorrect Write a mathematical expression for the quantity described verbally.The ... Write a mathematical expression for the quantity described verbally.

The revenue when each item sells for $25,000.]]> 1.0000000 0.3333333 0 true true abc 25,000x Correct 25,000 - x Incorrect 25,000 + x Incorrect x - 25,000 Incorrect Write a mathematical expression for the quantity described verbally.The total... Write a mathematical expression for the quantity described verbally.

The total cost if $20,000 plus $3.25 for each item produced.]]> 1.0000000 0.3333333 0 true true abc $(20,000 - 3.25x) Incorrect $(20,000 + 3.25)x Incorrect $(20,000x + 3.25) Incorrect $(20,000 + 3.25x) Correct Pre-Calc/Chapter 10: Intro to Calculus: Limits, Derivatives, and Integrals Matching Calculus Concepts Match these key calculus concepts with the appropriate description.

]]> 1.0000000 0.3333333 0 true Solid!

]]> Try again

]]> Slope of a tangent line to a function

]]> Derivative Derivative of displacement function at a specific time

]]> Instantaneous Velocity Area between function and the x-axis and between lower and upper bounds

]]> Integral Limit Rehoovelator

]]> 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 Part-time Riemann Sums <question><correctAnswers><correctAnswer></correctAnswer></correctAnswers></question> Pre-Calc/Chapter 10: Intro to Calculus: Limits, Derivatives, and Integrals/10.1 Derivatives/10.1.1 Estimate Slope of Tangent Line from Graph Estimate slope of tangent line Using this graph, estimate the slope of the indicated tangent line in red.

 

 

 

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1.0000000 0.3333333 0 true true abc -3

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]]> Pre-Calc/Chapter 10: Intro to Calculus: Limits, Derivatives, and Integrals/10.1 Derivatives/10.1.2 Find Derivative Using Definition Derivative of a Function Find the derivative of  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mi»x«/mi»«/math» using the definition of a derivative.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»`«/mo»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«munder»«mi»lim«/mi»«mrow»«mi»h«/mi»«mo»§#8594;«/mo»«mn»0«/mn»«/mrow»«/munder»«mfrac»«mrow»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»+«/mo»«mi»h«/mi»«mo»)«/mo»«mo»-«/mo»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«/mrow»«mi»h«/mi»«/mfrac»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>8</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>2</mn><mo>*</mo><mi>a</mi><mo>*</mo><mi>x</mi><mo>+</mo><mi>b</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 10: Intro to Calculus: Limits, Derivatives, and Integrals/10.1 Derivatives/10.1.3 Find Derivative of Function at Given Point Derivative of a Function at a Point Find «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»`«/mo»«mo»(«/mo»«mo»#«/mo»«mi»c«/mi»«mo»)«/mo»«/math» for the following function:

                    «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mi»x«/mi»«/math» 

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»`«/mo»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«munder»«mi»lim«/mi»«mrow»«mi»h«/mi»«mo»§#8594;«/mo»«mn»0«/mn»«/mrow»«/munder»«mfrac»«mrow»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»+«/mo»«mi»h«/mi»«mo»)«/mo»«mo»-«/mo»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«/mrow»«mi»h«/mi»«/mfrac»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>8</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>5</mn><mo>,</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>2</mn><mo>*</mo><mi>a</mi><mo>*</mo><mi>c</mi><mo>+</mo><mi>b</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 10: Intro to Calculus: Limits, Derivatives, and Integrals/10.1 Derivatives/10.1.4 Solve Apps: Velocity Find Instantaneous Velocity The position of an object at time t is given by s(t).  Find the instantaneous velocity at the indicated value of t.

  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mo»(«/mo»«mi»t«/mi»«mo»)«/mo»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«msup»«mi»t«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mi»t«/mi»«/math»  at  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»t«/mi»«mo»=«/mo»«mo»#«/mo»«mi»c«/mi»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»`«/mo»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«munder»«mi»lim«/mi»«mrow»«mi»h«/mi»«mo»§#8594;«/mo»«mn»0«/mn»«/mrow»«/munder»«mfrac»«mrow»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»+«/mo»«mi»h«/mi»«mo»)«/mo»«mo»-«/mo»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«/mrow»«mi»h«/mi»«/mfrac»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>8</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>5</mn><mo>,</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>2</mn><mo>*</mo><mi>a</mi><mo>*</mo><mi>c</mi><mo>+</mo><mi>b</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 10: Intro to Calculus: Limits, Derivatives, and Integrals/10.2 Integrals/10.2.1 Find Definite Integral by Computing Area Find the Definte Inegral (Rectangle) Calculate the definite integral by computing an area:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msubsup»«mo»§#8747;«/mo»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»c«/mi»«/mrow»«/msubsup»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»d«/mo»«mi»x«/mi»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>15</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>4</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>(</mo><mi>c</mi><mo>-</mo><mi>b</mi><mo>)</mo><mo>*</mo><mi>a</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find the Definte Inegral (Trapezoid) Calculate the definite integral by computing an area:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msubsup»«mo»§#8747;«/mo»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»c«/mi»«/mrow»«/msubsup»«mo»(«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mi»x«/mi»«mo»)«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»d«/mo»«mi»x«/mi»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mo>(</mo><mi>c</mi><mo>-</mo><mi>b</mi><mo>)</mo><mo>*</mo><mo>(</mo><mi>a</mi><mo>*</mo><mi>c</mi><mo>+</mo><mi>a</mi><mo>*</mo><mi>b</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find the Definte Inegral (Triangle) Calculate the definite integral by computing an area:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msubsup»«mo»§#8747;«/mo»«mn»0«/mn»«mrow»«mo»#«/mo»«mi»c«/mi»«/mrow»«/msubsup»«mo»(«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mi»x«/mi»«mo»)«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»d«/mo»«mi»x«/mi»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>4</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><msup><mi>c</mi><mn>2</mn></msup><mo>*</mo><mi>a</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 10: Intro to Calculus: Limits, Derivatives, and Integrals/10.2 Integrals/10.2.2 Find Definite Integral using Sin//Cos Find the Definte Inegral (Sin/Cos) The area enclosed between the x-axis and one arch of the sine curve is 2Use this to compute:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msubsup»«mo»§#8747;«/mo»«mn»0«/mn»«mi mathvariant=¨normal¨»§#960;«/mi»«/msubsup»«mo»(«/mo»«mi»S«/mi»«mi»i«/mi»«mi»n«/mi»«mo»§#160;«/mo»«mi»x«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«mo»)«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»d«/mo»«mi»x«/mi»«/math»

*If answering with a decimal, use 2 decimal places.  Otherwise answer in terms of «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi mathvariant=¨normal¨»§#960;«/mi»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>2</mn><mo>+</mo><mi>a</mi><mo>*</mo><pi/></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-2)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 10: Intro to Calculus: Limits, Derivatives, and Integrals/10.3 Limits/10.3.1 Find Limit by Direct Substitution Direct Substitution Find the limit of the function by using direct substitution.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«munder»«mi»lim«/mi»«mrow»«mi»x«/mi»«mo»§#8594;«/mo»«mn»4«/mn»«/mrow»«/munder»«mo»(«/mo»«msqrt»«mi»x«/mi»«/msqrt»«mo»-«/mo»«mo»#«/mo»«mi»a«/mi»«mo»)«/mo»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>2</mn><mo>-</mo><mi>a</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 10: Intro to Calculus: Limits, Derivatives, and Integrals/10.3 Limits/10.3.2 Find Limit Algebraically Find Limit Algebraically Find the limit of the function algebraically.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«munder»«mi»lim«/mi»«mrow»«mi»x«/mi»«mo»§#8594;«/mo»«mo»-«/mo»«mn»3«/mn»«/mrow»«/munder»«mfrac»«mrow»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»-«/mo»«mn»2«/mn»«mi»x«/mi»«mo»-«/mo»«mn»15«/mn»«/mrow»«mrow»«mi»x«/mi»«mo»+«/mo»«mn»3«/mn»«/mrow»«/mfrac»«/math»

]]> 1.0000000 0.3333333 0 0 -8 <question><correctAnswers><correctAnswer></correctAnswer></correctAnswers></question> Pre-Calc/Chapter 10: Intro to Calculus: Limits, Derivatives, and Integrals/10.3 Limits/10.3.3 Find Limit and Vertical Asymptotes Limit and Vertical Asymptote Use graphs to find the limit and identify any vertical asymptotes.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«munder»«mi»lim«/mi»«mrow»«mi»x«/mi»«mo»§#8594;«/mo»«msup»«mn»5«/mn»«mo»+«/mo»«/msup»«/mrow»«/munder»«mfrac»«mi»x«/mi»«mrow»«mi»x«/mi»«mo»-«/mo»«mn»5«/mn»«/mrow»«/mfrac»«/math»

]]> 1.0000000 0.3333333 0 true true ABCD «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»§#8734;«/mo»«mo»§#160;«/mo»«mo»;«/mo»«mo»§#160;«/mo»«mi»x«/mi»«mo»=«/mo»«mn»5«/mn»«/math»

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»-«/mo»«mo»§#8734;«/mo»«mo»§#160;«/mo»«mo»;«/mo»«mo»§#160;«/mo»«mi»x«/mi»«mo»=«/mo»«mn»5«/mn»«/math»

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»-«/mo»«mo»§#8734;«/mo»«mo»§#160;«/mo»«mo»;«/mo»«mo»§#160;«/mo»«mi»x«/mi»«mo»=«/mo»«mo»-«/mo»«mn»5«/mn»«/math»

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»5«/mn»«mo»§#160;«/mo»«mo»;«/mo»«mo»§#160;«/mo»«mi»n«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»v«/mi»«mi»e«/mi»«mi»r«/mi»«mi»t«/mi»«mi»i«/mi»«mi»c«/mi»«mi»a«/mi»«mi»l«/mi»«mo»§#160;«/mo»«mi»a«/mi»«mi»s«/mi»«mi»y«/mi»«mi»m«/mi»«mi»p«/mi»«mi»t«/mi»«mi»o«/mi»«mi»t«/mi»«mi»e«/mi»«mi»s«/mi»«/math»

]]> <question><correctAnswers><correctAnswer></correctAnswer></correctAnswers></question> Pre-Calc/Chapter 10: Intro to Calculus: Limits, Derivatives, and Integrals/10.4 Numerical Derivatives//Integrals/10.4.1 Compute Numerical Derivative Numerical Derivative Use a calculator to find the numerical derivative of the function at the specifiied point.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«mn»5«/mn»«mi»x«/mi»«mo»§#160;«/mo»«mo»§#160;«/mo»«mi»a«/mi»«mi»t«/mi»«mo»§#160;«/mo»«mo»§#160;«/mo»«mi»x«/mi»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>4</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>2</mn><mi>a</mi><mo>+</mo><mn>5</mn></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 10: Intro to Calculus: Limits, Derivatives, and Integrals/10.4 Numerical Derivatives//Integrals/10.4.2 Compute Numerical Integral Numerical Integral Use a calculator to find the numerical integral of the function over the specifiied interval.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«mn»3«/mn»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«mn»6«/mn»«mi»x«/mi»«mo»+«/mo»«mn»1«/mn»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»[«/mo»«mo»-«/mo»«mn»2«/mn»«mo»,«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«mo»]«/mo»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><msup><mi>a</mi><mn>3</mn></msup><mo>+</mo><mn>3</mn><msup><mi>a</mi><mn>2</mn></msup><mo>+</mo><mi>a</mi><mo>-</mo><mn>2</mn></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 10: Intro to Calculus: Limits, Derivatives, and Integrals/10.4 Numerical Derivatives//Integrals/10.4.3 Solve Apps: Numerical Derivatives//Integrals Solve Apps: Numerical Integral An object moves in such a way that its velocity (in m/s) after time t (in seconds) is given by:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»v«/mi»«mo»(«/mo»«mi»t«/mi»«mo»)«/mo»«mo»=«/mo»«msup»«mi»t«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«mn»3«/mn»«mi»t«/mi»«mo»+«/mo»«mn»3«/mn»«/math»

Find the distance traveled during the first #a seconds by evaluating:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msubsup»«mo»§#8747;«/mo»«mn»0«/mn»«mrow»«mo»#«/mo»«mi»a«/mi»«/mrow»«/msubsup»«mo»(«/mo»«msup»«mi»t«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«mn»3«/mn»«mi»t«/mi»«mo»+«/mo»«mn»3«/mn»«mo»)«/mo»«mo»§#160;«/mo»«mo»d«/mo»«mi»t«/mi»«mo».«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mi»R«/mi»«mi»o«/mi»«mi»u«/mi»«mi»n«/mi»«mi»d«/mi»«mo»§#160;«/mo»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»t«/mi»«mi»h«/mi»«mi»e«/mi»«mo»§#160;«/mo»«mi»n«/mi»«mi»e«/mi»«mi»a«/mi»«mi»r«/mi»«mi»e«/mi»«mi»s«/mi»«mi»t«/mi»«mo»§#160;«/mo»«mi»t«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»h«/mi»«mo».«/mo»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><msup><mi>a</mi><mn>3</mn></msup><mn>3</mn></mfrac><mo>+</mo><mn>1</mn><mo>.</mo><mn>5</mn><msup><mi>a</mi><mn>2</mn></msup><mo>+</mo><mn>3</mn><mi>a</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions Describe the end behavior of the polynomial function by finding f and f = ... Describe the end behavior of the polynomial function by finding f and 

f = (x - 3) ( 1 - x) (3x - 5)]]> 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1.0000000 0.3333333 0 true true abc ∞, ∞ Incorrect ∞, -∞ Incorrect -∞, -∞ Incorrect -∞, ∞ Correct Divide using synthetic division, and write a summary statement in fraction ... Divide using synthetic division, and write a summary statement in fraction form.  (Typo in all 4 answers: should read "x-1" in denominator.

]]> 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1.0000000 0.3333333 0 true true abc 4 + x3 + 4x2 + 3x + ]]> 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 Incorrect 4 + x3 - x2 + 2x + 1 + ]]> 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 Incorrect 4 - 3x3 + x + ]]> 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 Incorrect 4 + x3 + x2 + 4x + 3 + ]]> 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 Correct Evaluate the limit based on the graph of f shown.f Evaluate the limit based on the graph of f shown.




f]]> 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1.0000000 0.3333333 0 true true abc Correct -∞ Incorrect 0 Incorrect 2 Incorrect Find the remainder when f(x) is divided by (x - k)  (Numeric ... Find the remainder when f(x) is divided by (x - k)  (Numeric Answer)

f(x) = -4x2 - 5x - 3; k = 5]]> 1.0000000 0.3333333 0 0 -128 * Find the requested function.Find the polynomial function with leading ... Find the requested function.

Find the polynomial function with leading coefficient 7; degree 4; and 0, -2, -3, and  as zeros.]]> 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1.0000000 0.3333333 0 true true abc  = x]]> 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Incorrect  = 7x]]> 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Incorrect  = 7x]]> 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Incorrect  = x]]> 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Correct Find the zeros of the polynomial function and state the multiplicity of each.... Find the zeros of the polynomial function and state the multiplicity of each.

f(x) = -5x2(x - 9)(x + 1)3]]> 1.0000000 0.3333333 0 true true abc -1, multiplicity 1; 1, multiplicity 1; 9, multiplicity 1 Incorrect -1, multiplicity 3; 0, multiplicity 2; 1, multiplicity 1; 9, multiplicity 1 Incorrect -1, multiplicity 3; 9, multiplicity 1 Incorrect -1, multiplicity 3; 0, multiplicity 2; 9, multiplicity 1 Correct For the given function, find all asymptotes of the type indicated (if there ... For the given function, find all asymptotes of the type indicated (if there are any)

f(x) = , vertical]]> 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 1.0000000 0.3333333 0 true true abc x = -4, x = 7 Incorrect None Incorrect x = 4, x = -7 Incorrect x = 3, x = -3 Correct Match the polynomial function graph to the appropriate zeros and multiplicities. Match the polynomial function graph to the appropriate zeros and multiplicities.


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1.0000000 0.3333333 0 true true abc -1 (multiplicity 2), 4 (multiplicity 2) Incorrect -1 (multiplicity 3), 4 (multiplicity 3) Incorrect -1 (multiplicity 2), 4 (multiplicity 3) Correct -1 (multiplicity 3), 4 (multiplicity 2) Incorrect Provide an appropriate response.Let f be a polynomial function with real ... Provide an appropriate response.

Let f be a polynomial function with real coefficients. If -2, 4, , and 2 - 2i are zeros of f, what is the smallest possible degree that f can have?]]> 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 1.0000000 0.3333333 0 true true abc 6 Correct 4 Incorrect 8 Incorrect 5 Incorrect Solve the equation. -  =  Solve the equation.

 -  = ]]> 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1.0000000 0.3333333 0 true true abc x = 16 Incorrect x = 4 Incorrect x = -4 Correct ]]> 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Incorrect Solve the problem.  (Numeric Answer)The Cool Company determines that the ... Solve the problem.  (Numeric Answer)

The Cool Company determines that the supply function for its basic air conditioning unit is  and that its demand function is , where p is the price. Determine the price for which the supply equals the demand.]]> 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1.0000000 0.3333333 0 0 $21.86 * Solve the problem.An open-top rectangular box has a square base and it will ... Solve the problem.

An open-top rectangular box has a square base and it will hold 256 cubic centimeters (cc). Each side has length x cm and height y cm. The box's surface area is given by

S(x) =  + x2.

Estimate the minimum surface area and the value of x that will yield it.]]> 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 1.0000000 0.3333333 0 true true abc 2 when x = 8 cm]]> Correct 2 when x = 8 cm]]> Incorrect 2 when x = 6 cm]]> Incorrect 2 when x = 8 cm]]> Incorrect State how many total and real zeros the function has.f = x3 + 2x2 - 11x - 12 State how many total and real zeros the function has.

f = x3 + 2x2 - 11x - 12]]> 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 1.0000000 0.3333333 0 true true abc 3 total zeros; none real Incorrect 3 total zeros; 1 real Incorrect 3 total zeros; 2 real Incorrect 3 total zeros; all 3 real Correct Use limits to describe the behavior of the rational function near the ... Use limits to describe the behavior of the rational function near the indicated asymptote.

f(x) = 
Describe the behavior of the function near its vertical asymptote.]]> 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1.0000000 0.3333333 0 true true abc f(x) = -∞,  f(x) = ∞]]> 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Incorrect f(x) = ∞,  f(x) = -∞]]> 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Incorrect f(x) = -∞,  f(x) = ∞]]> 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Correct f(x) = ∞,  f(x) = ∞]]> 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Incorrect Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.1 Linear//Quadratic Functions and Modeling/2.1.1 Linear Functions Describe the strength and direction of the linear correlation. Describe the strength and direction of the linear correlation.


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 1.0000000 0.3333333 0 true true abc Strong positive linear correlation Correct Weak negative linear correlation Incorrect Strong negative linear correlation Incorrect Little or no linear correlation Incorrect Describe the strength and direction of the linear correlation. Describe the strength and direction of the linear correlation.


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 1.0000000 0.3333333 0 true true abc Weak positive linear correlation Incorrect Strong positive linear correlation Incorrect Little or no linear correlation Incorrect Strong negative linear correlation Correct Describe the strength and direction of the linear correlation. Describe the strength and direction of the linear correlation.


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9o1eY/s9fGvxp4q1q8n1i7ufFi6poN94gi0O1gs4ZdMmg1Ke2jsYXBjU71QIDcSk+ZBITIFJCbP7P/j/AF3Vvi18XrS6+GvijRbe+8WxS3F9fXOlNDpzL4f0oCOcQ3sjszCNCDCki4mj3MpEgSd4qXR/o2vzT/4YUvdnKD3X6pNfg0fRVFFFAgoor51/by/aO8VfstfAaTxr4Q8N2/iLUjqdtYyPfRyyWmnxSbybidYypKlkSEfOg3zx8nhGAPoqivKv2WPizrnx0/Z98E+O/Emgf8IzrWtWRnuNPVXVDiR0WaMONwimVVmQEthJV+Zx87eq0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVz/AIn+HvhbxveaVd+IvDWj6/daTN9p06fVLCK5ezlyp8yFnUmNsqp3Lg/KPQV0FFAGJoPgjw74V1DV7/RdA0vR77WJ/tWpXVhZxwS3s3P7yZkUGRvmb5myeT61wvwb/wCSi/Hb/sc7b/1HtGr1WvKvg3/yUX47f9jnbf8AqPaNQB6rRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXlXwb/5KL8dv+xztv/Ue0avVa8UttA+Kfgb4gfEW/wDDfhrwf4g0XxNrUGr282qeKLrTriHbpljZtG8SadOv3rNmDCTkOOARQB7XRXlX/CR/G/8A6J58P/8AwvL7/wCU1H/CR/G//onnw/8A/C8vv/lNQB6rRXlX/CR/G/8A6J58P/8AwvL7/wCU1ef/AAP8a/G/VfBepTf8Ij4P1nb4m8QwfaNT8c3yyp5es3sfkqP7Kf8AdRbPKjO4ZjjQ7Y87FAPpWivKv+Ej+N//AETz4f8A/heX3/ymo/4SP43/APRPPh//AOF5ff8AymoA9Voryr/hI/jf/wBE8+H/AP4Xl9/8pq8//Z68a/G/WfgF8NL/AP4RHwfrv2rwzpk/9qat45vlvLzdaxt504/sqTEr53MPMf5ifmbqQD6Voryr/hI/jf8A9E8+H/8A4Xl9/wDKaj/hI/jf/wBE8+H/AP4Xl9/8pqAPVaK+av2hfGvxv0b4BfEu/wD+ER8H6F9l8M6nP/amk+Ob5ryz22sjedAP7KjzKmNyjzE+YD5l6j0D/hI/jf8A9E8+H/8A4Xl9/wDKagD1WivKv+Ej+N//AETz4f8A/heX3/ymo/4SP43/APRPPh//AOF5ff8AymoA9Vor5q+OHjX436V4L02b/hEfB+jbvE3h6D7Rpnjm+aV/M1myj8lh/ZSfupd/lSHccRyOdsmNjegf8JH8b/8Aonnw/wD/AAvL7/5TUAeq0V5V/wAJH8b/APonnw//APC8vv8A5TUf8JH8b/8Aonnw/wD/AAvL7/5TUAeq0V81fEvxr8b7Hxp8J4f+ER8H6f8AbPE08H2ey8c3xivsaNqcnk3B/spcRDy/NB2yfvIYhtGd6egf8JH8b/8Aonnw/wD/AAvL7/5TUAeq0V81fEfxr8b7DxV4LXTfCPg+HxJPemOHSLLxzfXEV7YF4hfPcQNpSIsUSFHFyWVopDEiGU3BtbkoA+laKKKACiiigAooooA4b45eK9Z8B/Bzxp4n8PvYprGiaTc6nANTtnuLdzBGZSjokkbfMqFQQ4wWBw2Np8uv/wBojxPb/Fq30uOy0oeFbW80PSNQjeCb7bNc6lFI6zQy+YI1jibyAUKOWDSfOpUKfbvHHgrSfiN4R1Xwzr0M9xouqQG2vILa7mtXlib7yeZC6OAw4IDDIJByCQeXsf2f/Aun+KdF8Rx6TcS6zpFtDa21zc6ndz7lhSVIXmV5Ss8sazzKs0oeRRI2GGauLStfuvu6r59+m/QqTTptLez+925X8nd+e2zPRKKKKgk80+P3inxl4J8AX+v+Dn0NZ9NglupodYtJ7prtlA8q1gjhkjIklchA5ZsEqBG+7jhPAH7QXivxL8XU0jVdL0yx8OX2saj4etbOKOU39rd2VrFNJJLMX8uWNz9oUKka7dsbbnDHb6f8UPgz4W+Mltpdv4pg1O4h0y4+12q6drV7p2yYY2yE200e5lx8pbO3J24yc1fB/wAA/AngLxS3iLQtC+w6obcWyt9suJIo18uGJmSF5DGkjpbwK8qqHcRruZsUQ0lJy26Lz01/NW1XVWY5WcUo79fx0/J3+T01PQaKKKBHjnx6+KHif4X634Jn02fSI9C1XWLPSryLUdJvZ2dp7mOLP2uFvKswFc7WmRw7lVG3k1ifs/8Ax88SfE7xOttrtnpkGna1pdzrmjJYQTRTWlvDfvamG5Mjt5shXyX3qsYBMilPlDN6j4o+Fvh/xpr+navrMeo3ktgUaKy/te7jsHZH8xHls1lFvMyvhg0kbEFVIPyriDwN8G/B/wANtY1jVPDmkf2feaq7NcMbqaZEBlkmMcKSOywRmWaWQxxBELOzbcnNOHu/F3f3NKy+T1/DYcrNPl30/B6/etPx6I7SiiikI+avjT+2Zo3ws+NOkeBYLjR7h4YLi51uK6vQl4pGn3NzbQW8QO4u7QRAsVI/fxKoZn+Tr/2dfix4n+IcWq6f4vi0k6zZ2Wl6qs+iQSwW5gvrbzViKSySNvjZJVL7sONjbUJKj0nxD4H0PxZqWjX2r6el9c6PLNNZGVm2xtLBJbyZQHa4aKWRcOCPmzjIBrM+Gnwk8K/CDSJ9N8KabJp9rO6PJ595PdyNsjWKNPMmd32JGiIiZ2oqgKAOKIaKXN1tb8b/AKfd5u5LW1vn9yt+unn5I7CiiigD5q+M/wC0T41+FnijxhHLo1tYaVaaX5nhuPUNNeZdauS0Mby/a4LphDHFJOm6CSBHZAWV8btnqfwX8c6x4z0jxBa+IRYvrvh7W7nRbu60yF4La6MYR0ljid5GjDRyx5Qu+GDYYjBo1r4CeCfEuo69ea1p17rcmtWk9hdRapq95dQRwTbfNS3hkmaO23bEyYFQ/IvPArpPBPgbRfh3oKaPoVtJbWQlluHa4uZbqeaWRy8kss0rNJK7MxJd2Zj60Q0Wvb8b7/dp0vfZWSHKz+Hv+FrW++z8rb6s8I/aa/aP1j4L/EfwjpVl4n8HaTod/Ek2tf29p9zPc6ZbtdxQLeFo7iNPJZ5REAwBD/PlkWTyyvpWiuihUjSTU1e78vu1iznq0vaSunb5v9Gv6/EooornNwooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD//2Q== 1.0000000 0.3333333 0 true true abc Little or no linear correlation Incorrect Weak negative linear correlation Incorrect Strong negative linear correlation Incorrect Weak positive linear correlation Correct If the following is a polynomial function, then state its degree and leading ... If the following is a polynomial function, then state its degree and leading coefficient. If it is not, then state this fact.

f(x) = 5x-6 + 15]]> 1.0000000 0.3333333 0 true true abc Degree: 5; leading coefficient: -6 Incorrect Degree: 6; leading coefficient: 5 Incorrect Degree: -6; leading coefficient: 5 Incorrect Not a polynomial function Correct If the following is a polynomial function, then state its degree and leading ... If the following is a polynomial function, then state its degree and leading coefficient. If it is not, then state this fact.

f(x) = -11 - 4x4 - 5x - 7x3 - 17x2]]> 1.0000000 0.3333333 0 true true abc Not a polynomial function. Incorrect Degree: 4; leading coefficient: -4 Correct Degree: -11; leading coefficient: -4 Incorrect Degree: 4; leading coefficient: -11 Incorrect If the following is a polynomial function, then state its degree and leading ... If the following is a polynomial function, then state its degree and leading coefficient. If it is not, then state this fact.

f(x) = ]]> 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 1.0000000 0.3333333 0 true true abc Degree: 12; leading coefficient: 2 Incorrect Not a polynomial function Correct Degree: 2; leading coefficient: 4 Incorrect Degree: 4; leading coefficient: 2 Incorrect If the following is a polynomial function, then state its degree and leading ... If the following is a polynomial function, then state its degree and leading coefficient. If it is not, then state this fact.

f(x) = -9x3 - 4 - 10x4 + x9 + 10x2]]> 1.0000000 0.3333333 0 true true abc Not a polynomial function. Incorrect Degree: 3; leading coefficient: -9 Incorrect Degree: 9; leading coefficient: -9 Incorrect Degree: 9; leading coefficient: 1 Correct Solve the problem.  Bill Monotone sells used CDs for $9.75 each. Each used ... Solve the problem.  

Bill Monotone sells used CDs for $9.75 each. Each used CD costs him $3.50. His overhead is $6700. Express the cost C as a function of x where x is the number of CDs sold.]]> 1.0000000 0.3333333 0 true true abc C(x) = 6700x + 3.50 Incorrect C(x) = 6700x + 9.75 Incorrect C(x) = 9.75x + 6700 Incorrect C(x) = 3.50x + 6700 Correct Solve the problem.  Dan's long-distance phone carrier charges him $7.95 a ... Solve the problem.  

Dan's long-distance phone carrier charges him $7.95 a month for service. In addition, Dan is charged 10 cents a minute for the calls he makes. If his monthly bill is $30.05, how many minutes of calls did he make?]]> 1.0000000 0.3333333 0 true true abc 232 minutes Incorrect 222 minutes Incorrect 221 minutes Correct 211 minutes Incorrect Use regression to solve the problem. Round numbers to the nearest hundredth.T... Use regression to solve the problem. Round numbers to the nearest hundredth.

The ages and lengths of several animals of the same species are recorded in the following table:



Find the linear regression equation.]]> 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 1.0000000 0.3333333 0 true true abc y = 2.18x - 1.03 Incorrect y = 1.03x - 2.18 Correct y = 0.93x - 1.18 Incorrect y = 0.93x + 2.18 Incorrect Write an equation for the linear function f satisfying the given conditions.... Write an equation for the linear function f satisfying the given conditions.

f(-1) = -5 and f(5) = 7

]]> 1.0000000 0.3333333 0 true true ABCD f(x) = -3x - 8

]]> Incorrect

]]> f(x) = 4x - 1

]]> Incorrect

]]> f(x) = 2x - 3

]]> Correct

]]> f(x) = 3x - 8

]]> Incorrect

]]> f(x)= 3x - 2

]]> Write an equation for the linear function f satisfying the given conditions.f... Write an equation for the linear function f satisfying the given conditions.

f(3) = 5 and f(6) = 6]]> 1.0000000 0.3333333 0 true true abc x - 2]]> 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 Incorrect x - 2]]> 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 Incorrect x + 3]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAmAA0DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9APjJ4l+IPgq3PiHw9J4eutDspbWOXQruynkv9TMk6RskFysyJDId+1FMMu5toJXdx6nXlHj34c/ELxF4+s9d0bxl4YsdKsIx9g0nWvC9zf8A2ecgh7jfHqMCtIQSqkp8ikhcbnLeqRBxEgkZXkAG5kXaCe5AycD2yaF8P3jla+nb+v6/4c+X/jB8Gfh78N7OXVtJ/Zl+GviLQLFYnvppbGxtbxw8ipss4BZyCeQZ+7I8O4lVUtnj6N8LeE9D8DaFa6J4b0bT/D+i2u77Pp2l2qW1vDuYu2yNAFXLMzHA5LE9TXkHx/8Ag1rPxra40HUPB/gPXdBmgeGw8Q608p1TQXlQLJLbwfZ3Ejgqrqyz2+cKD93cfbdPtP7PsLa186a58iJYvOuH3ySYAG5m7scZJ9aFt/X9afiJ6NJFiiiigD//2Q== Incorrect x + 4]]> 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 Correct Write an equation for the linear function f satisfying the given conditions.f... Write an equation for the linear function f satisfying the given conditions.

f(-3) = 4 and f(1) = 1]]> 1.0000000 0.3333333 0 true true abc x + ]]> 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 Incorrect x + 6]]> 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 Incorrect x + 2]]> 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 Incorrect x + ]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAmAA0DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD7f/aV+MmufBq1tdUtfFXgLQrdtgtdF8UM63muyeYgkit5ftESwFVdfnMc4BcMwRRz7pXmPxK+Gniz4gnV9GHjDTrXwPrdqbPUNLudB+0XqROmyUW1yJ0SPcOQZYJtrEnkYUejafYQaXYW1lap5VtbRLDEmSdqKAFGTyeAOtC2t/X9dtfkraj3Vv6/rr+t9PnP4yfCj4F/CTQ9Ovf+FDeBtaub3UrOwW2h8N2EYiSe6ht2ndzCcIhmXgAlmZV4yWHv3hbwnofgbQrXRPDejaf4f0W13fZ9O0u1S2t4dzF22RoAq5ZmY4HJYnqa8K/al+BHxA+KCxXHgPxVJYXE0tj9psL++tLSzjS1ukuUdGOlXczOXXp5ioCEJVwCh+gtNW5TTrVbwhrsRIJiHDgvgbvmCoDznnauf7o6VacHT/vXd/Sytb8fvHKysv6/4cs0UUVAj//Z/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAmAA0DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD77+Luo/E/RJri+8K6/wCEdP05lhttP03VdAub+7vb2RioTzUvrdI1JKfwttAdicDA9Q08XQsLYXzQveiNfPa3UrGZMDcVBJIXOcAknFc9qHgy41X4iaX4hu9T8zTNKtJEstIWHAS8kyr3TSbvmYRExIu0bRJKctvAXqaSulr/AF/X5WBrX+v68vvPmv4yfCj4F/CTQ9Ovf+FDeBtaub3UrOwW2h8N2EYiSe6ht2ndzCcIhmXgAlmZV4yWHv3hbwnofgbQrXRPDejaf4f0W13fZ9O0u1S2t4dzF22RoAq5ZmY4HJYnqa8K/al+BHxA+KCxXHgPxVJYXE0tj9psL++tLSzjS1ukuUdGOlXczOXXp5ioCEJVwCh+gtNW5TTrVbwhrsRIJiHDgvgbvmCoDznnauf7o6VonB0/713f0srW/H7xysrL+v8AhyzRRRUCP//Z Correct Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.1 Linear//Quadratic Functions and Modeling/2.1.2 Quadratic Functions Complete the square Complete the square to get the proper values for Vertex Form     y= a (x - h)2+ k
y = x2 - #p x + 18

]]> 1.0000000 0.3333333 0 0 a=#ah=#hk=#k]]> Nice job.

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mn>6</mn><mo>,</mo><mn>8</mn><mo>,</mo><mn>10</mn><mo>,</mo><mn>12</mn><mo>,</mo><mn>14</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>h</mi><mo>=</mo><mo>(</mo><mfrac><mi>p</mi><mn>2</mn></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>k</mi><mo>=</mo><mn>18</mn><mo>-</mo><mfrac><msup><mi>p</mi><mn>2</mn></msup><mn>4</mn></mfrac></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mn>1</mn></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mo>#</mo><mi>a</mi><mspace linebreak="newline"/><mi>h</mi><mo>=</mo><mo>#</mo><mi>h</mi><mspace linebreak="newline"/><mi>k</mi><mo>=</mo><mo>#</mo><mi>k</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">distribute</data><data name="gradeCompoundDistribution">20 40 40</data><data name="casSession"/><data name="inputCompound">true</data></localData></question> Find degree of polynomial If the following is a polynomial function, then state its degree. If it is not, then enter 0.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«msup»«mi»x«/mi»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«/msup»«mo»+«/mo»«mo»#«/mo»«mi»c«/mi»«mo»§#160;«/mo»«msup»«mi»x«/mi»«mrow»«mo»#«/mo»«mi»d«/mi»«/mrow»«/msup»«mo»+«/mo»«mo»#«/mo»«mi»e«/mi»«mo»§#160;«/mo»«msup»«mi»x«/mi»«mrow»«mo»#«/mo»«mi»f«/mi»«/mrow»«/msup»«mo»-«/mo»«mn»12«/mn»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>5</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>5</mn><mo>,</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>e</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>5</mn><mo>,</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p</mi><mo>(</mo><mo>)</mo><mo>=</mo><msup><mi>ax</mi><mi>b</mi></msup><mo>+</mo><msup><mi>cx</mi><mi>d</mi></msup><mo>+</mo><msup><mi>ex</mi><mi>f</mi></msup></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">repeat</csymbol><mrow><mi>p</mi><mo>(</mo><mo>)</mo></mrow><mrow><mi>d</mi><mo>&gt;</mo><mi>b</mi></mrow></apply></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>d</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Find the axis of symmetry of the graph of the function.f(x) = 3x2 + 30x + 78 Find the axis of symmetry of the graph of the function.

f(x) = 3x2 + 30x + 78

]]> 1.0000000 0.3333333 0 true true abc x = 3

]]> Incorrect

]]> x = 6

]]> Incorrect

]]> x = -2

]]> Incorrect

]]> x = -5

]]> Correct

]]> Find the axis of the graph of the function.f(x) = (x + 3)2 + 4 Find the axis of the graph of the function.

f(x) = (x + 3)2 + 4]]> 1.0000000 0.3333333 0 true true abc y = -3 Incorrect x = -3 Correct x = 3 Incorrect x = 0 Incorrect Find the axis of the graph of the function.f(x) = 2x2 + 20x + 51 Find the axis of the graph of the function.

f(x) = 2x2 + 20x + 51]]> 1.0000000 0.3333333 0 true true abc x = 1 Incorrect x = 6 Incorrect x = -5 Correct x = 0 Incorrect Find the axis of the graph of the function.f(x) = 3x2 + 6x + 8 Find the axis of the graph of the function.

f(x) = 3x2 + 6x + 8]]> 1.0000000 0.3333333 0 true true abc x = 5 Incorrect x = -4 Incorrect x = 2 Incorrect x = -1 Correct Find the vertex of the graph of the function.f(x) = -4x2 - 16x - 22 Find the vertex of the graph of the function.

f(x) = -4x2 - 16x - 22]]> 1.0000000 0.3333333 0 true true abc (3, 7) Incorrect (7, 3) Incorrect (-6, -2) Incorrect (-2, -6) Correct Find the vertex of the graph of the function.f(x) = (x - 2)2 + 3 Find the vertex of the graph of the function.

f(x) = (x - 2)2 + 3

]]> 1.0000000 0.3333333 0 true true abc (0, 2)

]]> Incorrect

]]> (3, 0)

]]> Incorrect

]]> (3, 2)

]]> Incorrect

]]> (2, 3)

]]> Correct

]]> (-2,-3)

]]> Find the vertex of the graph of the function.f(x) = (x + 5)2 + 1 Find the vertex of the graph of the function.

f(x) = (x + 5)2 + 1]]> 1.0000000 0.3333333 0 true true abc (1, -5) Incorrect (1, 0) Incorrect (-5, 1) Correct (0, -5) Incorrect Find the vertex of the graph of the function.f(x) = 2(x - )2 + 2 Find the vertex of the graph of the function.

f(x) = 2(x - )2 + 2]]> 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 1.0000000 0.3333333 0 true true abc , 2)]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAATABQDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6+Xbew0Hxi3inxn4m1bxzd6jrXivUtG0Lwv4b8XarZMq6fKdOMMENvdwwnzHsZrt5HVFj+0sJH2xmQ9b4k8XX37MdtqXjf4i+LbjW/Al3DAda1I27BdF1AyMgmhtU8xxaTCS2thDGXaFoIncTtcXVynmy/A7xVpXhr4LahrPhnxVr11pHhKTTvEOl+EPEkOmakur3P2ae6u5Ln7Vb+aZJ4pjK6XO6SRwzCQMxC1bUV1/wAr/wDA9WPz/r+v6Wp9T+EIzD4V0eI2Oo6Z5dpFH9j1i7F3eQhVACzTCWXzZBj5n8xyxySzE5orL+FOj6/4f+HHh3TfFF82pa/a2aRXd08/nu7gfxS7V8xgMAybV3EFsDOKKuVuZ2/r8/zZKvbU6DVtJsdf0q90zU7K31HTb2F7a6s7uJZYZ4nUq8bowIZWUkFSCCCQat0UVIwooooA/9k= Incorrect (-6, 2) Incorrect (6, 2) Incorrect , 2)]]> 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 Correct Find the vertex of the graph of the function.f(x) = 3(x - 1)2 + 6 Find the vertex of the graph of the function.

f(x) = 3(x - 1)2 + 6]]> 1.0000000 0.3333333 0 true true abc (1, 6) Correct (1, -6) Incorrect (-1, 6) Incorrect (-1, -6) Incorrect Find the vertex of the graph of the function.f(x) = 3x2 + 18x + 29 Find the vertex of the graph of the function.

f(x) = 3x2 + 18x + 29]]> 1.0000000 0.3333333 0 true true abc (-3, 2) Correct (-1, 4) Incorrect (2, -3) Incorrect (4, -1) Incorrect Maximum height of projectile A projectile is thrown upward so that its distance above the ground after t seconds is «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»h«/mi»«mo»(«/mo»«mi»t«/mi»«mo»)«/mo»«mo»=«/mo»«mo»-«/mo»«mn»16«/mn»«msup»«mi»t«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mi»t«/mi»«/math».  After how many seconds does it reach its maximum height?  Round to tenths.

]]> 1.0000000 0.3333333 0 0 #answer]]> Great job.

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>250</mn><mo>,</mo><mn>300</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mo>-</mo><mi>a</mi></mrow><mrow><mo>-</mo><mn>32</mn></mrow></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi mathvariant="normal">s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Solve the problem.  A projectile is thrown upward so that its distance ... Solve the problem.  

A projectile is thrown upward so that its distance above the ground after t seconds is  After how many seconds does it reach its maximum height?]]> 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 1.0000000 0.3333333 0 true true abc 31.5 s Incorrect 42 s Incorrect 10 s Incorrect 21 s Correct Solve the problem.  The number of mosquitoes M(x), in millions, in a ... Solve the problem.  

The number of mosquitoes M(x), in millions, in a certain area depends on the June rainfall x, in inches: M(x) = 20x - x2. What rainfall produces the maximum number of mosquitoes?]]> 1.0000000 0.3333333 0 true true abc 0 in. Incorrect 10 in. Correct 20 in. Incorrect 400 in. Incorrect Solve the problem.  The perimeter of a rectangle is 82 m. If the width were... Solve the problem.  

The perimeter of a rectangle is 82 m. If the width were doubled and the length were increased by 18 m, the perimeter would be 150 m. What are the length and width of the rectangle?]]> 1.0000000 0.3333333 0 true true abc width 25 m, length 16 m Incorrect width 20 m, length 20 m Incorrect width 15 m, length 20 m Incorrect width 16 m, length 25 m Correct Solve the problem.  The stadium vending company finds that sales of hot ... Solve the problem.  

The stadium vending company finds that sales of hot dogs average 40,000 hot dogs per game when the hot dogs sell for $2.50 each. For each 50 cent increase in the price, the sales per game drop by 5000 hot dogs. What price per hot dog should the vending company charge to realize the maximum revenue?]]> 1.0000000 0.3333333 0 true true abc $3.50 Incorrect $4.00 Incorrect $3.25 Correct $1.50 Incorrect Solve the problem.

The profit made when t units are sold, t > 0, is given by  Determine the number of units to be sold in order for P > 0 (a profit is made).

]]> 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 1.0000000 0.3333333 0 true true ABCD 19 < t < 14

]]> Incorrect

]]> t = 19 or t = 14

]]> Incorrect

]]> t = 33

]]> Incorrect

]]> t > 19 or t < 14

]]> Correct

]]> Answer not shown

]]> Write an equation for the quadratic function whose graph contains the given ... Write an equation for the quadratic function whose graph contains the given vertex and point.

Vertex (5, 5), point (7, 17)]]> 1.0000000 0.3333333 0 true true abc 2 - 5x + 5]]> Incorrect 2 - 30x + 5]]> Incorrect 2 - 30x + 80]]> Incorrect 2 - 30x + 80]]> Correct Write an equation for the quadratic function whose graph contains the given ... Write an equation for the quadratic function whose graph contains the given vertex and point.

Vertex (5, 5), point (7, 17)

]]> 1.0000000 0.3333333 0 true true ABCD P(x) = -3x2 - 30x + 5

]]> Incorrect

]]> P(x) = 7x2 - 30x + 80

]]> Incorrect

]]> P(x) = 3x2 - 5x + 5

]]> Incorrect

]]> P(x) = 3x2 - 30x + 80

]]> Correct

]]> P(x) = -3x2 + 5x - 30

]]> Write an equation for the quadratic function whose graph contains the given ... Write an equation for the quadratic function whose graph contains the given vertex and point.

Vertex (3, -2), point (-4, 145)]]> 1.0000000 0.3333333 0 true true abc 2 + 18x - 2]]> Incorrect 2 - 18x + 25]]> Correct 2 - 18x - 25]]> Incorrect 2 - 3x - 2]]> Incorrect Write the quadratic function in vertex form.y = x2 - 10x + 18 Write the quadratic function in vertex form.

y = x2 - 10x + 18]]> 1.0000000 0.3333333 0 true true abc 2 - 7]]> Incorrect 2 - 7]]> Correct 2 + 7]]> Incorrect 2 + 7]]> Incorrect Write the quadratic function in vertex form.y = x2 + 4x Write the quadratic function in vertex form.

y = x2 + 4x]]> 1.0000000 0.3333333 0 true true abc 2 - 16]]> Incorrect 2 + 4]]> Incorrect 2 + 2]]> Incorrect 2 - 4]]> Correct Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.2 Power Functions and Modeling/2.2.1 Power Function Basics Degree and Leading Coefficient Determine if the function is a monomial function. If it is, state the degree and leading coefficient.
 
 «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«msup»«mi»x«/mi»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«/msup»«/math»
]]> 1.0000000 0.3333333 0 true true ABCD Your answer is correct.

]]> Your answer is partially correct.

]]> Your answer is incorrect.

]]> Degree is #b ; leading coefficient is #a

]]> Correct

]]> Degree is #a ; leading coefficient is #b

]]> Incorrect

]]> Degree is #b ; leading coefficient is #c

]]> Incorrect

]]> Degree is «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»a«/mi»«/mrow»«/mfrac»«/math» ; leading coefficient is #a

]]> Incorrect

]]> Not a monomial function

]]> Incorrect

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>10</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">repeat</csymbol><mrow/><mrow><mi>a</mi><mo>≠</mo><mn>0</mn></mrow></apply></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mo>-</mo><mi>a</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></library></session>]]></wirisCasSession><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession"/></localData></question> Determine if the function is a monomial function (given that c and k ... Determine if the function is a monomial function (given that c and k represent constants). If it is, state the degree and leading coefficient.

f = -9 ∙ x2 ]]> 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 1.0000000 0.3333333 0 true true abc Degree is -9; leading coefficient is 2 Incorrect Degree is 2; leading coefficient is 9 Incorrect Not a monomial function Incorrect Degree is 2; leading coefficient is -9 Correct Determine whether the power function is even, odd, or neither.f = 6x1/3 Determine whether the power function is even, odd, or neither.

f = 6x1/3]]> 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 1.0000000 0.3333333 0 true true abc Neither Incorrect Odd Correct Even Incorrect Solve the problem.The table shows the population of a certain city in various... Solve the problem.

The table shows the population of a certain city in various years. The population of the city f(x), in hundreds of thousands, can be modeled by f(x) = axb, where x represents the number of years since 1980. Estimate the population of the city in the year 1999. (You will first need to use regression to estimate the values of a and b).

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YB548MTyau/EP4BfEOXT/iJ4d8Hf8IzNoPiqwsoo9Q13UrmO6tntrZIPKaKO3dXDiJP33mAoXY+U+0BoUm5aaxvv6Xvp8vPfS9tYu7ba22/L1/4HS+jbnwx8OvC2veLrXxx4m8ReC9I0We0ittX1H4wa9FDdLPGzpvMt5GsUmUcbAz5AB3dQGeLY/gR4JvPBsWrfEnxLb23ize2l37/FvWEtpY1iaQS+Y2pgGNsKisu4F3QfxVc8ZfDb41a/451rULCDwxp3h7VvsQvLKy8XX9jeXKxW8qMn2qGwEkKiWRHBiZXYRYLIHIDvA3wP+IPw/wDCPwytbe08L6vqvhHWNUnmSfWr2KK4trv7RiVZXt5pPOHnjKSb8/NmVid1VC6T5v6X9W/HTQG3okv6v/lf8NbsWHw78G7fwBpPjPXfHfifwroGqEra3ms/GDVEglOW27J49VeF9wUsNkjcdcEECbxB4d+BHhKS4j1z4s6to0luIWmTUPjDrEBiEyloSwfUhjeqsy5+8FJGcVH4O+F3xZ8IWvh7VTpPgnU9ZsrXUtJu9Fm1y6Szktbm6W5SaO6+wM4kUr5bxGHa4w28bQtM+GP7OHiH4feIrC1ksvDN9oGneDW8O2mqC5lW9jmeV5pQluYGWK3LSBAqznCRJweAsSc0lK299O2jt99lr0va10zSNmry8vzSf3XfrbTc3/F3wf8Ah/4P8H3XiK41zx9c2ccaNAIPiVr+bqSRlSGONjfhS0juiLk4Jcc1wWjad8PtM8W634a+IXiPWfAmrWt9BZadHN8adeddUMsMcn7nzrqBi4MqqUVWOSvPzAV3V14C8TeG/wBmfwPpGpWlnNr3gz+xbm7tdJuZbmG5j0+eFpPKYwo7M0ULOF8vO/CjP3ji+Jvg14o+Itl8cLq2s/CHlePNLgt/D+sW+pyzPNElvsi+0MLUbIyT5gMbSgbzgHqdZq0vdeibXyto/m9PlsRFtwvJa2/Ht6Lf9UaN54E+DGnWmq3V18S9ftrbSrxdO1Cab4t60iWd0xAWCZjqOI5CSAEbDHI4qnpvh34EazrOnaRp/wAWdWvtV1IutlYW3xh1iSe6KMyuIo11Is+1kdTtBwUYHoaqfEz4NfFPxRb/ABIs9FtvB8Nv45s7OS4nv9Wut9hcxW6RSQIi2mJY2MYxOWQruJMLbdpLL4I/ECXwVrJutC8GWHiq68eWvi9UstYuJLe5jju4pzHNcGxVxIEj8tW8twQB90cCIOTkoyX9XS/Lmfyt1uOTtFuO/T7pP9Ir1fyVD4g6F8O/BnxA8K+ELPxF4j1bW9V1GGzvtKPxh1+LUrCGVSY7kWou3aRMgAljGBuGCc4raHh34ENPfwj4s6sZrBLiS8jHxh1jdbLAQLhpB/aXyCMkBycbcjOKqT/BX4m2E+j6Vp9j4IvdD0bxo/iqPU7u9uYr++SWaaWRXQWrrDMv2hl80SSeYqBSIw5K5njH9mvxp44t/HUl1pPhTTdQvPGNp4r0e5sNdvoZrlYIoYPIuLiC2hmtWMcJYSwvIVaTG1guXmLlbXv+Hu9PK8n3drLdDesvd7fjeX52iuyvrs79Fq3gr4O6d4ATxivxI1keHLgFLLWrv4wa3DptxLllVBdfb2Tl1K5XcRg8EjFc94VsvhRP8KPDPjbxt4x8Q/D+LWgypHqvxh1xIPNVmBjjnlvYvM+4SPlBx2FbXh34JeNPA2q+HfEvh3w/4cXWbddRt7/Sdc8YapqyL9qaAm7h1G4tnmaXFtGrRNEqsrEBxjJwLP8AZ8+JunfD/wAH6NbWvhiz8Q6LZ3unLr2keJL2wjtY5pgwdLL7FLb3MbLgm1uEKKUULIeHVyclZxXy9Onz7uy12VmiYu710t/V+/ySfzur+heI/g38MvB3h+XXdf8AGni7RNDiCtJqepfFLXbe2QMQFJlfUAoySAOecivPvGsPwk8Oan4E07TfHGs3914xl3aZNe/GTXbW1uLZWQPJDMt5IJXO9RHGoxIxxuXk17B8QPA/iuWHwNqnhibStV13wtcGRrPWXaxtdQV7Z7eQ+ZFFKbdwJC6lYnHBTADZHnfgr4FeN/BPxF8K67a6f4XOnDUNY1TWbaHVriL7HJqMkbPFaR/ZCsyxiIHcxh813diseap83PZbXXz1Xfur69LW3aGm+Tme/wDX5Pp1vfZM5z4u/wDCrvhjrV94Xt/EXim/8dR6Jca3Z6Hf/F7XLH7UkJBMO77bJIJHXeyARMGET8gAkdZ4D8E/CL4hxzw6P498S3+r2UCS6npdj8WtcuJ9OZhyk6LqG6Mghl+YLyp4rZ+OXw48d+IvE1xqngvT/DWoi/8AC1/4cn/t7V7iwa2M7xssqeVaziQDYcqdh4GG61zev/s7eKtc0zw1p9nB4a8OW0XgW88KXy2dxJLHZTO1tJC0EX2dFuId1sVZWMPyyHAPQxFye/Z/enP80off5O5PRpR/r4P1cvu16E+neHfgRq+ltqdj8WdWvdNW9j003lv8YdYkhF2/3LfeNSI81uyZ3HsK1J/hp8IraPxC83xC8SxJ4dx/bTP8WNcA0zK7h9pJ1D9zlefnxxzWJ4s+BHjr4kt4o8TaxZ+FfD3jG80ix0y0sdL1K4u7O5Nrei8ElzctbROAzDy1UQuYlLsGfeVDNX+EXxO8T6z421XXNA8H3Y8QRaQ8GnWPi3VNPe1ls5ZDtF7BaLKDiTzFmRVO5Qhjx+8Ne9e39b/5a9N7XvuN2fl/wP8AN2+Tez0WHT/2fbh9HSL4x38r6y23TFT4y6uTfHzDHiH/AImX7w7wU+XPzDHWrOoeHfgRpOqDTL74s6tZakb1tNFncfGHWI5vtY25t9h1LPmjemUxu+deORXB+Nv2ZvjZ418KavoWp+JtI1i01C2M1rFca/d2Men3JkkZ4ZhZWkI1NXTyU865A27SxgkO7f3Hin4HeN/Gtr8cvtmj+EdPv/GumQWWlXsGpzzyDyoPLWO5Y2aFED5cFC+Nx+XPJpu1vx8tPzvdaX7rTdt2ul8vP+tHrbs7PVZPxB0L4d+DPiB4V8IWfiLxHq2t6rqMNnfaUfjDr8WpWEMqkx3ItRdu0iZABLGMDcME5xW3qXgf4WHVdZ8P6D408SeIvGulQm4n8K2vxd1v+0Ai7S4MIvy6ttYY3KASyglQ24ZFj8Ffitp9l4b0qPSfAH9n6N4u/wCEqa6OpXX2m5MsssssX/HniOSM3DoJwWMqRgFIt5273hTwL4m+GHi/VfFOty6f4e8GWRvro6ZYa3caz/aFxPLlZI4rq2V7F2J/1FtO8cjyY2Z+YwnJJ37v7rK343829tNhO81yrSy07vmlf8OXtZee/JfHX4P+B9W/ZL+IvizQdd8a39pN4K1LUrKSfx/rl1BKPsMjpvikvWjkXplHDKeQQRkV61L+zZ4Sjid11T4hSsqkhE+I/iDLH0Gb8DP1IrifiB4a1Dwh/wAE+/G+j6tGsOp2vw81VbmFGLLFIbCZmQEgcKTt6dq+hdRW7fT7pbCSGK+MTC3kuULxLJg7S6gqSucZAIJHcVrPRvS34/8ADgrdz5o8GfDFdS+I914V8UaJ400JW0z+1rO+034weItQHl+d5flXKmeLyZjkEKjSo22TDnZkp4p+GsPhDxpo9vfaN42fwbqeqQ6RHq8Hxe8RPfxzSgiOR7Pz9nkmQBSwnLgMGMYAbHQeE/gvr+l/Ee++I/8Awg/gXwn4sTT7y3Nr4a1KYR+Ibid4383ULn7DGyhWiJA8qdsyFt3y7W3Z9N+K998UbfV77wx4QvfD9lKqacv/AAll3HJZoylJrjyP7MKyTlWdRmUAKdoK73ZiO8U/n56/K2ll5PVroG/Pb5d9v89fTZ7F/wD4Zp8I/wDQX+IH/hx/EP8A8nUf8M0+Ef8AoL/ED/w4/iH/AOTq9VopAeVf8M0+Ef8AoL/ED/w4/iH/AOTq4Dw54D8G+JPi94l8EQN8RoodF021vxqsnxL8QBLppZriJ0jT7bnajW5BcnltwAwuW+kLiJpoJI0leBnUqJY8bkJH3hkEZHXkEe1fMXgD4I/F74afG+/8RW+s2Xi3wq2lW2iW8Wua9b29y0EU8knmyJa6Ii7lE8hVBJktnfIwYeXcHC7U+2nr/X9bjdlBvrp+a/S//D2Ld98ONB0/42aN4Fms/iDHpuq6ZeX0Gtv8VNfy72xtg6LAt6Ts/wBKUb2dTuRhsIwx9B/4Zp8I/wDQX+IH/hx/EP8A8nVF4w8I+ONS/aA8E+KNM0zw/N4W0XT76wuZrvWJ4b5vtb2xd0gW0dD5YtRgGUb/ADOSm35vWqTtyxa87/e/0sOVrq3Y8q/4Zp8I/wDQX+IH/hx/EP8A8nUh/Zq8IgE/2v8AEDj/AKqP4h/+Tq9WqG8SeSznW1kjhumjYRSTRmRFfHyllDKWAOMgMM+o61D2Etz5N+DHh3QPix4gvbP+2C9taQCaeLw38e/EeralasxGxLi13RCEn5gcyHDLgBuot+MfhZrvh3xCsNl4Y16/0S41KHT7Kaf44eKIb+7VgC8i2yCRFCr5rkNMPliYkrXoukeB/G934j07xVqvhjwdpGseGtIutN0TTNH1ieSC687yflmuGso2tol8hQI0im+9uz8gB7PTPDOuX/xGufEOvNYrYWVklpo1jZytKYnkAa7mlLIvzllSNMZwiMcgysoe3L+P3/5dtr66ilvK3y/r1187aHP/APDNPhH/AKC/xA/8OP4h/wDk6j/hmnwj/wBBf4gf+HH8Q/8AydXqtFAHxz4nh8O+HNU1i/Nr4vfwLomuw+HdS1W5+MXiG31BbuRoVzFZtcbJIw1xF96dHYbmVGGzf3PjH4WeHdO8QxeFvC58c+IvFslr9ve0u/ip4isrS0ttzKstxOLqVkDsjoipG7MyngKruur8Qv2dIvif8XIPEGqeHPCOn6Vp8lvdrqtnbbte1mWIBkguLrylNtbK6rlEaVpAqgtGu5G5b4o/s1678TPFeo+INT8G+BNcvfEO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1.0000000 0.3333333 0 true true ABCD 1,068,993

]]> Correct

]]> 1,176,394

]]> Incorrect

]]> 1,014,133

]]> Incorrect

]]> 1,135,829

]]> Incorrect

]]> 1,234,823

]]> Incorrect

]]> Write the statement as a power function equation. Use k as the constant of ... Write the statement as a power function equation. Use k as the constant of variation.

The height h of a triangle with a fixed area varies inversely as the base b.]]> 1.0000000 0.3333333 0 true true abc b = kh Incorrect ]]> 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 Incorrect h = kb Incorrect ]]> 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 Correct Write the statement as a power function equation. Use k as the constant of ... Write the statement as a power function equation. Use k as the constant of variation.

The surface area of a sphere S varies directly as the square of its radius r.]]> 1.0000000 0.3333333 0 true true abc ]]> 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 Incorrect ]]> 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 Incorrect 2r]]> Incorrect 2]]> Correct Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.2 Power Functions and Modeling/2.2.2 Power Function Applications Boyle's Gas Law The volume V of a given mass of gas varies directly as the temperature T and inversely as the pressure P. If V = 450.0 in3 when T = 450° and P = 10 lb/in2, what is the volume when T = #a ° and P = #b lb/in2?  Round to tenths.

]]> 1.0000000 0.3333333 0 0 #answer]]> Correct!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>370</mn><mo>,</mo><mn>430</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>11</mn><mo>,</mo><mn>16</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mn>10</mn><mo>*</mo><mi>a</mi></mrow><mi>b</mi></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Data are given for y as a power function of x. Write an equation for the ... Data are given for y as a power function of x. Write an equation for the power function, and state its power and constant of variation.

]]> 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 1.0000000 0.3333333 0 true true abc  ; Power = -1; constant of variation = -16]]> 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Incorrect  ; Power = -3; constant of variation = 16]]> 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Incorrect y = - 16x ; Power = 1; constant of variation = -16 Incorrect  ; Power = -2; constant of variation = -16]]> 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Correct Force between masses The gravitational attraction A between two masses varies inversely as the square of the distance between them. The force of attraction is 8 lb when the masses are 2 ft apart, what is the attraction when the masses are #a ft apart?  Round to the nearest tenth if necessary.

]]> 1.0000000 0.3333333 0 0 #answer]]> Correct!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mn>32</mn><msup><mi>a</mi><mn>2</mn></msup></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi mathvariant="normal">s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Weight of liquid The weight of a liquid varies directly as its volume V. If the weight of the liquid in a cubical container 4 cm on a side is 128 g, find the weight of the liquid in a cubical container #a cm on a side.  Round to nearest gram.

]]> 1.0000000 0.3333333 0 0 #answer]]> Correct!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">repeat</csymbol><mrow/><mrow><mi>a</mi><mo>≠</mo><mn>4</mn></mrow></apply></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>2</mn><mo>*</mo><msup><mi>a</mi><mn>3</mn></msup><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi mathvariant="normal">s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.3 Polynomial Functions with Modeling/2.3.1 Describe End Behavior Describe the end behavior of the polynomial function by finding f and f = (x... Describe the end behavior of the polynomial function by finding f and 

f = (x - 3) ( 1 - x) (3x - 5)]]> 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1.0000000 0.3333333 0 true true abc ∞, ∞ Incorrect ∞, -∞ Incorrect -∞, ∞ Correct -∞, -∞ Incorrect Describe the end behavior of the polynomial function by finding f and f = -x3... Describe the end behavior of the polynomial function by finding f and 

f = -x3 + 4x2 - 4x - 6]]> 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1.0000000 0.3333333 0 true true abc -∞, -∞ Incorrect ∞, ∞ Incorrect ∞, -∞ Incorrect -∞, ∞ Correct Describe the end behavior of the polynomial function by finding f and f = x3 ... Describe the end behavior of the polynomial function by finding f and 

f = x3 - x4 + 2x2 + 3x - 1]]> 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1.0000000 0.3333333 0 true true abc -∞, ∞ Incorrect -∞, -∞ Correct ∞, ∞ Incorrect ∞, -∞ Incorrect Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.3 Polynomial Functions with Modeling/2.3.2 Find Zeros Find cubic function from zeros Find a cubic function in standard form with the given zeros.

#a , #b , #c

Express answer in this format:       f(x) = ax2 + bx + c

]]> 1.0000000 0.3333333 0 0 f(x)=#answer]]> Great job!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>5</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>(</mo><mi>x</mi><mo>-</mo><mi>a</mi><mo>)</mo><mo>*</mo><mo>(</mo><mi>x</mi><mo>-</mo><mi>b</mi><mo>)</mo><mo>*</mo><mo>(</mo><mi>x</mi><mo>-</mo><mi>c</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f</mi><mo>(</mo><mi>x</mi><mo>)</mo><mo>=</mo><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Find real zeros by factoring Find the zeros of the function.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«msup»«mi»x«/mi»«mn»3«/mn»«/msup»«mo»+«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mi»x«/mi»«/math»
 
]]> 1.0000000 0.3333333 0 true true ABCD Your answer is correct.

]]> Your answer is partially correct.

]]> Your answer is incorrect.

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»0«/mn»«mo»,«/mo»«mo»-«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«/math»

]]> Correct!

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»0«/mn»«mo»,«/mo»«mo»-«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«/math»

]]> Incorrect

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»-«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«/math»

]]> Incorrect.

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»0«/mn»«/math»

]]> Incorrect

]]> Answer not shown

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mn>4</mn><mo>,</mo><mn>9</mn><mo>,</mo><mn>16</mn><mo>,</mo><mn>25</mn><mo>,</mo><mn>36</mn><mo>,</mo><mn>49</mn><mo>,</mo><mn>64</mn><mo>,</mo><mn>81</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><msqrt><mi>a</mi></msqrt></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></library></session>]]></wirisCasSession><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession"/></localData></question> Find the zeros of the polynomial function and state the multiplicity of each.... Find the zeros of the polynomial function and state the multiplicity of each.

f(x) = -6x2(x - 8)(x + 1)3]]> 1.0000000 0.3333333 0 true true abc -1, multiplicity 3; 0, multiplicity 2; 8, multiplicity 1 Correct -1, multiplicity 3; 0, multiplicity 2; 1, multiplicity 1; 8, multiplicity 1 Incorrect -1, multiplicity 1; 1, multiplicity 1; 8, multiplicity 1 Incorrect -1, multiplicity 3; 8, multiplicity 1 Incorrect Match the given graph with its polynomial function. Match the given graph with its polynomial function.


]]> 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1.0000000 0.3333333 0 true true abc 4 + x3 - 12x2 + 10]]> Incorrect 5 - 4x3 + 12x2 + 10]]> Incorrect 5 - 10x2 - 10]]> Incorrect 4 + x3 - 10x2 + 10]]> Correct Use a graphing calculator to approximate the real zeros of the function ... Use a graphing calculator to approximate the real zeros of the function defined by f(x). Express decimal approximations to the nearest hundredth.

f(x) = 5x4 + 10x3 + 5x2 - 5x + 1]]> 1.0000000 0.3333333 0 true true abc -5.08, 0.16 Incorrect -2.54, -0.16 Incorrect No real solution Correct 0.16 Incorrect Use a graphing calculator to approximate the real zeros of the function ... Use a graphing calculator to approximate the real zeros of the function defined by f(x). Express decimal approximations to the nearest hundredth.

f(x) = 5x4 + 10x3 - 5x2 +5x + 1]]> 1.0000000 0.3333333 0 true true abc -5.08, 0.16 Incorrect -2.54, -0.16 Correct 0.16 Incorrect No real solution Incorrect Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.3 Polynomial Functions with Modeling/2.3.3 Solve Applications Solve the problem.A piece of rectangular sheet metal is 25 inches wide. It is... Solve the problem.

A piece of rectangular sheet metal is 25 inches wide. It is to be made into a rain gutter by turning up equal edges to form parallel sides. Let x represent the length of each of the parallel sides. For what value of x will the area of the cross section be a maximum (and thus maximize the amount of water that the gutter will hold)? If necessary, round to 2 decimal places.]]> 1.0000000 0.3333333 0 true true abc 100 Incorrect 50 Incorrect 6.25 Correct 12.5 Incorrect Solve the problem.A rectangular piece of cardboard measuring 15 inches by 42 ... Solve the problem.

A rectangular piece of cardboard measuring 15 inches by 42 inches is to be made into a box with an open top by cutting equal size squares from each corner and folding up the sides. Let x represent the length of a side of each such square. For what value of x will the volume be a maximum? If necessary, round to 2 decimal places.]]> 1.0000000 0.3333333 0 true true abc 31.29 Incorrect 3.36 Correct 15.64 Incorrect 18.03 Incorrect Solve the problem.A rectangular piece of cardboard measuring 30 inches by 43 ... Solve the problem.

A rectangular piece of cardboard measuring 30 inches by 43 inches is to be made into a box with an open top by cutting equal size squares from each corner and folding up the sides. Let x represent the length of a side of each such square. What is the maximum volume of this box? If necessary, round to 2 decimal places.]]> 1.0000000 0.3333333 0 true true abc 889.17 Incorrect 50,922.98 Incorrect 3351.01 Correct 777.08 Incorrect Solve the problem.The polynomial function I(t) = -.1t2 + 1.5t represents the ... Solve the problem.

The polynomial function I(t) = -.1t2 + 1.5t represents the yearly income (or loss) from a real estate investment, where t is time in years. After how many years does income begin to decline? Round to the nearest tenth of a year, if necessary.]]> 1.0000000 0.3333333 0 true true abc 7.5 years Correct 6.5 years Incorrect 15 years Incorrect 10 years Incorrect Solve the problem.The polynomial function L(p) = p3 - 5p2 + 20 gives the rate... Solve the problem.

The polynomial function L(p) = p3 - 5p2 + 20 gives the rate of gas leakage from a tank as pressure increases in p units from its initial setting. Will an increase of 2 units result in a lower rate of leakage compared to the initial setting?]]> 1.0000000 0.3333333 0 true true abc Yes Correct No Incorrect Use a cubic or quartic regression (as specified) to fit a curve through the ... Use a cubic or quartic regression (as specified) to fit a curve through the points given in the table. Round to the nearest hundredth.

  (Quartic)]]> 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 1.0000000 0.3333333 0 true true abc 4 + 3.27x3 + 20.02x2 + 55.93x - 46.00]]> Incorrect 4 + 3.77x3 + 20.02x2 + 51.93x - 44.00]]> Incorrect 4 + 3.77x3 - 20.02x2 + 41.93x - 44.00]]> Incorrect 4 + 3.27x3 - 20.02x2 + 51.93x - 44.00]]> Correct Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.4 Real Zeros of Polynomials/2.4.1 Long Division//Synthetic Division Divide f(x) by d(x), and write a summary statement in the form indicated.f =... Divide f(x) by d(x), and write a summary statement in the form indicated.

f = x3 + 4; d = x + 5 (Write answer in polynomial form)]]> 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1.0000000 0.3333333 0 true true abc  =   - 121]]> 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Correct  =   - 121]]> 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V3tkvtTtbKSaNXDIZUS4d03qyb1XcjrlT1XhPwtpfgbwro3hvRLX7Fouj2UOn2Nt5jSeTBEgjjTc5LNhVAyxJOOSTRRQB//Z Incorrect  =   - 125]]> 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AC/r+v8AMfS39f1/W+n0HRRRTA8q8Of8nT/EP/sTPDX/AKXa7R8G/wDkovx2/wCxztv/AFHtGoooA9VooooA/9k= Incorrect  =   - 125]]> 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Incorrect Divide f(x) by d(x), and write a summary statement in the form indicated.f =... Divide f(x) by d(x), and write a summary statement in the form indicated.

f = x2 - 12x + 7; d = x - 6 (Write answer in polynomial form)]]> 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1.0000000 0.3333333 0 true true abc  =   - 29]]> 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Incorrect  = 2 + 29]]> 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Incorrect  =   + 29]]> 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Incorrect  = 2 - 29]]> 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Correct Divide f(x) by d(x), and write a summary statement in the form indicated.f =... Divide f(x) by d(x), and write a summary statement in the form indicated.

f = x2 - 2x + 3; d = x - 4 (Write answer in polynomial form)

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]]> 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 Incorrect

]]> f =   + 8

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]]> f =   + 11

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]]> f = 2 + 11

]]> 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 Incorrect

]]> Divide f(x) by d(x), and write a summary statement in the form indicated.f =... Divide f(x) by d(x), and write a summary statement in the form indicated.

f = x4 + 4x3 + 3x2 - 8x - 8; d = x2 + 4x + 4 
(Write answer in polynomial form)]]> 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1.0000000 0.3333333 0 true true abc  =   + 4x - 4]]> 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Incorrect  =   - 4x - 4]]> 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/eTxDDEEhicYViCCUpRTe/8AX9blJL3r9E39y0NLwDezfDP4uXnwuFhcDwxqGmS+IvC08bRi2063he2t7vS1TeZFWKWeGeI48sR3hgjEaWqKSjVtTh1H9rvwrp9slxNcaN4G1e41B1tpPJtlvNQ01bQNLt2bpTp97tTduxbucY5JUEFv4b/8Up8YPH3gaw48PwWVl4rt4pPmeC61O91M3iK/UxNNamYBtzK9xKA3liKOP1WiigAooooAKKKKACiiigDyr9mX/id/B/QfHN38/iDx7ZWfivWZV4Rrq4srcBI06JFFDHDCg5bZCpdpJC8jlFFAH//Z Incorrect  =   - 4x - 4]]> 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/wCxztv/AFHtGoooA9VooooA/9k= Correct  =   + 4x - 4]]> 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Incorrect Divide f(x) by d(x), and write a summary statement in the form indicated.f =... Divide f(x) by d(x), and write a summary statement in the form indicated.

f = x3 + 5x2 + 8x - 5; d = x + 4 (Write answer in polynomial form)]]> 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1.0000000 0.3333333 0 true true abc  =   + 21]]> 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Incorrect  =   + 21]]> 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Incorrect  =   - 21]]> 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Correct  =   - 21]]> 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Incorrect Divide using synthetic division, and write a summary statement in fraction form. Divide using synthetic division, and write a summary statement in fraction form.

]]> 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 1.0000000 0.3333333 0 true true abc 3 + 5x2 + 3 + ]]> 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 Incorrect 3 - 7x2 + 6x -15 + ]]> 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 Incorrect 3 - 5x2 + 3 + ]]> 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 Incorrect 3 - 7x2 + 6x -15 + ]]> 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 Correct Divide using synthetic division, and write a summary statement in fraction form. Divide using synthetic division, and write a summary statement in fraction form.

]]> 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 1.0000000 0.3333333 0 true true abc 2 + 5x + 9 + ]]> 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 Incorrect 2 + x + 3 + ]]> 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 Correct 2 + x + 3 + ]]> 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 Incorrect 2 + 5x + 9 + ]]> 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 Incorrect Divide using synthetic division, and write a summary statement in fraction form. Divide using synthetic division, and write a summary statement in fraction form.

]]> 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 1.0000000 0.3333333 0 true true abc 3x4 - 2x3 + 4x2 - 6x + 12 + 

]]> 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 Correct

]]> 3x4 - 2x3 + 6x2 - 12 + 

]]> 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 Incorrect

]]> 3x4 + 2x3 + 4x2 + 8x + 

]]> 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 Incorrect

]]> 3x4 - 2x3 + 4x2 + 6 + 

]]> 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 Incorrect

]]> Find the remainder when f(x) is divided by (x - k)f(x) = 2x3 + 3x2 + 4x + 18;... Find the remainder when f(x) is divided by (x - k)

f(x) = 2x3 + 3x2 + 4x + 18; k= -2]]> 1.0000000 0.3333333 0 true true abc -60 Incorrect -38 Incorrect 6 Correct 10 Incorrect Find the remainder when f(x) is divided by (x - k)f(x) = 3x4 - 2x3 + 2x2 + 2x... Find the remainder when f(x) is divided by (x - k)

f(x) = 3x4 - 2x3 + 2x2 + 2x + 6; k = 2]]> 1.0000000 0.3333333 0 true true abc 50 Correct 46 Incorrect 26 Incorrect 52 Incorrect Find the remainder when f(x) is divided by (x - k)f(x) = x2 - 8x + 9; k = -8 Find the remainder when f(x) is divided by (x - k)

f(x) = x2 - 8x + 9; k = -8]]> 1.0000000 0.3333333 0 true true abc 9 Incorrect 119 Incorrect -9 Incorrect 137 Correct Use the Factor Theorem to determine whether the first polynomial is a factor ... Use the Factor Theorem to determine whether the first polynomial is a factor of the second polynomial.

x - 4; 2x2 - 17x + 36]]> 1.0000000 0.3333333 0 true true abc No Incorrect Yes Correct Use the Factor Theorem to determine whether the first polynomial is a factor ... Use the Factor Theorem to determine whether the first polynomial is a factor of the second polynomial.

x - 2; 4x2 - 12x + 40]]> 1.0000000 0.3333333 0 true true abc No Correct Yes Incorrect Use the Factor Theorem to determine whether the first polynomial is a factor ... Use the Factor Theorem to determine whether the first polynomial is a factor of the second polynomial.

x + 2; 9x4 + 19x3 - 2x2 + x + 4]]> 1.0000000 0.3333333 0 true true abc Yes Incorrect No Correct Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.4 Real Zeros of Polynomials/2.4.2 Finding Rational Zeros Find all of the real zeros of the function. Give exact values whenever ... Find all of the real zeros of the function. Give exact values whenever possible. Identify each zero as rational or irrational.

f = x3 + 6x2 - 26x - 80]]> 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 1.0000000 0.3333333 0 true true abc  (irrational), and 2 -  (irrational)]]> 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 Incorrect -8 (rational), 12 (rational), -10 (rational) Incorrect  (irrational), and - (irrational)]]> 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 Incorrect  (irrational), and 1 -  (irrational)]]> 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 Correct Find all of the real zeros of the function. Give exact values whenever ... Find all of the real zeros of the function. Give exact values whenever possible. Identify each zero as rational or irrational.

f = x3 + 4x2 - 5x - 20]]> 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1.0000000 0.3333333 0 true true abc  (irrational), and - (irrational)]]> 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Incorrect -4 (rational), 5 (rational), and -5 (rational) Incorrect  (irrational), and -2 (irrational)]]> 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Incorrect  (irrational), and - (irrational)]]> 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Correct Find all of the real zeros of the function. Give exact values whenever ... Find all of the real zeros of the function. Give exact values whenever possible. Identify each zero as rational or irrational.

f = x3 - 2x2 - 6x + 12]]> 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1.0000000 0.3333333 0 true true abc  (irrational), and - (irrational)]]> 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Correct  (irrational), and -2 (irrational)]]> 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Incorrect 2 (rational), 6 (rational), and -6 (rational) Incorrect  (irrational), and - (irrational)]]> 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 Incorrect Find all rational zeros.f = x4 - 7x3 + 3x2 + 21x - 18 Find all rational zeros.

f = x4 - 7x3 + 3x2 + 21x - 18]]> 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 1.0000000 0.3333333 0 true true abc -6, 1 Incorrect No rational zeros Incorrect 6, 1 Correct 6, -1 Incorrect Find all rational zeros.f = x4 + 3x3 + 3x2 - 6x - 27 Find all rational zeros.

f = x4 + 3x3 + 3x2 - 6x - 27]]> 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 1.0000000 0.3333333 0 true true abc 3, -1 Incorrect No rational zeros Correct -3, 2 Incorrect -3, -3 Incorrect Find all rational zeros.f(x) = 4x3 - 12x2 - x + 3 Find all rational zeros.

f(x) = 4x3 - 12x2 - x + 3]]> 1.0000000 0.3333333 0 true true abc 1, -1, 3 Incorrect 2, -2, 3 Incorrect , - , -3]]> 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Incorrect , - , 3]]> 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Correct Find all rational zeros.f(x) = x3 + 2x2 - 16x - 32 Find all rational zeros.

f(x) = x3 + 2x2 - 16x - 32]]> 1.0000000 0.3333333 0 true true abc 3, 4, -8 Incorrect -3, -4, 8 Incorrect 2, 4, -4 Incorrect -2, -4, 4 Correct Find the requested function.Find the polynomial function with leading ... Find the requested function.

Find the polynomial function with leading coefficient -7; degree 4; and 3, -4, 4, and 5 as zeros.]]> 1.0000000 0.3333333 0 true true abc  = -7]]> 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Incorrect  = -7]]> 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Correct  = ]]> 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Incorrect  = -7x]]> 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Incorrect Find the requested function.Find the polynomial function with leading ... Find the requested function.

Find the polynomial function with leading coefficient 8; degree 3; and -3, 5, and 2 as zeros.]]> 1.0000000 0.3333333 0 true true abc  =   ]]> 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 Incorrect  = 8  ]]> 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 Correct  = 8  ]]> 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Incorrect  =   ]]> 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MoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD7b+D/AMQtB0r4f+EviF4svJLfXfigLW+GoTWs0sdtHc5m0/THuFQxwxwR3CwIW8pZZTJJtEtxJu9i8L+KdO8ZaPHqulSTzWErMsU01rLB5oViN6CRVLRtjKyAFXUhlLKQT4T8NPhovxG/Z08I/DHW75bfTfC1knhPxbpCwsLi6nsoUhXy5Q6tBDIUiu42ZN8sEtu2IxIQfW/DfgS6Pw9HhXx1qFn8QI2ia1uJ9Q01EW+t+ii5iLOkj7cB2AVXOSEQHaEr63+X9f16d2+lvn/X9fjp2NeL+IY/FusePdO8HeM4fD3iDwf4miu5ktdItrm0v9Ga2MUsFwbn7QxkKuYws8SW7xTGBk5wR3fgf4R+Bfhi92/g3wX4e8JveBVuW0PSoLIzBc7Q/lIu7GTjPTJriNA8HeN/APifW/GHi34g+DrrQ2Elzqd1N4ansp7eyjVmWNbp9SeKCGIZYkxYPzs3zMWqlbm+X9f8Bhpyu/8AX9f5fLZ+BHjXWfE3h7WdD8TxXB8WeDtTbw5q1/MsCLqksdvBNHfxpCxWNbmC4gn8rgxNK8fOzcxVX9nvRNcXR/FHjDxDH9hv/HWtf8JJFpD2T2s+l2ps7W1tLa4R3Y/aVt7SFpgMKszyquVUMxSEHhz/AJOn+If/AGJnhr/0u12vVaKKACvKv2lv+SdaR/2OfhP/ANSHTqKKAPVaKKKAP//Z Incorrect Find the requested function.Find the polynomial function with leading ... Find the requested function.

Find the polynomial function with leading coefficient 7; degree 4; and 0, -2, -3, and  as zeros.]]> 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1.0000000 0.3333333 0 true true abc  = 7x]]> 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Correct  = x]]> 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Incorrect  = 7x]]> 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Incorrect Solve the problem.  Ariel, a marine biologist, models a population P of ... Solve the problem.  

Ariel, a marine biologist, models a population P of crabs, t days after being left to reproduce, with the function

Assuming that this model continues to be accurate, when will this population become extinct? (Round to the nearest day.)]]> 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1.0000000 0.3333333 0 true true abc 547 days Correct 707 days Incorrect 911 days Incorrect 1512 days Incorrect Solve the problem.  Photon Lighting Company determines that the supply and ... Solve the problem.  

Photon Lighting Company determines that the supply and demand functions for its most popular lamp are as follows:
and , where p is the price. Determine the price for which the supply equals the demand.]]> 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 1.0000000 0.3333333 0 true true abc $93.24 Incorrect $99.24 Incorrect $96.24 Correct $100.24 Incorrect Solve the problem.  The Cool Company determines that the supply function ... Solve the problem.  

The Cool Company determines that the supply function for its basic air conditioning unit is  and that its demand function is , where p is the price. Determine the price for which the supply equals the demand.]]> 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1.0000000 0.3333333 0 true true abc $22.86 Incorrect $21.36 Incorrect $21.86 Correct $22.36 Incorrect Use the Factor Theorem to determine whether the first polynomial is a factor ... Use the Factor Theorem to determine whether the first polynomial is a factor of the second polynomial.

x + 2; 9x4 + 19x3 - 2x2 + x + 4]]> 1.0000000 0.3333333 0 true true abc Yes Incorrect No Correct Use the graph to guess possible linear factors of f(x). Then completely ... Use the graph to guess possible linear factors of f(x). Then completely factor f(x) with the aid of synthetic division.

 f(x) = 7x3 - 39x2 - 40x + 132
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1.0000000 0.3333333 0 true true abc   ]]> 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Incorrect   ]]> 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Incorrect   ]]> 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Incorrect   ]]> 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Correct Use the Rational Zeros Theorem to write a list of all potential rational ... Use the Rational Zeros Theorem to write a list of all potential rational zeros

f(x) = 2x3 + 7x2 + 8x - 8]]> 1.0000000 0.3333333 0 true true abc ±1, ±2, ±4, ±8 Incorrect ±1, ±1/2, ±2, ±4, ±8 Correct ±1, ±1/2, ±1/4, ±1/8, ±2 Incorrect ±1, ±2, ±4 Incorrect Use the Rational Zeros Theorem to write a list of all potential rational ... Use the Rational Zeros Theorem to write a list of all potential rational zeros

f(x) = 2x3 - 5x2 + 7x - 13]]> 1.0000000 0.3333333 0 true true abc ±1, ±13, ±1/2, ± 13/2 Correct ±1, ±1/13, ±2, ±2/13 Incorrect ±1, ±2, ±13, ±13/2 Incorrect ±1, ±2, ±13 Incorrect Use the Rational Zeros Theorem to write a list of all potential rational ... Use the Rational Zeros Theorem to write a list of all potential rational zeros

f(x) = 3x3 + 43x2 + 43x + 27]]> 1.0000000 0.3333333 0 true true abc ±1, ±1/3, ±3, ±9, ±27 Correct ±1, ±3, ±6, ±9, ±27 Incorrect ±1, ±3, ±9, ±27 Incorrect ±1, ±1/3, ±1/9, ±1/27, ±3 Incorrect Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.5 Complex Zeros of Polynomials/2.5.1 Fundamental Theorem of Algebra Match the polynomial function graph to the appropriate zeros and multiplicities. Match the polynomial function graph to the appropriate zeros and multiplicities.


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1.0000000 0.3333333 0 true true abc 2 (multiplicity 2), -4 (multiplicity 2) Incorrect 2 (multiplicity 2), -4 (multiplicity 3) Correct 2 (multiplicity 3), -4 (multiplicity 3) Incorrect 2 (multiplicity 3), -4 (multiplicity 2) Incorrect State how many complex and real zeros the function has.f = x4 - 63x2 - 64 State how many complex and real zeros the function has.

f = x4 - 63x2 - 64]]> 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 1.0000000 0.3333333 0 true true abc 4 complex zeros; 1 real Incorrect 4 complex zeros; all 4 real Incorrect 4 complex zeros; none real Incorrect 4 complex zeros; 2 real Correct State how many complex and real zeros the function has.f = x5 - 9x4 + 2x3 - ... State how many complex and real zeros the function has.

f = x5 - 9x4 + 2x3 - 18x2 + x - 9]]> 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 1.0000000 0.3333333 0 true true abc 5 complex zeros; none real Incorrect 5 complex zeros; 1 real Correct 5 complex zeros; all 5 real Incorrect 5 complex zeros; 3 real Incorrect Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.5 Complex Zeros of Polynomials/2.5.2 Finding Complex Zeros Using the given zero, find all other zeros of f(x).-2i is a zero of f(x) = x4... Using the given zero, find all other zeros of f(x).

-2i is a zero of f(x) = x4 - 12x2 - 64]]> 1.0000000 0.3333333 0 true true abc 2i, 8, -8 Incorrect 2i, 4i, -4i Incorrect 2i, 4, -4 Correct 2i, 8i, -8i Incorrect Write a linear factorization of the function.f(x) = 4x3 + 4x Write a linear factorization of the function.

f(x) = 4x3 + 4x]]> 1.0000000 0.3333333 0 true true abc f(x) = 4x(x + i)(x - i) Correct f(x) = x(x + 4i)(x - i) Incorrect 2]]> Incorrect 2]]> Incorrect Write a linear factorization of the function.f(x) = x3 + 8x2 + 16x + 128 Write a linear factorization of the function.

f(x) = x3 + 8x2 + 16x + 128]]> 1.0000000 0.3333333 0 true true abc f(x) = (x + 4)(x + 8i)(x - 8i) Incorrect f(x) = (x + 8)(x + 4i)(x - 4i) Correct f(x) = (x + 4i)(x + 8i)(x - 8i) Incorrect f(x) = (x + 8i)(x + 4i)(x - 4i) Incorrect Write a polynomial function of minimum degree with real coefficients whose ... Write a polynomial function of minimum degree with real coefficients whose zeros include those listed. Write the polynomial in standard form.

3 (multiplicity 1) and -2 (multiplicity 3)]]> 1.0000000 0.3333333 0 true true abc  = x4 + 3x3 - 6x2 + 28x - 24]]> 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 Incorrect  = x4 + 3x3 - 6x2 - 28x + 24]]> 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 Incorrect  = x4 + 3x3 - 6x2 - 28x - 24]]> 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 Correct  = x4 - 3x3 - 6x2 - 28x - 24]]> 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 Incorrect Write the function as a product of linear and irreducible quadratic factors, ... Write the function as a product of linear and irreducible quadratic factors, all with real coefficients.

f = x3 - 2x2 + 2x - 15]]> 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 1.0000000 0.3333333 0 true true abc  ]]> 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Incorrect  ]]> 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Incorrect  ]]> 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Correct  ]]> 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Incorrect Write the polynomial in standard form and identify the zeros of the function.... Write the polynomial in standard form and identify the zeros of the function.

f(x) = (x - 5i)(x +5i)]]> 1.0000000 0.3333333 0 true true abc 2 + 5ix + 25; zeros ± 5]]> Incorrect 2 - 25; zeros ± 5i]]> Incorrect 2 + 25; zeros ± 5]]> Incorrect 2 + 25; zeros ± 5i]]> Correct Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.6 Graphs of Rational Functions/2.6.1 Asymptotes For the given function, find all asymptotes of the type indicated (if there ... For the given function, find all asymptotes of the type indicated (if there are any)

f(x) = , vertical]]> 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 1.0000000 0.3333333 0 true true abc x = -4 Incorrect x = 4 Incorrect x = 7 Incorrect x = 4, x = -4 Correct For the given function, find all asymptotes of the type indicated (if there ... For the given function, find all asymptotes of the type indicated (if there are any)

f(x) = , vertical]]> 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 1.0000000 0.3333333 0 true true abc x = 9 Incorrect x = 3, x = -3 Incorrect x = -9 Incorrect None Correct For the given function, find all asymptotes of the type indicated (if there ... For the given function, find all asymptotes of the type indicated (if there are any)

f(x) = , slant]]> 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 1.0000000 0.3333333 0 true true abc x = y + 6 Incorrect None Incorrect y = x - 15 Correct y = x + 10 Incorrect For the given function, find all asymptotes of the type indicated (if there ... For the given function, find all asymptotes of the type indicated (if there are any)

f(x) = , horizontal]]> 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 1.0000000 0.3333333 0 true true abc y = -2 Incorrect y = 4 Incorrect None Correct y = 2 Incorrect For the given function, find all asymptotes of the type indicated (if there ... For the given function, find all asymptotes of the type indicated (if there are any)

f(x) = , horizontal]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAsAC8DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9G/GHxp8I+AdctdK12+vLOWd4Yjdppd3NZW7yuI4luLuOJoLcszKAJXTO5fUV3FeG/HD4i6Zd60PAWq6H4pm0GVIrjV7/AE7wfq2pw3EW8MLSKS1tpEJfbiR93yKdq/O2Y+c1l9etPi/NqdvD49u/hjf6lBb6jbwyagJ7bVE+aO4gix5405i0aSrCREXRTt8nzy4tUv6/rtvvba9yprlu/Jf1+vpfsehW/iX4g6H8WtE0bWpPD2reHteivZIoNJsp4LzShCEZHlleZ1uYzvEbMIodryR8ENx6nXk3gr4cfEXw/wCO77XdZ8aeFtbtb+Ym5SLwrc296LcbvKt4p21KRI0QnOBCdxLMRuctVX43+Gfi3rninwPP8P8AxJpGk6Ra6ssupQ3elzTssf2a5UvMyX0Anh3tEPIC7t+x92EIq4Lm5Y/0uuv5DaXNKz/ry/T8r6HoHjbx/pHw/sIbvVhqMomk8uK30nSrrUrlzjJIgtY5JCoHVtuBkZIyKu+FPFWk+OPDem6/oN9Fqej6jAtza3cOdsiMMg4PIPYggEEEEAgiuS+LfxOufhj4csGj0rVda1e/cW0cuk+H7/UoLdsfPPNHaRyyLGvUJnLnChgNzre+DcOjWvw40i30GLU49PiDjdrOl3Gm3Uspdmmle3uI43QvIzv9wKd3y/LipWqb7EtNKL7nP/8ACOfG/wD6KH8P/wDwg77/AOXNH/COfG//AKKH8P8A/wAIO+/+XNQfHCPxjo8dtrvhnxtc6fqC3Vra6d4WFlaPZ6rK0q74p2kiafLJ5nzxSRCNVLsCEYnUl+N1pF47v/Bp8M+ID4jt3heGzEVvi8s3Yq19FJ52wQRlWD72SRTtXYWkiV0tbef9en9ag9Nen+f9W9dOpx2ieJ/iB4l8Tan4c0j42/CTVfEOl5+36TZeFLia7tMMFPmxLrZdMEgfMBycV0n/AAjnxv8A+ih/D/8A8IO+/wDlzXGeHPir8KPih8cPD8Gh+MPCP2rwqb6y0yxstYtft19cyoFnWKBH3+QioxPH7x1DABYwz+oeMPjr8Nvh7rI0jxV8QvCvhrVjGsosNY1q2tJyjZ2t5cjhsHBwcc4NNaqPn+PoOUXGTT6fh6mF/wAI58b/APoofw//APCDvv8A5c11XgXTfHGn/bv+Ey8Q+H9e37Psn9haDPpnlY3b/M829ufMzlMY2bdrZ3bhtTx/p13rnh4TWPje68EWMKm7uNX02Kzkk8pVJ+/dRSwrHjLMTGTgDDLzmD4N6l4i1j4X+HbzxYySa9NahridIPI88ZPlzNF/yzaSPY7R/wADMVwMYos9SX08zE8YfBbUPFPjpfFNn8S/Fnhu6jtvskFnplvpMtvboSC/l/arGZ1LkAsd2TtUdFUA1T4C6Zq/iS28Sz+IdeXxVaX4u7XXYpbdbmCDaFaxUCHyzasu7dGyMSzF93mBXX06iptZW/ruNty3/r+v+CFFFFMRw3xU+F8vxRsdNtB4t1zwtDZXS3ZXRo7GRbl1wYxKt3bTqwRgGAwBuAJyVXHQ+FNDvfDuiQ2OoeINS8UXUZYtqerR2yXEmSSAwtoYY+BwMIOBzk81sUULS4227X6H/9k= 1.0000000 0.3333333 0 true true abc y = -2 Incorrect None Incorrect y = 2 Incorrect y = 1 Correct For the given function, find all asymptotes of the type indicated (if there ... For the given function, find all asymptotes of the type indicated (if there are any)

f(x) = , horizontal]]> 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 1.0000000 0.3333333 0 true true abc y = 0 Correct y = x Incorrect None Incorrect y = 9 Incorrect Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.6 Graphs of Rational Functions/2.6.2 Analyze Describe how the graph of the given function can be obtained by transforming ... Describe how the graph of the given function can be obtained by transforming the graph of the reciprocal function f = 1/x.

f = ]]> 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 1.0000000 0.3333333 0 true true abc Shift the graph of the reciprocal function up 7 units. Incorrect Shift the graph of the reciprocal function down 7 units. Incorrect Shift the graph of the reciprocal function left 7 units. Correct Shift the graph of the reciprocal function right 7 units. Incorrect Evaluate the limit based on the graph of f shown.f Evaluate the limit based on the graph of f shown.




f]]> 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 1.0000000 0.3333333 0 true true abc Correct -5 Incorrect 0 Incorrect -∞ Incorrect State the domain of the rational function.f(x) =  State the domain of the rational function.

f(x) = ]]> 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 1.0000000 0.3333333 0 true true abc  (- 1, 1)  (1, ∞)]]> 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 Incorrect (-∞, ∞) Correct  (-9, ∞)]]> 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 Incorrect  (9, ∞)]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAARAAcDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9OLjxno1rpNtqct5tsbmQxRS+U53MN3GMZH3G6jtRXIWXwx13+2haanr+l6h4Htppbmx0iPSJYb+N33YWS8F0UkRfMcACBGwEyxIYuV1UfYcv7+9/K369d/lYwq+2uvZWt1vffyt0tY9KooorlNz/2Q== Incorrect State the domain of the rational function.f(x) =  State the domain of the rational function.

f(x) = ]]> 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 1.0000000 0.3333333 0 true true abc  (-2, 0)  (0, ∞)]]> 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 Correct  (-2, ∞)]]> 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 Incorrect  (2, ∞)]]> 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 Incorrect  (7, ∞)]]> 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 Incorrect State the domain of the rational function.f(x) =  State the domain of the rational function.

f(x) = ]]> 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 1.0000000 0.3333333 0 true true abc  (- 9, 9)  (9, ∞)]]> 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 Incorrect  (- 11, 11)  (11, ∞)]]> 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 Incorrect  (9, ∞)]]> 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 Incorrect  (11, ∞)]]> 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 Correct Use limits to describe the behavior of the rational function near the ... Use limits to describe the behavior of the rational function near the indicated asymptote.

f(x) = 
Describe the behavior of the function near its vertical asymptote.]]> 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 1.0000000 0.3333333 0 true true abc f(x) = -∞,  f(x) = ∞]]> 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Incorrect f(x) = -∞,  f(x) = ∞]]> 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Correct f(x) = ∞,  f(x) = -∞]]> 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Incorrect f(x) = ∞,  f(x) = ∞]]> 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Incorrect Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.7 Solving Equations in One Variable/2.7.1 Basic Solving Solve the equation. -  = 3 Solve the equation.

 -  = 3]]> 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 1.0000000 0.3333333 0 true true abc x = 39 Incorrect x = - 19 Correct x = 101 Incorrect x = 69 Incorrect Solve the equation. +   =    Solve the equation.

 +   =   ]]> 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1.0000000 0.3333333 0 true true abc No solution Incorrect x = 8 Correct ]]> 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Incorrect ]]> 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 Incorrect Solve the polynomial inequality.

(x + 2)(x - 1)(x - 10) < 0]]> 1.0000000 0.3333333 0 true true abc (-∞, 1) Incorrect (10, ∞) Incorrect  (1, 10)]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAARAAcDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9OLjxno1rpNtqct5tsbmQxRS+U53MN3GMZH3G6jtRXIWXwx13+2haanr+l6h4Htppbmx0iPSJYb+N33YWS8F0UkRfMcACBGwEyxIYuV1UfYcv7+9/K369d/lYwq+2uvZWt1vffyt0tY9KooorlNz/2Q== Correct  (10, ∞)]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAARAAcDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9OLjxno1rpNtqct5tsbmQxRS+U53MN3GMZH3G6jtRXIWXwx13+2haanr+l6h4Htppbmx0iPSJYb+N33YWS8F0UkRfMcACBGwEyxIYuV1UfYcv7+9/K369d/lYwq+2uvZWt1vffyt0tY9KooorlNz/2Q== Incorrect Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.7 Solving Equations in One Variable/2.7.2 Applications Solve the problem.A plane suddenly experiences turbulence while in flight. At... Solve the problem.

A plane suddenly experiences turbulence while in flight. At this point the change in its altitude, in feet, is represented by the following function of time:
F(t) = .
 Assuming that the turbulence first hits at time t = 0, what is the maximum relative drop the plane will experience due to turbulence? (Round the result to the nearest hundredth.)]]> 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1.0000000 0.3333333 0 true true abc 2.09 ft. Correct 0.25 ft. Incorrect 4.22 ft. Incorrect 48.78 ft. Incorrect Solve the problem.An open-top rectangular box has a square base and it will ... Solve the problem.

An open-top rectangular box has a square base and it will hold 256 cubic centimeters (cc). Each side has length x cm and height y cm. The box's surface area is given by

S(x) =  + x2.

Estimate the minimum surface area and the value of x that will yield it.]]> 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 1.0000000 0.3333333 0 true true abc 2 when x = 6 cm]]> Incorrect 2 when x = 8 cm]]> Correct 2 when x = 8 cm]]> Incorrect 2 when x = 8 cm]]> Incorrect Solve the problem.An open-top rectangular box has a square base and it will ... Solve the problem.

An open-top rectangular box has a square base and it will hold 108 cubic centimeters (cc). Each side has length x cm, and it has a height of y cm.
Express the surface area as a function of the length x of a side of the base.]]> 1.0000000 0.3333333 0 true true abc  + x2]]> 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 Incorrect 2]]> Incorrect  + x2]]> 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 Incorrect  + x2]]> 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 Correct Solve the problem.In the following formula, y is the minimum number of hours ... Solve the problem.

In the following formula, y is the minimum number of hours of studying required to attain a test score of x:  . How many hours of study are needed to score 88?]]> 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 1.0000000 0.3333333 0 true true abc 36.60 hr Incorrect 100.90 hr Incorrect 6.56 hr Incorrect 3.66 hr Correct Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.8 Solving Inequalities in One Variable/2.8.1 Polynomial Inequalities Solve the polynomial inequality.

(x + 10)(x + 1)(x - 3) < 0]]> 1.0000000 0.3333333 0 true true abc (3, ∞) Incorrect (-∞, -1) Incorrect  (3, ∞)]]> 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 Incorrect  (-1, 3)]]> 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 Correct Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.8 Solving Inequalities in One Variable/2.8.2 Other Inequalities Solve the inequality.

 > 0]]> 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 1.0000000 0.3333333 0 true true abc ]]> 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Incorrect     ]]> 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Incorrect   ]]> 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Incorrect   ]]> 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Correct Pre-Calc/Chapter 2: Polynomial, Power, and Rational Functions/2.8 Solving Inequalities in One Variable/2.8.3 Applications Solve the problem.A flare fired from the bottom of a gorge is visible only ... Solve the problem.

A flare fired from the bottom of a gorge is visible only when the flare is above the rim. If it is fired with an initial velocity of 208 ft/sec, and the gorge is 672 ft deep, during what interval can the flare be seen?  ]]> 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 1.0000000 0.3333333 0 true true abc Correct Incorrect Incorrect Incorrect Solve the problem.A retailer knows that n games can be sold in a month if the... Solve the problem.

A retailer knows that n games can be sold in a month if the price is  dollars per game. If he buys each game for $7, and if he wishes to make a profit of at least $600 per month on sales of this game, how many games must he sell each month?]]> 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 1.0000000 0.3333333 0 true true abc 25 ≤ n ≤ 45 Incorrect 25 ≤ n ≤ 40 Incorrect 40 ≤ n ≤ 50 Correct 40 ≤ n ≤ 90 Incorrect Solve the problem.If a rocket is propelled upward from ground level, its ... Solve the problem.

If a rocket is propelled upward from ground level, its height in meters after t seconds is given by   During what interval of time will the rocket be higher than 137.2 m?]]> 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 1.0000000 0.3333333 0 true true abc Correct Incorrect Incorrect Incorrect Solve the problem.The cost of producing t units is C = 3t2 + 8t, and the ... Solve the problem.

The cost of producing t units is C = 3t2 + 8t, and the revenue generated from sales is R = 4t2 + t. Determine the number of units to be sold in order to generate a profit.]]> 1.0000000 0.3333333 0 true true abc Incorrect Incorrect Correct Incorrect Solve the problem.

The profit made when t units are sold, t > 0, is given by  Determine the number of units to be sold in order for P > 0 (a profit is made).]]> 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 1.0000000 0.3333333 0 true true abc Incorrect Correct t = 33 Incorrect t = 19 or t = 14 Incorrect Solve the problem.

The profit made when t units are sold, t > 0, is given by  Determine the number of units to be sold in order for P = 0 (the break- even point).]]> 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1.0000000 0.3333333 0 true true abc Incorrect t = 31 Incorrect t = 19 or t = 12 Correct t = -19 or t = -12 Incorrect Pre-Calc/Chapter 3: Exponential and Log Functions nr001-1.jpg when nr001-2.jpg]]> nr001-1.jpg when nr001-2.jpg]]> 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1.0000000 1.0000000 0 0 32 State whether the function is an exponential growth function or exponential ... State whether the function is an exponential growth function or exponential decay function, and describe its end behavior using limits.

f(x) = 0.1x]]> 1.0000000 0.3333333 0 true true abc f(x) = ∞; f(x) = 0]]> 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Incorrect f(x) = ∞; f(x) = 0]]> 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Correct f(x) = 0; f(x) = ∞]]> 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Incorrect f(x) = 0; f(x) = ∞]]> 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 Incorrect tf001-1.jpg]]> tf001-1.jpg]]> 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 1.0000000 1.0000000 0 true false mc001-1.jpg
]]> mc001-1.jpg
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]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>98</mn><mo>,</mo><mn>120</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>100</mn><mo>*</mo><msup><exponentiale/><mrow><mo>-</mo><mn>0</mn><mo>.</mo><mn>01123</mn><mo>*</mo><mi>a</mi></mrow></msup></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-2)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Decide whether the function is an exponential growth or exponential decay ... Decide whether the function is an exponential growth or exponential decay function and find the constant percentage rate of growth or decay.

f(x) = 5.8 ∙ 1.02x]]> 1.0000000 0.3333333 0 true true abc Exponential decay function; 0.02% Incorrect Exponential growth function; 102% Incorrect Exponential growth function; 0.02% Incorrect Exponential growth function; 2% Correct Solve the equation.3(10 - 2x) = 81 Solve the equation.

3(10 - 2x) = 81]]> 1.0000000 0.3333333 0 true true abc 27 Incorrect -3 Incorrect 3 Correct 5 Incorrect Pre-Calc/Chapter 3: Exponential and Log Functions/3.2 Exponential and Logistic Modeling Find the exponential function that satisfies the given conditions.Initial ... Find the exponential function that satisfies the given conditions.

Initial population = 1092, doubling every 7 hours]]> 1.0000000 0.3333333 0 true true abc 7t]]> Incorrect t/7]]> Correct t]]> Incorrect t/7]]> 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 Incorrect Solve the problem.The number of students infected with the flu on a college ... Solve the problem.

The number of students infected with the flu on a college campus after t days is modeled by the function   When will the number of infected students be 100?]]> 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 1.0000000 0.3333333 0 true true abc About 12 days Correct About 8 days Incorrect About 14 days Incorrect About 16 days Incorrect Solve the problem.The population of wolves in a state park after t years is ... Solve the problem.

The population of wolves in a state park after t years is modeled by the function   What was the initial population of wolves?]]> 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 1.0000000 0.3333333 0 true true abc 16 Incorrect 99 Incorrect 8 Correct 800 Incorrect Solve the problem.There are currently 73 million cars in a certain country, ... Solve the problem.

There are currently 73 million cars in a certain country, increasing by 1.7% annually. How many years will it take for this country to have 91 million cars? Round to the nearest year.]]> 1.0000000 0.3333333 0 true true abc 4 yr Incorrect 11 yr Incorrect 13 yr Correct 170 yr Incorrect Pre-Calc/Chapter 3: Exponential and Log Functions/3.4 Properties of Log Functions Rewrite the expression as a sum or difference or multiple of logarithms.log19  Rewrite the expression as a sum or difference or multiple of logarithms.

log19 ]]> 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 1.0000000 0.3333333 0 true true abc 19 y - log19 5 -  log19 x]]> 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 Incorrect 19 5 ∙  log19 x ÷ log19 y]]> 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 Incorrect 19 (5) - log19 y]]> 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 Incorrect 19 5 +  log19 x - log19 y]]> 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 Correct Use the product, quotient, and power rules of logarithms to rewrite the ... Use the product, quotient, and power rules of logarithms to rewrite the expression as a single logarithm. Assume that all variables represent positive real numbers.

4log x + 2log y]]> 1.0000000 0.3333333 0 true true abc 4 + y2)]]> Incorrect 4y2)]]> Correct log(8xy) Incorrect log(4x + 2y) Incorrect Pre-Calc/Chapter 3: Exponential and Log Functions/3.5 Equations Solving and Modeling Find the exact solution to the equation.log4(x - 2) = - 1 Find the exact solution to the equation.

log4(x - 2) = - 1]]> 1.0000000 0.3333333 0 true true abc x = 2.25 Correct x =6 Incorrect x = -1.75 Incorrect x = 2 Incorrect Solve the problem.If an earthquake has an intensity of x, then its ... Solve the problem.

If an earthquake has an intensity of x, then its magnitude, as computed by the Richter Scale, is given by   is the intensity of a small, measurable earthquake. (Consider  for this problem.) If one earthquake has a magnitude  on the Richter scale and a second earthquake has a magnitude  on the Richter scale, how many times more intense (to the nearest whole number) is the second earthquake than the first?]]> 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1.0000000 0.3333333 0 true true abc 15,848,931,925 Incorrect 21 Incorrect 25 Correct 6 Incorrect Solve the problem.If x is the hydrogen ion concentration of a sample of ... Solve the problem.

If x is the hydrogen ion concentration of a sample of water, then the pH of that water sample is  If the pH of the water from one lake is 7.1 and the pH of the water from a second lake is 8.0, how many times greater is the hydrogen ion concentration of the second lake than the hydrogen ion concentration of the first lake? Round your answer to the nearest hundredth.]]> 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 1.0000000 0.3333333 0 true true abc 13.39 Incorrect 7.94 Incorrect 7.72 Incorrect 0.13 Correct Use a calculator to find an approximate solution to the equation.e-t = 0.03 Use a calculator to find an approximate solution to the equation.

e-t = 0.03]]> 1.0000000 0.3333333 0 true true abc 3.6066 Incorrect -3.5066 Incorrect 3.3066 Incorrect 3.5066 Correct Pre-Calc/Chapter 3: Exponential and Log Functions/3.6 Mathematics of Finance Determine the doubling time of the investment.$14,500 at 7% compounded monthly Determine the doubling time of the investment.

$14,500 at 7% compounded monthly]]> 1.0000000 0.3333333 0 true true abc 7.94 years Incorrect 14.9 years Incorrect 9.93 years Correct 19.86 years Incorrect Find the amount accumulated after investing a principal P for t years at an ... Find the amount accumulated after investing a principal P for t years at an interest rate r.

P = $14,000, t = 9, r = 12%, compounded semiannually (k = 2)]]> 1.0000000 0.3333333 0 true true abc $37,698.82 Incorrect $38,823.10 Incorrect $25,960.75 Incorrect $39,960.75 Correct Solve the problem.Find the annual percentage yield if the interest rate is 6.... Solve the problem.

Find the annual percentage yield if the interest rate is 6.0% and interest is compounded daily (n = 365).]]> 1.0000000 0.3333333 0 true true abc 5.93% Incorrect 6.68% Incorrect 6.18% Correct 6.43% Incorrect Solve the problem.Find the interest rate necessary for a present value of ... Solve the problem.

Find the interest rate necessary for a present value of $15,458 to grow to a future value of $18,111.51 if interest is compounded quarterly for two years.]]> 1.0000000 0.3333333 0 true true abc 8% Correct 12% Incorrect 10% Incorrect 6% Incorrect Solve the problem.How long must $6000 be in a bank at 7% compounded annually ... Solve the problem.

How long must $6000 be in a bank at 7% compounded annually to become $11,802.91? (Round to the nearest year.)]]> 1.0000000 0.3333333 0 true true abc 9 yr Incorrect 12 yr Incorrect 11 yr Incorrect 10 yr Correct Pre-Calc/Chapter 7: Systems and Matrices/7.1 Solving Systems of Two Equations/Solve Applications: Linear Systems Solve the problem.A theatre sells two types of tickets to their plays; ... Solve the problem.

A theatre sells two types of tickets to their plays; children's tickets and adult tickets. For today's performance they have sold a total of 1180 tickets. Also, they have sold 80 more adult tickets than children's tickets. How many adult tickets have they sold?]]> 1.0000000 0.3333333 0 true true abc 628 Incorrect 615 Incorrect 630 Correct 635 Incorrect Solve the problem.A theatre sells two types of tickets to their plays; ... Solve the problem.

A theatre sells two types of tickets to their plays; children's tickets and adult tickets. For today's performance they have sold a total of 1265 tickets. Also, they have sold 4 times as many adult tickets as children's tickets. How many adult tickets have they sold?]]> 1.0000000 0.3333333 0 true true abc 1005 Incorrect 1012 Correct 1018 Incorrect 1009 Incorrect Solve the problem.Find the market equilibrium for the given supply and ... Solve the problem.

Find the market equilibrium for the given supply and demand functions. Here y represents price and x represents quantity.
y = 918 - 5x (demand)
y = 2x - 202 (supply)]]> 1.0000000 0.3333333 0 true true abc 160, $118 Correct 913, $204 Incorrect -202, $918 Incorrect 118, $160 Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.1 Solving Systems of Two Equations/Solve Applications: Nonlinear Systems Solve.A rectangular plot has area 126 yd2 with a perimeter of   What is the ... Solve.

A rectangular plot has area 126 yd2 with a perimeter of   What is the length of the longest side?]]> 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 1.0000000 0.3333333 0 true true abc 16 yd Incorrect 13 yd Incorrect 12 yd Incorrect 14 yd Correct Solve.Find the dimensions of a rectangular garden with perimeter  and area  Solve.

Find the dimensions of a rectangular garden with perimeter  and area ]]> 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 1.0000000 0.3333333 0 true true abc 10 yd by 22 yd Incorrect 10 yd by 11 yd Incorrect 20 yd by 22 yd Incorrect 20 yd by 11 yd Correct Pre-Calc/Chapter 7: Systems and Matrices/7.1 Solving Systems of Two Equations/Solve Linear System by Elimination Solve the system by elimination. 3x + 4y = 31 6x = 29 - 8y Solve the system by elimination.

 3x + 4y = 31
 6x = 29 - 8y]]> 1.0000000 0.3333333 0 true true abc (3, 5) Incorrect No solution Correct (9, 1) Incorrect (9, 5) Incorrect Solve the system by elimination. 9x - 7y = 72-6x + 4y = -48 Solve the system by elimination.

 9x - 7y = 72
-6x + 4y = -48]]> 1.0000000 0.3333333 0 true true abc (8, 0) Correct (8, 1) Incorrect No solution Incorrect (7, 1) Incorrect Solve the system by elimination. x - 3y = -10 6x - 4y = -18 Solve the system by elimination.

 x - 3y = -10
 6x - 4y = -18]]> 1.0000000 0.3333333 0 true true abc (-2, 4) Incorrect No solution Incorrect (1, 4) Incorrect (-1, 3) Correct Solve the system by elimination.-4x - 7y = -17 2x - 3y = -11 Solve the system by elimination.

-4x - 7y = -17
 2x - 3y = -11]]> 1.0000000 0.3333333 0 true true abc (-2, 4) Incorrect (-1, 4) Incorrect No solution Incorrect (-1, 3) Correct Pre-Calc/Chapter 7: Systems and Matrices/7.1 Solving Systems of Two Equations/Solve Nonlinear System Algebraically Solve the system algebraically.y = 15x23x + y = 12 Solve the system algebraically.

y = 15x2
3x + y = 12]]> 1.0000000 0.3333333 0 true true abc  and ]]> 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Correct  and ]]> 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Incorrect  and ]]> 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Incorrect  and ]]> 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Incorrect Solve the system algebraically.y = x3 - x2y = 5x2 Solve the system algebraically.

y = x3 - x2
y = 5x2]]> 1.0000000 0.3333333 0 true true abc (0, 0) and (6, 180) Correct (0, 0) and (6, 216) Incorrect (0, 0) and (4, 80) Incorrect (6, 180) Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.1 Solving Systems of Two Equations/Solve System by Substitution Solve the system by substitution.  x - 5y = 2-7x - 6y = 27 Solve the system by substitution.

  x - 5y = 2
-7x - 6y = 27]]> 1.0000000 0.3333333 0 true true abc (-3, -1) Correct No solution Incorrect (-4, 0) Incorrect (3, 0) Incorrect Solve the system by substitution. x - 4y = -312x - 4y = -34 Solve the system by substitution.

 x - 4y = -31
2x - 4y = -34]]> 1.0000000 0.3333333 0 true true abc (-3, 7) Correct No solution Incorrect (-2, -3) Incorrect (-2, 6) Incorrect Solve the system by substitution.x - y2 = 0x - 25 = 0 Solve the system by substitution.

x - y2 = 0
x - 25 = 0]]> 1.0000000 0.3333333 0 true true abc (25, ±25) Incorrect (25, ±5) Correct (25, 5) Incorrect (±5, 25) Incorrect Solve the system by substitution.x + y = 17x - y = 1 Solve the system by substitution.

x + y = 17
x - y = 1]]> 1.0000000 0.3333333 0 true true abc (8, 9) Incorrect (-9, 9) Incorrect No solution Incorrect (9, 8) Correct Solve the system by substitution.y - x2 = -3xy = x + 5 Solve the system by substitution.

y - x2 = -3x
y = x + 5]]> 1.0000000 0.3333333 0 true true abc (-1, 4) and (5, 9) Incorrect (-1, 2) and (5, 10) Incorrect (-1, 4) Incorrect (-1, 4) and (5, 10) Correct Pre-Calc/Chapter 7: Systems and Matrices/7.1 Solving Systems of Two Equations/Use Graph to Estimate Solutions of System Use the graph to estimate any solutions of the system.2x - 2y = 6-3x + y = ... Use the graph to estimate any solutions of the system.

2x - 2y = 6
-3x + y = -7


 [-5, 5] by [-5, 5]]]> 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 1.0000000 0.3333333 0 true true abc (2.5, -1) Incorrect (2, 1) Incorrect (2.5, -0.5) Incorrect (2, -1) Correct Use the graph to estimate any solutions of the system.x - 4y = 42x - 8y = 16 Use the graph to estimate any solutions of the system.

x - 4y = 4
2x - 8y = 16

 [-5, 5] by [-5, 5]]]> 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 1.0000000 0.3333333 0 true true abc No solution Correct (0, -1) Incorrect (8, -8) Incorrect (4, 0) Incorrect Use the graph to estimate any solutions of the system.y = 5 + x - x2y = 1 + ... Use the graph to estimate any solutions of the system.

y = 5 + x - x2
y = 1 + x

 [-5, 5] by [-5, 5]]]> 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1.0000000 0.3333333 0 true true abc (1.5, 3) and (-2, -1) Incorrect (2, 3) and (-2, -1) Correct (2, 3) Incorrect (2, 3) and (-1, -1) Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.2 Matrix Algebra/Add//Subtract Matrices Perform the indicated operation, if possible. -  Perform the indicated operation, if possible.

 - ]]> 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1.0000000 0.3333333 0 true true abc ]]> 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Incorrect ]]> 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Correct ]]> 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Incorrect ]]> 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Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.2 Matrix Algebra/Add//Subtract//Scalar Multiply Matrices Find the indicated matrix.Let A =  and B = . Find 2A + B. Find the indicated matrix.

Let A =  and B = . Find 2A + B.]]> 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 1.0000000 0.3333333 0 true true abc ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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Correct Pre-Calc/Chapter 7: Systems and Matrices/7.2 Matrix Algebra/Determining Order of a Matrix Determine the order of the matrix. Determine the order of the matrix.

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A = 
]]> 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1.0000000 0.3333333 0 true true abc ]]> 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Correct Inverse does not exist Incorrect ]]> 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Incorrect ]]> 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Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.2 Matrix Algebra/Find Unknowns in Matrix Equation Determine the value of each variable. =  Determine the value of each variable.


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n = -2; x = 8 Incorrect m = 12; n = -6; x = 8 Correct m = -6; n = 12; x = 0 Incorrect m = -12; n = +6; x = -8 Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.2 Matrix Algebra/Identify Specified Element of Matrix Identify the element specified for the matrix.a12 Identify the element specified for the matrix.




a12]]> 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 1.0000000 0.3333333 0 true true abc 5 Incorrect 7 Correct 6 Incorrect 3 Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.2 Matrix Algebra/Multiply Matrices I Find the indicated matrix product or state that the product is undefined.A ... Find the indicated matrix product or state that the product is undefined.

A = , B = 

AB]]> 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1.0000000 0.3333333 0 true true abc ]]> 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 Incorrect ]]> 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 Incorrect Undefined Correct ]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAATAD8DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD7v+GnxA8aa3pPi/xj4gvdFufC2m6jr9jZ6HpGjSw6gBYalcWsbPdS3jRyF47ViV8qMbpB8yhTu07r45TaB4Y1PXPFPw/8UeEbe0kt7e3h1KbTJpdQnnlWGKGEW17MAxkdFzKY1G4EsAGI534SW0l78CPGNtHox8Q+f4p8YRPpK3It2u428QaiHiWQkBXZSwXJUZwCyDLDz/UPgE2r+HvGU2ifCZfB3hXXY9PtdT+Hivp8EurRxXDvdyqlvM9pFNJEyRpIJUdinzPEVjcS21eyv/w/9dJW35WXokm+/wDX9Oy876H0F8OPiVF8Q4tYjk0LV/DGraRdizvtJ1pIPPhcxpKh3wSyxOrJIrApI3XBwQRXY15B+zl4F1DwLpGvwHSNX8MeHLq9WfSfD+v6oupX9mPLUTtLOss+RJKGdVM8uAc7l3eWnr9aSVnb0++2v4maCuDtfi1b6tdamdF8O65r2k2CSqda0+KA2txcxsFa2h3yrJK+47fMVDCCrhpQUYLVHww8TRapd3v/AAtfxbeQSiby9JurbSEtE3qwRd8Vgk+1CQQfN3fKMluc+H/Bf4f/ABB+EGlaK1h4O8Zyz+G9Ak07UtL1DxZa3Vj4huVWJIDp8D3RitkDRu5kZLUhHwY5WYhJWqbfRf5/lbp3W+qdpapLv6L+n/VtD6A+HPxSg+IF3rmnT6BrHhXXtFliS+0fXFg8+NZU3xSq9vLNE6ONwBSQ4KOCAQRWB8NPFHjj/hafi/wb4y1Tw/rf9l6LpOr2l7oWjT6b/wAfc+oxPHIkt3c7tv2FCGDL99gQcA0/4I3Gu3Q1m68S+C9f8Oa9fSR3N7qGsvppjun27Fit1tLy4KRRKoCq+PvFss7OSzw5/wAnT/EP/sTPDX/pdrtVJWZJ1Xgn4Y6B8O7zXbjQo9Qt/wC2r2XULu3uNWu7q3WeWaWeV4YZpXjt98s8rsIVQMW5BwMdXRRUgFFFFABRRRQAVynhf4Y6B4P8VeIvEmnR6g+teIPKF/c6hq13e5SJ5pIoolnldYIka5nKxxBEHmHC4AwUUAf/2Q== Incorrect Find the matrix product, if possible.  Find the matrix product, if possible.

 ]]> 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1.0000000 0.3333333 0 true true abc [1 18]]]> Incorrect ]]> 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Incorrect ]]> 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 Correct ]]> 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 Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.3 Solving Linear Systems with Matrices/Solve Applications: Linear Systems in 3-Variables Solve the problem.A company makes 3 types of cable. Cable A requires 3 ... Solve the problem.

A company makes 3 types of cable. Cable A requires 3 black, 3 white, and 2 red wires. B requires  2 white, and 1 red. C requires 2 black, 1 white, and 2 red. If 100 black, 110 white and 90 red wires were used, how many of each type cable were made?]]> 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 1.0000000 0.3333333 0 true true abc 30 cable B
93 cable C]]> Incorrect 30 cable B
20 cable C]]> Correct 30 cable B
10 cable C]]> Incorrect 103 cable B
20 cable C]]> Incorrect Solve the problem.A grain dealer sold to one customer 6 bushels of wheat, 2 ... Solve the problem.

A grain dealer sold to one customer 6 bushels of wheat, 2 of corn, and 2 of rye, for $25.00; to another, 2 of wheat, 2 of corn, and 6 of rye, for $35.00; and to a third, 2 of wheat, 6 of corn, and 2 of rye, for $33.00. What was the price per bushel for corn?]]> 1.0000000 0.3333333 0 true true abc $2.10 Incorrect $3.60 Correct $1.60 Incorrect $4.10 Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.3 Solving Linear Systems with Matrices/Solve Linear System in 3 or 4-Variables Solve the system of equations.  x + y + z - w = 6 2x - y + 3z + 4w = ... Solve the system of equations.

  x + y + z - w = 6
 2x - y + 3z + 4w = -4
 4x + 2y - z - w = -13
 -x - 2y + 4z + 3w = 12]]> 1.0000000 0.3333333 0 true true abc No solution Incorrect (4, -3, -5, 2) Incorrect (-4, 3, 5, -2) Correct ]]> 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 Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.3 Solving Linear Systems with Matrices/Solve System using RREF Solve the system of equations by finding the reduced row echelon form for ... Solve the system of equations by finding the reduced row echelon form for the augmented matrix.

2x + 4y + 10z = 42
 x + 2y + 5z = -18
 x + y + z = -2]]> 1.0000000 0.3333333 0 true true abc No solution Correct (-2, -4, 2) Incorrect (2, -4, -2) Incorrect (-2, 2, -4) Incorrect Solve the system of equations by finding the reduced row echelon form for ... Solve the system of equations by finding the reduced row echelon form for the augmented matrix.

 x + y + z = -6
 x - y + 2z = -16
3x + y + z = -16]]> 1.0000000 0.3333333 0 true true abc No solution Incorrect (-4, -5, 3) Incorrect (-4, 3, -5) Incorrect (-5, 3, -4) Correct Solve the system of equations by finding the reduced row echelon form for ... Solve the system of equations by finding the reduced row echelon form for the augmented matrix.

x + 2y + 3z = -21
 5y + 4z = -32
 z = -3]]> 1.0000000 0.3333333 0 true true abc (-3, -4, -4) Incorrect No solution Incorrect (-4, -4, -3) Correct (-4, -3, -4) Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.4 Partial Fractions/Divide and Find Partial Fraction Decomposition Use division to write the rational function in the form  where the degree of ... Use division to write the rational function in the form  where the degree of r is less than the degree of . Then find the partial fraction decomposition of 

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1.0000000 0.3333333 0 true true abc  + ]]> 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Incorrect  + ]]> 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Incorrect  + ]]> 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Correct  + ]]> 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Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.4 Partial Fractions/Find Partial Fraction Decomposition (Linear) Find the partial fraction decomposition. Find the partial fraction decomposition.

]]> 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1.0000000 0.3333333 0 true true abc  + ]]> 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Incorrect  + ]]> 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Incorrect  + ]]> 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Correct  + ]]> 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Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.4 Partial Fractions/Find Partial Fraction Decomposition (Nonlinear) Decompose into partial fractions. Decompose into partial fractions.

]]> 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1.0000000 0.3333333 0 true true abc  + ]]> 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Incorrect  - ]]> 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Incorrect  - ]]> 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Correct  - ]]> 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Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.4 Partial Fractions/Find Partial Fraction Decomposition Given Linear Terms Find the partial fraction decomposition. =  +  Find the partial fraction decomposition.

 =  + ]]> 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1.0000000 0.3333333 0 true true abc , B = - ]]> 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Incorrect , B = ]]> 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 Correct , B = ]]> 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 Incorrect , B = - ]]> 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 Incorrect Find the partial fraction decomposition. =  +  Find the partial fraction decomposition.

 =  + ]]> 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 1.0000000 0.3333333 0 true true abc , B = ]]> 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Correct , B = - ]]> 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 Incorrect , B = ]]> 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 Incorrect , B = - ]]> 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 Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.4 Partial Fractions/Find Partial Fraction Decomposition Given Nonlinear Terms Find the partial fraction decomposition. =  +  Find the partial fraction decomposition.

 =  + ]]> 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 1.0000000 0.3333333 0 true true abc , B = , C = 0]]> 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Incorrect , B = - , C = 0]]> 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Correct , B = - , C = 0]]> 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Incorrect , B = , C = 0]]> 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Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.4 Partial Fractions/Write Terms of Partial Fraction Decomposition Write the terms for the partial fraction decomposition of the rational ... Write the terms for the partial fraction decomposition of the rational function. Do not solve for the constants.

]]> 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1.0000000 0.3333333 0 true true abc   + ]]> 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Incorrect  +  + ]]> 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Correct  +  ]]> 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Incorrect  +  + ]]> 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Incorrect Write the terms for the partial fraction decomposition of the rational ... Write the terms for the partial fraction decomposition of the rational function. Do not solve for the constants.

(A1 is the same as B, A2 is the same as C, etc.)

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]]>  +  + 

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UVe7/r0f4+jVuuhOLjb1/S9/y9b+WtzxL8O9RvPH2qahp2o6lpdl4l0iLS9QvdKlgS4sZLd5JIZkMqN99J5omKgsp8oqo+Z01PAHwj0b4Y6trM/h24vbDSNTZZm8Pq6GwtpwMPNCuzfG0gCl1D7CwLbQzOzdvRS8yXrp/X9fnr3YV558UPg+3xO1nwtqJ8Y+IPDTeHb3+0bWDRksTHJceW8QeT7RazMcRyyrhSow5OMhSPQ6KabTUl0Do13OH8P+F7+X4n+IvFuoRNZpJZwaNYWxkRy0EUksjTttztMjy8Lu+7GhIViQO4oopeX9f09xt3bf9dvyP//Z Incorrect

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]]>  +  + 

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]]> Pre-Calc/Chapter 7: Systems and Matrices/7.5 Systems of Inequalities in Two Variables/Graph Linear Inequality Graph the linear inequality.2x + 4y ≤ 8 Graph the linear inequality.

2x + 4y ≤ 8
]]> 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V9Fh8631CVblkvLC9TyiLSa1Me6KULI5kjlMckTKimMlzsAOgkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQA+dfGutfFOL9qfwj9g8G+D7ny/DPiSPT/tPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kp86+Nda+KcX7U/hH7B4N8H3Pl+GfEken/AGnxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAt0UUUAFfP/irw59o+Kd9df2J527WreX7T/Y/mZxP4bO/zf7GkzjyM7/tDY+z581Ps+/TPoCvn/wAVeHPtHxTvrr+xPO3a1by/af7H8zOJ/DZ3+b/Y0mceRnf9obH2fPmp9n36YAcr4R8I/Z/+Eb/4pvyPK/sv/mX/AC/L2/8ACMf9S9Fs2/Z/+mW37P8A8sPs/wDxKuf0/wCD8N9c6DqGnafrHgzxCIdKtx4g8M6dJpd8kaR6BGsUjx+H4hNAivcZtrhfs/yOHijELDS+g8I+Efs//CN/8U35Hlf2X/zL/l+Xt/4Rj/qXotm37P8A9Mtv2f8A5YfZ/wDiVHhHwj9n/wCEb/4pvyPK/sv/AJl/y/L2/wDCMf8AUvRbNv2f/plt+z/8sPs//EqANXwj8c/iR4Js4P8AhOvCOoeMtFf7MItX8KaJqZ1S2jkhsizXtlLZQLN5bXbeZLa7ZH2vtsYjDcpb+1eDviHpfxE2Xvhi+0/V9Fh8631CVblkvLC9TyiLSa1Me6KULI5kjlMckTKimMlzs8A8I+Efs/8Awjf/ABTfkeV/Zf8AzL/l+Xt/4Rj/AKl6LZt+z/8ATLb9n/5YfZ/+JVz+n/B+G+udB1DTtP1jwZ4hEOlW48QeGdOk0u+SNI9AjWKR4/D8QmgRXuM21wv2f5HDxRiFhpYB9fySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kp86+Efjn8SPBNnB/wAJ14R1Dxlor/ZhFq/hTRNTOqW0ckNkWa9spbKBZvLa7bzJbXbI+19tjEYblLf2rwd8Q9L+Imy98MX2n6vosPnW+oSrcsl5YXqeURaTWpj3RShZHMkcpjkiZUUxkudgB0Ekl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnz98RfE13b/ALWfgGxtvFul6vZvC9pceC7HXLuz1TT5CjyrqElrBMY7uBlUowuY1WPEZRizkUK7korr/k3/AF/kD0i32K3jXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU+dfGutfFOL9qfwj9g8G+D7ny/DPiSPT/tPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgBbooooAK+f/FXhz7R8U766/sTzt2tW8v2n+x/Mzifw2d/m/2NJnHkZ3/aGx9nz5qfZ9+mfQFfP/irw59o+Kd9df2J527WreX7T/Y/mZxP4bO/zf7GkzjyM7/tDY+z581Ps+/TADlfCPhH7P8A8I3/AMU35Hlf2X/zL/l+Xt/4Rj/qXotm37P/ANMtv2f/AJYfZ/8AiVHhHwj9n/4Rv/im/I8r+y/+Zf8AL8vb/wAIx/1L0Wzb9n/6Zbfs/wDyw+z/APEqPCPhH7P/AMI3/wAU35Hlf2X/AMy/5fl7f+EY/wCpei2bfs//AEy2/Z/+WH2f/iVHhHwj9n/4Rv8A4pvyPK/sv/mX/L8vb/wjH/UvRbNv2f8A6Zbfs/8Ayw+z/wDEqADwj4R+z/8ACN/8U35Hlf2X/wAy/wCX5e3/AIRj/qXotm37P/0y2/Z/+WH2f/iVHhHwj9n/AOEb/wCKb8jyv7L/AOZf8vy9v/CMf9S9Fs2/Z/8Aplt+z/8ALD7P/wASo8I+Efs//CN/8U35Hlf2X/zL/l+Xt/4Rj/qXotm37P8A9Mtv2f8A5YfZ/wDiVHhHwj9n/wCEb/4pvyPK/sv/AJl/y/L2/wDCMf8AUvRbNv2f/plt+z/8sPs//EqADwj4R+z/APCN/wDFN+R5X9l/8y/5fl7f+EY/6l6LZt+z/wDTLb9n/wCWH2f/AIlXP6f8H4b650HUNO0/WPBniEQ6VbjxB4Z06TS75I0j0CNYpHj8PxCaBFe4zbXC/Z/kcPFGIWGl9B4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEqPCPhH7P/wjf/FN+R5X9l/8y/5fl7f+EY/6l6LZt+z/APTLb9n/AOWH2f8A4lQBq+Efjn8SPBNnB/wnXhHUPGWiv9mEWr+FNE1M6pbRyQ2RZr2ylsoFm8trtvMltdsj7X22MRhuUt/avB3xD0v4ibL3wxfafq+iw+db6hKtyyXlhep5RFpNamPdFKFkcyRymOSJlRTGS52eAeEfCP2f/hG/+Kb8jyv7L/5l/wAvy9v/AAjH/UvRbNv2f/plt+z/APLD7P8A8Srn9P8Ag/DfXOg6hp2n6x4M8QiHSrceIPDOnSaXfJGkegRrFI8fh+ITQIr3Gba4X7P8jh4oxCw0sA+v5JL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU+dfCPxz+JHgmzg/4TrwjqHjLRX+zCLV/CmiamdUto5IbIs17ZS2UCzeW123mS2u2R9r7bGIw3KW/tXg74h6X8RNl74YvtP1fRYfOt9QlW5ZLywvU8oi0mtTHuilCyOZI5THJEyopjJc7ADxXxrrXxTi/an8I/YPBvg+58vwz4kj0/wC0+LbqH7Ra/btGzLNjTH8mUYhxEvmKd8n7wbB5n0VJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnzr411r4pxftT+EfsHg3wfc+X4Z8SR6f9p8W3UP2i1+3aNmWbGmP5MoxDiJfMU75P3g2DzPoqSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUALdFFFABXz/AOKvDn2j4p311/Ynnbtat5ftP9j+ZnE/hs7/ADf7GkzjyM7/ALQ2Ps+fNT7Pv0z6Ar5/8VeHPtHxTvrr+xPO3a1by/af7H8zOJ/DZ3+b/Y0mceRnf9obH2fPmp9n36YAcr4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEqPCPhH7P/wjf/FN+R5X9l/8y/5fl7f+EY/6l6LZt+z/APTLb9n/AOWH2f8A4lR4R8I/Z/8AhG/+Kb8jyv7L/wCZf8vy9v8AwjH/AFL0Wzb9n/6Zbfs//LD7P/xKjwj4R+z/APCN/wDFN+R5X9l/8y/5fl7f+EY/6l6LZt+z/wDTLb9n/wCWH2f/AIlQAeEfCP2f/hG/+Kb8jyv7L/5l/wAvy9v/AAjH/UvRbNv2f/plt+z/APLD7P8A8So8I+Efs/8Awjf/ABTfkeV/Zf8AzL/l+Xt/4Rj/AKl6LZt+z/8ATLb9n/5YfZ/+JUeEfCP2f/hG/wDim/I8r+y/+Zf8vy9v/CMf9S9Fs2/Z/wDplt+z/wDLD7P/AMSo8I+Efs//AAjf/FN+R5X9l/8AMv8Al+Xt/wCEY/6l6LZt+z/9Mtv2f/lh9n/4lQAeEfCP2f8A4Rv/AIpvyPK/sv8A5l/y/L2/8Ix/1L0Wzb9n/wCmW37P/wAsPs//ABKjwj4R+z/8I3/xTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/wD0y2/Z/wDlh9n/AOJUeEfCP2f/AIRv/im/I8r+y/8AmX/L8vb/AMIx/wBS9Fs2/Z/+mW37P/yw+z/8So8I+Efs/wDwjf8AxTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/8A0y2/Z/8Alh9n/wCJUAHhHwj9n/4Rv/im/I8r+y/+Zf8AL8vb/wAIx/1L0Wzb9n/6Zbfs/wDyw+z/APEqPCPhH7P/AMI3/wAU35Hlf2X/AMy/5fl7f+EY/wCpei2bfs//AEy2/Z/+WH2f/iVHhHwj9n/4Rv8A4pvyPK/sv/mX/L8vb/wjH/UvRbNv2f8A6Zbfs/8Ayw+z/wDEqPCPhH7P/wAI3/xTfkeV/Zf/ADL/AJfl7f8AhGP+pei2bfs//TLb9n/5YfZ/+JUAHhHwj9n/AOEb/wCKb8jyv7L/AOZf8vy9v/CMf9S9Fs2/Z/8Aplt+z/8ALD7P/wASrn9P+D8N9c6DqGnafrHgzxCIdKtx4g8M6dJpd8kaR6BGsUjx+H4hNAivcZtrhfs/yOHijELDS+g8I+Efs/8Awjf/ABTfkeV/Zf8AzL/l+Xt/4Rj/AKl6LZt+z/8ATLb9n/5YfZ/+JUeEfCP2f/hG/wDim/I8r+y/+Zf8vy9v/CMf9S9Fs2/Z/wDplt+z/wDLD7P/AMSoA8qv/jd8d/A3xT8Ca1r3w70/4g3cWi6vZQHRZNUtLyHTbifw+5u7yCTS1lnliMkHmmztuWlmHkQG2dK+1PB3xD0v4ibL3wxfafq+iw+db6hKtyyXlhep5RFpNamPdFKFkcyRymOSJlRTGS52fFenad44sPin4DtbXwF4fTbosksFtNNPa7/Jn8JiJ2iHhqLZt+z2IZxbt5G+4AltPsSJF2un/B+G+udB1DTtP1jwZ4hEOlW48QeGdOk0u+SNI9AjWKR4/D8QmgRXuM21wv2f5HDxRiFhpYB9fySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kp86+Efjn8SPBNnB/wnXhHUPGWiv9mEWr+FNE1M6pbRyQ2RZr2ylsoFm8trtvMltdsj7X22MRhuUt/avB3xD0v4ibL3wxfafq+iw+db6hKtyyXlhep5RFpNamPdFKFkcyRymOSJlRTGS52AHQSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAW6KKKAPmr4ceNfjff8AirxoupeEfB83iSC9Ec2kXvjm+t4rKwDyixe3gXSnRopUDubkMzSyCVHMRtxa23mvjEfEWf8AaS0iS58B+F11KeG9u3t4tVuZoZJY7zwttcSHw+TIqtBZAz7JjGHnP2i2+yII/t+vm34mvpHhbxzrHiLXobLStIttXt57jWNR09I7eJftHhvEj3L6O6gZhHzm5OPIz5qeRv0xN21Y0r6I8S07TvHFh8U/Adra+AvD6bdFklgtppp7Xf5M/hMRO0Q8NRbNv2exDOLdvI33AEtp9iRIjTtO8cWHxT8B2tr4C8Ppt0WSWC2mmntd/kz+ExE7RDw1Fs2/Z7EM4t28jfcAS2n2JEig0vxPq2lapfS6bpGh6ho9n4a8P61oLxeHPJBeVtARTLP/AGLGHiDWUbAxpAVWIgeU1uv9mdr8D9K1W+0TQYtd0CxbWtKu7Cyu7jTfDX2W3Z4m8MYdIjoe+3AWFTsdo2jNucGFbdW0ymuWXK97X/r+v1FL3XZ+X4q6/D8vS/I6dp3jiw+KfgO1tfAXh9NuiySwW0009rv8mfwmInaIeGotm37PYhnFu3kb7gCW0+xIkRp2neOLD4p+A7W18BeH026LJLBbTTT2u/yZ/CYidoh4ai2bfs9iGcW7eRvuAJbT7EiReq+EfCP2f/hG/wDim/I8r+y/+Zf8vy9v/CMf9S9Fs2/Z/wDplt+z/wDLD7P/AMSo8I+Efs//AAjf/FN+R5X9l/8AMv8Al+Xt/wCEY/6l6LZt+z/9Mtv2f/lh9n/4lSA8q07TvHFh8U/Adra+AvD6bdFklgtppp7Xf5M/hMRO0Q8NRbNv2exDOLdvI33AEtp9iRIjTtO8cWHxT8B2tr4C8Ppt0WSWC2mmntd/kz+ExE7RDw1Fs2/Z7EM4t28jfcAS2n2JEi9V8I+Efs//AAjf/FN+R5X9l/8AMv8Al+Xt/wCEY/6l6LZt+z/9Mtv2f/lh9n/4lXlGu+NDpugWq+ANJ07W9Z8P3Okw65/Z/hyHUX8PRovht3kubNdJs5coLQjykeKVfs5KpGbXbpZu0l/Wtv1Gk2O07TvHFh8U/Adra+AvD6bdFklgtppp7Xf5M/hMRO0Q8NRbNv2exDOLdvI33AEtp9iRIjTtO8cWHxT8B2tr4C8Ppt0WSWC2mmntd/kz+ExE7RDw1Fs2/Z7EM4t28jfcAS2n2JEi9Q8D+Fdlr4Vk/sCP5U0lvNi8PeUg2jwxyv8AxT8ewDyOOY9n2frB9n/4lUvhHwj9n/4Rv/im/I8r+y/+Zf8AL8vb/wAIx/1L0Wzb9n/6Zbfs/wDyw+z/APEqb0EeVadp3jiw+KfgO1tfAXh9NuiySwW0009rv8mfwmInaIeGotm37PYhnFu3kb7gCW0+xIkRp2neOLD4p+A7W18BeH026LJLBbTTT2u/yZ/CYidoh4ai2bfs9iGcW7eRvuAJbT7EiReq+EfCP2f/AIRv/im/I8r+y/8AmX/L8vb/AMIx/wBS9Fs2/Z/+mW37P/yw+z/8So8I+Efs/wDwjf8AxTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/8A0y2/Z/8Alh9n/wCJUgPKtO07xxYfFPwHa2vgLw+m3RZJYLaaae13+TP4TETtEPDUWzb9nsQzi3byN9wBLafYkSI07TvHFh8U/Adra+AvD6bdFklgtppp7Xf5M/hMRO0Q8NRbNv2exDOLdvI33AEtp9iRIjTtO8cWHxT8B2tr4C8Ppt0WSWC2mmntd/kz+ExE7RDw1Fs2/Z7EM4t28jfcAS2n2JEi9V8I+Efs/wDwjf8AxTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/8A0y2/Z/8Alh9n/wCJUAeVadp3jiw+KfgO1tfAXh9NuiySwW0009rv8mfwmInaIeGotm37PYhnFu3kb7gCW0+xIkXP3vw88ZT/ABc8EzaJ4Xt/CHiE+H3S31fw9q13o19JHA/huKBZ1i8NxCaBFeIPBPazW8f2i7V/s4tRHH7r4R8I/Z/+Eb/4pvyPK/sv/mX/AC/L2/8ACMf9S9Fs2/Z/+mW37P8A8sPs/wDxKjwj4R+z/wDCN/8AFN+R5X9l/wDMv+X5e3/hGP8AqXotm37P/wBMtv2f/lh9n/4lQB5pd/tCftC+APH/AIMm1rwPb+Pbd9M1KP7HodzqtnMLJ5dDMd/fWr6Wr3E9uLlQ7WlqcG5uVEEBgljPoGifHT4nfEH40eEj4c0fwPf2/wDwj+updaRbeO78Qx3EVzo+9b2NtJV7e7gE6qIJYvMUXEwbyiNslvwj4R+z/wDCN/8AFN+R5X9l/wDMv+X5e3/hGP8AqXotm37P/wBMtv2f/lh9n/4lXjur+Dteh+Lnw7t9J0PV/h9bXkGmWkvjXQPD7Wl3NKkGiCOxaeDSbdo4o0Fy3k3ltJZvteN0gMQXTRatJdf+HHY931rxr8b4vj74NsP+ER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSGteNfjfF8ffBth/wiPg+Hz/DOuT/2XH45vvsdxsutJXzpT/ZQxLH5m1B5bZWeb5kxiQ8I/HP4keCbOD/hOvCOoeMtFf7MItX8KaJqZ1S2jkhsizXtlLZQLN5bXbeZLa7ZH2vtsYjDcpb+1eDviHpfxE2Xvhi+0/V9Fh8631CVblkvLC9TyiLSa1Me6KULI5kjlMckTKimMlzsBHiuteNfjfF8ffBth/wiPg+Hz/DOuT/2XH45vvsdxsutJXzpT/ZQxLH5m1B5bZWeb5kxiQ1rxr8b4vj74NsP+ER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KAHzrrXjX43xfH3wbYf8Ij4Ph8/wzrk/wDZcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJDWvGvxvi+Pvg2w/4RHwfD5/hnXJ/wCy4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSN8VfHr4iaP4t8S+GrK28MzSp4ysfDGm6vPa3W2zW6t7S5jae1WQ/aCsUtyC4ngBeOIBcSHZ6r8GfiFrHxM8DeHNeu9NsbZbq3uotSeG5cGO8gnEGIYyh3ROUnbczhkCxja+9ilcrtf0/FJ/k19/qOScGovqr/K9k/nZ/dqeWfEfxr8b7DxV4LXTfCPg+HxJPemOHSLLxzfXEV7YF4hfPcQNpSIsUSFHFyWVopDEiGU3Btbko/aa/aP1j4L/ABH8I6VZeJ/B2k6HfxJNrX9vafcz3OmW7XcUC3haO4jTyWeURAMAQ/z5ZFk8srahQliE5Q6O2zf5JnPVq+ylytX+79Wj6Vr5/wDFXhz7R8U766/sTzt2tW8v2n+x/Mzifw2d/m/2NJnHkZ3/AGhsfZ8+an2ffpn0BXz/AOKvDn2j4p311/Ynnbtat5ftP9j+ZnE/hs7/ADf7GkzjyM7/ALQ2Ps+fNT7Pv0znNzyjQv2fvDl/rsOrXvhO9e61jS9K0bUIpLK6S2a0T/hG8ILf+woooSvlyfOiQsnlP80Hkn+y9f4UfCrT/AuheEdH0vwzcW1lZf2aVN3pMs0wbd4ad2eaXQFkLboWYs7RkGAkmD7P/wASrW8I+Efs/wDwjf8AxTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/8A0y2/Z/8Alh9n/wCJUeEfCP2f/hG/+Kb8jyv7L/5l/wAvy9v/AAjH/UvRbNv2f/plt+z/APLD7P8A8SoG23qw8I+Efs//AAjf/FN+R5X9l/8AMv8Al+Xt/wCEY/6l6LZt+z/9Mtv2f/lh9n/4lR4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEqPCPhH7P/wjf/FN+R5X9l/8y/5fl7f+EY/6l6LZt+z/APTLb9n/AOWH2f8A4lR4R8I/Z/8AhG/+Kb8jyv7L/wCZf8vy9v8AwjH/AFL0Wzb9n/6Zbfs//LD7P/xKgQeEfCP2f/hG/wDim/I8r+y/+Zf8vy9v/CMf9S9Fs2/Z/wDplt+z/wDLD7P/AMSrnZvgnpPje08I2useHdSitrKXS5fJsLS601G2jwyCkwg0O3EkYEBBjk2IPs/KwfZ/+JV0XhHwj9n/AOEb/wCKb8jyv7L/AOZf8vy9v/CMf9S9Fs2/Z/8Aplt+z/8ALD7P/wASo8I+Efs//CN/8U35Hlf2X/zL/l+Xt/4Rj/qXotm37P8A9Mtv2f8A5YfZ/wDiVG4B4R8I/Z/+Eb/4pvyPK/sv/mX/AC/L2/8ACMf9S9Fs2/Z/+mW37P8A8sPs/wDxKjwj4R+z/wDCN/8AFN+R5X9l/wDMv+X5e3/hGP8AqXotm37P/wBMtv2f/lh9n/4lR4R8I/Z/+Eb/AOKb8jyv7L/5l/y/L2/8Ix/1L0Wzb9n/AOmW37P/AMsPs/8AxKjwj4R+z/8ACN/8U35Hlf2X/wAy/wCX5e3/AIRj/qXotm37P/0y2/Z/+WH2f/iVAB4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEqPCPhH7P/wjf/FN+R5X9l/8y/5fl7f+EY/6l6LZt+z/APTLb9n/AOWH2f8A4lR4R8I/Z/8AhG/+Kb8jyv7L/wCZf8vy9v8AwjH/AFL0Wzb9n/6Zbfs//LD7P/xKjwj4R+z/APCN/wDFN+R5X9l/8y/5fl7f+EY/6l6LZt+z/wDTLb9n/wCWH2f/AIlQB5Vp2neOLD4p+A7W18BeH026LJLBbTTT2u/yZ/CYidoh4ai2bfs9iGcW7eRvuAJbT7EiReq+EfCP2f8A4Rv/AIpvyPK/sv8A5l/y/L2/8Ix/1L0Wzb9n/wCmW37P/wAsPs//ABKvKtO07xxYfFPwHa2vgLw+m3RZJYLaaae13+TP4TETtEPDUWzb9nsQzi3byN9wBLafYkSL1Xwj4R+z/wDCN/8AFN+R5X9l/wDMv+X5e3/hGP8AqXotm37P/wBMtv2f/lh9n/4lQAeEfCP2f/hG/wDim/I8r+y/+Zf8vy9v/CMf9S9Fs2/Z/wDplt+z/wDLD7P/AMSo8I+Efs//AAjf/FN+R5X9l/8AMv8Al+Xt/wCEY/6l6LZt+z/9Mtv2f/lh9n/4lR4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEqPCPhH7P/wjf/FN+R5X9l/8y/5fl7f+EY/6l6LZt+z/APTLb9n/AOWH2f8A4lQAeEfCP2f/AIRv/im/I8r+y/8AmX/L8vb/AMIx/wBS9Fs2/Z/+mW37P/yw+z/8SrnfDHwT0k+NPCfimbw7qS6rZRaXFDG9pdJZ2+1fDSl1tP7Djt45FWJl8wRxOohI3QCD/iVdF4R8I/Z/+Eb/AOKb8jyv7L/5l/y/L2/8Ix/1L0Wzb9n/AOmW37P/AMsPs/8AxKjwj4R+z/8ACN/8U35Hlf2X/wAy/wCX5e3/AIRj/qXotm37P/0y2/Z/+WH2f/iVAB4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEq5/T/g/DfXOg6hp2n6x4M8QiHSrceIPDOnSaXfJGkegRrFI8fh+ITQIr3Gba4X7P8jh4oxCw0voPCPhH7P/AMI3/wAU35Hlf2X/AMy/5fl7f+EY/wCpei2bfs//AEy2/Z/+WH2f/iVHhHwj9n/4Rv8A4pvyPK/sv/mX/L8vb/wjH/UvRbNv2f8A6Zbfs/8Ayw+z/wDEqANXwj8c/iR4Js4P+E68I6h4y0V/swi1fwpompnVLaOSGyLNe2UtlAs3ltdt5ktrtkfa+2xiMNylv7V4O+Iel/ETZe+GL7T9X0WHzrfUJVuWS8sL1PKItJrUx7opQsjmSOUxyRMqKYyXOzwDwj4R+z/8I3/xTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/wD0y2/Z/wDlh9n/AOJVz+n/AAfhvrnQdQ07T9Y8GeIRDpVuPEHhnTpNLvkjSPQI1ikePw/EJoEV7jNtcL9n+Rw8UYhYaWAe56p+zr4Q1PXdfefR7u5tPEtwmq6teyeJtRW4j1C3eE2klqgkxAVVWHmQvEyCGJArKf3fc+HPDsPguy0Xw9oOlWdj4XsLJoEC3DiWBkMYhRYyh3qymUtI0gYFF4fezJ4R4R+OfxI8E2cH/CdeEdQ8ZaK/2YRav4U0TUzqltHJDZFmvbKWygWby2u28yW12yPtfbYxGG5S39q8HfEPS/iJsvfDF9p+r6LD51vqEq3LJeWF6nlEWk1qY90UoWRzJHKY5ImVFMZLnY7u1htuTuzq6KKKQgr5/wDFXhz7R8U766/sTzt2tW8v2n+x/Mzifw2d/m/2NJnHkZ3/AGhsfZ8+an2ffpn0BXz/AOKvDn2j4p311/Ynnbtat5ftP9j+ZnE/hs7/ADf7GkzjyM7/ALQ2Ps+fNT7Pv0wA5Xwj4R+z/wDCN/8AFN+R5X9l/wDMv+X5e3/hGP8AqXotm37P/wBMtv2f/lh9n/4lR4R8I/Z/+Eb/AOKb8jyv7L/5l/y/L2/8Ix/1L0Wzb9n/AOmW37P/AMsPs/8AxKjwj4R+z/8ACN/8U35Hlf2X/wAy/wCX5e3/AIRj/qXotm37P/0y2/Z/+WH2f/iVHhHwj9n/AOEb/wCKb8jyv7L/AOZf8vy9v/CMf9S9Fs2/Z/8Aplt+z/8ALD7P/wASoAPCPhH7P/wjf/FN+R5X9l/8y/5fl7f+EY/6l6LZt+z/APTLb9n/AOWH2f8A4lR4R8I/Z/8AhG/+Kb8jyv7L/wCZf8vy9v8AwjH/AFL0Wzb9n/6Zbfs//LD7P/xKjwj4R+z/APCN/wDFN+R5X9l/8y/5fl7f+EY/6l6LZt+z/wDTLb9n/wCWH2f/AIlR4R8I/Z/+Eb/4pvyPK/sv/mX/AC/L2/8ACMf9S9Fs2/Z/+mW37P8A8sPs/wDxKgA8I+Efs/8Awjf/ABTfkeV/Zf8AzL/l+Xt/4Rj/AKl6LZt+z/8ATLb9n/5YfZ/+JUeEfCP2f/hG/wDim/I8r+y/+Zf8vy9v/CMf9S9Fs2/Z/wDplt+z/wDLD7P/AMSo8I+Efs//AAjf/FN+R5X9l/8AMv8Al+Xt/wCEY/6l6LZt+z/9Mtv2f/lh9n/4lR4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEqADwj4R+z/8I3/xTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/wD0y2/Z/wDlh9n/AOJUeEfCP2f/AIRv/im/I8r+y/8AmX/L8vb/AMIx/wBS9Fs2/Z/+mW37P/yw+z/8So8I+Efs/wDwjf8AxTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/8A0y2/Z/8Alh9n/wCJUeEfCP2f/hG/+Kb8jyv7L/5l/wAvy9v/AAjH/UvRbNv2f/plt+z/APLD7P8A8SoAPCPhH7P/AMI3/wAU35Hlf2X/AMy/5fl7f+EY/wCpei2bfs//AEy2/Z/+WH2f/iVHhHwj9n/4Rv8A4pvyPK/sv/mX/L8vb/wjH/UvRbNv2f8A6Zbfs/8Ayw+z/wDEqr6B4ak0ux0OeLwjLPLax6a6WtvoCRSMUHhkhFL6BAqEfZ8Dc0IQ2/Jtxb50rxDwyZda+NnwjW609NC1JINOab4d3FqbTWNMRU8Pk308dnpgt5oR9kjXZLGqx+UGWS2e28vTRayS/rZv9P8AMdtL/wBf1/SOi07TvHFh8U/Adra+AvD6bdFklgtppp7Xf5M/hMRO0Q8NRbNv2exDOLdvI33AEtp9iRIvVfCPhH7P/wAI3/xTfkeV/Zf/ADL/AJfl7f8AhGP+pei2bfs//TLb9n/5YfZ/+JV5Vp2neOLD4p+A7W18BeH026LJLBbTTT2u/wAmfwmInaIeGotm37PYhnFu3kb7gCW0+xIkXqvhHwj9n/4Rv/im/I8r+y/+Zf8AL8vb/wAIx/1L0Wzb9n/6Zbfs/wDyw+z/APEqBB4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEqPCPhH7P/wjf/FN+R5X9l/8y/5fl7f+EY/6l6LZt+z/APTLb9n/AOWH2f8A4lR4R8I/Z/8AhG/+Kb8jyv7L/wCZf8vy9v8AwjH/AFL0Wzb9n/6Zbfs//LD7P/xKjwj4R+z/APCN/wDFN+R5X9l/8y/5fl7f+EY/6l6LZt+z/wDTLb9n/wCWH2f/AIlQAeEfCP2f/hG/+Kb8jyv7L/5l/wAvy9v/AAjH/UvRbNv2f/plt+z/APLD7P8A8So8I+Efs/8Awjf/ABTfkeV/Zf8AzL/l+Xt/4Rj/AKl6LZt+z/8ATLb9n/5YfZ/+JUeEfCP2f/hG/wDim/I8r+y/+Zf8vy9v/CMf9S9Fs2/Z/wDplt+z/wDLD7P/AMSo8I+Efs//AAjf/FN+R5X9l/8AMv8Al+Xt/wCEY/6l6LZt+z/9Mtv2f/lh9n/4lQAeEfCP2f8A4Rv/AIpvyPK/sv8A5l/y/L2/8Ix/1L0Wzb9n/wCmW37P/wAsPs//ABKjwj4R+z/8I3/xTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/wD0y2/Z/wDlh9n/AOJUeEfCP2f/AIRv/im/I8r+y/8AmX/L8vb/AMIx/wBS9Fs2/Z/+mW37P/yw+z/8So8I+Efs/wDwjf8AxTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/8A0y2/Z/8Alh9n/wCJUAHhHwj9n/4Rv/im/I8r+y/+Zf8AL8vb/wAIx/1L0Wzb9n/6Zbfs/wDyw+z/APEqPCPhH7P/AMI3/wAU35Hlf2X/AMy/5fl7f+EY/wCpei2bfs//AEy2/Z/+WH2f/iVHhHwj9n/4Rv8A4pvyPK/sv/mX/L8vb/wjH/UvRbNv2f8A6Zbfs/8Ayw+z/wDEqPCPhH7P/wAI3/xTfkeV/Zf/ADL/AJfl7f8AhGP+pei2bfs//TLb9n/5YfZ/+JUAHhHwj9n/AOEb/wCKb8jyv7L/AOZf8vy9v/CMf9S9Fs2/Z/8Aplt+z/8ALD7P/wASrJ8M/Cyzj13wprdtoOoaDrVt/Y6PqOiWFxpNxLDEvh9BbXElvoVu0tsFa5VraUrDhZAyQiE/2XreEfCP2f8A4Rv/AIpvyPK/sv8A5l/y/L2/8Ix/1L0Wzb9n/wCmW37P/wAsPs//ABKjwj4R+z/8I3/xTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/wD0y2/Z/wDlh9n/AOJUAfVVFFFABXz/AOKvDn2j4p311/Ynnbtat5ftP9j+ZnE/hs7/ADf7GkzjyM7/ALQ2Ps+fNT7Pv0z6Ar5/8VeHPtHxTvrr+xPO3a1by/af7H8zOJ/DZ3+b/Y0mceRnf9obH2fPmp9n36YAcr4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEqPCPhH7P/wjf/FN+R5X9l/8y/5fl7f+EY/6l6LZt+z/APTLb9n/AOWH2f8A4lR4R8I/Z/8AhG/+Kb8jyv7L/wCZf8vy9v8AwjH/AFL0Wzb9n/6Zbfs//LD7P/xKjwj4R+z/APCN/wDFN+R5X9l/8y/5fl7f+EY/6l6LZt+z/wDTLb9n/wCWH2f/AIlQAeEfCP2f/hG/+Kb8jyv7L/5l/wAvy9v/AAjH/UvRbNv2f/plt+z/APLD7P8A8So8I+Efs/8Awjf/ABTfkeV/Zf8AzL/l+Xt/4Rj/AKl6LZt+z/8ATLb9n/5YfZ/+JUeEfCP2f/hG/wDim/I8r+y/+Zf8vy9v/CMf9S9Fs2/Z/wDplt+z/wDLD7P/AMSo8I+Efs//AAjf/FN+R5X9l/8AMv8Al+Xt/wCEY/6l6LZt+z/9Mtv2f/lh9n/4lQAeEfCP2f8A4Rv/AIpvyPK/sv8A5l/y/L2/8Ix/1L0Wzb9n/wCmW37P/wAsPs//ABKjwj4R+z/8I3/xTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/wD0y2/Z/wDlh9n/AOJUeEfCP2f/AIRv/im/I8r+y/8AmX/L8vb/AMIx/wBS9Fs2/Z/+mW37P/yw+z/8So8I+Efs/wDwjf8AxTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/8A0y2/Z/8Alh9n/wCJUAHhHwj9n/4Rv/im/I8r+y/+Zf8AL8vb/wAIx/1L0Wzb9n/6Zbfs/wDyw+z/APEqPCPhH7P/AMI3/wAU35Hlf2X/AMy/5fl7f+EY/wCpei2bfs//AEy2/Z/+WH2f/iVHhHwj9n/4Rv8A4pvyPK/sv/mX/L8vb/wjH/UvRbNv2f8A6Zbfs/8Ayw+z/wDEqPCPhH7P/wAI3/xTfkeV/Zf/ADL/AJfl7f8AhGP+pei2bfs//TLb9n/5YfZ/+JUAHhHwj9n/AOEb/wCKb8jyv7L/AOZf8vy9v/CMf9S9Fs2/Z/8Aplt+z/8ALD7P/wASo8I+Efs//CN/8U35Hlf2X/zL/l+Xt/4Rj/qXotm37P8A9Mtv2f8A5YfZ/wDiVHhHwj9n/wCEb/4pvyPK/sv/AJl/y/L2/wDCMf8AUvRbNv2f/plt+z/8sPs//EqPCPhH7P8A8I3/AMU35Hlf2X/zL/l+Xt/4Rj/qXotm37P/ANMtv2f/AJYfZ/8AiVAHlWnad44sPin4DtbXwF4fTbosksFtNNPa7/Jn8JiJ2iHhqLZt+z2IZxbt5G+4AltPsSJF6r4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEq8q07TvHFh8U/Adra+AvD6bdFklgtppp7Xf5M/hMRO0Q8NRbNv2exDOLdvI33AEtp9iRIvVfCPhH7P/AMI3/wAU35Hlf2X/AMy/5fl7f+EY/wCpei2bfs//AEy2/Z/+WH2f/iVAB4R8I/Z/+Eb/AOKb8jyv7L/5l/y/L2/8Ix/1L0Wzb9n/AOmW37P/AMsPs/8AxKjwj4R+z/8ACN/8U35Hlf2X/wAy/wCX5e3/AIRj/qXotm37P/0y2/Z/+WH2f/iVHhHwj9n/AOEb/wCKb8jyv7L/AOZf8vy9v/CMf9S9Fs2/Z/8Aplt+z/8ALD7P/wASo8I+Efs//CN/8U35Hlf2X/zL/l+Xt/4Rj/qXotm37P8A9Mtv2f8A5YfZ/wDiVAB4R8I/Z/8AhG/+Kb8jyv7L/wCZf8vy9v8AwjH/AFL0Wzb9n/6Zbfs//LD7P/xKjwj4R+z/APCN/wDFN+R5X9l/8y/5fl7f+EY/6l6LZt+z/wDTLb9n/wCWH2f/AIlR4R8I/Z/+Eb/4pvyPK/sv/mX/AC/L2/8ACMf9S9Fs2/Z/+mW37P8A8sPs/wDxKjwj4R+z/wDCN/8AFN+R5X9l/wDMv+X5e3/hGP8AqXotm37P/wBMtv2f/lh9n/4lQAeEfCP2f/hG/wDim/I8r+y/+Zf8vy9v/CMf9S9Fs2/Z/wDplt+z/wDLD7P/AMSo8I+Efs//AAjf/FN+R5X9l/8AMv8Al+Xt/wCEY/6l6LZt+z/9Mtv2f/lh9n/4lR4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEqPCPhH7P/wjf/FN+R5X9l/8y/5fl7f+EY/6l6LZt+z/APTLb9n/AOWH2f8A4lQAeEfCP2f/AIRv/im/I8r+y/8AmX/L8vb/AMIx/wBS9Fs2/Z/+mW37P/yw+z/8So8I+Efs/wDwjf8AxTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/8A0y2/Z/8Alh9n/wCJUeEfCP2f/hG/+Kb8jyv7L/5l/wAvy9v/AAjH/UvRbNv2f/plt+z/APLD7P8A8So8I+Efs/8Awjf/ABTfkeV/Zf8AzL/l+Xt/4Rj/AKl6LZt+z/8ATLb9n/5YfZ/+JUAHhHwj9n/4Rv8A4pvyPK/sv/mX/L8vb/wjH/UvRbNv2f8A6Zbfs/8Ayw+z/wDEqPCPhH7P/wAI3/xTfkeV/Zf/ADL/AJfl7f8AhGP+pei2bfs//TLb9n/5YfZ/+JUeEfCP2f8A4Rv/AIpvyPK/sv8A5l/y/L2/8Ix/1L0Wzb9n/wCmW37P/wAsPs//ABKjwj4R+z/8I3/xTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/wD0y2/Z/wDlh9n/AOJUAfVVFFFABXz/AOKvDn2j4p311/Ynnbtat5ftP9j+ZnE/hs7/ADf7GkzjyM7/ALQ2Ps+fNT7Pv0z6Ar5/8VeHPtHxTvrr+xPO3a1by/af7H8zOJ/DZ3+b/Y0mceRnf9obH2fPmp9n36YAcr4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEqPCPhH7P/wjf/FN+R5X9l/8y/5fl7f+EY/6l6LZt+z/APTLb9n/AOWH2f8A4lR4R8I/Z/8AhG/+Kb8jyv7L/wCZf8vy9v8AwjH/AFL0Wzb9n/6Zbfs//LD7P/xKjwj4R+z/APCN/wDFN+R5X9l/8y/5fl7f+EY/6l6LZt+z/wDTLb9n/wCWH2f/AIlQAeEfCP2f/hG/+Kb8jyv7L/5l/wAvy9v/AAjH/UvRbNv2f/plt+z/APLD7P8A8So8I+Efs/8Awjf/ABTfkeV/Zf8AzL/l+Xt/4Rj/AKl6LZt+z/8ATLb9n/5YfZ/+JUeEfCP2f/hG/wDim/I8r+y/+Zf8vy9v/CMf9S9Fs2/Z/wDplt+z/wDLD7P/AMSo8I+Efs//AAjf/FN+R5X9l/8AMv8Al+Xt/wCEY/6l6LZt+z/9Mtv2f/lh9n/4lQAeEfCP2f8A4Rv/AIpvyPK/sv8A5l/y/L2/8Ix/1L0Wzb9n/wCmW37P/wAsPs//ABKjwj4R+z/8I3/xTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/wD0y2/Z/wDlh9n/AOJUeEfCP2f/AIRv/im/I8r+y/8AmX/L8vb/AMIx/wBS9Fs2/Z/+mW37P/yw+z/8So8I+Efs/wDwjf8AxTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/8A0y2/Z/8Alh9n/wCJUAHhHwj9n/4Rv/im/I8r+y/+Zf8AL8vb/wAIx/1L0Wzb9n/6Zbfs/wDyw+z/APEqPCPhH7P/AMI3/wAU35Hlf2X/AMy/5fl7f+EY/wCpei2bfs//AEy2/Z/+WH2f/iVHhHwj9n/4Rv8A4pvyPK/sv/mX/L8vb/wjH/UvRbNv2f8A6Zbfs/8Ayw+z/wDEqPCPhH7P/wAI3/xTfkeV/Zf/ADL/AJfl7f8AhGP+pei2bfs//TLb9n/5YfZ/+JUAHhHwj9n/AOEb/wCKb8jyv7L/AOZf8vy9v/CMf9S9Fs2/Z/8Aplt+z/8ALD7P/wASo8I+Efs//CN/8U35Hlf2X/zL/l+Xt/4Rj/qXotm37P8A9Mtv2f8A5YfZ/wDiVHhHwj9n/wCEb/4pvyPK/sv/AJl/y/L2/wDCMf8AUvRbNv2f/plt+z/8sPs//EqPCPhH7P8A8I3/AMU35Hlf2X/zL/l+Xt/4Rj/qXotm37P/ANMtv2f/AJYfZ/8AiVAHlWnad44sPin4DtbXwF4fTbosksFtNNPa7/Jn8JiJ2iHhqLZt+z2IZxbt5G+4AltPsSJF6r4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEq8q07TvHFh8U/Adra+AvD6bdFklgtppp7Xf5M/hMRO0Q8NRbNv2exDOLdvI33AEtp9iRIvVfCPhH7P/AMI3/wAU35Hlf2X/AMy/5fl7f+EY/wCpei2bfs//AEy2/Z/+WH2f/iVAB4R8I/Z/+Eb/AOKb8jyv7L/5l/y/L2/8Ix/1L0Wzb9n/AOmW37P/AMsPs/8AxKjwj4R+z/8ACN/8U35Hlf2X/wAy/wCX5e3/AIRj/qXotm37P/0y2/Z/+WH2f/iVHhHwj9n/AOEb/wCKb8jyv7L/AOZf8vy9v/CMf9S9Fs2/Z/8Aplt+z/8ALD7P/wASo8I+Efs//CN/8U35Hlf2X/zL/l+Xt/4Rj/qXotm37P8A9Mtv2f8A5YfZ/wDiVAB4R8I/Z/8AhG/+Kb8jyv7L/wCZf8vy9v8AwjH/AFL0Wzb9n/6Zbfs//LD7P/xKjwj4R+z/APCN/wDFN+R5X9l/8y/5fl7f+EY/6l6LZt+z/wDTLb9n/wCWH2f/AIlR4R8I/Z/+Eb/4pvyPK/sv/mX/AC/L2/8ACMf9S9Fs2/Z/+mW37P8A8sPs/wDxKjwj4R+z/wDCN/8AFN+R5X9l/wDMv+X5e3/hGP8AqXotm37P/wBMtv2f/lh9n/4lQAeEfCP2f/hG/wDim/I8r+y/+Zf8vy9v/CMf9S9Fs2/Z/wDplt+z/wDLD7P/AMSo8I+Efs//AAjf/FN+R5X9l/8AMv8Al+Xt/wCEY/6l6LZt+z/9Mtv2f/lh9n/4lR4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEqPCPhH7P/wjf/FN+R5X9l/8y/5fl7f+EY/6l6LZt+z/APTLb9n/AOWH2f8A4lQAeEfCP2f/AIRv/im/I8r+y/8AmX/L8vb/AMIx/wBS9Fs2/Z/+mW37P/yw+z/8So8I+Efs/wDwjf8AxTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/8A0y2/Z/8Alh9n/wCJUeEfCP2f/hG/+Kb8jyv7L/5l/wAvy9v/AAjH/UvRbNv2f/plt+z/APLD7P8A8So8I+Efs/8Awjf/ABTfkeV/Zf8AzL/l+Xt/4Rj/AKl6LZt+z/8ATLb9n/5YfZ/+JUAHhHwj9n/4Rv8A4pvyPK/sv/mX/L8vb/wjH/UvRbNv2f8A6Zbfs/8Ayw+z/wDEqPCPhH7P/wAI3/xTfkeV/Zf/ADL/AJfl7f8AhGP+pei2bfs//TLb9n/5YfZ/+JUeEfCP2f8A4Rv/AIpvyPK/sv8A5l/y/L2/8Ix/1L0Wzb9n/wCmW37P/wAsPs//ABKjwj4R+z/8I3/xTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/wD0y2/Z/wDlh9n/AOJUAfVVFFFABXz/AOKvDn2j4p311/Ynnbtat5ftP9j+ZnE/hs7/ADf7GkzjyM7/ALQ2Ps+fNT7Pv0z6Ar5/8VeHPtHxTvrr+xPO3a1by/af7H8zOJ/DZ3+b/Y0mceRnf9obH2fPmp9n36YAcr4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEqPCPhH7P/wjf/FN+R5X9l/8y/5fl7f+EY/6l6LZt+z/APTLb9n/AOWH2f8A4lR4R8I/Z/8AhG/+Kb8jyv7L/wCZf8vy9v8AwjH/AFL0Wzb9n/6Zbfs//LD7P/xKjwj4R+z/APCN/wDFN+R5X9l/8y/5fl7f+EY/6l6LZt+z/wDTLb9n/wCWH2f/AIlQAeEfCP2f/hG/+Kb8jyv7L/5l/wAvy9v/AAjH/UvRbNv2f/plt+z/APLD7P8A8So8I+Efs/8Awjf/ABTfkeV/Zf8AzL/l+Xt/4Rj/AKl6LZt+z/8ATLb9n/5YfZ/+JUeEfCP2f/hG/wDim/I8r+y/+Zf8vy9v/CMf9S9Fs2/Z/wDplt+z/wDLD7P/AMSo8I+Efs//AAjf/FN+R5X9l/8AMv8Al+Xt/wCEY/6l6LZt+z/9Mtv2f/lh9n/4lQAeEfCP2f8A4Rv/AIpvyPK/sv8A5l/y/L2/8Ix/1L0Wzb9n/wCmW37P/wAsPs//ABKjwj4R+z/8I3/xTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/wD0y2/Z/wDlh9n/AOJUeEfCP2f/AIRv/im/I8r+y/8AmX/L8vb/AMIx/wBS9Fs2/Z/+mW37P/yw+z/8So8I+Efs/wDwjf8AxTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/8A0y2/Z/8Alh9n/wCJUAHhHwj9n/4Rv/im/I8r+y/+Zf8AL8vb/wAIx/1L0Wzb9n/6Zbfs/wDyw+z/APEqPCPhH7P/AMI3/wAU35Hlf2X/AMy/5fl7f+EY/wCpei2bfs//AEy2/Z/+WH2f/iVHhHwj9n/4Rv8A4pvyPK/sv/mX/L8vb/wjH/UvRbNv2f8A6Zbfs/8Ayw+z/wDEqPCPhH7P/wAI3/xTfkeV/Zf/ADL/AJfl7f8AhGP+pei2bfs//TLb9n/5YfZ/+JUAeRfE4yaT8OPEVtf+DdZ8J6XpWgWV5D4vW0g0y2SeNPDBjjili0iG5hdHgX70duo+zFd0PkAaZh+FFs5vjV8NVtZboahLp3hybS9JttPZbS7sGTQmubkQDRo45Qn2aMmclGh+yxBfJ8oCx958I+Efs/8Awjf/ABTfkeV/Zf8AzL/l+Xt/4Rj/AKl6LZt+z/8ATLb9n/5YfZ/+JUeEfCP2f/hG/wDim/I8r+y/+Zf8vy9v/CMf9S9Fs2/Z/wDplt+z/wDLD7P/AMSo6Jdnf+vy9PUcnzRUfX8Ul+Fr+voeVadp3jiw+KfgO1tfAXh9NuiySwW0009rv8mfwmInaIeGotm37PYhnFu3kb7gCW0+xIkXqvhHwj9n/wCEb/4pvyPK/sv/AJl/y/L2/wDCMf8AUvRbNv2f/plt+z/8sPs//Eq8q07TvHFh8U/Adra+AvD6bdFklgtppp7Xf5M/hMRO0Q8NRbNv2exDOLdvI33AEtp9iRIvVfCPhH7P/wAI3/xTfkeV/Zf/ADL/AJfl7f8AhGP+pei2bfs//TLb9n/5YfZ/+JUCDwj4R+z/APCN/wDFN+R5X9l/8y/5fl7f+EY/6l6LZt+z/wDTLb9n/wCWH2f/AIlR4R8I/Z/+Eb/4pvyPK/sv/mX/AC/L2/8ACMf9S9Fs2/Z/+mW37P8A8sPs/wDxKjwj4R+z/wDCN/8AFN+R5X9l/wDMv+X5e3/hGP8AqXotm37P/wBMtv2f/lh9n/4lR4R8I/Z/+Eb/AOKb8jyv7L/5l/y/L2/8Ix/1L0Wzb9n/AOmW37P/AMsPs/8AxKgA8I+Efs//AAjf/FN+R5X9l/8AMv8Al+Xt/wCEY/6l6LZt+z/9Mtv2f/lh9n/4lR4R8I/Z/wDhG/8Aim/I8r+y/wDmX/L8vb/wjH/UvRbNv2f/AKZbfs//ACw+z/8AEqPCPhH7P/wjf/FN+R5X9l/8y/5fl7f+EY/6l6LZt+z/APTLb9n/AOWH2f8A4lR4R8I/Z/8AhG/+Kb8jyv7L/wCZf8vy9v8AwjH/AFL0Wzb9n/6Zbfs//LD7P/xKgA8I+Efs/wDwjf8AxTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/8A0y2/Z/8Alh9n/wCJUeEfCP2f/hG/+Kb8jyv7L/5l/wAvy9v/AAjH/UvRbNv2f/plt+z/APLD7P8A8So8I+Efs/8Awjf/ABTfkeV/Zf8AzL/l+Xt/4Rj/AKl6LZt+z/8ATLb9n/5YfZ/+JUeEfCP2f/hG/wDim/I8r+y/+Zf8vy9v/CMf9S9Fs2/Z/wDplt+z/wDLD7P/AMSoAPCPhH7P/wAI3/xTfkeV/Zf/ADL/AJfl7f8AhGP+pei2bfs//TLb9n/5YfZ/+JUeEfCP2f8A4Rv/AIpvyPK/sv8A5l/y/L2/8Ix/1L0Wzb9n/wCmW37P/wAsPs//ABKjwj4R+z/8I3/xTfkeV/Zf/Mv+X5e3/hGP+pei2bfs/wD0y2/Z/wDlh9n/AOJUeEfCP2f/AIRv/im/I8r+y/8AmX/L8vb/AMIx/wBS9Fs2/Z/+mW37P/yw+z/8SoAPCPhH7P8A8I3/AMU35Hlf2X/zL/l+Xt/4Rj/qXotm37P/ANMtv2f/AJYfZ/8AiVHhHwj9n/4Rv/im/I8r+y/+Zf8AL8vb/wAIx/1L0Wzb9n/6Zbfs/wDyw+z/APEqPCPhH7P/AMI3/wAU35Hlf2X/AMy/5fl7f+EY/wCpei2bfs//AEy2/Z/+WH2f/iVHhHwj9n/4Rv8A4pvyPK/sv/mX/L8vb/wjH/UvRbNv2f8A6Zbfs/8Ayw+z/wDEqAPqqiiigAooooAKKKKACiiigAooooAKKKKACiiigD5q8a/EfXLD9qfwjpq+C9QufEkXhnxJa6bbxF2069jlvtGaC5e+EWyCJUiczh18yJkKIk5ltTc/StFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH//2Q== Correct ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.5 Systems of Inequalities in Two Variables/Graph Nonlinear Inequality Graph the inequality.y ≤ 4x - x2 Graph the inequality.

y ≤ 4x - x2
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 Incorrect ]]> 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 Correct ]]> 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 Incorrect ]]> 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 Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.5 Systems of Inequalities in Two Variables/Match Inequality with Graph Determine which inequality matches the graph. Determine which inequality matches the graph.


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 1.0000000 0.3333333 0 true true abc x ≤ -2 Incorrect y ≤ -2 Correct x ≥ -2 Incorrect y ≥ -2 Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.5 Systems of Inequalities in Two Variables/Solve Applications: Linear Programming Problem Solve the problem.The Acme Class Ring Company designs and sells two types of ... Solve the problem.

The Acme Class Ring Company designs and sells two types of rings: the VIP and the SST. They can produce up to 24 rings each day using up to 60 total man-hours of labor. It takes 3 man-hours to make one VIP ring and 2 man-hours to make one SST ring. How many of each type of ring should be made daily to maximize the company's profit, if the profit on a VIP ring is $40 and on an SST ring is $35?]]> 1.0000000 0.3333333 0 true true abc 18 VIP and 6 SST Incorrect 14 VIP and 10 SST Incorrect 16 VIP and 8 SST Incorrect 12 VIP and 12 SST Correct Pre-Calc/Chapter 7: Systems and Matrices/7.5 Systems of Inequalities in Two Variables/Solve Linear Programming Problem Solve the problem.Find the maximum value of P = 8x + 12y subject to the ... Solve the problem.

Find the maximum value of P = 8x + 12y subject to the following constraints.
 40x + 80y ≤ 560
 6x + 8y ≤ 72
 x ≥ 0
 y ≥ 0]]> 1.0000000 0.3333333 0 true true abc Maximum of 100 Correct Maximum of 92 Incorrect Maximum of 96 Incorrect Maximum of 120 Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.5 Systems of Inequalities in Two Variables/Solve System of Linear Inequalities Solve the system of inequalities.2x + y ≥ 4 x - 1 ≥ 0 Solve the system of inequalities.

2x + y ≥ 4
 x - 1 ≥ 0
]]> 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 Incorrect ]]> 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 Correct ]]> 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 Incorrect ]]> 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 Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.5 Systems of Inequalities in Two Variables/Solve System of Nonlinear Inequalities Graph the system of inequalities. Shade the region that represents the ... Graph the system of inequalities. Shade the region that represents the solution set.

 y ≥ x2
 x + y ≤ 3

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uChVUsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUALKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVACysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVfmrVtJvv2KNVvfEPh6yuNR+AF7M91rfh2yiaWbwZK7FpdQsYlBLaezEvPaoCYCWmiGzzIx9K2VlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqAeK/GHVltb74QeOrG9uPFfhg+ObG5FxYy2skNra6jptzpVtJAwKebA1zf28hbdK+J5GXKKqr7VZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqvxB+1P8M/E/wCzP8J/G198OINQu/hZNjxAnh/SUie48GazbTpfW19YxyqyNpr3UERubUjEIaSWLCGRV+1PDl1b6rZtrFhrf9u6Vq3l31hNE8MlukDQxhBA8ajfE20yhmZyTK2G2bFUA8w8KaXYyfFf4j6XF4nttK1o2FvZ6RpWn3Nib3RrDyVJuIrYIwRWuJXcGdHyyjIKbUHNfs/+ANd0n4tfF67uviV4o1q3sfFsUVxY31tpSw6izeH9KIknMNlG6sokQAQvGuIY9ysTIX83/ZM8C+JvD/xc+L2i3vjbULXUphcvq1uviax1R47+edvs+oWlp+8a0HkKrFbqIZd1Xa6IAvpH7P8A4A13Sfi18Xru6+JXijWrex8WxRXFjfW2lLDqLN4f0oiScw2UbqyiRABC8a4hj3KxMhcjrThLur/n/wAP53vZbIlpUlHs/wBF/wAN+CutX7/ZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqvmv7RF1qnh/4HfEd9M1vUI9e1myk0zw+YnWB7TUruOOysYYJY1Rk33ckTCWRjseZmMiRqAnpVlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKq+K/tAyzXXib4YeCE8SW8dx4u8c2WofZL+OOSaCy0qD+05EtUQxsVafTrdXkkMuw3rdjEigHr/hzw5b+FrNrCwbydKj8uOw02KCGG302BIY4kt4EjRcRDyywDbiC7AEIERbdlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgBZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqoAWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqAFlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgFuiiigAqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqtuqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgBZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqoAWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqAFlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgBZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqv58/sx+IfFn7IPgy4F1Hf8Aij4OaRrOsaJrcdlp19JJoJ0+8+yya3b+YjA207fvLm0jll8t/PngJCXNvD+g1lZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKq/Kt1pui+Ff2uPE/g3TLGwQarY6Z47Fqtijz/arnV7K1vZIwthPtiH9l2k7NujbzppJXf7lxZehgaNPEVfYz6p2fZ7/o/61Jk2lc6T4B6bPqXjD4lP4c1jxBoPhXX7WDVrO21DXdN1ee1urvzT/aNh5ct0I7aYIJkE7MjPv2xhAVM/7P8A4A13Sfi18Xru6+JXijWrex8WxRXFjfW2lLDqLN4f0oiScw2UbqyiRABC8a4hj3KxMhf5A/ZruNY/Zb8T/FDWLLULHxH8O9WitU8Var4G0qWO98HXC2qySXa2ksBiVLeW9czW5hUgZeO3C211bQ/Wn7NHha/uPiL8Udetvit4g8WaKPE1vIqvHpD2esJL4e0p47h5LeyRjhZY9pgeNCsUZIYly/PWozw7VOatZL7rfdb0/DYFJSbku59FWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqr4/wD8I5b+J/2uPtt+326TwX4Z+3aeL2CGT7O+ry/ZyLdgitF5a6JMSzGR3/tGVdyIgRvYLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVV81+CX/FV6x468f3X/AB/6prV34egi/wCfWw0m8ubKKHIwH3XC311uKhh9t8ol1hQ1zlHpVlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgBZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqoAWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqAFlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgFuiiigAqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqtuqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgBZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqoAWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqAFlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgBZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqvzd+0x4CuPD/xO+GXxQ09LnU5/+Eq0zw3rSGHTQsWj3l1arChaW2aR0h1KCynTBMqNcXOx4wytF9I2VlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqrxXxf8AhHb/ABg+Fnj7wTquofaLTxRZTW0DahZw3MWlu0CpE8UYVC/lzILhd7FxITh1AQJpTm6U41Funf7hNX0Pj74FQTfEbxj4qubDT5fDn2SHSPD8irpelXGp6ZeW76OTJm30eSOFYxsCQ3CxsjWjl44fJb+z+a+B8fif9kbxt4n1my1DX7z4IW2uPe+KfDthocIm0ia40bSbmXUZSunwubaJ77a1rFHaSxxwCRYXWK4jW5+zELz4la34ilufB954Q8U6Sth4P1XVNL0rR2gs7/T7jR45zAlvp1yqsk6zSp5wEYWNCjbIi9h2PwS+HGp23jvXJ5dY1q8t7DxDpW7TZtEshDEo07wu4hYJoAeBUDxYUfY2A06BikZSeeD7LF0YYunQVnrs/Jpu9nbfSW17aaMx5kpSt/Xl8tj608QeP9J8FfDTxR8RpdWuPEnhi10yXxHEdPNvMv2KK0WTbaMgQSK6xtIpd2y0x+cJtVanwL+HuqfDT4cadpWuap/auvT51DVpYtv2f+0pwJb94MRo3lS3b3M4Dj5TOyqEjWONPjDU7a+/Z8l8OaWZL9fgvdXtl4t17wzDpt3LqHh/7A2nX1xqdgHtLVUsTf3Vr9rtUhPlL57wRRMZ4bX758OXVvqtm2sWGt/27pWreXfWE0TwyW6QNDGEEDxqN8TbTKGZnJMrYbZsVfkK9GeHqOlPdGyd1dFuysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVcBhZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqoAWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqAFlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgFuiiigCpHq1jNqtxpkd7bvqVtDFcz2ayqZoopGkWORkzlVdoZQrEYJjcDO04qaNdW9xqOvJDrf9qyQXqxz2m+Fv7Mf7PCwt8RqGXKsk+JSz/wCkZB2FFXwv4efs/ePPDOq+LLK7+L3jiBLvU5NVj1u1t/D7jUxOzYWYSaa8qzwJHHCQSYvKS38oouba3PAH7P3jzSfFfxKurv4veONMt9U8QQ3dndQ2/h921GIaVp8JnkB01gjCSGSHaFjG2BG2ksXcA900a6t7jUdeSHW/7VkgvVjntN8Lf2Y/2eFhb4jUMuVZJ8Sln/0jIOwoqmjXVvcajryQ63/askF6sc9pvhb+zH+zwsLfEahlyrJPiUs/+kZB2FFXwvwB+z9480nxX8Srq7+L3jjTLfVPEEN3Z3UNv4fdtRiGlafCZ5AdNYIwkhkh2hYxtgRtpLF3PAH7P3jzSfFfxKurv4veONMt9U8QQ3dndQ2/h921GIaVp8JnkB01gjCSGSHaFjG2BG2ksXcA900a6t7jUdeSHW/7VkgvVjntN8Lf2Y/2eFhb4jUMuVZJ8Sln/wBIyDsKKpo11b3Go68kOt/2rJBerHPab4W/sx/s8LC3xGoZcqyT4lLP/pGQdhRV8L8Afs/ePNJ8V/Eq6u/i9440y31TxBDd2d1Db+H3bUYhpWnwmeQHTWCMJIZIdoWMbYEbaSxdzwB+z9480nxX8Srq7+L3jjTLfVPEEN3Z3UNv4fdtRiGlafCZ5AdNYIwkhkh2hYxtgRtpLF3APdNGure41HXkh1v+1ZIL1Y57TfC39mP9nhYW+I1DLlWSfEpZ/wDSMg7CiqaNdW9xqOvJDrf9qyQXqxz2m+Fv7Mf7PCwt8RqGXKsk+JSz/wCkZB2FFXwvwB+z9480nxX8Srq7+L3jjTLfVPEEN3Z3UNv4fdtRiGlafCZ5AdNYIwkhkh2hYxtgRtpLF3PAH7P3jzSfFfxKurv4veONMt9U8QQ3dndQ2/h921GIaVp8JnkB01gjCSGSHaFjG2BG2ksXcA900a6t7jUdeSHW/wC1ZIL1Y57TfC39mP8AZ4WFviNQy5VknxKWf/SMg7CiqaNdW9xqOvJDrf8AaskF6sc9pvhb+zH+zwsLfEahlyrJPiUs/wDpGQdhRV8L8Afs/ePNJ8V/Eq6u/i9440y31TxBDd2d1Db+H3bUYhpWnwmeQHTWCMJIZIdoWMbYEbaSxdzwB+z9480nxX8Srq7+L3jjTLfVPEEN3Z3UNv4fdtRiGlafCZ5AdNYIwkhkh2hYxtgRtpLF3APEL6KfwT+0v8SYNV0az8D+DvF3ivTtL8PeIrVtJuLlPEE50yWWMwi3vWhlmWzW9iM0cSs+GmIklgkgm+FHg6Xwv4m8Ua3rHiTUotF0PW9NubyLUdJsIbOzgTTPDErLKw0FWto4laNv+XIqunQuUjMc9xB2eh/s2L8ZB8cvDGu/GHxBr/hvVfEa2t9b2h8O3TXRTS9OiZrgLp7m2uI5YWjUKIWT7PFIFDHzH434W/sE+HNU+LXijU5viJ46a++HPiGy03w+00mmXEMAj8P6T5c7W81i8JnVDEglEYbFvAxJkTefboZgoU6caib5NVZ7qztf52+V9O8SjdtrQ93/AGT/AAjBY6b4i8UXmnWOk+J9TNjpV3ptpHFHLYWVjaJHYw3CRQ24EskUhvAsltBLHHfRQNGiwRqvIXX/ABh1rut6z4T/AOJ38CFvWPifwxpn+kXHgO6kVZ5Ly1hTLfYWWZJp7QDdCJRPCvls6V0HgD9n7x5pPiv4lXV38XvHGmW+qeIIbuzuobfw+7ajENK0+EzyA6awRhJDJDtCxjbAjbSWLueAP2fvHmk+K/iVdXfxe8caZb6p4ghu7O6ht/D7tqMQ0rT4TPIDprBGEkMkO0LGNsCNtJYu/k1asq1R1J7spKyse1eEPEGk+Jo9R1DRfFFv4nsZpopUNpcW88Nmr2sEkcaNEASrxvHcAyF2IuQwbyzGq2tGure41HXkh1v+1ZIL1Y57TfC39mP9nhYW+I1DLlWSfEpZ/wDSMg7Cir8F2nwU+In7F2teMNV0jxj4o0v4ATeIJb7U08O6Zosmp6cstlZtJrHlfYJEe0SYXEMltDFC0McKSojoGFe6/Cr4K+LrjVvHuvW/xq8YLoviHWrbVNK1bTk8PXCaxatpGnxrdlhpzqMtE8S7AilIUbaSxkfIZ7/o11b3Go68kOt/2rJBerHPab4W/sx/s8LC3xGoZcqyT4lLP/pGQdhRVNGure41HXkh1v8AtWSC9WOe03wt/Zj/AGeFhb4jUMuVZJ8Sln/0jIOwoq+F+AP2fvHmk+K/iVdXfxe8caZb6p4ghu7O6ht/D7tqMQ0rT4TPIDprBGEkMkO0LGNsCNtJYu54A/Z+8eaT4r+JV1d/F7xxplvqniCG7s7qG38Pu2oxDStPhM8gOmsEYSQyQ7QsY2wI20li7gHumjXVvcajryQ63/askF6sc9pvhb+zH+zwsLfEahlyrJPiUs/+kZB2FFU0a6t7jUdeSHW/7VkgvVjntN8Lf2Y/2eFhb4jUMuVZJ8Sln/0jIOwoq+F+AP2fvHmk+K/iVdXfxe8caZb6p4ghu7O6ht/D7tqMQ0rT4TPIDprBGEkMkO0LGNsCNtJYu54A/Z+8eaT4r+JV1d/F7xxplvqniCG7s7qG38Pu2oxDStPhM8gOmsEYSQyQ7QsY2wI20li7gHumjXVvcajryQ63/askF6sc9pvhb+zH+zwsLfEahlyrJPiUs/8ApGQdhRVNGure41HXkh1v+1ZIL1Y57TfC39mP9nhYW+I1DLlWSfEpZ/8ASMg7Cir4X4A/Z+8eaT4r+JV1d/F7xxplvqniCG7s7qG38Pu2oxDStPhM8gOmsEYSQyQ7QsY2wI20li7ngD9n7x5pPiv4lXV38XvHGmW+qeIIbuzuobfw+7ajENK0+EzyA6awRhJDJDtCxjbAjbSWLuAe/wCk6tY6/pVlqemXtvqOm3sKXNreWkqywzxOoZJEdSQyspBDAkEEEUV4B8Kv2fvHmk6Vq97ffF7xx4bfWtTm1VNEt7fw/KbESqm5ZSNNaLz5HV5pRbhYvNmkwZm33M5QB7Z4z8R6h4X0lLvTfC2reL7hpVjNho0tnHMqkEmQm6uII9owAcOW+YYB5x8cfED4sppd38XrK18Z6pPomn/EHRhrVvZ+J2S70rTpbS2a5hjuDOPsUbXgeIkSxRxl5V3xhTj7lqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqrTt+H4NO3o7WfqXGSSen9a6+q6dj88vhH8TPidrnxB8Evd6l4r1vxBdR2Wo6boUfiCxV4NDiiuBcJqNj9qUPNcx+TLHczI2ZJowJogNo7Xxz8UfEUX7W/hVru98a6I10LGaLwFPqtrDdAGPUEMEFpBcm0vYZmhjeW4kd2tiYxvVWYQfbFlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKq1zu6fnfp939dbt7szto15W/4P4/JWSeiZ4Brul6jr/wARvC/iJoPiFpPiC4mm1WTwnP4iSOOCys4Qv2dba0u/sT+fO8J3Tu5JkYM6qqonk/jH4y+P5/2odHs7uLXLC3jubC40/wCFt7cR2uqXkMscqz3UE9jdrb3EcTWm4xXMk8YE0hdovkVPteysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVYWkk+zvb+v+DrqrPVPRqSe7Vv69P+A7rQ+W9c8eau/wC0B4Z1C41bUrq+uS8afCCTWoLXWtKxbO/2sx2N81tdQSeQMLeZVGnyJk4jqj4s+KXxXtv2jfh5Lc+CvHWl+EL7ULkW+gSX+h5u5BpV15kTeTecqjRRzIsrsNzTMXJ8mOP6ysrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVVWsrLv+f8AXW/lZWSHZu/p+H9f1rf5S1/4gak/7SHg29sX8SjWriaf+1/h9/wmFnJqOnwLYTeSj6TBK9p9nldY5TdSzeYsk8Y3qm1RlfFL4tPJ8Y/DFvoXjbV/BXxTnuDPN4F8R6hb38Udp9naGKyXTbS9S2lmuZnimV5LjzEVnkaWONFQfYVlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKq4PibRvFslleHwv4msbDULi8SZG8QaQdQtraERKjQxRwTWz8svmbpJHIZ3H3dio1uvX+rdvPe+umrBpO/wDX3/ptbTXQ+LPhd8TpfE/7b3imxfxFd+C7jxRZ30S6bH4m0m6miuobHTbdCbK3u7uFLmN4Lp1EyMSpx86q6r7l+z/4A13Sfi18Xru6+JXijWrex8WxRXFjfW2lLDqLN4f0oiScw2UbqyiRABC8a4hj3KxMhfmv2dtVl+I/xZ+Kt/aac3hlo7KPw9bXmk6xoV3/AGJHBlY4o7e0efy5mle5nK3QcIUVBvXKr0v7P/gDXdJ+LXxeu7r4leKNat7HxbFFcWN9baUsOos3h/SiJJzDZRurKJEAELxriGPcrEyF7cnKEG0tunXeztur9hyd5NLpp93+W2l1ZfJbHwG8X2Gq/F/466FaeKm13+y/Edu0enzau162nrJYWxljRXdjFH9oFwNgwqsHUAbdo5L9mvxv4a8QfHf4mWfhX4tX/j7SPJgY6ZqGr/2l9nu4yVuZrfAC29uTJCFVTtd/O2AJGoH0pZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqqbTkn2VvwS+7S9vx0CTUk0l1X9er7+qs7nzj+zHrBvvjX8Xo9L8Z3vjfwlIbG6067j8V/8JBp9tKxnWeFWKD7LNlEdrZXdVWRCCF2geB/B/wCIfjv9l74yfET+0fhxrWi/Be3ig1TW9DgvobxPBkdzdXjRXdhawXEwNmyq73McShkIaRUVIxGf0KsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVWe3krf1+nQTs7273Pnn9mzxGNe+L/AMT5rb4iWnxV0y+kh1S11nRNYln07So5C0aaYtsJpbeJ0EPmeYhDyeaS6qNmeU/ZL+JPir4gfHDx7N4h1z+3XeG4efToJLuBfCssV69vHpk1q0pgLtHD5yz+Wkr5lyWTbjc1bSb79ijVb3xD4esrjUfgBezPda34dsomlm8GSuxaXULGJQS2nsxLz2qAmAlpohs8yMfRXhy6t9Vs21iw1v8At3StW8u+sJonhkt0gaGMIIHjUb4m2mUMzOSZWw2zYqqKjBxa6Jr71b8Pv7vV3bd4yXVtP7v8/wCloreT/B7wA3hv4x/EO+tvFni3XtNj8i1a38Qa5cX1tDduizTC3iZvLiVVMRwq5VppFBVAiL5L+x34q1PWf2gvi9b6h478Q+J0ae4nh0rUb83EOmhdQuYfLe2J/wCJfIBGuyH/AJaRnzM4Ijh+vbKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVcfda7JNff+l/66iesWuraf3f1/V2fJX7GeteL9e+Knj6bUfFWr+KdOiWRNXuJ9dtdT0dNTNy3kppYhlkNvGIAzSQPsZWkQFcBMfUOuadcJoXiUmTVNb+1xSPDp1rcR2k0Y8hU+z20yeU0ZZlZxI8m5XlYiRVChNSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVU7uCi3srX/r8Oysug7++593/AMD9Lvu7s+PPhN4c+KvgLw9caZ4t+G3xP8Z6g06XEWpxfEmF9sT28J8ht+ow5eJ98bOECyMhkGPM2gr7Oorvp4uVOCgltpvL/wCSOKWFpSbbS+5f5BVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVbdVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVV4TsCysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVQAsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUALKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVACysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVcHxNo3i2SyvD4X8TWNhqFxeJMjeINIOoW1tCIlRoYo4JrZ+WXzN0kjkM7j7uxU3rKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVwfE2jeLZLK8PhfxNY2GoXF4kyN4g0g6hbW0IiVGhijgmtn5ZfM3SSOQzuPu7FQGjx/4P+G9cv/it8Ur25a+8JyahpGn2dva3g0Y6rpJDXe2S3S0aeNbUly8Qut7GRJdwYA5T9n/wBruk/Fr4vXd18SvFGtW9j4tiiuLG+ttKWHUWbw/pREk5hso3VlEiACF41xDHuViZC/Jfs5fDnxF4W+Pnx3stS+KmjeJNT1ix0+Se80W2tIdU0+6JusEwNcXBj8pZVK/aImVvMjVcRxeXXW/s/wDgDXdJ+LXxeu7r4leKNat7HxbFFcWN9baUsOos3h/SiJJzDZRurKJEAELxriGPcrEyFxWcYtPp/Xr69RN3lL1Pf7Kymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVACysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVQAsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVX5q1bSb79ijVb3xD4esrjUfgBezPda34dsomlm8GSuxaXULGJQS2nsxLz2qAmAlpohs8yMfStlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgFTw5dW+q2baxYa3/bulat5d9YTRPDJbpA0MYQQPGo3xNtMoZmckythtmxVt2VlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqr81atpN9+xRqt74h8PWVxqPwAvZnutb8O2UTSzeDJXYtLqFjEoJbT2Yl57VATAS00Q2eZGPorw5dW+q2baxYa3/bulat5d9YTRPDJbpA0MYQQPGo3xNtMoZmckythtmxVALdlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgFuiiigAqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqtuqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgBZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqoAWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqAFlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgBZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCquD4m0bxbJZXh8L+JrGw1C4vEmRvEGkHULa2hESo0MUcE1s/LL5m6SRyGdx93Yqb1lZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKq4PibRvFslleHwv4msbDULi8SZG8QaQdQtraERKjQxRwTWz8svmbpJHIZ3H3dioDR4n8E9OubP4p/FTw3Z63rvhNNSt11IaBrGuabqOo6fezF1m1CygWa7eC3cmOQLcll8xziML8pt/s/wDgDXdJ+LXxeu7r4leKNat7HxbFFcWN9baUsOos3h/SiJJzDZRurKJEAELxriGPcrEyF/KP2ONC1WD4q/FnSR8R5Jb+6F82qRWfizT9YI1FrpkTULK0Uym1Cxqu9LqMfvHVCrogC+r/ALP/AIA13Sfi18Xru6+JXijWrex8WxRXFjfW2lLDqLN4f0oiScw2UbqyiRABC8a4hj3KxMhdrWnTfdL/AC/4by6LZJ6VJrs/0X9Pz6vd+/2VlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqgCysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVQAsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUALKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVV+atW0m+/Yo1W98Q+HrK41H4AXsz3Wt+HbKJpZvBkrsWl1CxiUEtp7MS89qgJgJaaIbPMjH0rZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqoBU8OXVvqtm2sWGt/27pWreXfWE0TwyW6QNDGEEDxqN8TbTKGZnJMrYbZsVbdlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKq/NWraTffsUare+IfD1lcaj8AL2Z7rW/DtlE0s3gyV2LS6hYxKCW09mJee1QEwEtNENnmRj6K8OXVvqtm2sWGt/27pWreXfWE0TwyW6QNDGEEDxqN8TbTKGZnJMrYbZsVQDWooooAKqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqrbqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqoAWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqAFlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgBZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqoAWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqrg+JtG8WyWV4fC/iaxsNQuLxJkbxBpB1C2toREqNDFHBNbPyy+Zukkchncfd2Km9ZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCquD4m0bxbJZXh8L+JrGw1C4vEmRvEGkHULa2hESo0MUcE1s/LL5m6SRyGdx93YqA0ec/DiPSfEfxF+KFvpXjPTv7SsooNDtLTQbuwluNAiWH52W3VXEJNy0zBblZG3RkEFAEGJ+z/wCANd0n4tfF67uviV4o1q3sfFsUVxY31tpSw6izeH9KIknMNlG6sokQAQvGuIY9ysTIX4T9lzwzqU3xd+LlqlxY6dJbR3emtf6Rq2n38+izS6lezpHaxrJM8aMJTOy3sKsJgyhGjARO7/Z/8Aa7pPxa+L13dfErxRrVvY+LYorixvrbSlh1Fm8P6URJOYbKN1ZRIgAheNcQx7lYmQu/sxfdf19+/wAxS0nJdn+i/wCG+XyPf7Kymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVQBZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqoAWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqAFlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgBZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqvK/Cr4Q+HfgxpWr6R4VjuLDQr7U5tUg0gzFrTTWlVPMhtI+kMBkV5fKX5VeaTaFUhR1VlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgFuiiigAqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqtuqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgBZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqpZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqoAWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqAFlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqllZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgBZWU1rc38st/cXiXMwlihmWMLaqI0Ty49iKSpZGky5dt0jjcFCqvGeOtU1DR7u10rSfiBoGgeJNfvi+l2niqyS8WSKOBRLb2lvFPaySYK+aWaSRlMj/AMJRU7OzsprW4v5JL+4u0uZhLFDMsYS1URonlx7EUlSyNJly7bpHG4KFVfBfGvg/4oR+Jfh9c6qw+Iq2njVdZmm0DTrbSbfRrAadLaeWUuL1pJsyzGYkM7fNKAABGlXBKUkm7f1/XkUlv6P8n/wx53+yV8MtSg8efEkt40ZY9Dt5/DGlwxf2XLrGkpNO07m4MFxdozJKGeM3Khy8k++MLtWu/wD2f/AGu6T8Wvi9d3XxK8Ua1b2Pi2KK4sb620pYdRZvD+lESTmGyjdWUSIAIXjXEMe5WJkL85+zb8B/HXgvxFrS65JqPh+G00e90S21aObT5XuZJr6SdLq1VEYbEGZv9MRn868mXaYwAej/AGf/AABruk/Fr4vXd18SvFGtW9j4tiiuLG+ttKWHUWbw/pREk5hso3VlEiACF41xDHuViZC8r4ILy/V/n8Xle3QmStUnbutfkvy+Hztfqe/2VlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqWVlNa3N/LLf3F4lzMJYoZljC2qiNE8uPYikqWRpMuXbdI43BQqqgCysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVQAsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUsrKa1ub+WW/uLxLmYSxQzLGFtVEaJ5cexFJUsjSZcu26RxuChVUALKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVLKymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVACysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVSysprW5v5Zb+4vEuZhLFDMsYW1URonlx7EUlSyNJly7bpHG4KFVQC3RRRQAUUUUAFFFFABRRRQAUUUUAFFFFAFTVtJsdf0q90zU7K31HTb2F7a6s7uJZYZ4nUq8bowIZWUkFSCCCQa8A/Z/+FVjpPxa+L19e6vrHiJ9E8WxQ6Smt3K3AsS/h/SgZg20PLP5Mi2/nzNJL5SEb909y85RQB9FUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB/9k= Correct ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect Pre-Calc/Chapter 7: Systems and Matrices/7.5 Systems of Inequalities in Two Variables/Write System of Inequalities Given Graph Write a system of inequalities whose solution set is the region shown. Write a system of inequalities whose solution set is the region shown.


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 1.0000000 0.3333333 0 true true abc y ≤ -x2 + 4]]> Correct y ≥ x2 + 4]]> Incorrect y ≥ -x2 + 4]]> Incorrect y ≤ -x2 + 4]]> Incorrect Pre-Calc/Chapter 7: Systems and Matrices/Is College Affordable #10 Using your linear model, determine the cost of Room and Board for the year 2018.

]]> 1.0000000 0.3333333 0 9974.32 50 0 0.1000000 3 0 #3 Describe the typical yearly increase in the cost of room and board during this period.

]]> 1.0000000 0.3333333 0 true true abc 141%

]]> 98%

]]> 120%

]]> 163%

]]> #5 Which expense (tuition or room & board) seems to go up at more of a constant rate of change?

]]> 1.0000000 0.3333333 0 true true abc Room and Board

]]> Tuition and Fees

]]> #9 Using your exponential model, determine the cost of Tuition and Fees for the year 2018.

]]> 1.0000000 0.3333333 0 26521.1 200 0 0.1000000 3 0 Room and Board Trend Describe the trend of Room and Board costs from 1978-2008.

]]> 1.0000000 0.3333333 0 true true abc Except for one 5-year period, there is a steady increase.

]]> There is a constant increase in costs.

]]> Costs sporadically fluctuate up and down.

]]> There is no observable pattern.

]]> Total College Cost Looking at the future, what would the total cost be for attending four years of college if the tuition and fees cost is ${tuitionfees} and the room and board cost is ${roomboard} per year?

]]> 1.0000000 0.3333333 0 0 0 abc 0 4*({tuitionfees}+{roomboard}) 2 1 1 2 0 0.1000000 0 1 1 $ private tuitionfees calculatedsimple uniform 1.0 10.0 1 90 1 13042.57 2 15823.30 3 18690.40 4 22311.34 5 22514.25 6 26654.47 7 16415.40 8 16650.61 9 29864.07 10 13990.85 11 27080.41 12 27231.14 13 20670.28 14 16832.91 15 22278.29 16 21237.97 17 13747.42 18 25605.72 19 25163.34 20 28307.86 21 13844.87 22 17916.07 23 22870.30 24 23259.95 25 23643.53 26 27805.47 27 16324.74 28 14850.42 29 28333.07 30 18190.02 31 18865.15 32 27580.05 33 16847.84 34 21269.93 35 18565.63 36 16366.78 37 13379.58 38 28828.97 39 14751.87 40 24514.91 41 29904.50 42 24598.52 43 20316.34 44 19788.98 45 20905.48 46 29546.30 47 26833.30 48 15779.31 49 17313.81 50 16779.45 51 15698.46 52 21492.15 53 17275.61 54 21486.46 55 13527.84 56 23108.95 57 25930.13 58 13956.01 59 27409.24 60 20669.96 61 22490.79 62 14527.60 63 24851.29 64 15335.50 65 28374.02 66 21458.71 67 22853.64 68 13300.90 69 22128.88 70 14480.05 71 25853.73 72 17976.19 73 27461.35 74 23697.11 75 14910.79 76 21969.66 77 24288.62 78 24375.97 79 13051.14 80 16752.98 81 18554.92 82 21808.19 83 27911.75 84 25094.45 85 25591.41 86 21384.53 87 27689.29 88 13375.69 89 25349.32 90 20946.20 90 private roomboard calculatedsimple uniform 1.0 10.0 1 90 1 10122.12 2 15557.48 3 15527.53 4 12388.41 5 14940.37 6 11161.38 7 19376.39 8 17381.27 9 12989.85 10 13742.92 11 18960.91 12 16075.63 13 9396.34 14 15816.92 15 13766.54 16 10518.27 17 13451.37 18 15054.64 19 13509.25 20 13169.99 21 16777.46 22 11785.30 23 19087.21 24 18317.04 25 13530.22 26 11526.88 27 19453.12 28 18048.62 29 19496.74 30 19787.48 31 10622.34 32 9646.20 33 11516.74 34 18004.95 35 17114.93 36 9974.77 37 18454.68 38 10199.02 39 9986.57 40 16047.48 41 15175.27 42 13822.14 43 11920.14 44 17218.35 45 17193.30 46 13609.92 47 13864.04 48 14735.91 49 14982.07 50 16505.84 51 10688.98 52 9622.82 53 13325.11 54 12068.25 55 18750.99 56 16993.59 57 12214.52 58 19388.60 59 11004.56 60 17339.29 61 19760.05 62 17229.23 63 18448.17 64 14972.34 65 15591.20 66 16137.38 67 9419.90 68 12710.00 69 18091.79 70 11709.75 71 16721.18 72 18085.52 73 12423.65 74 19549.82 75 9015.24 76 16364.25 77 14373.57 78 10974.69 79 19573.10 80 16910.21 81 13213.36 82 16062.48 83 15922.19 84 13932.43 85 13500.87 86 14442.84 87 17057.79 88 16532.66 89 17536.70 90 11570.54 90 Tuition and Fees Trend  Describe the trend in tuition and fees from 1978-2008

]]> 1.0000000 0.3333333 0 true true abc Costs have constantly increased over each 5-year period.

]]> Except for one 5-year period, cost have increased.

]]> Costs have increased, except for private universities.

]]> There is no observable pattern

]]> Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.1 Conic Sections and Parabolas/8.1.1 Find Vertex, Fous, Directrix, and Focal Width Find the vertex, focus, directrix, and focal width of the parabola.- x2 = y Find the vertex, focus, directrix, and focal width of the parabola.

x2 = y]]> 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 1.0000000 0.3333333 0 true true abc Vertex: (0, 0); Focus: (0, -10); Directrix: y = 10; Focal width: 40 Correct Vertex: (0, 0); Focus: (-20, 0); Directrix: x = 10; Focal width: 160 Incorrect Vertex: (0, 0); Focus: (0, 10); Directrix: y = -10; Focal width: 10 Incorrect Vertex: (0, 0); Focus: (0, -10); Directrix: y = 10; Focal width: 160 Incorrect Find the vertex, focus, directrix, and focal width of the parabola.x = 7y2 Find the vertex, focus, directrix, and focal width of the parabola.

x = 7y2]]> 1.0000000 0.3333333 0 true true abc ; Directrix: x = - ; Focal width: 0.14]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAmACIDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD73/Z/e58SfCqy+JLRRX/izxxp0WvM13KU8qCZWnsdO80K22G2inEIZEAZvOnMYknk3a3wI8c694+8Hajd+JF04avYa7qmkSNpUMkUDi1vJYFYK7uwJEYJy3UngdKzP2Vllb9lH4PiB0jmPgrRwjyIXVW+ww4JUEZGe2R9RV74G/DTxJ8L9H1yx8QeJdK8SHUdXu9Xjk0zRpNO8mS6nknmUh7qfeu+TC4KkAYO481ceW0r/L7ym1yW63/Cz/Wx6XXj/wC0DezfC3Sm+L2lWFxeXHhiEy+IbGwaNJtW0RFkM0ZMjqha2MjXkRb58wywoyC7lJ674reLdT8I+Grd9Egtp9b1LULXS7I3wY28Uk8qoZZApDMsaln2AqW2bQy7tw8U+K3jHxPq/wCzj+0p4a8XvpF3rXh3wxqcQ1HRbeS1t7yCbSnmjf7PJLK0TDcyEeY4OzcCM7Rmmn+Xz0dvuafp6Ml6O39ddfwZ9O0UUUwPmz4X/DTw54//AGOPg7c6v8OvDXxH1fTPA2ltpWn+JLWB4xI9jb7lWWWKTyQxRNzKp4UcHAFO+Ffw70zwz4w168t/2ffht4W8QeHrQSWWqeCnhnmNzLGwNsJZLCz8tjEwLYcjbKoON1dh+zO9/H+yF8KW0qK2n1RfAukm0ivJWigeb+z4tgkdVZlUtjJCsQMkA9K7z4deFbjwf4Ss7G/ul1DWJN1zqd+q7RdXkhLzSAdlLkhV/hQKo4UVO7a/r+v+AD2/r+v6fYxPF3gHXvHvw60uw1DXLTSfGFlLaaimq6baM1nHfwOsgPkPJueAsCpQyBmRiNynBHmvxm8Cal4R/ZZ/aB1HxBrNtr/iTXPDGr3V7e2Ng1jbgJpjxRRRQtLKyKqRg/NI5LM5yAQo+iq8q/ax/wCTWPjJ/wBiZrP/AKQzVfey3d/np+iSD+v6+/7z1WiiikB5V8FP+KFvNV+Er/vo/CNla3Wk3Ef3Bo1zNdx2FswPzCW3WzktySXMiQxSs5eaRI/VaKKACvH/AImaTY/Gnx/D8MdTsre78MaPDYeJfElnfxLLDqsUkt0thZhMcqLmyNxKxIGLaKIrKlxL5ZRQB7BRRRQB/9k=/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAmAA0DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9Bvid488T+DvH/wAOLGwg0lvDniDWf7JvXuRK92WNpdTgxAFUjC/Zl5bfu8wjam3Lem15j8X/AIZeKfiBr/gi/wBB8T6RoEHhrVP7XMGo6HLftczeRNAF3pdwBE2XEnG1ju2nIAKt6dV+7yLvqVNptW7fjd/pY+Wfil8DPCfgya/uvD/7Mnwg1vQ7WCIpc6osFjc3Vw7FRBDBFpdxuJYxqpZ13M4GOM19E+B/DGl+DfCem6Ro3h/TfCthBHuXRtIhjitbV3JeRUWNVXG9nJIUZJJxk1l634Y1fxB8RNEvLqW0XwnpED3cVqrsZ7jUWJRGkUrtEUUZcr8xLPIGIXylLdjWa21Je9v6/r/g9gooopgf/9k= Incorrect ; Directrix: x = ; Focal width: 28]]> 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 Incorrect ; Directrix: x = - ; Focal width: 0.14]]> 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 Correct ; Directrix: y = - ; Focal width: 28]]> 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 Incorrect Find the vertex, focus, directrix, and focal width of the parabola.x2 = 8y Find the vertex, focus, directrix, and focal width of the parabola.

x2 = 8y]]> 1.0000000 0.3333333 0 true true abc Vertex: (0, 0); Focus: (0, -2); Directrix: x = -2; Focal width: 32 Incorrect Vertex: (0, 0); Focus: (2, 0); Directrix: x = 2; Focal width: 2 Incorrect Vertex: (0, 0); Focus: (2, 0); Directrix: y = 2; Focal width: 32 Incorrect Vertex: (0, 0); Focus: (0, 2); Directrix: y = -2; Focal width: 8 Correct Find the vertex, focus, directrix, and focal width of the parabola.y2 = -32x Find the vertex, focus, directrix, and focal width of the parabola.

y2 = -32x]]> 1.0000000 0.3333333 0 true true abc Vertex: (0, 0); Focus: (-8, 0); Directrix: y = 8; Focal width: 128 Incorrect Vertex: (0, 0); Focus: (-8, 0); Directrix: x = 8; Focal width: 32 Correct Vertex: (0, 0); Focus: (8, 0); Directrix: x = -8; Focal width: 8 Incorrect Vertex: (0, 0); Focus: (0, -8); Directrix: y = 8; Focal width: 128 Incorrect Find the vertex, focus, directrix, and focal width of the parabola.y2 = 16x Find the vertex, focus, directrix, and focal width of the parabola.

y2 = 16x]]> 1.0000000 0.3333333 0 true true abc Vertex: (0, 0); Focus: (4, 0); Directrix: x = -4; Focal width: 64 Incorrect Vertex: (0, 0); Focus: (0, 4); Directrix: y = -4; Focal width: 4 Incorrect Vertex: (0, 0); Focus: (4, 0); Directrix: x = -4; Focal width: 16 Correct Vertex: (0, 0); Focus: (4, 4); Directrix: x = 4; Focal width: 64 Incorrect Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.1 Conic Sections and Parabolas/8.1.2 Find Equation of Parabola from Graph Find an equation that matches the parabola's graph. Find an equation that matches the parabola's graph.


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 1.0000000 0.3333333 0 true true abc x2]]> 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Correct x2]]> 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 Incorrect y2]]> 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 Incorrect y2]]> 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 Incorrect Find an equation that matches the parabola's graph. Find an equation that matches the parabola's graph.


]]> 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 1.0000000 0.3333333 0 true true abc 2]]> Incorrect 2]]> Incorrect 2]]> Incorrect 2]]> Correct Find an equation that matches the parabola's graph. Find an equation that matches the parabola's graph.


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 1.0000000 0.3333333 0 true true abc 2]]> Incorrect 2]]> Incorrect 2]]> Incorrect 2]]> Correct Find an equation that matches the parabola's graph. Find an equation that matches the parabola's graph.


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 1.0000000 0.3333333 0 true true abc x2]]> 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 Incorrect x2]]> 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 Incorrect y2]]> 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 Correct y2]]> 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 Incorrect Find an equation that matches the parabola's graph. Find an equation that matches the parabola's graph.


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tHbacBdZ2OwMUq7JpDckIWcEDNavxI0m+/a18ffD210CyuLD4deDPEGn+No/HMsTeTqt9aSsBp9vbyCJ5IJYZ1mTUImlgYDau85IAPmv9l/9qbxV8NdV1DU7f4EfFjXPBPjmGTxprF5pvg+W4mfxJetE05sHEqxnSzEmYt5abJBLMDW/8Rv22/HHiv4BfG7RPG3wD+KGjf2lZa5ZaHqNt4Nngs7XSpLVkt5dQklmOyVdztMyAoFGVHBr9Fa8q/ax/wCTWPjJ/wBiZrP/AKQzUAfFXwa/av1z4UfAL4RaJ8Lf2aviB/zCJfFWow+A3+x6ra/ZUS9vbOS3lXzrmXZG0cso2uvLdq9V/wCG+vHH/C0/+TcvjB/wrb+xf+hGn/tj+1fP/wCu/k/ZvJ/4Hv8A9mvQP+CeF1eXX7LHhD7X8R9P+I3l2VnHD/Z9tbw/2DGLG226VL5LNvlg53PJiQ7xuA4r6VoA+KvAH7fXjj/io/8AhNv2cvjB/wAhq5/sP+wPA0//ACCvl+z/AGrzZ/8Aj5+/v2fJ93b3rK039vr4p/8ACK+PP7Q/Zy+KH/CSfbb/AP4RD7N4Guvsf2XYPsP9obp9/m78+d5Py7fuc191UUAfCupft9fFP/hFfAf9n/s5fFD/AIST7bYf8Jf9p8DXX2P7LsP27+z9s+/zd+PK875dv3+a1f8Ahvrxx/wtP/k3L4wf8K2/sX/oRp/7Y/tXz/8Arv5P2byf+B7/APZr7VooA+FdN/b6+Kf/AAivjz+0P2cvih/wkn22/wD+EQ+zeBrr7H9l2D7D/aG6ff5u/PneT8u37nNGpft9fFP/AIRXwH/Z/wCzl8UP+Ek+22H/AAl/2nwNdfY/suw/bv7P2z7/ADd+PK875dv3+a+6qKAPir/hvrxx/wALT/5Ny+MH/Ctv7F/6Eaf+2P7V8/8A67+T9m8n/ge//Zo/4b68cf8AC0/+TcvjB/wrb+xf+hGn/tj+1fP/AOu/k/ZvJ/4Hv/2a+1aKAPhXTf2+vin/AMIr48/tD9nL4of8JJ9tv/8AhEPs3ga6+x/Zdg+w/wBobp9/m78+d5Py7fuc1q6L+238U/Ff/CqtE0/4B/EDRvEmpa1pVl4v1HX/AAbdQaPa2smEvpbWRZi6bXYMjTAqEDFxkV9q0UAfKv7Av/Nxv/ZZvEf/ALb1q/G34TfFPxl+0n8LPiF4b0jwfPovw+/tX7PBqniK6tbjUvt1nHA29U0+VYPLZWIw0m8Y+4TgZX7Av/Nxv/ZZvEf/ALb19VUAfJX7Tn7KXir40eIdf/4R/RPhvolxqs2kXNj8Ro7SW08V6FLbXETTyLIkTm7by4EETLNalQShyFDn61oooAKKKKACvlX9vr/m3L/ss3hz/wBuK+qq+Vf2+v8Am3L/ALLN4c/9uKAPqqiiigAooooAKKKKACiiigDivGvwQ+HXxK1WLU/F/gHwv4q1KKEW0d5rejW15MkQZmEYeRGIUM7nbnGWJ7muq0nSbHQNKstM0yyt9O02yhS2tbO0iWKGCJFCpGiKAFVVAAUAAAACrdFABXlX7WP/ACax8ZP+xM1n/wBIZq9Vryr9rH/k1j4yf9iZrP8A6QzUAcp+whpmn6Z+yx8Pv7P8E/8ACFfaNF0+4uP3FnF/a8zWNvu1D/RpH3ebgfNNtmOz50XjP0BXzV/wTwury6/ZY8Ifa/iPp/xG8uys44f7PtreH+wYxY223SpfJZt8sHO55MSHeNwHFfStABRRRQAUUUUAFFFFABRRRQAUUUUAfKv7Av8Azcb/ANlm8R/+29fVVfKv7Av/ADcb/wBlm8R/+29fVVABRRRQAUUUUAFfKv7fX/NuX/ZZvDn/ALcV9VV8q/t9f825f9lm8Of+3FAH1VRRRQAUUUUAFFFFABRRRQAUUUUAFeVftY/8msfGT/sTNZ/9IZq9Vryr9rH/AJNY+Mn/AGJms/8ApDNQB5//AME8PE3w88S/sseEP+Few6fD/Z9lZ2HiH+z9NNnu1lLG2+1NLmNPOlOY90w3BuPmOK+la+f/ANhD/hOP+GWPh9/wm3/CP/8AIF0/+w/7A8//AJBX2G3+z/avN/5efv79nyfd296+gKACiiigAooooAKKKKACiiigAooooA+Vf2Bf+bjf+yzeI/8A23r6qr5V/YF/5uN/7LN4j/8AbevqqgAooooAKKKKACvlX9vr/m3L/ss3hz/24r6qr5K/4KIatY6BpX7P2p6ne2+nabZfGDw/c3V5dyrFDBEi3LPI7sQFVVBJYkAAEmgD61oryr/hrH4If9Fk+H//AIVFj/8AHaP+Gsfgh/0WT4f/APhUWP8A8doA9Voryr/hrH4If9Fk+H//AIVFj/8AHaP+Gsfgh/0WT4f/APhUWP8A8doA9Voryr/hrH4If9Fk+H//AIVFj/8AHaP+Gsfgh/0WT4f/APhUWP8A8doA9Voryr/hrH4If9Fk+H//AIVFj/8AHaP+Gsfgh/0WT4f/APhUWP8A8doA9Voryr/hrH4If9Fk+H//AIVFj/8AHaP+Gsfgh/0WT4f/APhUWP8A8doA9Vryr9rH/k1j4yf9iZrP/pDNR/w1j8EP+iyfD/8A8Kix/wDjtcV8b/j58HviV8F/H3hDTPjT8N4NS1/w/qGlWst34qs1hSWe2kiRnKyMQoZwSQCcZwD0oAqf8E8PFngzxX+yx4Q/4Q3WdQ1n+zbKz03Wf7Qur2f7LqcdjbfaLeL7UTsiXcm1IcQjJ2Dk19K18lfspfHzwr8NfgvonhD4lfGn4Lz6loEMGlabL4V8VRNC+nwW0MUTTGeRSZyySFioC424A5Fewf8ADWPwQ/6LJ8P/APwqLH/47QB6rRXlX/DWPwQ/6LJ8P/8AwqLH/wCO0f8ADWPwQ/6LJ8P/APwqLH/47QB6rRXlX/DWPwQ/6LJ8P/8AwqLH/wCO0f8ADWPwQ/6LJ8P/APwqLH/47QB6rRXlX/DWPwQ/6LJ8P/8AwqLH/wCO0f8ADWPwQ/6LJ8P/APwqLH/47QB6rRXlX/DWPwQ/6LJ8P/8AwqLH/wCO0f8ADWPwQ/6LJ8P/APwqLH/47QB6rRXlX/DWPwQ/6LJ8P/8AwqLH/wCO0f8ADWPwQ/6LJ8P/APwqLH/47QB5V+wL/wA3G/8AZZvEf/tvX1VXyV/wTv1ax1/Sv2gdT0y9t9R029+MHiC5tby0lWWGeJ1tmSRHUkMrKQQwJBBBFfWtABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFcVrvxo8FeGvih4Z+HOo+ILeDxt4khnudM0VUeSaWKFHd5G2qREu2OTa0hUOY3C7ipAqeKfgf4c8Ya7davf6l4wt7u42749L8a6zp9uNqhRsgt7uOJOFGdqjJyTkkk+VfG34TfFPxl+0n8LPiF4b0jwfPovw+/tX7PBqniK6tbjUvt1nHA29U0+VYPLZWIw0m8Y+4TgAHoHjf9qP4YfDnxVf+HvEHib7Ff6b9i/tSaOwup7PSftb7LX7ddxxNBZ+YcEee6fKQ33SCfVa+AP2of8AgnD4k+O/xl+IfiKz13TxovjT+xZFe71O5t/7EntAkE1x9hjhaO/l+zJKsRkmgCfa51IztkH3/QAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf//Z 1.0000000 0.3333333 0 true true abc 2 - 2]]> Incorrect 2 - 2]]> Incorrect 2 + 2]]> Incorrect 2 - 2]]> Correct Find an equation that matches the parabola's graph. Find an equation that matches the parabola's graph.


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 1.0000000 0.3333333 0 true true abc 2 + 2]]> Incorrect 2 - 2]]> Correct 2 - 2]]> Incorrect 2 - 2]]> Incorrect Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.1 Conic Sections and Parabolas/8.1.3 Find Equation for Parabola Given Conditions Find the standard form of the equation of the parabola.Focus at (-4, 7), ... Find the standard form of the equation of the parabola.

Focus at (-4, 7), directrix y = 5]]> 1.0000000 0.3333333 0 true true abc 2 = 4(y - 7)]]> Incorrect 2 = 4(y - 6)]]> Incorrect 2 = 4(y - 6)]]> Correct 2 = 4(x + 4)]]> Incorrect Find the standard form of the equation of the parabola.Focus at (0, 3), ... Find the standard form of the equation of the parabola.

Focus at (0, 3), directrix y = -3]]> 1.0000000 0.3333333 0 true true abc 2 = 3x]]> Incorrect x2]]> 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 Incorrect x2]]> 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 Correct 2 = 12x]]> Incorrect Find the standard form of the equation of the parabola.Focus at (4, -9), ... Find the standard form of the equation of the parabola.

Focus at (4, -9), directrix x = 2]]> 1.0000000 0.3333333 0 true true abc 2 = 4(x - 4)]]> Incorrect 2 = 4(x - 3)]]> Correct 2 = 4(y - 3)]]> Incorrect 2 = 4(y + 9)]]> Incorrect Find the standard form of the equation of the parabola.Focus at (7, 0), ... Find the standard form of the equation of the parabola.

Focus at (7, 0), directrix x = -7]]> 1.0000000 0.3333333 0 true true abc y2]]> 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 Correct 2 = 28x]]> Incorrect x2]]> 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 Incorrect 2]]> Incorrect Find the standard form of the equation of the parabola.Vertex at (-9, 4), ... Find the standard form of the equation of the parabola.

Vertex at (-9, 4), opens to the right, focal width = 12]]> 1.0000000 0.3333333 0 true true abc 2 = 12(x + 9)]]> Correct 2 = -12(x + 9)]]> Incorrect 2 = 12(y - 4)]]> Incorrect 2 = 3(x + 9)]]> Incorrect Find the standard form of the equation of the parabola.Vertex at (7, -8), ... Find the standard form of the equation of the parabola.

Vertex at (7, -8), opens downward, focal width = 8]]> 1.0000000 0.3333333 0 true true abc 2 = 8(x - 7)]]> Incorrect 2 = -2(y + 8)]]> Incorrect 2 = 8(y + 8)]]> Incorrect 2 = -8(y + 8)]]> Correct Find the standard form of the equation of the parabola.Vertex at the origin, ... Find the standard form of the equation of the parabola.

Vertex at the origin, focus at (10, 0)]]> 1.0000000 0.3333333 0 true true abc 2 = 40y]]> Incorrect 2 = 40x]]> Incorrect y2]]> 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 Correct x2]]> 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 Incorrect Find the standard form of the equation of the parabola.Vertex at the origin, ... Find the standard form of the equation of the parabola.

Vertex at the origin, focus at (0, -7)]]> 1.0000000 0.3333333 0 true true abc x2]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAmABMDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9QfEbasui3X9hLZNqxXFudRZxAhJALuEBZgoy20Y3YC7kzuHLfAjx1qPxN+DPgvxZq8VrDqes6VBe3MdkjJCsjoCwRWZmC5PALE+5rrNeg1K50a8i0a7tLDVHiK21zfWrXUET9meJZI2cf7IdSfUVx3wH+HOrfCP4WaD4O1fXLLxE+jW6WdvfWWmvYhoEUKgeNp5svwcsGAORhRjmo25ZX30/W/6FXXLbrc9AoooqST5e+K/wa+HHw2V9Ytv2avhrrPhCx8k6le/2dZQ36I8iq7W1qLN1m2BtxDzRMcEKGOM8x4h0H4N6f8U9V8KaV+zx8MdWg0XULDT9SR7Gxg1cm6VHWe1sPsbCeFVclnMsZ/czbVITLe1fEnSvifrHjixk0fw74U1vwhp/lXMFrqfie606We8VgyyzJHp04ZY2AMaB8bhvbJCbOR8Zfs+6/wCLfH13qVxonhK5mudSt9Qs/HNzdTf29oUUfklrS0QW/KZikAYXESn7Q5eJ/nWUhrKN9ru/TqtPuv29b2RUrK/ovl5/116WPoyiiigkKKKKACiiigD/2Q== Correct 2 = -7x]]> Incorrect 2 = -28x]]> Incorrect x2]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAmAA0DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9Bvid488T+DvH/wAOLGwg0lvDniDWf7JvXuRK92WNpdTgxAFUjC/Zl5bfu8wjam3Lem15j8X/AIZeKfiBr/gi/wBB8T6RoEHhrVP7XMGo6HLftczeRNAF3pdwBE2XEnG1ju2nIAKt6dV+7yLvqVNptW7fjd/pY+Wfil8DPCfgya/uvD/7Mnwg1vQ7WCIpc6osFjc3Vw7FRBDBFpdxuJYxqpZ13M4GOM19E+B/DGl+DfCem6Ro3h/TfCthBHuXRtIhjitbV3JeRUWNVXG9nJIUZJJxk1l634Y1fxB8RNEvLqW0XwnpED3cVqrsZ7jUWJRGkUrtEUUZcr8xLPIGIXylLdjWa21Je9v6/r/g9gooopgf/9k= Incorrect Find the standard form of the equation of the parabola.Vertex at the origin, ... Find the standard form of the equation of the parabola.

Vertex at the origin, opens downward, focal width = 16]]> 1.0000000 0.3333333 0 true true abc 2 = 16x]]> Incorrect 2 = -4x]]> Incorrect 2 = 16y]]> Incorrect 2 = -16y]]> Correct Find the standard form of the equation of the parabola.Vertex at the origin, ... Find the standard form of the equation of the parabola.

Vertex at the origin, opens to the left, focal width = 2]]> 1.0000000 0.3333333 0 true true abc 2 = 2x]]> Incorrect 2 = -2x]]> Correct 2 = 2y]]> Incorrect 2 = -0.5x]]> Incorrect Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.1 Conic Sections and Parabolas/8.1.4 Graph Parabola Given Equation Graph the parabola.4y = x2 Graph the parabola.

4y = x2
]]> 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KIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUALdFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHzV41+I+uWH7U/hHTV8F6hc+JIvDPiS1023iLtp17HLfaM0Fy98ItkESpE5nDr5kTIURJzLam5+laKKACiiigAooooAKKKKACiiigAooooAKKKKAP/2Q== Correct ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect Graph the parabola.4y = -x2 Graph the parabola.

4y = -x2
]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect ]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCADIAMgDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6KKqSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAW6KqSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAW6KqSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAW6KqSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAW6KqSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAW6KqSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAfOvjX4ca5f/ALU/hHUl8aahbeJJfDPiS6024iDrp1lHFfaMsFs9iJdk8TJK4nLt5krOXR4DFai29pvvi34G0zWrrR7zxp4etNXtJoLe4sJ9VgSeGWc4gjeMvuVpDwgIy3bNeLeNda+KcX7U/hH7B4N8H3Pl+GfEken/AGnxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM6vWPhddeKf2l9P8UNpWpaVoelaaq3t217ALTXLpG3WWLdC0hNsZrtjJJ5WGZAokXlFrzRXTr/AF/Wo+jZ7VRVSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lGIt0VUkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAt0VUkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAt0VUkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAt0VUkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAt0UUUAFVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUt1UkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPK/2rtauNA+AfxBvjqI0GxtfDd/cprVvrM2nXdtfIqGzWJo9pIeTIJ81TkImyQStt8Gm+KniHWP2mPCseleJ5b63vE0FtIsrXXJWg1DTJoZTe3C2ar5N0n/Hwz3LOWha2tlXPnEV9mySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpcZWtps0/u6ej2flddSpO9Nw8mvvtr8rXXnr01+dfGutfFOL9qfwj9g8G+D7ny/DPiSPT/tPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kp86+Nda+KcX7U/hH7B4N8H3Pl+GfEken/AGnxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUgkJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAC3RRRQAVUkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJS3VSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPnXxrrXxTi/an8I/YPBvg+58vwz4kj0/7T4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KfOvjXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAt0UUUAFVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUt1UkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lPn74i+Jru3/AGs/ANjbeLdL1ezeF7S48F2OuXdnqmnyFHlXUJLWCYx3cDKpRhcxqseIyjFnIoV3JRXX/Jv+v8gekW+xW8a618U4v2p/CP2Dwb4PufL8M+JI9P8AtPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kp86+Nda+KcX7U/hH7B4N8H3Pl+GfEken/afFt1D9otft2jZlmxpj+TKMQ4iXzFO+T94Ng8z6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAC3RRRQAVUkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJS3VSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPnXxrrXxTi/an8I/YPBvg+58vwz4kj0/7T4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KfOvjXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAt0UUUAFVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUt1UkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAD518a618U4v2p/CP2Dwb4PufL8M+JI9P+0+LbqH7Ra/btGzLNjTH8mUYhxEvmKd8n7wbB5n0VJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnzr411r4pxftT+EfsHg3wfc+X4Z8SR6f8AafFt1D9otft2jZlmxpj+TKMQ4iXzFO+T94Ng8z6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAC3RRRQB81fDjxr8b7/xV40XUvCPg+bxJBeiObSL3xzfW8VlYB5RYvbwLpTo0UqB3NyGZpZBKjmI24tbY1rxr8b4vj74NsP+ER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSfStYPirxbZ+CoG1bXb/SNE8K20Dvfaxquoi1W2k3xLCvzrs2Nvky7SKVZYwFfeShsG54RrXjX43xfH3wbYf8ACI+D4fP8M65P/Zcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJDWvGvxvi+Pvg2w/4RHwfD5/hnXJ/7Lj8c332O42XWkr50p/soYlj8zag8tsrPN8yYxInxG/aY8ReE9b8dXOg/8Iz4o8J2nhHT9e0K/tWlLNc3d1JaxLI8bulxblo2lMieUVXC4fJdfSvg5498TeMl1ey1220mW60DVL7R9S1LTjLbpPPEYXgeG2fzCqPFMxfdMSjxgDzA+5L5Wm097X+V7fm1945Lks31svvXMvvV/u9DzbWvGvxvi+Pvg2w/4RHwfD5/hnXJ/wCy4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSGteNfjfF8ffBth/wiPg+Hz/AAzrk/8AZcfjm++x3Gy60lfOlP8AZQxLH5m1B5bZWeb5kxiT6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJSBHzrrXjX43xfH3wbYf8Ij4Ph8/wzrk/wDZcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJDWvGvxvi+Pvg2w/4RHwfD5/hnXJ/wCy4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KeI/Gj9oO/0a2vIfhrcaB4ouNFmdfFVzaXEeq3XhqJCMyzaZFcQyzDCzBlSVZFKDbHLlgqbt/X4+i6voNJvYw9a8a/G+L4++DbD/AIRHwfD5/hnXJ/7Lj8c332O42XWkr50p/soYlj8zag8tsrPN8yYxIa141+N8Xx98G2H/AAiPg+Hz/DOuT/2XH45vvsdxsutJXzpT/ZQxLH5m1B5bZWeb5kxiT6A06/vb46XNCtneaXcWbTTX6SvG5lPlmLy4SrAo6tKxJkBTagAfeSlqSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lKatoSndXR866141+N8Xx98G2H/CI+D4fP8ADOuT/wBlx+Ob77HcbLrSV86U/wBlDEsfmbUHltlZ5vmTGJOU8U/Hf4zwftNeEvC+j/D3w/4gv4tF1KPVNI0fxzcCwsxJcaUwuruWbTok82BJEPkxLNOI73fsVZE833Xxb4t8ReJfGR8FeCjb26Qwt/wkPioyB20FmETQwQwtG0c93LE7uFdtsC+VLLHIssUU/V+G/DcPgq203Q9D023t/D0MM7yzSXcj3P2hpFfc29WM7Ss9xJLPJL5hkwzeYZWZUM+f9f1/4wn9pLwLJJ4F8DrqS+EvEKwW6+NLwwvEbzRfMdpP7JBVlYRBVCMGDuSybAH5XVv2jfizpn7SXhXw/wCJfBXhfwHcXGmavZadpuu+PpodN8QSNeaalvPBOmnMkk+RIsVvtNwFmlLpCGQTdr411r4pxftT+EfsHg3wfc+X4Z8SR6f9p8W3UP2i1+3aNmWbGmP5MoxDiJfMU75P3g2DzPf9b03+3fM0i/0rT9U8N39lcQahHetv8zdsUQmAxlJYnRpt5Zhjao2uHJQA8A1rxr8b4vj74NsP+ER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSGteNfjfF8ffBth/wiPg+Hz/DOuT/ANlx+Ob77HcbLrSV86U/2UMSx+ZtQeW2Vnm+ZMYk9A+1ap8C/wB7rOt6h4j+HZ4k1TVnWW88OAcIZ5goaexChQ1xKXnhYGWeSaJ5JbX0qSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAD511rxr8b4vj74NsP+ER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSGteNfjfF8ffBth/wiPg+Hz/DOuT/ANlx+Ob77HcbLrSV86U/2UMSx+ZtQeW2Vnm+ZMYk+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU8p8b/Erxp4e+Pngzw4mlW2mfDvVIJIp/EN1Ztdvd6kctFZReVcKbbMaSuZpo2QlVReWzSvql3/r+vPQOjfY4vWvGvxvi+Pvg2w/4RHwfD5/hnXJ/7Lj8c332O42XWkr50p/soYlj8zag8tsrPN8yYxIa141+N8Xx98G2H/CI+D4fP8M65P8A2XH45vvsdxsutJXzpT/ZQxLH5m1B5bZWeb5kxiT6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJRgfOuteNfjfF8ffBth/wiPg+Hz/DOuT/ANlx+Ob77HcbLrSV86U/2UMSx+ZtQeW2Vnm+ZMYkNa8a/G+L4++DbD/hEfB8Pn+Gdcn/ALLj8c332O42XWkr50p/soYlj8zag8tsrPN8yYxJ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAfOuteNfjfF8ffBth/wiPg+Hz/AAzrk/8AZcfjm++x3Gy60lfOlP8AZQxLH5m1B5bZWeb5kxiQ1rxr8b4vj74NsP8AhEfB8Pn+Gdcn/suPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEjfFXx6+Imj+LfEvhqytvDM0qeMrHwxpurz2t1ts1ure0uY2ntVkP2grFLcguJ4AXjiAXEh2eq/Bn4hax8TPA3hzXrvTbG2W6t7qLUnhuXBjvIJxBiGMod0TlJ23M4ZAsY2vvYpXK7X9PxSf5Nff6jknBqL6q/yvZP52f3anlnxH8a/G+w8VeC103wj4Ph8ST3pjh0iy8c31xFe2BeIXz3EDaUiLFEhRxcllaKQxIhlNwbW5KP2mv2j9Y+C/xH8I6VZeJ/B2k6HfxJNrX9vafcz3OmW7XcUC3haO4jTyWeURAMAQ/z5ZFk8srahQliE5Q6O2zf5JnPVq+ylytX+79Wj6VqpJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSluqkkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95Kc5uefeJ/gR4W8WeONZ1jVdEfU4vEOiSaNrElzrt7seBWTyYEstxgC4e4fzV2PG/KhjK7L0fg3wVZ/Dq1tND8PabHDoGLm6ubq61Ge4vXunlV9ztKHecyb5meWSXcCiDDhiU3pJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUd3sNtvf8Arp+WgSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kohBJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnLfET4cWHxNlsdM1u2u5/D6wztciy1+909pHPlqsMkFuyLcwuhm3iV9o2qNjiRinUySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koDvYaBd2+oWlvb2lquki3k8yXziksUimMRIkQQqyFTKSxdSpRAFfeSnA/FXxb4ii8Q+HvBHhM29trfiKGe4fU5JB5um2VvcWi3dykbxtG7LFcsse4ti4ktt0MsJneHq/GPi2HwLpWo+INXNvaeE9J0y71LVNSaSRprZYVV/lgSNjIvlidmIYMDGgVH3kpynwq8N+IrDVdX8TeIdNt7fV/E8011eiW7D3GmW8TJHpunoqq6lVgMsswWdo0uprlot6T7kBHV+G/DcPgq203Q9D023t/D0MM7yzSXcj3P2hpFfc29WM7Ss9xJLPJL5hkwzeYZWZdWSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAD518a618U4v2p/CP2Dwb4PufL8M+JI9P+0+LbqH7Ra/btGzLNjTH8mUYhxEvmKd8n7wbB5n0VJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnzr411r4pxftT+EfsHg3wfc+X4Z8SR6f8AafFt1D9otft2jZlmxpj+TKMQ4iXzFO+T94Ng8z6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU8q8JSX3wj+KFn4A+z248Ba7Dd3vhq4+0NGNJlhS23aLHGUIZWU3d1CBLlIo5okhSG1U16rJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnK/FbwVffEbwzd+HreW30xJoftdprbM0k2m6pbzwz6fOtttCTrHNH5zK8iqTCiFXWRtgB1Ukl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KcnqXwz03Uvibpfim4tLm9ktIZJEkudevTBa3AVY4mi04sbXcY5LgNNhXXCgB/MYo74d+Pr7x3bb5dJt9LuLCa803XLOS9Z57HUIJEVERPKUyQTRs08cr+UzQyWz+Vif931Ukl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KHW4eQSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KAHmeqfs6+ENT13X3n0e7ubTxLcJqurXsnibUVuI9Qt3hNpJaoJMQFVVh5kLxMghiQKyn933Phzw7D4LstF8PaDpVnY+F7CyaBAtw4lgZDGIUWMod6splLSNIGBReH3syackl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KO7tYbbk7st0UUUhBVSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lLdVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUqa3rf8Awj/mX9/Jp9h4btLK4u9Q1S9vfJ+yeXsYEgps8rZ5zPI0i7PLX5WDkoAcB4//AOLifFPw54ET5tK0T7N4u8Qdt3lzt/ZNv/Cw33dvJc742O3+y/LkXZcjPpUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95Kea/AbTdci0KXxFqmlfY7vxle3viTUTfs9vf23mNFHpltLa+XtSWLT47eCYBl2SWv/LYyPLXpUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSlbV7/AFPT5GltdKGp2cdpPM8cFyqXck67PKhijcLG28GXLvLGFKoMEOzJ84az8QtX1r9pj4deferpyzxS2d18OLjxAbbW9Lk2vImozW9heTW13buiEETgCP8AdlSWcrQk3JRXX/J/5fq9AekXLt/X9fhqXvGutfFOL9qfwj9g8G+D7ny/DPiSPT/tPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kp86+Nda+KcX7U/hH7B4N8H3Pl+GfEken/afFt1D9otft2jZlmxpj+TKMQ4iXzFO+T94Ng8z6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPNdf/4tl8ZdN8QL+58N+NPL0bVsfLFbaqgP2C7b7qJ56b7OSRyzySLpUKDANelSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpz/xD8Hf8LE0K+8MXqfZ9F1GylWTVLS68u/sLpWja1ntQYmUSxtumSYsGikghKqxJKZXwf8AHWuePvCGjX+pWOnx3cP2/S9cmtJXRE1WyuzZzi1iZWLWzzQXTI7yK4RYcoS7eWAdrJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KAFuiiigAqpJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSluqkkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KeVfHWS+8X+IfBnwxtLe3lsfE0z6jrU8lwwaLS7C4tZbmNrcpsuILkyR2UqGVWC3oby5oxKF9VkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJTyr4aSX3jb4ueMvGr29vdaFbTXHhbRr17hg0MVm8S3RigZCVaW/8At8M0m+MOul2OI5FxLQB6rJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAfOvjXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU+dfGutfFOL9qfwj9g8G+D7ny/DPiSPT/tPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnmtv/AMW//aCmtU/d6L8QLKS/ZpPkSPWbKOCEqrtnzJbmy8siEFQiaPLIqsXlZfSpJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU8/+OvhvxF4j8MwTeG9Nt77V9Dmi8QacRdiC7lvbWeKRbKFmXbEt5B9rtJJzIvlpOQUlSR1AB6BJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSmV4X8Ww+N9K8PeINANvqHhPWtMXUoNSaSSKZlkWJ7bbA0YJV43kZizIyFUGxt7FNWSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUALdFFFABVSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lLdVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQA5X4s+Pr74ZeDda8RwaTb6xb6fplzPDZm9aG5vtQzGtlYwoInDtcSMYgQdwkMSrHIZPlPhd4Kvvhl4N8KeFBLb6xb6fphj1PXZGaG5vtQzGZLlodrh2uJGuZ5ZGl3CQjPmGRnXlPi7JfeKvi58LPASW9u+hXE134s1l5rhkaSLS3tTawxqqElvt93YT53oNto6neshQ+qySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgB86+Nda+KcX7U/hH7B4N8H3Pl+GfEken/afFt1D9otft2jZlmxpj+TKMQ4iXzFO+T94Ng8z6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJT518a618U4v2p/CP2Dwb4PufL8M+JI9P8AtPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgB5V8C5L7wvqvin4d/Z7cab4X1O6a0lluGhmGn3TR3enpb2mwhbSJZ7uxRhIFB0rai8skHqskl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95Kea+Kv8Aijf2gvBWtx/JaeMLK48KXqR/M811bxzahp7sG4SKKGPWVJQhme6iDK4AaL0qSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUALdFFFABVSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lLdVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJTK8Y6r4i0bStRu9A0C38RXFvpl3cwWLaiLSa6vUVTbWyloyirKfMDSs48shPlcMxQA8/+Fcl94q+LnxD8ax29u+hXEy+FrO9W4ZGki0t2UkQFCS32+71mF5GdBttLfZG6yGU+qySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpyvwu8FX3wy8G+FPCglt9Yt9P0wx6nrsjNDc32oZjMly0O1w7XEjXM8sjS7hIRnzDIzr1Ukl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgB4V+1P8AEDWtG+GvxKs5ND1fw14fsPC19fRePI9eg09E1BEjNnDAIbgXO5pGZSWWMbo1QCRZePJ5vip4h1j9pjwrHpXieW+t7xNBbSLK11yVoNQ0yaGU3twtmq+TdJ/x8M9yzloWtrZVz5xFfZskl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KXGVrabNP1t0fk9n5etypO8HDya++2vytdeevQ+dfGutfFOL9qfwj9g8G+D7ny/DPiSPT/tPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kp86+Nda+KcX7U/hH7B4N8H3Pl+GfEken/afFt1D9otft2jZlmxpj+TKMQ4iXzFO+T94Ng8z6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJSCQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPP/j/AOG/EXiz4d6pZ+HdNt9R1KyhTXNMjkuxE02r2Fzb3mnW7IyhGglmg2ysZYyqgBT85ePq/C/i2HxvpXh7xBoBt9Q8J61pi6lBqTSSRTMsixPbbYGjBKvG8jMWZGQqg2NvYpqySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kp5/8HPDfiLwFbaj4VudNt08Mabqeof2TqBuwrNZSyR3NpBDaqrCKCBbm4swpkXaunxFI9kwEQB6BJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAW6KKKACiiigAooooAKKKKACiiigAooooAKKKKAPmrxr8R9csP2p/COmr4L1C58SReGfElrptvEXbTr2OW+0ZoLl74RbIIlSJzOHXzImQoiTmW1Nz9K0UUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf//Z Correct Graph the parabola.x = y2 Graph the parabola.

x = y2
]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect  ]]> 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 Correct Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.1 Conic Sections and Parabolas/8.1.6 Solve Apps: Parabolas Parabolic Focus A radio telescope has a parabolic surface.  If it is #a m deep and 12 m wide, how far is the focus from the vertex?  (round to tenths)

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mn>36</mn><mo>.</mo><mn>0</mn></mrow><mrow><mn>4</mn><mo>*</mo><mi>a</mi></mrow></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Solve the problem. 20 m 1 mA radio telescope has a parabolic surface. If it ... Solve the problem.



 20 m
 1 m


A radio telescope has a parabolic surface. If it is 1 m deep and 20 m wide, how far is the focus from the vertex?]]> 1.0000000 0.3333333 0 true true abc 5 m Incorrect 100 m Incorrect 1 m Incorrect 25 m Correct Solve the problem. 39 m  10 mA tunnel is in the shape of a parabola. The ... Solve the problem.




 39 m 

 10 m
A tunnel is in the shape of a parabola. The maximum height is 39 m and it is 10 m wide at the base. What is the vertical clearance 4 m from the edge of the tunnel?]]> 1.0000000 0.3333333 0 true true abc 1.6 m Incorrect 37.4 m Correct 2.3 m Incorrect 36.7 m Incorrect Solve the problem. 58 ft 28 ftA building has an entry the shape of a ... Solve the problem.




 58 ft
 28 ft

A building has an entry the shape of a parabolic arch 58 ft high and 28 ft wide at the base. Find an equation for the parabola if the vertex is put at the origin of the coordinate system.]]> 1.0000000 0.3333333 0 true true abc 2 = -13.5x]]> Incorrect 2 = -3.4y]]> Correct 2 = -3.4x]]> Incorrect 2 = -13.5y]]> Incorrect Solve the problem.A domed ceiling is a parabolic surface. For the best ... Solve the problem.

A domed ceiling is a parabolic surface. For the best lighting on the floor, a light source is to be placed at the focus of the surface. If 3 m down from the top of the dome the ceiling is 18 m wide, find the best location for the light source.]]> 1.0000000 0.3333333 0 true true abc 6.8 m down from the top Correct 20.4 m down from the top Incorrect 13.6 m down from the top Incorrect 27 m down from the top Incorrect Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.2 Ellipses/8.2.1 Find Center, Vertices, Foci of Ellipse Find the center, vertices, and foci of the ellipse with the given equation. Find the center, vertices, and foci of the ellipse with the given equation.

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 +  = 1]]> 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 1.0000000 0.3333333 0 true true abc Center: (-3, 5); Vertices: (-5, 5), (15, 5); Foci: (-3, -3), (-3, 13) Incorrect Center: (-3, 5); Vertices: (-3, -5), (-3, 15); Foci: (-3, 5), (13, 5) Incorrect Center: (-3, 5); Vertices: (-3, -5), (-3, 15); Foci: (-3, -1), (-3, 11) Correct Center: (-3, 5); Vertices: (-5, 5), (15, 5); Foci: (-1, -3), (11, -3) Incorrect Find the center, vertices, and foci of the ellipse with the given equation.... Find the center, vertices, and foci of the ellipse with the given equation.

9x2 + 4y2 = 36]]> 1.0000000 0.3333333 0 true true abc ; Foci: ]]> 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 Correct ; Foci: ]]> 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 Incorrect ; Foci: ]]> 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 Incorrect ; Foci: ]]> 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Incorrect Find the center, vertices, and foci of the ellipse with the given equation.... Find the center, vertices, and foci of the ellipse with the given equation.

2x2 + 8y2 = 16]]> 1.0000000 0.3333333 0 true true abc ; Foci: ]]> 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Incorrect ; Foci: ]]> 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i+PvxE8NWH+i6D/Yuj+IV09P9VHf3l1qqXcyD+DzfskLsq4UyeZJjzJZXf1WiigQUUUUAVNT0mx1q2S31Cyt7+3SaG5WK5iWRVlikWWKQBgQGSREdW6qyqRggGrdFFAHmn7Q+rX2k/DaJbC9uLB9R8QaDo889pK0M32W81eztLlUkUh42aGeVRIhV0LBkZWVWHoGk6TY6BpVlpmmWVvp2m2UKW1rZ2kSxQwRIoVI0RQAqqoACgAAAAUUUAf/2Q==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 Incorrect ; Foci: ]]> 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 Correct ; Foci: ]]> 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Incorrect Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.2 Ellipses/8.2.2 Find Equation of Ellipse from Graph Match the given graph with its equation. Match the given graph with its equation.


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1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Correct  +  = 1]]> 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Incorrect Match the given graph with its equation. Match the given graph with its equation.


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 1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect  +  = 1]]> 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Correct Match the given graph with its equation. Match the given graph with its equation.


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 1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Correct  +  = 1]]> 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Incorrect Match the given graph with its equation. Match the given graph with its equation.


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 1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Correct Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.2 Ellipses/8.2.3 Graph Ellipse from Equation Graph the ellipse. +  = 1 Graph the ellipse.

 +  = 1
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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Correct Graph the ellipse. +  = 1 Graph the ellipse.

 +  = 1
]]> 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q063bW/s93JZXMkeib4R9rRXgD3G0r5p8ksiZRgg+0/OGJjK5X9p6f8A8I55/wDwm3+jf219n/tbz7P/AF39o+X/AGfu8vy/9b/oW3b538O/zv3lAHV0Vk211bv4q1G3XW/tF3HZW0kmib4T9kRnnCXG0L5o84q6Zdih+zfIFIkLZWmanp82j+CZYvG39oQ3nl/YtQ8+zP8AwkebOVxykYR9yK1z/owj/wBTkYiDoQDq6K5TU9T0+HR/G0svjb+z4bPzPtuoefZj/hHMWcTnl4yibUZbn/SRJ/rsnMRRBq3N1bp4q063bW/s93JZXMkeib4R9rRXgD3G0r5p8ksiZRgg+0/OGJjKgGtRXKf2np//AAjnn/8ACbf6N/bX2f8Atbz7P/Xf2j5f9n7vL8v/AFv+hbdvnfw7/O/eVznjn4nS+Cfin4S0WCWDV4vEd1Bpd1p7ahHFLpBaG9nhu1gWBpJFn+yzxkySqo+zL5a583LScnZDSbvb1+7U9D1aO+m0q9j0y4t7PUnhdbW4u7dp4YpSp2O8auhdQ2CVDoSAQGXOR8/fALwBeeFPit8YL618Xavdw2/iyKDWE124N2uoqfD+lyicDKpbTLNIx3QqsXlM0PlbY7Y27PBP7QWm+P7fV9PuvHcPhDSdGiKWfia91C2g1PW4fsVww1B7e509LcW7JFLeRzW5eJxaliBEssR85+B3jrwdJ8Rfi9s/aj+1+brUlxF/xNPDh+3wp4esPM1D5bMZ+z7JPmj2wj7F+8Rts2+U+aKkuourXY+q/DXxY8EeNLu2tfD3jLw/rtzdRSzwQ6ZqkFw8scb7JHRUYllRyFYjgE4ODXVV4D8C/hv/AMIn8SvEevX9xqnhibW5L+bRvAmqX9lObazM1vJdXCJDvKA3UruVjmZFF0m/5mRY/U/7T0//AIRzz/8AhNv9G/tr7P8A2t59n/rv7R8v+z93l+X/AK3/AELbt87+Hf537ymvhTe9v6/4PncHu0dXRWTbXVu/irUbddb+0XcdlbSSaJvhP2RGecJcbQvmjzirpl2KH7N8gUiQtlaZqenzaP4Jli8bf2hDeeX9i1Dz7M/8JHmzlccpGEfcitc/6MI/9TkYiDoQDq6K5TU9T0+HR/G0svjb+z4bPzPtuoefZj/hHMWcTnl4yibUZbn/AEkSf67JzEUQatzdW6eKtOt21v7PdyWVzJHom+Efa0V4A9xtK+afJLImUYIPtPzhiYyoBrUVyn9p6f8A8I55/wDwm3+jf219n/tbz7P/AF39o+X/AGfu8vy/9b/oW3b538O/zv3lattdW7+KtRt11v7Rdx2VtJJom+E/ZEZ5wlxtC+aPOKumXYofs3yBSJCwBrUVymmanp82j+CZYvG39oQ3nl/YtQ8+zP8AwkebOVxykYR9yK1z/owj/wBTkYiDodXRrq3uNR15Idb/ALVkgvVjntN8Lf2Y/wBnhYW+I1DLlWSfEpZ/9IyDsKKoBrUUUUAFZN1c64lnrbW+nafLdw7v7Kilv3RLv9ypXz3EJMGZi6HYs2EVX5LGNdauU1P+yP7H8bef/wAJB9m/ef2l9l/tHz/+POLd9g8v95/qtmPsX/LbzNv77zKAOgkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJSp9p1z+zt/wDZ2n/b/tvl+R9vfyvsv2jb5vmeTnzfs/7zytm3zP3fmbf31Fz9j/4SrTt/9ofb/sVz5Xl/aPsfl74PM83b+483Pl7PM/ebfO8v5fOrK/4lH/COf8zB9j/tr/qI/avtP9o/9/vs3nf9u/2f/p2oA6COS+Oq3EclvbrpqwxNBcLcMZnlLSeYjR7AFVVERVg7Fi7gqmwF6lrc649nojXGnafFdzbf7Viiv3dLT9yxbyHMIM+JgiDesOUZn4KiNi2+x/8ACVajs/tD7f8AYrbzfM+0fY/L3z+X5W79x5ufM3+X+82+T5ny+TWVpn9kf2P4J8j/AISD7N+7/s37V/aPn/8AHnLt+3+Z+8/1W/P23/lt5e7995dAGrdXOuJZ621vp2ny3cO7+yopb90S7/cqV89xCTBmYuh2LNhFV+SxjW3JJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnP6n/ZH9j+NvP/4SD7N+8/tL7L/aPn/8ecW77B5f7z/VbMfYv+W3mbf33mVq3P2P/hKtO3/2h9v+xXPleX9o+x+Xvg8zzdv7jzc+Xs8z95t87y/l86gA+065/Z2/+ztP+3/bfL8j7e/lfZftG3zfM8nPm/Z/3nlbNvmfu/M2/vq5P4g/DG5+I/izwveXGs6hoNh4XvYtYsH0me3Z7y72TRSR3EU1rJtjWKTCtHIC3nyZCGNGOv8A8Sj/AIRz/mYPsf8AbX/UR+1faf7R/wC/32bzv+3f7P8A9O1att9j/wCEq1HZ/aH2/wCxW3m+Z9o+x+Xvn8vyt37jzc+Zv8v95t8nzPl8mmm07oabW39XOA8NfD/xV4Umn8TyXreMfGmpWS21zFr2qxQWunokc0qW1tLa6dH5kf2l0QySQiQxsXOTGsTef/BXWvim3xF+NXm+DfB6bvEyyXOzxbdN5V0PD2l+TEmdMG+JtsG6U7WTzJMRyeWvmeq6z/wjn/CvdC+0/wDCYf2P9ib7L9i/tn+0/L+wTZ+0eV/pfm+T5mPP/eef5WP9I8qvmr4Hf8K6/wCFi/F7yv8AhcH/ACGpPs/nf8Jl/wAe3/CPWHm+dv8A+Xn/AF3leb/pH/Hv5P8Ay70ulhPVts+ypJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUqfadc/s7f/AGdp/wBv+2+X5H29/K+y/aNvm+Z5OfN+z/vPK2bfM/d+Zt/fUXP2P/hKtO3/ANofb/sVz5Xl/aPsfl74PM83b+483Pl7PM/ebfO8v5fOrK/4lH/COf8AMwfY/wC2v+oj9q+0/wBo/wDf77N53/bv9n/6dqAOgjkvjqtxHJb266asMTQXC3DGZ5S0nmI0ewBVVREVYOxYu4KpsBepa3OuPZ6I1xp2nxXc23+1Yor93S0/csW8hzCDPiYIg3rDlGZ+CojYtvsf/CVajs/tD7f9itvN8z7R9j8vfP5flbv3Hm58zf5f7zb5PmfL5NZWmf2R/Y/gnyP+Eg+zfu/7N+1f2j5//HnLt+3+Z+8/1W/P23/lt5e7995dAGrdXOuJZ621vp2ny3cO7+yopb90S7/cqV89xCTBmYuh2LNhFV+SxjW3JJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnP6n/ZH9j+NvP8A+Eg+zfvP7S+y/wBo+f8A8ecW77B5f7z/AFWzH2L/AJbeZt/feZWrc/Y/+Eq07f8A2h9v+xXPleX9o+x+Xvg8zzdv7jzc+Xs8z95t87y/l86gA+065/Z2/wDs7T/t/wBt8vyPt7+V9l+0bfN8zyc+b9n/AHnlbNvmfu/M2/vqtxyXx1W4jkt7ddNWGJoLhbhjM8paTzEaPYAqqoiKsHYsXcFU2Avz/wDxKP8AhHP+Zg+x/wBtf9RH7V9p/tH/AL/fZvO/7d/s/wD07Vq232P/AISrUdn9ofb/ALFbeb5n2j7H5e+fy/K3fuPNz5m/y/3m3yfM+XyaAC1udcez0RrjTtPiu5tv9qxRX7ulp+5Yt5DmEGfEwRBvWHKMz8FRG1uykvnub9bu3t4LdJgtm8Nw0jTReWhLyKUURt5hkXaC42qjbgWKJz+mf2R/Y/gnyP8AhIPs37v+zftX9o+f/wAecu37f5n7z/Vb8/bf+W3l7v33l1q6N9j/ALR177N/aHnfbV+1fbftHleZ9nhx9n835PK2eXnyP3fmebn975tAGtRRRQAVk3Vtrj2etrb6jp8V3Nu/sqWWwd0tP3KhfPQTAz4mDudjQ5RlTgqZG1q5TU9M0+bR/G0Uvgn+0IbzzPtun+RZn/hI82cSHh5Aj7kVbb/STH/qcHEQRyAdBJHfHVbeSO4t101YZVnt2t2Mzylo/LdZN4CqqiUMpRixdCGTYQ9T7Nrn9nbP7R0/7f8AbfM8/wCwP5X2X7Ru8ry/Oz5v2f8Ad+bv2+Z+88vb+5oubW3fxVp1w2ifaLuOyuY49b2Qn7IjPAXt9xbzR5xVHwilD9m+cqRGGyv7M0//AIRzyP8AhCf9G/tr7R/ZPkWf+u/tHzP7Q2+Z5f8Arf8ATd27zv4tnnfu6AOgjjvhqtxJJcW7aa0MSwW627CZJQ0nmO0m8hlZTEFUIpUo5LPvASpa22uJZ6ItxqOny3cO3+1ZYrB0S7/csG8hDMTBmYo43tNhFZOSwkUtrW3TxVqNwuifZ7uSyto5Nb2Qj7WivOUt9wbzT5JZ3w6hB9p+QsTIFytM0zT4dH8ExReCf7Phs/L+xaf5FmP+EcxZyoOEkKJtRmtv9GMn+uwMxF3ABq3Vtrj2etrb6jp8V3Nu/sqWWwd0tP3KhfPQTAz4mDudjQ5RlTgqZGtyR3x1W3kjuLddNWGVZ7drdjM8paPy3WTeAqqolDKUYsXQhk2EPz+p6Zp82j+NopfBP9oQ3nmfbdP8izP/AAkebOJDw8gR9yKtt/pJj/1ODiII51bm1t38VadcNon2i7jsrmOPW9kJ+yIzwF7fcW80ecVR8IpQ/ZvnKkRhgA+za5/Z2z+0dP8At/23zPP+wP5X2X7Ru8ry/Oz5v2f935u/b5n7zy9v7mrccd8NVuJJLi3bTWhiWC3W3YTJKGk8x2k3kMrKYgqhFKlHJZ94Cc//AGZp/wDwjnkf8IT/AKN/bX2j+yfIs/8AXf2j5n9obfM8v/W/6bu3ed/Fs8793WrbWtunirUbhdE+z3cllbRya3shH2tFecpb7g3mnySzvh1CD7T8hYmQKAVb2y8VP4esIbTWdHg11ISt5ezaRLJbTS/Z3UPHALlWjXzzHJtMrny1ePcGYSp4V8FdF+Ka/EX41eb4y8Hvt8TLHc7PCV0vm3R8PaX5MqZ1M7Il3QbojuZ/LkxJH5i+X6rrOhaPcfD3QrKb4W/2rp0Fk0cHhX7Lprf2Yn2CaM2+ySYW65jZ7PETsn+kbSfJLuvzV8DvAvg6P4i/F7Z+y59k8rWpLeL/AIlfhwfYIX8PWHmaf8t4cfaN8nyx7oT9t/eOu6bYAfZUkd8dVt5I7i3XTVhlWe3a3YzPKWj8t1k3gKqqJQylGLF0IZNhD1Ps2uf2ds/tHT/t/wBt8zz/ALA/lfZftG7yvL87Pm/Z/wB35u/b5n7zy9v7mi5tbd/FWnXDaJ9ou47K5jj1vZCfsiM8Be33FvNHnFUfCKUP2b5ypEYbK/szT/8AhHPI/wCEJ/0b+2vtH9k+RZ/67+0fM/tDb5nl/wCt/wBN3bvO/i2ed+7oA6COO+Gq3EklxbtprQxLBbrbsJklDSeY7SbyGVlMQVQilSjks+8BKlrba4lnoi3Go6fLdw7f7VlisHRLv9ywbyEMxMGZijje02EVk5LCRS2tbdPFWo3C6J9nu5LK2jk1vZCPtaK85S33BvNPklnfDqEH2n5CxMgXK0zTNPh0fwTFF4J/s+Gz8v7Fp/kWY/4RzFnKg4SQom1Ga2/0Yyf67AzEXcAGrdW2uPZ62tvqOnxXc27+ypZbB3S0/cqF89BMDPiYO52NDlGVOCpka3JHfHVbeSO4t101YZVnt2t2Mzylo/LdZN4CqqiUMpRixdCGTYQ/P6npmnzaP42il8E/2hDeeZ9t0/yLM/8ACR5s4kPDyBH3Iq23+kmP/U4OIgjnVubW3fxVp1w2ifaLuOyuY49b2Qn7IjPAXt9xbzR5xVHwilD9m+cqRGGAD7Nrn9nbP7R0/wC3/bfM8/7A/lfZftG7yvL87Pm/Z/3fm79vmfvPL2/uatxx3w1W4kkuLdtNaGJYLdbdhMkoaTzHaTeQyspiCqEUqUcln3gJz/8AZmn/APCOeR/whP8Ao39tfaP7J8iz/wBd/aPmf2ht8zy/9b/pu7d538Wzzv3datta26eKtRuF0T7PdyWVtHJreyEfa0V5ylvuDeafJLO+HUIPtPyFiZAoAWttriWeiLcajp8t3Dt/tWWKwdEu/wBywbyEMxMGZijje02EVk5LCRbdlHfJc37Xdxbz27zBrNIbdo2hi8tAUkYuwkbzBI24BBtZF2kqXfn9M0zT4dH8ExReCf7Phs/L+xaf5FmP+EcxZyoOEkKJtRmtv9GMn+uwMxF3Gro1rb2+o688Oif2VJPerJPd7IV/tN/s8Ki4zGxZsKqQZlCv/o+ANgRmANaiiigArlNT1PT4dH8bSy+Nv7Phs/M+26h59mP+EcxZxOeXjKJtRluf9JEn+uycxFEHV1k3VzriWettb6dp8t3Du/sqKW/dEu/3KlfPcQkwZmLodizYRVfksY1AC5urdPFWnW7a39nu5LK5kj0TfCPtaK8Ae42lfNPklkTKMEH2n5wxMZXK/tPT/wDhHPP/AOE2/wBG/tr7P/a3n2f+u/tHy/7P3eX5f+t/0Lbt87+Hf537yugkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJSp9p1z+zt/8AZ2n/AG/7b5fkfb38r7L9o2+b5nk5837P+88rZt8z935m399QAW11bv4q1G3XW/tF3HZW0kmib4T9kRnnCXG0L5o84q6Zdih+zfIFIkLZWmanp82j+CZYvG39oQ3nl/YtQ8+zP/CR5s5XHKRhH3IrXP8Aowj/ANTkYiDoegjkvjqtxHJb266asMTQXC3DGZ5S0nmI0ewBVVREVYOxYu4KpsBepa3OuPZ6I1xp2nxXc23+1Yor93S0/csW8hzCDPiYIg3rDlGZ+CojYAytT1PT4dH8bSy+Nv7Phs/M+26h59mP+EcxZxOeXjKJtRluf9JEn+uycxFEGrc3VunirTrdtb+z3cllcyR6JvhH2tFeAPcbSvmnySyJlGCD7T84YmMqXVzriWettb6dp8t3Du/sqKW/dEu/3KlfPcQkwZmLodizYRVfksY1tySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAc/8A2np//COef/wm3+jf219n/tbz7P8A139o+X/Z+7y/L/1v+hbdvnfw7/O/eVq211bv4q1G3XW/tF3HZW0kmib4T9kRnnCXG0L5o84q6Zdih+zfIFIkLH2nXP7O3/2dp/2/7b5fkfb38r7L9o2+b5nk5837P+88rZt8z935m399VuOS+Oq3EclvbrpqwxNBcLcMZnlLSeYjR7AFVVERVg7Fi7gqmwFwDitZ13R7f4e6FezfFL+ytOnsmkg8VfatNX+00+wTSG43yQm3bEaveZiRU/0fcR5IdG+avgd468HSfEX4vbP2o/tfm61JcRf8TTw4ft8KeHrDzNQ+WzGfs+yT5o9sI+xfvEbbNv8ArW9vfFSeHrCa00bR59deEteWU2ryx20Mv2d2CRzi2ZpF88Rx7jEh8tnk2llET+FfBXWvim3xF+NXm+DfB6bvEyyXOzxbdN5V0PD2l+TEmdMG+JtsG6U7WTzJMRyeWvmAHv8Ac3VunirTrdtb+z3cllcyR6JvhH2tFeAPcbSvmnySyJlGCD7T84YmMrlf2np//COef/wm3+jf219n/tbz7P8A139o+X/Z+7y/L/1v+hbdvnfw7/O/eV0Ekl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KVPtOuf2dv8A7O0/7f8AbfL8j7e/lfZftG3zfM8nPm/Z/wB55Wzb5n7vzNv76gAtrq3fxVqNuut/aLuOytpJNE3wn7IjPOEuNoXzR5xV0y7FD9m+QKRIWytM1PT5tH8EyxeNv7QhvPL+xah59mf+EjzZyuOUjCPuRWuf9GEf+pyMRB0PQRyXx1W4jkt7ddNWGJoLhbhjM8paTzEaPYAqqoiKsHYsXcFU2AvUtbnXHs9Ea407T4rubb/asUV+7pafuWLeQ5hBnxMEQb1hyjM/BURsAZWp6np8Oj+NpZfG39nw2fmfbdQ8+zH/AAjmLOJzy8ZRNqMtz/pIk/12TmIog1bm6t08Vadbtrf2e7ksrmSPRN8I+1orwB7jaV80+SWRMowQfafnDExlS6udcSz1trfTtPlu4d39lRS37ol3+5Ur57iEmDMxdDsWbCKr8ljGtuSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lADn/7T0//AIRzz/8AhNv9G/tr7P8A2t59n/rv7R8v+z93l+X/AK3/AELbt87+Hf537ytW2urd/FWo26639ou47K2kk0TfCfsiM84S42hfNHnFXTLsUP2b5ApEhY+065/Z2/8As7T/ALf9t8vyPt7+V9l+0bfN8zyc+b9n/eeVs2+Z+78zb++q3HJfHVbiOS3t101YYmguFuGMzylpPMRo9gCqqiIqwdixdwVTYC4Bz+manp82j+CZYvG39oQ3nl/YtQ8+zP8AwkebOVxykYR9yK1z/owj/wBTkYiDodXRrq3uNR15Idb/ALVkgvVjntN8Lf2Y/wBnhYW+I1DLlWSfEpZ/9IyDsKKpa3OuPZ6I1xp2nxXc23+1Yor93S0/csW8hzCDPiYIg3rDlGZ+Coja3ZSXz3N+t3b28FukwWzeG4aRpovLQl5FKKI28wyLtBcbVRtwLFEALdFFFABXKan/AGR/Y/jbz/8AhIPs37z+0vsv9o+f/wAecW77B5f7z/VbMfYv+W3mbf33mV1dZN1ba49nra2+o6fFdzbv7KllsHdLT9yoXz0EwM+Jg7nY0OUZU4KmRgAufsf/AAlWnb/7Q+3/AGK58ry/tH2Py98Hmebt/cebny9nmfvNvneX8vnVlf8AEo/4Rz/mYPsf9tf9RH7V9p/tH/v99m87/t3+z/8ATtXQSR3x1W3kjuLddNWGVZ7drdjM8paPy3WTeAqqolDKUYsXQhk2EPU+za5/Z2z+0dP+3/bfM8/7A/lfZftG7yvL87Pm/Z/3fm79vmfvPL2/uaAC2+x/8JVqOz+0Pt/2K283zPtH2Py98/l+Vu/cebnzN/l/vNvk+Z8vk1laZ/ZH9j+CfI/4SD7N+7/s37V/aPn/APHnLt+3+Z+8/wBVvz9t/wCW3l7v33l10Ecd8NVuJJLi3bTWhiWC3W3YTJKGk8x2k3kMrKYgqhFKlHJZ94CVLW21xLPRFuNR0+W7h2/2rLFYOiXf7lg3kIZiYMzFHG9psIrJyWEigGVqf9kf2P428/8A4SD7N+8/tL7L/aPn/wDHnFu+weX+8/1WzH2L/lt5m3995latz9j/AOEq07f/AGh9v+xXPleX9o+x+Xvg8zzdv7jzc+Xs8z95t87y/l86i6ttcez1tbfUdPiu5t39lSy2Dulp+5UL56CYGfEwdzsaHKMqcFTI1uSO+Oq28kdxbrpqwyrPbtbsZnlLR+W6ybwFVVEoZSjFi6EMmwhwDn/+JR/wjn/MwfY/7a/6iP2r7T/aP/f77N53/bv9n/6dq1bb7H/wlWo7P7Q+3/YrbzfM+0fY/L3z+X5W79x5ufM3+X+82+T5ny+TR9m1z+ztn9o6f9v+2+Z5/wBgfyvsv2jd5Xl+dnzfs/7vzd+3zP3nl7f3NW4474arcSSXFu2mtDEsFutuwmSUNJ5jtJvIZWUxBVCKVKOSz7wEAOK1n/hHP+Fe6F9p/wCEw/sf7E32X7F/bP8Aafl/YJs/aPK/0vzfJ8zHn/vPP8rH+keVXzV8Dv8AhXX/AAsX4veV/wALg/5DUn2fzv8AhMv+Pb/hHrDzfO3/APLz/rvK83/SP+Pfyf8Al3r61vbLxU/h6whtNZ0eDXUhK3l7NpEsltNL9ndQ8cAuVaNfPMcm0yufLV49wZhKnhXwV0X4pr8RfjV5vjLwe+3xMsdzs8JXS+bdHw9pfkypnUzsiXdBuiO5n8uTEkfmL5YB7/c/Y/8AhKtO3/2h9v8AsVz5Xl/aPsfl74PM83b+483Pl7PM/ebfO8v5fOrK/wCJR/wjn/MwfY/7a/6iP2r7T/aP/f77N53/AG7/AGf/AKdq6CSO+Oq28kdxbrpqwyrPbtbsZnlLR+W6ybwFVVEoZSjFi6EMmwh6n2bXP7O2f2jp/wBv+2+Z5/2B/K+y/aN3leX52fN+z/u/N37fM/eeXt/c0AFt9j/4SrUdn9ofb/sVt5vmfaPsfl75/L8rd+483Pmb/L/ebfJ8z5fJrK0z+yP7H8E+R/wkH2b93/Zv2r+0fP8A+POXb9v8z95/qt+ftv8Ay28vd++8uugjjvhqtxJJcW7aa0MSwW627CZJQ0nmO0m8hlZTEFUIpUo5LPvASpa22uJZ6ItxqOny3cO3+1ZYrB0S7/csG8hDMTBmYo43tNhFZOSwkUAytT/sj+x/G3n/APCQfZv3n9pfZf7R8/8A484t32Dy/wB5/qtmPsX/AC28zb++8ytW5+x/8JVp2/8AtD7f9iufK8v7R9j8vfB5nm7f3Hm58vZ5n7zb53l/L51F1ba49nra2+o6fFdzbv7KllsHdLT9yoXz0EwM+Jg7nY0OUZU4KmRrckd8dVt5I7i3XTVhlWe3a3YzPKWj8t1k3gKqqJQylGLF0IZNhDgHP/8AEo/4Rz/mYPsf9tf9RH7V9p/tH/v99m87/t3+z/8ATtWrbfY/+Eq1HZ/aH2/7Fbeb5n2j7H5e+fy/K3fuPNz5m/y/3m3yfM+XyaPs2uf2ds/tHT/t/wBt8zz/ALA/lfZftG7yvL87Pm/Z/wB35u/b5n7zy9v7mrccd8NVuJJLi3bTWhiWC3W3YTJKGk8x2k3kMrKYgqhFKlHJZ94CAHP6Z/ZH9j+CfI/4SD7N+7/s37V/aPn/APHnLt+3+Z+8/wBVvz9t/wCW3l7v33l1q6N9j/tHXvs39oed9tX7V9t+0eV5n2eHH2fzfk8rZ5efI/d+Z5uf3vm0WttriWeiLcajp8t3Dt/tWWKwdEu/3LBvIQzEwZmKON7TYRWTksJFt2Ud8lzftd3FvPbvMGs0ht2jaGLy0BSRi7CRvMEjbgEG1kXaSpdwC3RRRQBUj1axm1W40yO9t31K2hiuZ7NZVM0UUjSLHIyZyqu0MoViMExuBnaccVrus+E7fw18Upr3QtPudO0/zv8AhIreWSwCanjTYJH88ySiNc2zRRH7W0XyIpbEOx281+Hn7P3jzwzqviyyu/i944gS71OTVY9btbfw+41MTs2FmEmmvKs8CRxwkEmLykt/KKLm2t/NPHXwO8XSfDb9qNP+FveIJ/tH2z9xdT+HooL/AD4csV/0+T7Gv2XOPLPz2+IUjk+Xf5zgH1re3ukp4/0a0msLeTXZdMvpbW+ZrfzobdZbQTxqGcTFXd7csY0MeYk8xlYxB+f/ALZ8J/8ACF/af7C0/wDsf/hJvsv2PzLDyv7R/tnyvtOfN8rzftn7/G7z/M42faP3VeVa18FfFzfH3wbL/wALq8YPt8M64v2yRPDy3kWbrST5cUP9nDfE23Lv5bbGjhG+PzNsnn//AAo7xd/wpfyv+FveIP8Akpvm/ZfP8PfZf+Ry3+f5v2P/AI+f+W3keZ/x8fufJ/5d6APrWyvdJfx/rNpDYW8euxaZYy3V8rW/nTW7S3YgjYK5mCo6XBUyII8yv5bMwlCc/oWs+E7jw18LZrLQtPttO1Dyf+Edt4pLAppmdNnkTyDHKY2xbLLEPsjS/I7Fcw73XyrRfgr4uX4++Mpf+F1eME3eGdDX7ZGnh5ryXF1qx8uWH+zjsiXdlH8td7STDfJ5e2Pz/wADfA7xdH8Nv2XE/wCFveIIPs/2P9xaz+HpYLDHhy+X/QJPsbfasZ8sfPcZheST5tnnIAfSuu6z4Tt/DXxSmvdC0+507T/O/wCEit5ZLAJqeNNgkfzzJKI1zbNFEftbRfIilsQ7HboL290lPH+jWk1hbya7Lpl9La3zNb+dDbrLaCeNQziYq7vbljGhjzEnmMrGIP8AJXjr4HeLpPht+1Gn/C3vEE/2j7Z+4up/D0UF/nw5Yr/p8n2NfsuceWfnt8QpHJ8u/wA5/QNa+Cvi5vj74Nl/4XV4wfb4Z1xftkieHlvIs3Wkny4of7OG+JtuXfy22NHCN8fmbZAD1X+2fCf/AAhf2n+wtP8A7H/4Sb7L9j8yw8r+0f7Z8r7TnzfK837Z+/xu8/zONn2j91XQWV7pL+P9ZtIbC3j12LTLGW6vla386a3aW7EEbBXMwVHS4KmRBHmV/LZmEoT5K/4Ud4u/4Uv5X/C3vEH/ACU3zfsvn+Hvsv8AyOW/z/N+x/8AHz/y28jzP+Pj9z5P/LvXoGi/BXxcvx98ZS/8Lq8YJu8M6Gv2yNPDzXkuLrVj5csP9nHZEu7KP5a72kmG+Ty9sYB6Bf3/AIL1X4Y+BlXwNp+u6Jq1l5eh+HIv7KkREbSrlxbwB5xbvutVmtwIHdCkrc+R5ki/Ovwl8OeAPDvjD416nqH7NFvoem6bqdwZLy7sPDUMOk2n/COWLT2Tv9txGsytKTsJhxeEyumZth4c+EniDw78If2aNQ1P416xo+m6VDbXN1Kbzw59i0mJPDV/vktJ2syLhUXKbi848lpJTnZ5ycTqOo6F468J/tNaFoX7TX9t6rqn282Omtq/hlE19F8M2W+WR/si4iHlywvJC8SIlsxLK6SSEA+9b290lPH+jWk1hbya7Lpl9La3zNb+dDbrLaCeNQziYq7vbljGhjzEnmMrGIPz/wDbPhP/AIQv7T/YWn/2P/wk32X7H5lh5X9o/wBs+V9pz5vleb9s/f43ef5nGz7R+6ryrWvgr4ub4++DZf8AhdXjB9vhnXF+2SJ4eW8izdaSfLih/s4b4m25d/LbY0cI3x+Ztk8//wCFHeLv+FL+V/wt7xB/yU3zfsvn+Hvsv/I5b/P837H/AMfP/LbyPM/4+P3Pk/8ALvQB9a2V7pL+P9ZtIbC3j12LTLGW6vla386a3aW7EEbBXMwVHS4KmRBHmV/LZmEoTn9C1nwnceGvhbNZaFp9tp2oeT/wjtvFJYFNMzps8ieQY5TG2LZZYh9kaX5HYrmHe6+VaL8FfFy/H3xlL/wurxgm7wzoa/bI08PNeS4utWPlyw/2cdkS7so/lrvaSYb5PL2x+f8Agb4HeLo/ht+y4n/C3vEEH2f7H+4tZ/D0sFhjw5fL/oEn2NvtWM+WPnuMwvJJ82zzkAPpXXdZ8J2/hr4pTXuhafc6dp/nf8JFbyyWATU8abBI/nmSURrm2aKI/a2i+RFLYh2O3QXt7pKeP9GtJrC3k12XTL6W1vma386G3WW0E8ahnExV3e3LGNDHmJPMZWMQf5K8dfA7xdJ8Nv2o0/4W94gn+0fbP3F1P4eigv8APhyxX/T5Psa/Zc48s/Pb4hSOT5d/nP6BrXwV8XN8ffBsv/C6vGD7fDOuL9skTw8t5Fm60k+XFD/Zw3xNty7+W2xo4Rvj8zbIAeq/2z4T/wCEL+0/2Fp/9j/8JN9l+x+ZYeV/aP8AbPlfac+b5Xm/bP3+N3n+Zxs+0fuq6CyvdJfx/rNpDYW8euxaZYy3V8rW/nTW7S3YgjYK5mCo6XBUyII8yv5bMwlCfJX/AAo7xd/wpfyv+FveIP8Akpvm/ZfP8PfZf+Ry3+f5v2P/AI+f+W3keZ/x8fufJ/5d69A0X4K+Ll+PvjKX/hdXjBN3hnQ1+2Rp4ea8lxdasfLlh/s47Il3ZR/LXe0kw3yeXtjAPVdC1nwnceGvhbNZaFp9tp2oeT/wjtvFJYFNMzps8ieQY5TG2LZZYh9kaX5HYrmHe69B4ZvdJuta8WRadYW9neW2ppFqU0LW5a6uDZWzrJJ5Ts4YQvBHiYJJtjQhTGY2b5K8DfA7xdH8Nv2XE/4W94gg+z/Y/wBxaz+HpYLDHhy+X/QJPsbfasZ8sfPcZheST5tnnJ6B8NPgr4ui8afFhv8AhdXjC28zxNA3m2SeHppbj/iTaYPMuE/s5/JlGNgTbHmNIn2Hf5kgB9FaTq1jr+lWWp6Ze2+o6bewpc2t5aSrLDPE6hkkR1JDKykEMCQQQRRXgHwq/Z+8eaTpWr3t98XvHHht9a1ObVU0S3t/D8psRKqbllI01ovPkdXmlFuFi82aTBmbfczlAH0VXz9+0z8Qdc0r4TfGO21DQtW8J6Zpeg3N1o3ja01+C0t551to3gUPHOl1BN9qYxBPLZHCL8583y6+ga5TU/7I/sfxt5//AAkH2b95/aX2X+0fP/484t32Dy/3n+q2Y+xf8tvM2/vvMoLhLlkpdjwO8+IP9uftAfCSbSfHmi+K9Iv9LSOTwxpXiK5h1C2d4TMupvDbzmK9t2VSrfaIwqYjKMzORX0j9p1z+zt/9naf9v8Atvl+R9vfyvsv2jb5vmeTnzfs/wC88rZt8z935m399Rc/Y/8AhKtO3/2h9v8AsVz5Xl/aPsfl74PM83b+483Pl7PM/ebfO8v5fOrK/wCJR/wjn/MwfY/7a/6iP2r7T/aP/f77N53/AG7/AGf/AKdqptdFbV/i7/1/loZJW+5L7v6/p3Z0Ecl8dVuI5Le3XTVhiaC4W4YzPKWk8xGj2AKqqIirB2LF3BVNgL1LW51x7PRGuNO0+K7m2/2rFFfu6Wn7li3kOYQZ8TBEG9YcozPwVEbFt9j/AOEq1HZ/aH2/7Fbeb5n2j7H5e+fy/K3fuPNz5m/y/wB5t8nzPl8msrTP7I/sfwT5H/CQfZv3f9m/av7R8/8A485dv2/zP3n+q35+2/8ALby9377y6ko1bq51xLPW2t9O0+W7h3f2VFLfuiXf7lSvnuISYMzF0OxZsIqvyWMa25JL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU5/U/7I/sfxt5//CQfZv3n9pfZf7R8/wD484t32Dy/3n+q2Y+xf8tvM2/vvMrVufsf/CVadv8A7Q+3/YrnyvL+0fY/L3weZ5u39x5ufL2eZ+82+d5fy+dQAfadc/s7f/Z2n/b/ALb5fkfb38r7L9o2+b5nk5837P8AvPK2bfM/d+Zt/fVbjkvjqtxHJb266asMTQXC3DGZ5S0nmI0ewBVVREVYOxYu4KpsBfn/APiUf8I5/wAzB9j/ALa/6iP2r7T/AGj/AN/vs3nf9u/2f/p2rVtvsf8AwlWo7P7Q+3/YrbzfM+0fY/L3z+X5W79x5ufM3+X+82+T5ny+TQBVvb3xUnh6wmtNG0efXXhLXllNq8sdtDL9ndgkc4tmaRfPEce4xIfLZ5NpZRE/hXwV1r4pt8RfjV5vg3wem7xMslzs8W3TeVdDw9pfkxJnTBvibbBulO1k8yTEcnlr5nqus/8ACOf8K90L7T/wmH9j/Ym+y/Yv7Z/tPy/sE2ftHlf6X5vk+Zjz/wB55/lY/wBI8qvmr4Hf8K6/4WL8XvK/4XB/yGpPs/nf8Jl/x7f8I9Yeb52//l5/13leb/pH/Hv5P/LvQB9lSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpU+065/Z2/+ztP+3/bfL8j7e/lfZftG3zfM8nPm/Z/3nlbNvmfu/M2/vqLn7H/wlWnb/wC0Pt/2K58ry/tH2Py98Hmebt/cebny9nmfvNvneX8vnVlf8Sj/AIRz/mYPsf8AbX/UR+1faf7R/wC/32bzv+3f7P8A9O1AHQRyXx1W4jkt7ddNWGJoLhbhjM8paTzEaPYAqqoiKsHYsXcFU2AvUtbnXHs9Ea407T4rubb/AGrFFfu6Wn7li3kOYQZ8TBEG9YcozPwVEbFt9j/4SrUdn9ofb/sVt5vmfaPsfl75/L8rd+483Pmb/L/ebfJ8z5fJrK0z+yP7H8E+R/wkH2b93/Zv2r+0fP8A+POXb9v8z95/qt+ftv8Ay28vd++8ugDVurnXEs9ba307T5buHd/ZUUt+6Jd/uVK+e4hJgzMXQ7Fmwiq/JYxrbkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJTn9T/sj+x/G3n/APCQfZv3n9pfZf7R8/8A484t32Dy/wB5/qtmPsX/AC28zb++8ytW5+x/8JVp2/8AtD7f9iufK8v7R9j8vfB5nm7f3Hm58vZ5n7zb53l/L51AB9p1z+zt/wDZ2n/b/tvl+R9vfyvsv2jb5vmeTnzfs/7zytm3zP3fmbf31W45L46rcRyW9uumrDE0FwtwxmeUtJ5iNHsAVVURFWDsWLuCqbAX5/8A4lH/AAjn/MwfY/7a/wCoj9q+0/2j/wB/vs3nf9u/2f8A6dq1bb7H/wAJVqOz+0Pt/wBitvN8z7R9j8vfP5flbv3Hm58zf5f7zb5PmfL5NAHzR4i+JV1pXx18eaHN4/0HwZqU/gfTrvVV1TxNJdWPh26b7aklzbwSmNW2t9hBGLYMkiysQxCP2n7O2o3+u/s/6os8Vx4gjhlv7Ky1HR/E97eya/FHlPtVtd3cvmQec4fywLh1QbSs2OR6dpn9kf2P4J8j/hIPs37v+zftX9o+f/x5y7ft/mfvP9Vvz9t/5beXu/feXWro32P+0de+zf2h5321ftX237R5XmfZ4cfZ/N+Tytnl58j935nm5/e+bRK0vLS34v8Az/zvpa5STkpJbW/JL8bX/p3+R/hN4c+KvgLw9caZ4t+G3xP8Z6g06XEWpxfEmF9sT28J8ht+ow5eJ98bOECyMhkGPM2gr7Oorup4uVOCgltpvL/5I4JYWlJttL7l/kFZN1ba49nra2+o6fFdzbv7KllsHdLT9yoXz0EwM+Jg7nY0OUZU4KmRtauU1PTNPm0fxtFL4J/tCG88z7bp/kWZ/wCEjzZxIeHkCPuRVtv9JMf+pwcRBHPCdh0Ekd8dVt5I7i3XTVhlWe3a3YzPKWj8t1k3gKqqJQylGLF0IZNhD1Ps2uf2ds/tHT/t/wBt8zz/ALA/lfZftG7yvL87Pm/Z/wB35u/b5n7zy9v7mi5tbd/FWnXDaJ9ou47K5jj1vZCfsiM8Be33FvNHnFUfCKUP2b5ypEYbK/szT/8AhHPI/wCEJ/0b+2vtH9k+RZ/67+0fM/tDb5nl/wCt/wBN3bvO/i2ed+7oA6COO+Gq3EklxbtprQxLBbrbsJklDSeY7SbyGVlMQVQilSjks+8BKlrba4lnoi3Go6fLdw7f7VlisHRLv9ywbyEMxMGZijje02EVk5LCRS2tbdPFWo3C6J9nu5LK2jk1vZCPtaK85S33BvNPklnfDqEH2n5CxMgXK0zTNPh0fwTFF4J/s+Gz8v7Fp/kWY/4RzFnKg4SQom1Ga2/0Yyf67AzEXcAGrdW2uPZ62tvqOnxXc27+ypZbB3S0/cqF89BMDPiYO52NDlGVOCpka3JHfHVbeSO4t101YZVnt2t2Mzylo/LdZN4CqqiUMpRixdCGTYQ/P6npmnzaP42il8E/2hDeeZ9t0/yLM/8ACR5s4kPDyBH3Iq23+kmP/U4OIgjnVubW3fxVp1w2ifaLuOyuY49b2Qn7IjPAXt9xbzR5xVHwilD9m+cqRGGAD7Nrn9nbP7R0/wC3/bfM8/7A/lfZftG7yvL87Pm/Z/3fm79vmfvPL2/uatxx3w1W4kkuLdtNaGJYLdbdhMkoaTzHaTeQyspiCqEUqUcln3gJz/8AZmn/APCOeR/whP8Ao39tfaP7J8iz/wBd/aPmf2ht8zy/9b/pu7d538Wzzv3datta26eKtRuF0T7PdyWVtHJreyEfa0V5ylvuDeafJLO+HUIPtPyFiZAoBVvbLxU/h6whtNZ0eDXUhK3l7NpEsltNL9ndQ8cAuVaNfPMcm0yufLV49wZhKnhXwV0X4pr8RfjV5vjLwe+3xMsdzs8JXS+bdHw9pfkypnUzsiXdBuiO5n8uTEkfmL5fqus6Fo9x8PdCspvhb/aunQWTRweFfsumt/ZifYJozb7JJhbrmNns8ROyf6RtJ8ku6/NXwO8C+Do/iL8Xtn7Ln2Tytakt4v8AiV+HB9ghfw9YeZp/y3hx9o3yfLHuhP239467ptgB9lSR3x1W3kjuLddNWGVZ7drdjM8paPy3WTeAqqolDKUYsXQhk2EPU+za5/Z2z+0dP+3/AG3zPP8AsD+V9l+0bvK8vzs+b9n/AHfm79vmfvPL2/uaLm1t38VadcNon2i7jsrmOPW9kJ+yIzwF7fcW80ecVR8IpQ/ZvnKkRhsr+zNP/wCEc8j/AIQn/Rv7a+0f2T5Fn/rv7R8z+0NvmeX/AK3/AE3du87+LZ537ugDoI474arcSSXFu2mtDEsFutuwmSUNJ5jtJvIZWUxBVCKVKOSz7wEqWttriWeiLcajp8t3Dt/tWWKwdEu/3LBvIQzEwZmKON7TYRWTksJFLa1t08VajcLon2e7ksraOTW9kI+1orzlLfcG80+SWd8OoQfafkLEyBcrTNM0+HR/BMUXgn+z4bPy/sWn+RZj/hHMWcqDhJCibUZrb/RjJ/rsDMRdwAat1ba49nra2+o6fFdzbv7KllsHdLT9yoXz0EwM+Jg7nY0OUZU4KmRrckd8dVt5I7i3XTVhlWe3a3YzPKWj8t1k3gKqqJQylGLF0IZNhD8/qemafNo/jaKXwT/aEN55n23T/Isz/wAJHmziQ8PIEfcirbf6SY/9Tg4iCOdW5tbd/FWnXDaJ9ou47K5jj1vZCfsiM8Be33FvNHnFUfCKUP2b5ypEYYAPs2uf2ds/tHT/ALf9t8zz/sD+V9l+0bvK8vzs+b9n/d+bv2+Z+88vb+5q3HHfDVbiSS4t201oYlgt1t2EyShpPMdpN5DKymIKoRSpRyWfeAnP/wBmaf8A8I55H/CE/wCjf219o/snyLP/AF39o+Z/aG3zPL/1v+m7t3nfxbPO/d1q21rbp4q1G4XRPs93JZW0cmt7IR9rRXnKW+4N5p8ks74dQg+0/IWJkCgBa22uJZ6ItxqOny3cO3+1ZYrB0S7/AHLBvIQzEwZmKON7TYRWTksJFt2Ud8lzftd3FvPbvMGs0ht2jaGLy0BSRi7CRvMEjbgEG1kXaSpd+f0zTNPh0fwTFF4J/s+Gz8v7Fp/kWY/4RzFnKg4SQom1Ga2/0Yyf67AzEXcaujWtvb6jrzw6J/ZUk96sk93shX+03+zwqLjMbFmwqpBmUK/+j4A2BGYA1qKKKACuU1PU9Ph0fxtLL42/s+Gz8z7bqHn2Y/4RzFnE55eMom1GW5/0kSf67JzEUQdXWTdXOuJZ621vp2ny3cO7+yopb90S7/cqV89xCTBmYuh2LNhFV+SxjUALm6t08Vadbtrf2e7ksrmSPRN8I+1orwB7jaV80+SWRMowQfafnDExlcr+09P/AOEc8/8A4Tb/AEb+2vs/9refZ/67+0fL/s/d5fl/63/Qtu3zv4d/nfvK6CSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lKn2nXP7O3/wBnaf8Ab/tvl+R9vfyvsv2jb5vmeTnzfs/7zytm3zP3fmbf31ABbXVu/irUbddb+0XcdlbSSaJvhP2RGecJcbQvmjzirpl2KH7N8gUiQtlaZqenzaP4Jli8bf2hDeeX9i1Dz7M/8JHmzlccpGEfcitc/wCjCP8A1ORiIOh6COS+Oq3EclvbrpqwxNBcLcMZnlLSeYjR7AFVVERVg7Fi7gqmwF6lrc649nojXGnafFdzbf7Viiv3dLT9yxbyHMIM+JgiDesOUZn4KiNgDK1PU9Ph0fxtLL42/s+Gz8z7bqHn2Y/4RzFnE55eMom1GW5/0kSf67JzEUQatzdW6eKtOt21v7PdyWVzJHom+Efa0V4A9xtK+afJLImUYIPtPzhiYypdXOuJZ621vp2ny3cO7+yopb90S7/cqV89xCTBmYuh2LNhFV+SxjW3JJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgBz/wDaen/8I55//Cbf6N/bX2f+1vPs/wDXf2j5f9n7vL8v/W/6Ft2+d/Dv8795WrbXVu/irUbddb+0XcdlbSSaJvhP2RGecJcbQvmjzirpl2KH7N8gUiQsfadc/s7f/Z2n/b/tvl+R9vfyvsv2jb5vmeTnzfs/7zytm3zP3fmbf31W45L46rcRyW9uumrDE0FwtwxmeUtJ5iNHsAVVURFWDsWLuCqbAXAOK1nXdHt/h7oV7N8Uv7K06eyaSDxV9q01f7TT7BNIbjfJCbdsRq95mJFT/R9xHkh0b5q+B3jrwdJ8Rfi9s/aj+1+brUlxF/xNPDh+3wp4esPM1D5bMZ+z7JPmj2wj7F+8Rts2/wCtb298VJ4esJrTRtHn114S15ZTavLHbQy/Z3YJHOLZmkXzxHHuMSHy2eTaWURP4V8Fda+KbfEX41eb4N8Hpu8TLJc7PFt03lXQ8PaX5MSZ0wb4m2wbpTtZPMkxHJ5a+YAe/wBzdW6eKtOt21v7PdyWVzJHom+Efa0V4A9xtK+afJLImUYIPtPzhiYyuV/aen/8I55//Cbf6N/bX2f+1vPs/wDXf2j5f9n7vL8v/W/6Ft2+d/Dv8795XQSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpU+065/Z2/wDs7T/t/wBt8vyPt7+V9l+0bfN8zyc+b9n/AHnlbNvmfu/M2/vqAC2urd/FWo26639ou47K2kk0TfCfsiM84S42hfNHnFXTLsUP2b5ApEhbK0zU9Pm0fwTLF42/tCG88v7FqHn2Z/4SPNnK45SMI+5Fa5/0YR/6nIxEHQ9BHJfHVbiOS3t101YYmguFuGMzylpPMRo9gCqqiIqwdixdwVTYC9S1udcez0RrjTtPiu5tv9qxRX7ulp+5Yt5DmEGfEwRBvWHKMz8FRGwBlanqenw6P42ll8bf2fDZ+Z9t1Dz7Mf8ACOYs4nPLxlE2oy3P+kiT/XZOYiiDVubq3TxVp1u2t/Z7uSyuZI9E3wj7WivAHuNpXzT5JZEyjBB9p+cMTGVLq51xLPW2t9O0+W7h3f2VFLfuiXf7lSvnuISYMzF0OxZsIqvyWMa25JL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAOf/tPT/8AhHPP/wCE2/0b+2vs/wDa3n2f+u/tHy/7P3eX5f8Arf8AQtu3zv4d/nfvK1ba6t38Vajbrrf2i7jsraSTRN8J+yIzzhLjaF80ecVdMuxQ/ZvkCkSFj7Trn9nb/wCztP8At/23y/I+3v5X2X7Rt83zPJz5v2f955Wzb5n7vzNv76rccl8dVuI5Le3XTVhiaC4W4YzPKWk8xGj2AKqqIirB2LF3BVNgLgHP6ZqenzaP4Jli8bf2hDeeX9i1Dz7M/wDCR5s5XHKRhH3IrXP+jCP/AFORiIOh1dGure41HXkh1v8AtWSC9WOe03wt/Zj/AGeFhb4jUMuVZJ8Sln/0jIOwoqlrc649nojXGnafFdzbf7Viiv3dLT9yxbyHMIM+JgiDesOUZn4KiNrdlJfPc363dvbwW6TBbN4bhpGmi8tCXkUoojbzDIu0FxtVG3AsUQAt0UUUAFcpqf8AZH9j+NvP/wCEg+zfvP7S+y/2j5//AB5xbvsHl/vP9Vsx9i/5beZt/feZXV1k3Vtrj2etrb6jp8V3Nu/sqWWwd0tP3KhfPQTAz4mDudjQ5RlTgqZGAC5+x/8ACVadv/tD7f8AYrnyvL+0fY/L3weZ5u39x5ufL2eZ+82+d5fy+dWV/wASj/hHP+Zg+x/21/1EftX2n+0f+/32bzv+3f7P/wBO1dBJHfHVbeSO4t101YZVnt2t2Mzylo/LdZN4CqqiUMpRixdCGTYQ9T7Nrn9nbP7R0/7f9t8zz/sD+V9l+0bvK8vzs+b9n/d+bv2+Z+88vb+5oALb7H/wlWo7P7Q+3/YrbzfM+0fY/L3z+X5W79x5ufM3+X+82+T5ny+TWVpn9kf2P4J8j/hIPs37v+zftX9o+f8A8ecu37f5n7z/AFW/P23/AJbeXu/feXXQRx3w1W4kkuLdtNaGJYLdbdhMkoaTzHaTeQyspiCqEUqUcln3gJUtbbXEs9EW41HT5buHb/assVg6Jd/uWDeQhmJgzMUcb2mwisnJYSKAZWp/2R/Y/jbz/wDhIPs37z+0vsv9o+f/AMecW77B5f7z/VbMfYv+W3mbf33mVq3P2P8A4SrTt/8AaH2/7Fc+V5f2j7H5e+DzPN2/uPNz5ezzP3m3zvL+XzqLq21x7PW1t9R0+K7m3f2VLLYO6Wn7lQvnoJgZ8TB3OxocoypwVMjW5I746rbyR3FuumrDKs9u1uxmeUtH5brJvAVVUShlKMWLoQybCHAOf/4lH/COf8zB9j/tr/qI/avtP9o/9/vs3nf9u/2f/p2rVtvsf/CVajs/tD7f9itvN8z7R9j8vfP5flbv3Hm58zf5f7zb5PmfL5NH2bXP7O2f2jp/2/7b5nn/AGB/K+y/aN3leX52fN+z/u/N37fM/eeXt/c1bjjvhqtxJJcW7aa0MSwW627CZJQ0nmO0m8hlZTEFUIpUo5LPvAQA4rWf+Ec/4V7oX2n/AITD+x/sTfZfsX9s/wBp+X9gmz9o8r/S/N8nzMef+88/ysf6R5VfNXwO/wCFdf8ACxfi95X/AAuD/kNSfZ/O/wCEy/49v+EesPN87f8A8vP+u8rzf9I/49/J/wCXevrW9svFT+HrCG01nR4NdSEreXs2kSyW00v2d1DxwC5Vo188xybTK58tXj3BmEqeFfBXRfimvxF+NXm+MvB77fEyx3OzwldL5t0fD2l+TKmdTOyJd0G6I7mfy5MSR+YvlgHv9z9j/wCEq07f/aH2/wCxXPleX9o+x+Xvg8zzdv7jzc+Xs8z95t87y/l86sr/AIlH/COf8zB9j/tr/qI/avtP9o/9/vs3nf8Abv8AZ/8Ap2roJI746rbyR3FuumrDKs9u1uxmeUtH5brJvAVVUShlKMWLoQybCHqfZtc/s7Z/aOn/AG/7b5nn/YH8r7L9o3eV5fnZ837P+783ft8z955e39zQAW32P/hKtR2f2h9v+xW3m+Z9o+x+Xvn8vyt37jzc+Zv8v95t8nzPl8msrTP7I/sfwT5H/CQfZv3f9m/av7R8/wD485dv2/zP3n+q35+2/wDLby9377y66COO+Gq3EklxbtprQxLBbrbsJklDSeY7SbyGVlMQVQilSjks+8BKlrba4lnoi3Go6fLdw7f7VlisHRLv9ywbyEMxMGZijje02EVk5LCRQDK1P+yP7H8bef8A8JB9m/ef2l9l/tHz/wDjzi3fYPL/AHn+q2Y+xf8ALbzNv77zK1bn7H/wlWnb/wC0Pt/2K58ry/tH2Py98Hmebt/cebny9nmfvNvneX8vnUXVtrj2etrb6jp8V3Nu/sqWWwd0tP3KhfPQTAz4mDudjQ5RlTgqZGtyR3x1W3kjuLddNWGVZ7drdjM8paPy3WTeAqqolDKUYsXQhk2EOAc//wASj/hHP+Zg+x/21/1EftX2n+0f+/32bzv+3f7P/wBO1att9j/4SrUdn9ofb/sVt5vmfaPsfl75/L8rd+483Pmb/L/ebfJ8z5fJo+za5/Z2z+0dP+3/AG3zPP8AsD+V9l+0bvK8vzs+b9n/AHfm79vmfvPL2/uatxx3w1W4kkuLdtNaGJYLdbdhMkoaTzHaTeQyspiCqEUqUcln3gIAc/pn9kf2P4J8j/hIPs37v+zftX9o+f8A8ecu37f5n7z/AFW/P23/AJbeXu/feXWro32P+0de+zf2h5321ftX237R5XmfZ4cfZ/N+Tytnl58j935nm5/e+bRa22uJZ6ItxqOny3cO3+1ZYrB0S7/csG8hDMTBmYo43tNhFZOSwkW3ZR3yXN+13cW89u8wazSG3aNoYvLQFJGLsJG8wSNuAQbWRdpKl3ALdFFFABXKanpmnzaP42il8E/2hDeeZ9t0/wAizP8AwkebOJDw8gR9yKtt/pJj/wBTg4iCOerrJutGvLiz1uFNd1C2k1Dd9muIo7cvpmYVjHkBoirYZTKPOWX53YHKbUUALm1t38VadcNon2i7jsrmOPW9kJ+yIzwF7fcW80ecVR8IpQ/ZvnKkRhsr+zNP/wCEc8j/AIQn/Rv7a+0f2T5Fn/rv7R8z+0NvmeX/AK3/AE3du87+LZ537uugkspn1W3u1v7iO3ihliexVY/JmZmjKyMShcMgRgoVwuJX3KxCFKn9jXn9nfZv7d1Dzvtv2r7Z5dv5vl/aPN+zY8rZ5Wz9xnb5nl87/N/e0AFta26eKtRuF0T7PdyWVtHJreyEfa0V5ylvuDeafJLO+HUIPtPyFiZAuVpmmafDo/gmKLwT/Z8Nn5f2LT/Isx/wjmLOVBwkhRNqM1t/oxk/12BmIu46COymTVbi7a/uJLeWGKJLFlj8mFlaQtIpCByzh1DBnK4iTaqkuXqWujXlvZ6JC+u6hcyaft+03EsduH1PELRnzwsQVcswlPkrF86KBhNyMAZWp6Zp82j+NopfBP8AaEN55n23T/Isz/wkebOJDw8gR9yKtt/pJj/1ODiII51bm1t38VadcNon2i7jsrmOPW9kJ+yIzwF7fcW80ecVR8IpQ/ZvnKkRhi60a8uLPW4U13ULaTUN32a4ijty+mZhWMeQGiKthlMo85ZfndgcptRbcllM+q292t/cR28UMsT2KrH5MzM0ZWRiULhkCMFCuFxK+5WIQoAc/wD2Zp//AAjnkf8ACEf6N/bP2j+yfIs/9d/aPmf2ht8zy/8AW/6bu3ed/Fs8793XkniX4otqvxS8Aal4Ws9f0GDUdeh8P6xdav4b/s5dYg+x6jcJB/pkC3RFvJFvVk2Rf6W4VpGMgT3D+xrz+zvs39u6h53237V9s8u383y/tHm/ZseVs8rZ+4zt8zy+d/m/vayvEfwx8N+M/EFlq3iTSNP8Rvp3lSaZb6tp1tcJps6uzNcW7tEZEkfMYY7yP3Ee0Kdxa4NRkm1dFJpXv2f5P9dTwfwM2tT6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 Correct ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect Graph the ellipse.9x2 + 25y2  = 225 Graph the ellipse.

9x2 + 25y2  = 225
]]> 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 Incorrect ]]> 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 Correct ]]> 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 Incorrect ]]> 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 Incorrect Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.2 Ellipses/8.2.4 Find Equation of Ellipse Given Conditions Find an equation in standard form for the ellipse that satisfies the given ... Find an equation in standard form for the ellipse that satisfies the given conditions.

An ellipse with foci at (-6, -3) and (0, -3); major axis length of 10]]> 1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Correct Find an equation in standard form for the ellipse that satisfies the given ... Find an equation in standard form for the ellipse that satisfies the given conditions.

An ellipse with major axis from (-4, 3) to (6, 3); minor axis from  to ]]> 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1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Incorrect  +  = 1]]> 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Correct  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect Find an equation in standard form for the ellipse that satisfies the given ... Find an equation in standard form for the ellipse that satisfies the given conditions.

An ellipse with foci at (2, 1) and (2, -5); major axis length of 10]]> 1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Correct  +  = 1]]> 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Incorrect Find an equation in standard form for the ellipse that satisfies the given ... Find an equation in standard form for the ellipse that satisfies the given conditions.

An ellipse with center at origin, length of major axis 18 and y-intercepts ]]> 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1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Correct  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect Find an equation in standard form for the ellipse that satisfies the given ... Find an equation in standard form for the ellipse that satisfies the given conditions.

The vertical major axis is of length 18, and the minor axis is of length 10.]]> 1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Incorrect  +  = 1]]> 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Correct  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect Find an equation in standard form for the ellipse that satisfies the given ... Find an equation in standard form for the ellipse that satisfies the given conditions.

Vertices at (±14, 0) and foci at (±7 , 0)]]> 1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Correct  +  = 1]]> 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Incorrect  +   = 1]]> 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Incorrect  +  = 2]]> 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Incorrect Find an equation in standard form for the ellipse that satisfies the given ... Find an equation in standard form for the ellipse that satisfies the given conditions.

The horizontal major axis is of length 16, and the minor axis is of length 14.]]> 1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Correct Find an equation in standard form for the ellipse that satisfies the given ... Find an equation in standard form for the ellipse that satisfies the given conditions.

Major axis endpoints (0, ±6), minor axis length 4]]> 1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Incorrect  +  = 1]]> 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 Incorrect  +  = 1]]> 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 Incorrect  +  = 1]]> 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 Correct Find an equation in standard form for the ellipse that satisfies the given ... Find an equation in standard form for the ellipse that satisfies the given conditions.

Minor axis endpoints (±3, 0), major axis length 18]]> 1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Correct Find an equation in standard form for the ellipse that satisfies the given ... Find an equation in standard form for the ellipse that satisfies the given conditions.

An ellipse with intercepts (±5, 0) and (0, ±9), center at origin]]> 1.0000000 0.3333333 0 true true abc  +  = 1]]> 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 Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAApABcDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U65zxtbeLbzT4YfCGpaLo96XzLe63p81/GqAfdWCOeAkk/xGUbcfdbPHPfHiwuNW+HtxYafceIbPXLqeOHSrrw5JcRywXhJEMsrRfKIFb5pPOBiKghlbIU+a6L4V+IPxN8BXGlyavN4R8TpqbDxXb+KNJvdSsNSZVAEdgVu7dFsXUKQsLHcvyS/vDNvne6f9bfl1+XctWTV3o/6/Hp5p7WPXfhB4u1Tx58NPD+va1Ywadql7b754rRy8DsGK+bCTyYpABIhPOx1zmitfwfYa3pnh+2tvEOoaZqeqR5V7jR9NfT7Yrn5AsDzzsuFwP9Yc4zgdAVpLdma0Rwn/AAjnxv8A+ih/D/8A8IO+/wDlzXM+FfFfj7x1qWqad4a+N/wj8Q6hpb+Xf2mleFbi5ls2yV2ypHrZMZyrDDAcqR2r27WtLi1vR7/TppJYYbyCS3eSB9kiq6lSVYdCAeD2NfLHwG0rXPFPxZ8J3em+KdI8ZeAvAehXOhweIdF0L+zrW5dxDGtukrTTC7ZFt9zyQGOBWwoUtlY5jdytbT/h/wDget++jctI83n/AMN69fRK9mr2+ifAum+ONP8At3/CZeIfD+vb9n2T+wtBn0zysbt/mebe3PmZymMbNu1s7tw2ldXRQAUUUUAFFFFAH//Z/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAApABcDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U65zxtbeLbzT4YfCGpaLo96XzLe63p81/GqAfdWCOeAkk/xGUbcfdbPGT8bfAeo/En4X6/oGj63qPh3Wri3LWGpaXfz2UsVwvzR5khdH2FgAwB5UmvK7X4ceL/iz4Rs/EukeIbnwY3iC3tTqPh/xUl/rFu1tFEFEIhF/CsXmNuaRkYmZdgYndJvi93y+n3d/l1Sv+Jasmr+f9fdt5/evXPhB4u1Tx58NPD+va1Ywadql7b754rRy8DsGK+bCTyYpABIhPOx1zmitfwfYa3pnh+2tvEOoaZqeqR5V7jR9NfT7Yrn5AsDzzsuFwP8AWHOM4HQFay3ZmtEeYeJPAfx11/SJbKD4teDdDeQrm807wHciYKCCygyas6gMMqSBuAJKlTgjmvBPj7xP4v1M+HPCfx9+DOv6nZxHdpmk+HJru4ijTCktGmuswCnAJI4J5r6HvblLKyuLiUSNHFG0jCGJpXIAydqKCzH0ABJ6AV8+fBLxbJf+PdJ0vwn8WYviz4RTSJV1VYo7CSHRp4/JW3WOW0jQxmQNKPJnaWQiPIYbG3TH4mv68v6t81uU1aPN52/rp+N/Jnr/AIF03xxp/wBu/wCEy8Q+H9e37Psn9haDPpnlY3b/ADPNvbnzM5TGNm3a2d24bSurooEFFFFABRRRQB//2Q== Incorrect  +  = 1]]> 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 Correct Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.2 Ellipses/8.2.5 Find Eccentricity of Ellipse Find the eccentricity of the ellipse.35x2 + y2 = 35 Find the eccentricity of the ellipse.

35x2 + y2 = 35]]> 1.0000000 0.3333333 0 true true abc ]]> 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Correct ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect Find the eccentricity of the ellipse.x2 + 3y2 = 15 Find the eccentricity of the ellipse.

x2 + 3y2 = 15]]> 1.0000000 0.3333333 0 true true abc ]]> 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 Incorrect ]]> 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 Correct ]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAoAB8DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9EPiN8ZIfhldrJqPhXxFeeH4jCL/xHZQ27WWnCSQIGlV5lmdV3As0MUgUZLEYOPQ68Y+LWu+Lb/xXbaFF8MfE3iXwZb+VdXV1o91pCrqMysHSBlur6F1hUqC42ZkPy8IGEkviy48R/CnUL74l6z4gutW8K29vdP4g0YRrFFpmnqVkgureLc+57SNJzOFbzLgXEzqW+z2loBfDf1HJWfy/r+v+CcX4vtf+E8+KHxC1G7s/iBrsXh66sPC1h4a8FeJrzSg8q2aajPfO8d7aQKXTUoYiJWziyUqzGTYvrfwP1jRte+F2iXugR67Bpj+cqweJr2e81GCRZ5Fminlnlld2SRXXmR1AUBSVC15R4Jn1LVPgmdWtvCPiDxnp/jfW9V117zwxriaXq81jPfSS6VcCZ7m2cKbAWceDOkkcaRRFMKUT0v8AZ+8C6p8OPhlZ6Hqk1wfKubqazs7y7N5NYWkkzvBayTkkyvGjKpYluQQGcKGIuv8AX9fc/VaJp6W/r5/15aPVqj/wpvxd/wBF2+IH/gD4e/8AlVXK6Dpk/ifxjrnhbS/2ivH95rmixRzX0CaVoWyNXd0GJTo/luQ8UiMEYlWRlYAjFe/14PYeJTH+1l4uePQfEs8TeErGwhuhoF5HZ3FzBcX08kSXckS25OyaLDGQKWfaGyGAqKTbXk39xaS5W3vpb5tL8vyMD4baONf+yeHPCvxg+LmmWNjaKlpHP4D0/S9Pjt4wqokMs2gxwFQu0KqNyo+UECvbPAvg3V/CX27+1fHfiDxr9o2eX/bsGnRfZtu7Pl/Y7S3zu3DO/d9xcbfmz5J8GtIjX4iabdeDbj4hQ+GLfSprfXLfxuNUihkuMxC2+zwagq7HAE5Y2qrCBwRzGB9DUrWSvv8A1/X4kP4mlsFFFFIAooooA//Z Incorrect ]]> 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 Incorrect Find the eccentricity of the ellipse.x2 + 7y2 = 7 Find the eccentricity of the ellipse.

x2 + 7y2 = 7]]> 1.0000000 0.3333333 0 true true abc ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect ]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAoAB4DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U68S8baFB8UfjxNoGqaxr2jaD4T8LxalPDoviG+0oX02o3UyRySvaTQsBbppM4AYuG+2scJ5fz9F418N+NbTxNF4v0XWrjVk02YBfB9vstob3TzAyzw75GKNdtMY5o5pCigW0VuDbrNczyeZ/D6+uvjp4M+J/j/wBq9rc6d4r1m3bw9rOoabJc/bdKtLO1iktBA89rLHH9tj1NBHJJEoaaaQDE29k3ZXGld2KOjaH4G8XeDP+Ei8J6V8ZfFcZ1O70xLGx+IGs287G3meKSUm51WGNIyUyod1chh8mcge9fCnxNo/i/4c+HtU0FtQOky2iRwrq0ksl7H5f7to7hpWaRpkZGV2dmYsrEsx5Pzp8KL345eAvhrrtjqXw51a613VvFGoXyzaVHo8D2drczvO86xy6vLG8hMhCoXwhPzeaEzJ9GfC+EWvgbSrVfDWpeEktozCul6xLbS3SBSRvke3mmjZn5ct5hJLEtyTW01FSkobf8AJWvdef56P+vXqjlP+FN+Lv+i7fED/AMAfD3/yqrzHxN9i+EN9faNP8aPiza/Zlk1S8GgeA7C+tofPkkmkllltNAkjV3fzZG3MGJZmb72T9R1wPjRrzxX4z0jwgmm3R0IRf2rrGoSwN9lljR8Q2auRtd5JBvdQTiOJgwHmqaxb2DzfQwNP+FPijU7C2vLf47/EJre4jWaMvp3h9CVYAjKtpIIOD0IBHeu98FeGdR8K6VLaan4s1jxjcPMZVvtbiso5o1KqBGBaW8CbQVJyULZY5YjAHQUVT8iVe2oUUUUhhRRRQB//2Q== Correct Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.2 Ellipses/8.2.6 Solve Apps: Ellipses Solve the problem.A railroad tunnel is shaped like a semiellipse. The height ... Solve the problem.

A railroad tunnel is shaped like a semiellipse. The height of the tunnel at the center is 34 ft and the vertical clearance must be 30 ft at a point 24 ft from the center. Find an equation for the ellipse. 
]]> 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1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Correct  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect Solve the problem.A satellite is to be put into an elliptical orbit around a ... Solve the problem.

A satellite is to be put into an elliptical orbit around a moon. The moon is a sphere with radius of 538 km. Determine an equation for the ellipse if the distance of the satellite from the surface of the moon varies from 834 km to 869 km.
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1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Correct  +  = 1]]> 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Incorrect Solve the problem.An elliptical riding path is to be built on a rectangular ... Solve the problem.

An elliptical riding path is to be built on a rectangular piece of property that measures 8 mi by 4 mi. Find an equation for the ellipse if the path is to touch the center of the property line on all 4 sides
]]> 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1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  +  = 1]]> 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Correct Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.3 Hyperbolas/8.3.1 Find Vertices, Foci of Hyperbola from Equation Find the vertices and foci of the hyperbola. -  = 1 Find the vertices and foci of the hyperbola.

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 -  = 1]]> 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 1.0000000 0.3333333 0 true true abc Vertices: (± 3, 0); Foci: (± 9, 0) Correct Vertices: (0, ± 9); Foci: (0, ± 3) Incorrect Vertices: (± 9, 0); Foci: (± 3, 0) Incorrect Vertices: (0, ± 3); Foci: (0, ±9) Incorrect Find the vertices and foci of the hyperbola. -  = 1 Find the vertices and foci of the hyperbola.

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1.0000000 0.3333333 0 true true abc  -  = 1]]> 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Incorrect  -  = 1]]> 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Correct  -  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect Match the given graph with its equation. Match the given graph with its equation.


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 1.0000000 0.3333333 0 true true abc 2 - 4y2 = 100]]> Correct 2 - 25y2 = 100]]> Incorrect 2 - 25x2 = 100]]> Incorrect 2 + 4y2 = 100]]> Incorrect Match the given graph with its equation. Match the given graph with its equation.


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 1.0000000 0.3333333 0 true true abc  -  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect  -  = 1]]> 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Correct  -  = 1]]> 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Incorrect Match the given graph with its equation. Match the given graph with its equation.


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1.0000000 0.3333333 0 true true abc  -  = 1]]> 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Incorrect  +  = 1]]> 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Incorrect  -  = 1]]> 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Correct  +  = 1]]> 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Incorrect Match the given graph with its equation. Match the given graph with its equation.


]]> 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lFEbeYZF2guNqo24FiiW6KAKmpyX0Vsjafb291cGaFWS5uGhURGRRK4ZUclljLsq4AZlVSyBi626KKAKllJfPc363dvbwW6TBbN4bhpGmi8tCXkUoojbzDIu0FxtVG3AsUTivj34O1zx58J9d0fwumnnxS3kXWjT6pdPb29pfwTxz2107JFKW8maKOYRlGWQxBH+V2I9AooA5/4e+NbH4leAPDXi/TIriDTdf0y21W1iu1VZkiniWVFcKzAMFcAgEjOcE9a1bKS+e5v1u7e3gt0mC2bw3DSNNF5aEvIpRRG3mGRdoLjaqNuBYonmvwn/AOKU+I/xL8DDi0gvYfFemxR/MkFrqZmMyM5+YytqFrqkxB3KqXEQVsDy4/VaAKmpyX0Vsjafb291cGaFWS5uGhURGRRK4ZUclljLsq4AZlVSyBi626KKAPmf9t/xv8S/CXwZ8SS+EtHvra0SO5ln8Q6BqUC3VlaR2ysrsszQtE73DMh8kzMIoiwIeQCPR/ap1rx4/gnw62jeE9Fk0ubxF4VnlbWdfktb2C8/t6yKW7Qw2k8ZTeIlaVZjtDOVR9iiT6Hryr9pb/knWkf9jn4T/wDUh06ktLg9Xc7/AMLXOuXehWsviTTtP0rWm3faLPS79763j+Yhdkzwws+V2k5jXBJHIG427KS+e5v1u7e3gt0mC2bw3DSNNF5aEvIpRRG3mGRdoLjaqNuBYoluimBU1OS+itkbT7e3urgzQqyXNw0KiIyKJXDKjkssZdlXADMqqWQMXW3RRQBUspL57m/W7t7eC3SYLZvDcNI00XloS8ilFEbeYZF2guNqo24FiieVeLJL7xb+0N4f0yxt7e8t/BOmJr9xbX1w1sv2rUJpLG3uInRHZ2hs4NbBicKjNcW4zk+ZB7BXlX7OX/FQeCb34hN8knxEvV8VpAOBBay20EFghXnbL9itrQzDc6+eZtjFCgAB6rVSykvnub9bu3t4LdJgtm8Nw0jTReWhLyKUURt5hkXaC42qjbgWKJbooAqanJfRWyNp9vb3VwZoVZLm4aFREZFErhlRyWWMuyrgBmVVLIGLrboooAqWUl89zfrd29vBbpMFs3huGkaaLy0JeRSiiNvMMi7QXG1UbcCxRDU5L6K2RtPt7e6uDNCrJc3DQqIjIolcMqOSyxl2VcAMyqpZAxdbdFABRRRQAVU1PSbHWrZLfULK3v7dJoblYrmJZFWWKRZYpAGBAZJER1bqrKpGCAat1U1OS+itkbT7e3urgzQqyXNw0KiIyKJXDKjkssZdlXADMqqWQMXUAt1UstJsdOub+4tLK3tbi/mFzeSwxKjXMojSISSEDLsI4o03HJ2xoOigC3VSykvnub9bu3t4LdJgtm8Nw0jTReWhLyKUURt5hkXaC42qjbgWKIAGp6TY61bJb6hZW9/bpNDcrFcxLIqyxSLLFIAwIDJIiOrdVZVIwQDVuqmpyX0Vsjafb291cGaFWS5uGhURGRRK4ZUclljLsq4AZlVSyBi626AKllpNjp1zf3FpZW9rcX8wubyWGJUa5lEaRCSQgZdhHFGm45O2NB0UAGp6TY61bJb6hZW9/bpNDcrFcxLIqyxSLLFIAwIDJIiOrdVZVIwQDRZSXz3N+t3b28FukwWzeG4aRpovLQl5FKKI28wyLtBcbVRtwLFENTkvorZG0+3t7q4M0KslzcNCoiMiiVwyo5LLGXZVwAzKqlkDF1APNfiV/wAUz8Zfhd4tl+awl/tHwjcs/wAkVp9vEFxDcPIeBuuNMgtFQ43yX8YDbgqSelWWk2OnXN/cWllb2txfzC5vJYYlRrmURpEJJCBl2EcUabjk7Y0HRQBxX7QPhbVPGnwO8eaPoNr9r8SXGi3R0VVkWJ01JI2ezljkYgRSpcLE6SZXY6KwZSoI6DwN4th8eeHrXxFp5t5/D2qwwX+jXsMkm67spreKVJZI5I0MLFnceX83yqjEgsUQA1dT0mx1q2S31Cyt7+3SaG5WK5iWRVlikWWKQBgQGSREdW6qyqRggGrdVNTkvorZG0+3t7q4M0KslzcNCoiMiiVwyo5LLGXZVwAzKqlkDF1t0AVLLSbHTrm/uLSyt7W4v5hc3ksMSo1zKI0iEkhAy7COKNNxydsaDooA8K/a5+E/gfxh4X0XW9e8G+H9b1pfE3hfTV1HUdLguLgWsmv2SSW4kdC3lMs0qsmdpErgjDHNL9sLxppHhbwBdDxJ44Pw/wBSup3tPCklj4ml037ZctDGEuLooqMscMruXTdJF5YVn3M6xpB+0f4j8Z3/AMMPB114b0vw/wCJdAu9a8I3Y1nUdYn064nuW1yxaIC1WylVYnbydzmQMgkciNigV0tb+X9ff+lvkP3Wl31/r/Pyfz9+8LeE9D8DaFa6J4b0bT/D+i2u77Pp2l2qW1vDuYu2yNAFXLMzHA5LE9TVuy0mx065v7i0sre1uL+YXN5LDEqNcyiNIhJIQMuwjijTccnbGg6KAKnha51y70K1l8Sadp+la0277RZ6XfvfW8fzELsmeGFnyu0nMa4JI5A3G3ZSXz3N+t3b28FukwWzeG4aRpovLQl5FKKI28wyLtBcbVRtwLFEYBqek2OtWyW+oWVvf26TQ3KxXMSyKssUiyxSAMCAySIjq3VWVSMEA1bqpqcl9FbI2n29vdXBmhVkubhoVERkUSuGVHJZYy7KuAGZVUsgYutugDx/9pfSbGL4JeNdJtLK3srjxzNaeGry9hiVWEuqTW2kC8kAAMzQxzRttJBZYEj3IMFfVdT0mx1q2S31Cyt7+3SaG5WK5iWRVlikWWKQBgQGSREdW6qyqRggGvKviJJfeMfi54J8Banb29roTTXPixnhuGla/i0t9PNvDIuxDAwv72GfKO4K6eituW4dI/VdTkvorZG0+3t7q4M0KslzcNCoiMiiVwyo5LLGXZVwAzKqlkDF1ALdVLLSbHTrm/uLSyt7W4v5hc3ksMSo1zKI0iEkhAy7COKNNxydsaDooAt1UspL57m/W7t7eC3SYLZvDcNI00XloS8ilFEbeYZF2guNqo24FiiABqek2OtWyW+oWVvf26TQ3KxXMSyKssUiyxSAMCAySIjq3VWVSMEA1bqpqcl9FbI2n29vdXBmhVkubhoVERkUSuGVHJZYy7KuAGZVUsgYutugCpZaTY6dc39xaWVva3F/MLm8lhiVGuZRGkQkkIGXYRxRpuOTtjQdFABqek2OtWyW+oWVvf26TQ3KxXMSyKssUiyxSAMCAySIjq3VWVSMEA0WUl89zfrd29vBbpMFs3huGkaaLy0JeRSiiNvMMi7QXG1UbcCxRDU5L6K2RtPt7e6uDNCrJc3DQqIjIolcMqOSyxl2VcAMyqpZAxdQC3RRRQAUUVU1PSbHWrZLfULK3v7dJoblYrmJZFWWKRZYpAGBAZJER1bqrKpGCAaALdFFVLLSbHTrm/uLSyt7W4v5hc3ksMSo1zKI0iEkhAy7COKNNxydsaDooAALdFVNT0mx1q2S31Cyt7+3SaG5WK5iWRVlikWWKQBgQGSREdW6qyqRggGrdABRVSy0mx065v7i0sre1uL+YXN5LDEqNcyiNIhJIQMuwjijTccnbGg6KADU9Jsdatkt9Qsre/t0mhuViuYlkVZYpFlikAYEBkkRHVuqsqkYIBoAt15V+y5/ofwJ8M6D9/8A4RX7V4R+0dPtX9lXUum/aNv8Hm/ZPN2ZbZ5m3c23cfVa8f8AgFpNj4e8V/G3SdMsrexsYPHL3KpDEqs8t1pWm3txJI+N0jNPdTNucsVUpGuI40RQD2Ciqmp6TY61bJb6hZW9/bpNDcrFcxLIqyxSLLFIAwIDJIiOrdVZVIwQDVugAryr9pb/AJJ1pH/Y5+E//Uh06vSrLSbHTrm/uLSyt7W4v5hc3ksMSo1zKI0iEkhAy7COKNNxydsaDooA8K/a5+E/gfxh4X0XW9e8G+H9b1pfE3hfTV1HUdLguLgWsmv2SSW4kdC3lMs0qsmdpErgjDHIB9AUVk+FvCeh+BtCtdE8N6Np/h/RbXd9n07S7VLa3h3MXbZGgCrlmZjgcliepq3ZaTY6dc39xaWVva3F/MLm8lhiVGuZRGkQkkIGXYRxRpuOTtjQdFAABboqpqek2OtWyW+oWVvf26TQ3KxXMSyKssUiyxSAMCAySIjq3VWVSMEA1boA8q03/ib/ALU/iH7X+9/4R/wZpn9mfw/Z/wC0L6/+29MbvM/sqw+9nb5Hy7d77vVa8f8AgtpNjD8Wvj9qcdlbpqVz4tsbae8WJRNLFH4f0po42fGWVGmlKqTgGRyMbjn1XU9Jsdatkt9Qsre/t0mhuViuYlkVZYpFlikAYEBkkRHVuqsqkYIBoAt0UVUstJsdOub+4tLK3tbi/mFzeSwxKjXMojSISSEDLsI4o03HJ2xoOigAAt0VU1PSbHWrZLfULK3v7dJoblYrmJZFWWKRZYpAGBAZJER1bqrKpGCAat0AFFVLLSbHTrm/uLSyt7W4v5hc3ksMSo1zKI0iEkhAy7COKNNxydsaDooANT0mx1q2S31Cyt7+3SaG5WK5iWRVlikWWKQBgQGSREdW6qyqRggGgC3RRRQB81fDjxr8b7/xV40XUvCPg+bxJBeiObSL3xzfW8VlYB5RYvbwLpTo0UqB3NyGZpZBKjmI24tbY+OHjX436V4L02b/AIRHwfo27xN4eg+0aZ45vmlfzNZso/JYf2Un7qXf5Uh3HEcjnbJjY30rXmPxv+Nmk/C/wvr8Fnrnh0ePYtFutT0nw9q2qQ2814YopHDCNpFZox5bkkEDCN8y4JCbsrjSbdkQf8JH8b/+iefD/wD8Ly+/+U1ef/DTxr8b77xp8WIf+ER8H6h9j8TQQfZ73xzfCKxzo2mSeTbn+ymzEfM80nbH+8mlG043v6H+zf8AEjXPip8N21zxA2nSXq6ne2aS6daS2XmRQzNGjS2s0kkltKQvzQu7Mp64zgepVTViU09j5q+OHjX436V4L02b/hEfB+jbvE3h6D7Rpnjm+aV/M1myj8lh/ZSfupd/lSHccRyOdsmNjegf8JH8b/8Aonnw/wD/AAvL7/5TVZ+M37QXg/4KaNfvqur6fP4ljsXvbDwut/DHqOpYyFWGJmDEFlI3gEDDE8Kah/Z1+JOvfE7wTf3vim1TTPEun6rcaZqOlJYfZTYTR7cwEi5uFmwGBE6OFkVlIRORSj7zaXRX/G3579uu6u37qTfXT8L/ANd+mzt558NPGvxvvvGnxYh/4RHwfqH2PxNBB9nvfHN8IrHOjaZJ5Nuf7KbMR8zzSdsf7yaUbTje58cPGvxv0rwXps3/AAiPg/Rt3ibw9B9o0zxzfNK/mazZR+Sw/spP3Uu/ypDuOI5HO2TGxvpWvOfi5+0J8P8A4JadeSeK/FejaZqcVk99Bo1zqMEN7doMgeVE7gsCyld33QQckAEhN2Gk3oih/wAJH8b/APonnw//APC8vv8A5TV5p8J9f+MKePPjO1p4F8Dz3D+LbdrxJvGl5GsMv9haSAkbDSWMi+WI23EIdzOu0hQ7+l/sy/GN/jt8JbTxVcT6NLfPf39ncR6DdfabWIw3cscYD5JYmJYn3HG4OGCqGAB8G/8Akovx2/7HO2/9R7RqpprclNNXR5/8cPGvxv0rwXps3/CI+D9G3eJvD0H2jTPHN80r+ZrNlH5LD+yk/dS7/KkO44jkc7ZMbG9A/wCEj+N//RPPh/8A+F5ff/Kaui8bfELTdJ1CLwpp3ijwzp3j/U4fM0nSdbvVWWYZIMot1dZZVULIcJjdsI3LywpfA7xh4h8c+AU1PxNb2Kagt9eWqXemxPDa38MVw8cV1FFI7vGkioGAZ24IIYhgam/9f1/X42buv6/r/L8Dyr4aeNfjffeNPixD/wAIj4P1D7H4mgg+z3vjm+EVjnRtMk8m3P8AZTZiPmeaTtj/AHk0o2nG96n7Qev/ABhl8B6UuoeBfA9rbjxb4YZXtvGl5MxlGu2BiQq2koArSBFZskqrMwVyoRvqCvKv2lv+SdaR/wBjn4T/APUh06mAf8JH8b/+iefD/wD8Ly+/+U1ef/DTxr8b77xp8WIf+ER8H6h9j8TQQfZ73xzfCKxzo2mSeTbn+ymzEfM80nbH+8mlG043v9K0UAfNXxw8a/G/SvBemzf8Ij4P0bd4m8PQfaNM8c3zSv5ms2UfksP7KT91Lv8AKkO44jkc7ZMbG9A/4SP43/8ARPPh/wD+F5ff/KarXx+8U+MvBPgC/wBf8HPoaz6bBLdTQ6xaT3TXbKB5VrBHDJGRJK5CByzYJUCN93HoenzT3FhbS3Vv9juZIlaW33h/KcgFk3DhsHIyOuKSd7r+v6/rtcelvP8Ar+vw6nzP8J9f+MKePPjO1p4F8Dz3D+LbdrxJvGl5GsMv9haSAkbDSWMi+WI23EIdzOu0hQ72/jh41+N+leC9Nm/4RHwfo27xN4eg+0aZ45vmlfzNZso/JYf2Un7qXf5Uh3HEcjnbJjY3oHwj/wBE+KPxwtJ/3N3P4ms9Sigk+V5LV9E02BLhVPJiaa1uow4+UvbyqDmNgOf/AGvP2mbP9mn4cnUYptJPifUEnGk2ms3Igt5GijMkjN8yl8DaoRDud5EUYBLKN2Ha50H/AAkfxv8A+iefD/8A8Ly+/wDlNXn/AMNPGvxvvvGnxYh/4RHwfqH2PxNBB9nvfHN8IrHOjaZJ5Nuf7KbMR8zzSdsf7yaUbTje/wBG2F/a6rY217ZXMN5ZXMazQXNu4eOWNgCrqw4ZSCCCOCDViqaadmSnfVHzV8cPGvxv0rwXps3/AAiPg/Rt3ibw9B9o0zxzfNK/mazZR+Sw/spP3Uu/ypDuOI5HO2TGxvQP+Ej+N/8A0Tz4f/8AheX3/wApqzv2mvjfrHwd8P6XF4Z8Pz+IvEmrPOYYooEnW1treEz3Vy0TTwecUjX5YRKjOzABq9N8Ga4nifwfoWsx3Md6mo2EF2tzFA0CSiSNXDrGzMyA5yFLMRnBJxmkveTa6WX36/187bOzelk+t/w/4f8Az3V/A/hp41+N9940+LEP/CI+D9Q+x+JoIPs9745vhFY50bTJPJtz/ZTZiPmeaTtj/eTSjacb3Pjh41+N+leC9Nm/4RHwfo27xN4eg+0aZ45vmlfzNZso/JYf2Un7qXf5Uh3HEcjnbJjY30rXhn7W/wAaPE3wS8D6XqvhiPSjdXV3NDLNqtpJeJGqWdxOoEEU0TkM8SK8oYrCheVwURiE2lqyormdkb3/AAkfxv8A+iefD/8A8Ly+/wDlNXn/AMFPGvxv1LwrdNZ+EfB+veG4r149B1fU/HN80t5YBIyjrOdKZ7qIOZUjuZFRpo0RyZwwurj3K616e3+HkutXl/pei3KaWbya+mJuLC0cRb2kYh08yJTknDLuUfeXOR8qfCb9tpfEPh64m8e/Ff4YeDddjnQLp8umXMXmW728M0NwvnXqMUlSUSLlQVVgrAOrgbU6bq1XSjuter8ulznnUUYKdrp/11t/XyPs6sLxx4G0D4leE9S8M+KNKt9a0LUY/KurK6XKOAQykEcqysFZWUhlZVZSCARu1U1OS+itkbT7e3urgzQqyXNw0KiIyKJXDKjkssZdlXADMqqWQMXXI2MXwD8OtB+GWizaX4ftriC2nuZL2eS8vZ724uJ5Dl5ZZ53eWRjgDLsTgAdABW1ZaTY6dc39xaWVva3F/MLm8lhiVGuZRGkQkkIGXYRxRpuOTtjQdFAFuqllJfPc363dvbwW6TBbN4bhpGmi8tCXkUoojbzDIu0FxtVG3AsUR3uBmeOfAvh/4meEtT8MeKdJtdc0DUovJurC8TdHIuQwPqGVgrKwIZWVWUggGovAXw+0H4ZeHk0Xw7ZyWliJXnY3F1LdTzSOctJLNMzySseBudicBRnAAGxqcl9FbI2n29vdXBmhVkubhoVERkUSuGVHJZYy7KuAGZVUsgYutui7DcqWWk2OnXN/cWllb2txfzC5vJYYlRrmURpEJJCBl2EcUabjk7Y0HRQAanpNjrVslvqFlb39uk0NysVzEsirLFIssUgDAgMkiI6t1VlUjBANFlJfPc363dvbwW6TBbN4bhpGmi8tCXkUoojbzDIu0FxtVG3AsUQ1OS+itkbT7e3urgzQqyXNw0KiIyKJXDKjkssZdlXADMqqWQMXVAUvCfhHSfA2irpOiWn2LT1uLi6EPmPJ+8nmeeVsuSfmkldsZwM4GAAK83/ZW0mxtvhVPrthZW9vb+LfEGteKobuGJUbULW+1G4uLK5kwAxZ7N7Xh8OqhEYKU2j0Dx/41sfh14N1bxHqEVxdW9hCZFs7JVe5vJSQsVtbozKJJ5pGSKOPILySIo5YVz/wE8Ha58OPg/4P8H68mnm78O6Lp2kLcaddPMlz5FlBHJIQ8UZT98syqvzZRUYkFyiAG58RPh34f+K3g++8L+KLFtS0S9MTTW6XEtuxaOVJY2WSJldGWSNGBVgQVFQfDX4X+HPhH4cGheF7W5tNNEnm7LvULi9k3bFQfvbiR3wEjRQu7ChQAABXQanJfRWyNp9vb3VwZoVZLm4aFREZFErhlRyWWMuyrgBmVVLIGLrboWl7dQetr9CpZaTY6dc39xaWVva3F/MLm8lhiVGuZRGkQkkIGXYRxRpuOTtjQdFAHhX7XPwn8D+MPC+i63r3g3w/retL4m8L6auo6jpcFxcC1k1+ySS3EjoW8plmlVkztIlcEYY55L9qP4tQ6d4a8Q2HjC71n4RXMd29j4N1ZvFdvYQa5cPGipdP9mmMyRQSs7PHMPL8vYzhncRx7P7R/iPxnf8Aww8HXXhvS/D/AIl0C71rwjdjWdR1ifTrie5bXLFogLVbKVVidvJ3OZAyCRyI2KBXS1u+36/k/J+XyJe60n1/r7vNdn8/fvC3hPQ/A2hWuieG9G0/w/otru+z6dpdqltbw7mLtsjQBVyzMxwOSxPU1bstJsdOub+4tLK3tbi/mFzeSwxKjXMojSISSEDLsI4o03HJ2xoOigCp4Wudcu9CtZfEmnafpWtNu+0Wel3731vH8xC7JnhhZ8rtJzGuCSOQNxt2Ul89zfrd29vBbpMFs3huGkaaLy0JeRSiiNvMMi7QXG1UbcCxRGBx/wAVvgl4R+NdnpVr4utdQvbfS7pb60jsdZvdPEdwpBSU/Zpo9zoVBVmyUOSuCTXXaLo9p4e0ew0rT4fs9hYwR21vFuLbI0UKq5YknAAGSSadqcl9FbI2n29vdXBmhVkubhoVERkUSuGVHJZYy7KuAGZVUsgYutukla9uu4272v0PH9K0mx8IftX6/cJZW8Fx458JWtystpEqtLLpN1JFcSXJwCWaPVrBI2+YlYHB2BEDegePvAHh74o+ENS8LeKtLh1nQNRRUurKcsFcKwdSCpDKysqsGUgqVBBBArz/AMfyX2j/ABy+FetSW9vG97qepeE4Ntw0ok0+40s6jJMybE8ucXOjxRqA0i+UXJ+aQCL1XU5L6K2RtPt7e6uDNCrJc3DQqIjIolcMqOSyxl2VcAMyqpZAxdXsIt1UstJsdOub+4tLK3tbi/mFzeSwxKjXMojSISSEDLsI4o03HJ2xoOigC3VSykvnub9bu3t4LdJgtm8Nw0jTReWhLyKUURt5hkXaC42qjbgWKIAcd8XfgZ4H+O+kadpnjjQl1u1068TULMi5mtpbedQQrpLC6OOvQNg8ZBwK7aysrfTbOC0tIIrW0t41ihghQIkaKMKqqOAAAAAOmKi1OS+itkbT7e3urgzQqyXNw0KiIyKJXDKjkssZdlXADMqqWQMXW3RsNtu1+hUstJsdOub+4tLK3tbi/mFzeSwxKjXMojSISSEDLsI4o03HJ2xoOigDjvi98DPA/wAeNFsNK8caJ/bNpYXa31oUu57WWCZQQHSWB0cdegbBIBIyBjsbKS+e5v1u7e3gt0mC2bw3DSNNF5aEvIpRRG3mGRdoLjaqNuBYohqcl9FbI2n29vdXBmhVkubhoVERkUSuGVHJZYy7KuAGZVUsgYuqaT0YJuLuhdL0u00TTLPTrC3jtLGzhS3t7eIYSKNFCqqjsAAAPpVqiiqbbd2SkkrIKKKqanpNjrVslvqFlb39uk0NysVzEsirLFIssUgDAgMkiI6t1VlUjBANIZbooqpZaTY6dc39xaWVva3F/MLm8lhiVGuZRGkQkkIGXYRxRpuOTtjQdFAABboqpqek2OtWyW+oWVvf26TQ3KxXMSyKssUiyxSAMCAySIjq3VWVSMEA1boAKKqWWk2OnXN/cWllb2txfzC5vJYYlRrmURpEJJCBl2EcUabjk7Y0HRQAanpNjrVslvqFlb39uk0NysVzEsirLFIssUgDAgMkiI6t1VlUjBANAHmv7Qf/ABNdO8CeGIvlv9e8Z6P9mkfiJPsFwNXm3kcjdb6ZOi4BzI8YO1Szr6rXlWjf8Vl+0dr2qr81h4J0VfD0M0fy5v79ob2+hlDct5dvb6O6MoC/6VMpLsCIvSrLSbHTrm/uLSyt7W4v5hc3ksMSo1zKI0iEkhAy7COKNNxydsaDooAALdFVNT0mx1q2S31Cyt7+3SaG5WK5iWRVlikWWKQBgQGSREdW6qyqRggGrdABXlX7S3/JOtI/7HPwn/6kOnV6VZaTY6dc39xaWVva3F/MLm8lhiVGuZRGkQkkIGXYRxRpuOTtjQdFAHhX7XPwn8D+MPC+i63r3g3w/retL4m8L6auo6jpcFxcC1k1+ySS3EjoW8plmlVkztIlcEYY5APoCisnwt4T0PwNoVronhvRtP8AD+i2u77Pp2l2qW1vDuYu2yNAFXLMzHA5LE9TVuy0mx065v7i0sre1uL+YXN5LDEqNcyiNIhJIQMuwjijTccnbGg6KAAC3RVTU9Jsdatkt9Qsre/t0mhuViuYlkVZYpFlikAYEBkkRHVuqsqkYIBq3QB5/wDH7wtqnjD4NeLLDQLX7X4phsjqGgR+YqY1a2IudPfLkJ8t1DA2JPkO3DgqWB6rwn4p0vxz4V0bxJol19t0XWLKHULG58to/OglQSRvtcBlyrA4YAjPIBq3ZaTY6dc39xaWVva3F/MLm8lhiVGuZRGkQkkIGXYRxRpuOTtjQdFAHlXwZ0mxsrbxd8N9Usre7t/CXiD7TplveRLt/s+aRdQ06SCBgRHBayO9nCy5UNpbbNhQxxgHsFFFVLLSbHTrm/uLSyt7W4v5hc3ksMSo1zKI0iEkhAy7COKNNxydsaDooAALdFVNT0mx1q2S31Cyt7+3SaG5WK5iWRVlikWWKQBgQGSREdW6qyqRggGrdABRVSy0mx065v7i0sre1uL+YXN5LDEqNcyiNIhJIQMuwjijTccnbGg6KADU9Jsdatkt9Qsre/t0mhuViuYlkVZYpFlikAYEBkkRHVuqsqkYIBoAt0UUUAFVNTkvorZG0+3t7q4M0KslzcNCoiMiiVwyo5LLGXZVwAzKqlkDF1t0UAFVLKS+e5v1u7e3gt0mC2bw3DSNNF5aEvIpRRG3mGRdoLjaqNuBYoluigCpqcl9FbI2n29vdXBmhVkubhoVERkUSuGVHJZYy7KuAGZVUsgYutuiigCpZSXz3N+t3b28FukwWzeG4aRpovLQl5FKKI28wyLtBcbVRtwLFEyvH/i2HwD4N1bxLdm3TTdIhN/qE1zJIiwWUZD3Mo8uOR3ZIRI6xhfnZVTK7ty9BXlXxq/4q7XfBPw4X99aeIb2W/1y3HBfRrJRJOpLfI8Ut1Jp1rNCwYyQXkyhcbnjANX4HeFtU8N+BBdeIbX7J4p169ude1eB5Fmlt57mVpFtHnUkT/ZYTDZrKDho7WPaEUKi9rZSXz3N+t3b28FukwWzeG4aRpovLQl5FKKI28wyLtBcbVRtwLFEt0UAVNTkvorZG0+3t7q4M0KslzcNCoiMiiVwyo5LLGXZVwAzKqlkDF1t0UUAfJP7X/xa+Lml/C/x7D4e+HviTwzpmnG4I8YWGr6YZJLNLfcs8SfahLCWnyp+UuIlDKBJJti6/wDap1rx4/gnw62jeE9Fk0ubxF4VnlbWdfktb2C8/t6yKW7Qw2k8ZTeIlaVZjtDOVR9iiT6Hryr9pb/knWkf9jn4T/8AUh06haA9Xc7/AMLXOuXehWsviTTtP0rWm3faLPS79763j+Yhdkzwws+V2k5jXBJHIG427KS+e5v1u7e3gt0mC2bw3DSNNF5aEvIpRRG3mGRdoLjaqNuBYoluigCpqcl9FbI2n29vdXBmhVkubhoVERkUSuGVHJZYy7KuAGZVUsgYutuiigCpZSXz3N+t3b28FukwWzeG4aRpovLQl5FKKI28wyLtBcbVRtwLFE8q+Jcl98Pfi54N8X6Tb289v4mmt/B+vC9uGt4Iot8s9jdtNskCtHI11bRwhUFxNqkKNICsdewVynxS8C/8LI8CanoUd9/ZV/J5V1p2p+V532C/glSezuvK3KJfJuIoZfLY7X2bWyrEEA6uqllJfPc363dvbwW6TBbN4bhpGmi8tCXkUoojbzDIu0FxtVG3AsUTn/hV46/4WX8OPDnid7H+yrvUrKOW80tpfNfTrrG24s5DtU+bBMJIXBVWV42DKpBA6ugCpqcl9FbI2n29vdXBmhVkubhoVERkUSuGVHJZYy7KuAGZVUsgYutuiigCpZSXz3N+t3b28FukwWzeG4aRpovLQl5FKKI28wyLtBcbVRtwLFENTkvorZG0+3t7q4M0KslzcNCoiMiiVwyo5LLGXZVwAzKqlkDF1t0UAFFFFABVTU9Jsdatkt9Qsre/t0mhuViuYlkVZYpFlikAYEBkkRHVuqsqkYIBq3VTU5L6K2RtPt7e6uDNCrJc3DQqIjIolcMqOSyxl2VcAMyqpZAxdQC3VSy0mx065v7i0sre1uL+YXN5LDEqNcyiNIhJIQMuwjijTccnbGg6KALdVLKS+e5v1u7e3gt0mC2bw3DSNNF5aEvIpRRG3mGRdoLjaqNuBYogAanpNjrVslvqFlb39uk0NysVzEsirLFIssUgDAgMkiI6t1VlUjBANW6qanJfRWyNp9vb3VwZoVZLm4aFREZFErhlRyWWMuyrgBmVVLIGLrboAqWWk2OnXN/cWllb2txfzC5vJYYlRrmURpEJJCBl2EcUabjk7Y0HRQB5V8KNJsfiRqvjPx/qVlb6ppuvanaw6A93ErhtL01gbOZVwY2Vr4317bzqWZ4rq3feMIkdv4163rkuj2vg+0k/sS/8aa0nhvTNX0+9dZ7e1azkur253hFNvcpb21+sBXzVEy2rN8rusffppv8AwjehWGm+G9K0+3tLP7NaW+nq32S3trVWRGEYSNgPLh3FIwoViipuQHeoBrVUstJsdOub+4tLK3tbi/mFzeSwxKjXMojSISSEDLsI4o03HJ2xoOigC3VSykvnub9bu3t4LdJgtm8Nw0jTReWhLyKUURt5hkXaC42qjbgWKIAGp6TY61bJb6hZW9/bpNDcrFcxLIqyxSLLFIAwIDJIiOrdVZVIwQDVuqmpyX0Vsjafb291cGaFWS5uGhURGRRK4ZUclljLsq4AZlVSyBi626AKllpNjp1zf3FpZW9rcX8wubyWGJUa5lEaRCSQgZdhHFGm45O2NB0UAeFftc/CfwP4w8L6LreveDfD+t60vibwvpq6jqOlwXFwLWTX7JJLcSOhbymWaVWTO0iVwRhjnzz9rv42+PdE06TRTYyfCfw/Jq09vD4w1i8WS21iKKyeeK3V7K6SeyNxPG8QYvG4QIUJd2iTpPjzrXxBb4N+AW07who4sptU8HT3C674ku4b+2vv7asCts6GzmLrvESPM8vmDdIxjcoA7iuZSl2aX3q/9de6Wl3Jcrin1v8Ah/Xp2vZ2+ifC3hPQ/A2hWuieG9G0/wAP6La7vs+naXapbW8O5i7bI0AVcszMcDksT1NW7LSbHTrm/uLSyt7W4v5hc3ksMSo1zKI0iEkhAy7COKNNxydsaDooAqeFrnXLvQrWXxJp2n6VrTbvtFnpd+99bx/MQuyZ4YWfK7ScxrgkjkDcbdlJfPc363dvbwW6TBbN4bhpGmi8tCXkUoojbzDIu0FxtVG3AsURCDU9Jsdatkt9Qsre/t0mhuViuYlkVZYpFlikAYEBkkRHVuqsqkYIBq3VTU5L6K2RtPt7e6uDNCrJc3DQqIjIolcMqOSyxl2VcAMyqpZAxdbdAFSy0mx065v7i0sre1uL+YXN5LDEqNcyiNIhJIQMuwjijTccnbGg6KADU9Jsdatkt9Qsre/t0mhuViuYlkVZYpFlikAYEBkkRHVuqsqkYIBospL57m/W7t7eC3SYLZvDcNI00XloS8ilFEbeYZF2guNqo24FiiGpyX0Vsjafb291cGaFWS5uGhURGRRK4ZUclljLsq4AZlVSyBi6gHmvg/8A4oX44+KfCi/6PoviSyHivSIDyBdLJ5GrJEq/LFEGk064IYBpJ9QupA0hLiP0qy0mx065v7i0sre1uL+YXN5LDEqNcyiNIhJIQMuwjijTccnbGg6KAPP/AI76TfDw9o3i/SbK41TV/BGpjxFBplrE00t9EtvPbXkEcSjdJO1ndXQgQFQbjyNzbNwPa+HNb/4SKzbUreTT7vRbry59K1DTr37Sl7avDG6zEhAq5ZnChGkUoqPuy5RQC3qek2OtWyW+oWVvf26TQ3KxXMSyKssUiyxSAMCAySIjq3VWVSMEA1bqpqcl9FbI2n29vdXBmhVkubhoVERkUSuGVHJZYy7KuAGZVUsgYutugCpZaTY6dc39xaWVva3F/MLm8lhiVGuZRGkQkkIGXYRxRpuOTtjQdFABqek2OtWyW+oWVvf26TQ3KxXMSyKssUiyxSAMCAySIjq3VWVSMEA0WUl89zfrd29vBbpMFs3huGkaaLy0JeRSiiNvMMi7QXG1UbcCxRDU5L6K2RtPt7e6uDNCrJc3DQqIjIolcMqOSyxl2VcAMyqpZAxdQC3RRRQAUUVU1PSbHWrZLfULK3v7dJoblYrmJZFWWKRZYpAGBAZJER1bqrKpGCAaALdFFVLLSbHTrm/uLSyt7W4v5hc3ksMSo1zKI0iEkhAy7COKNNxydsaDooAALdFVNT0mx1q2S31Cyt7+3SaG5WK5iWRVlikWWKQBgQGSREdW6qyqRggGuf8Ail/wk8ngTU7bwb+68SXnlWNpe/uj/Z3nSpE99sl+SX7MjvceSf8AW+T5YILg0Acr4A/4uJ8U/Efjt/m0rRPtPhHw/wBt3lzr/a1x/Cw33dvHbbJFO3+y/MjbZcnPqtc/4G8AeHfhr4etdD8M6Tb6RpttDBbrHCCWdYbeK2iMkjEvIywwQx73LNtjQEnArV1PSbHWrZLfULK3v7dJoblYrmJZFWWKRZYpAGBAZJER1bqrKpGCAaALdFFVLLSbHTrm/uLSyt7W4v5hc3ksMSo1zKI0iEkhAy7COKNNxydsaDooAALdFVNT0mx1q2S31Cyt7+3SaG5WK5iWRVlikWWKQBgQGSREdW6qyqRggGrdABXlX7S3/JOtI/7HPwn/AOpDp1elWWk2OnXN/cWllb2txfzC5vJYYlRrmURpEJJCBl2EcUabjk7Y0HRQB4V+1z8J/A/jDwvout694N8P63rS+JvC+mrqOo6XBcXAtZNfskktxI6FvKZZpVZM7SJXBGGOQD6AorJ8LeE9D8DaFa6J4b0bT/D+i2u77Pp2l2qW1vDuYu2yNAFXLMzHA5LE9TVuy0mx065v7i0sre1uL+YXN5LDEqNcyiNIhJIQMuwjijTccnbGg6KAAC3RVTU9Jsdatkt9Qsre/t0mhuViuYlkVZYpFlikAYEBkkRHVuqsqkYIBq3QAUVUstJsdOub+4tLK3tbi/mFzeSwxKjXMojSISSEDLsI4o03HJ2xoOigA1PSbHWrZLfULK3v7dJoblYrmJZFWWKRZYpAGBAZJER1bqrKpGCAaALdeVfCb/i33irX/hlN+6sLPOs+GN3CtpUznzLSPOAfsdwXiEcS7ILWbTVJLOa9Vryr4v8AhP8AsT+zPHfhjRs+JNH1q3v786ba5n1Cwl8m01FZljHm3O2zRZkhUlnm0+ywshiSMgHqtFVNT0mx1q2S31Cyt7+3SaG5WK5iWRVlikWWKQBgQGSREdW6qyqRggGrdABRVSy0mx065v7i0sre1uL+YXN5LDEqNcyiNIhJIQMuwjijTccnbGg6KADU9Jsdatkt9Qsre/t0mhuViuYlkVZYpFlikAYEBkkRHVuqsqkYIBoAt0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFfP/7XPja48KeF9Fiv9C1C40GXxN4Xni1XSbea/dJ4tfspJIJbaGNpF3RIDE6hxI4eI7JDAs5RQB7V4W1HVNX0K1vdY0j+wb+fc7aa1ytw9uhY+Wsjp8nm7NhdULorllWSVVEja1FFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH//2Q== 1.0000000 0.3333333 0 true true abc  -  = 1]]> 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Incorrect  -  = 1]]> 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Correct  +  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.3 Hyperbolas/8.3.3 Graph Hyperbola from Equation Graph the hyperbola. -  = 1 Graph the hyperbola.

 -  = 1
]]> 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 Incorrect ]]> 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 Correct ]]> 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 Incorrect ]]> 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 Incorrect Graph the hyperbola. -  = 1 Graph the hyperbola.

 -  = 1
]]> 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flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAt0UUUAFVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUt1UkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPK/2rtauNA+AfxBvjqI0GxtfDd/cprVvrM2nXdtfIqGzWJo9pIeTIJ81TkImyQStt8Gm+KniHWP2mPCseleJ5b63vE0FtIsrXXJWg1DTJoZTe3C2ar5N0n/Hwz3LOWha2tlXPnEV9mySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpcZWtps0/u6ej2flddSpO9Nw8mvvtr8rXXnr01+dfGutfFOL9qfwj9g8G+D7ny/DPiSPT/tPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kp86+Nda+KcX7U/hH7B4N8H3Pl+GfEken/AGnxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUgkJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAC3RRRQAVUkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJS3VSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPnXxrrXxTi/an8I/YPBvg+58vwz4kj0/7T4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KfOvjXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAt0UUUAFVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUt1UkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lPn74i+Jru3/AGs/ANjbeLdL1ezeF7S48F2OuXdnqmnyFHlXUJLWCYx3cDKpRhcxqseIyjFnIoV3JRXX/Jv+v8gekW+xW8a618U4v2p/CP2Dwb4PufL8M+JI9P8AtPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kp86+Nda+KcX7U/hH7B4N8H3Pl+GfEken/afFt1D9otft2jZlmxpj+TKMQ4iXzFO+T94Ng8z6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAC3RRRQAVUkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJS3VSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPnXxrrXxTi/an8I/YPBvg+58vwz4kj0/7T4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KfOvjXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAt0UUUAFVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUt1UkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAD518a618U4v2p/CP2Dwb4PufL8M+JI9P+0+LbqH7Ra/btGzLNjTH8mUYhxEvmKd8n7wbB5n0VJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnzr411r4pxftT+EfsHg3wfc+X4Z8SR6f8AafFt1D9otft2jZlmxpj+TKMQ4iXzFO+T94Ng8z6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAC3RRRQB81fDjxr8b7/xV40XUvCPg+bxJBeiObSL3xzfW8VlYB5RYvbwLpTo0UqB3NyGZpZBKjmI24tbY1rxr8b4vj74NsP+ER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSfStYPirxbZ+CoG1bXb/SNE8K20Dvfaxquoi1W2k3xLCvzrs2Nvky7SKVZYwFfeShsG54RrXjX43xfH3wbYf8ACI+D4fP8M65P/Zcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJDWvGvxvi+Pvg2w/4RHwfD5/hnXJ/7Lj8c332O42XWkr50p/soYlj8zag8tsrPN8yYxInxG/aY8ReE9b8dXOg/8Iz4o8J2nhHT9e0K/tWlLNc3d1JaxLI8bulxblo2lMieUVXC4fJdfSvg5498TeMl1ey1220mW60DVL7R9S1LTjLbpPPEYXgeG2fzCqPFMxfdMSjxgDzA+5L5Wm097X+V7fm1945Lks31svvXMvvV/u9DzbWvGvxvi+Pvg2w/4RHwfD5/hnXJ/wCy4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSGteNfjfF8ffBth/wiPg+Hz/AAzrk/8AZcfjm++x3Gy60lfOlP8AZQxLH5m1B5bZWeb5kxiT6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJSBHzrrXjX43xfH3wbYf8Ij4Ph8/wzrk/wDZcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJDWvGvxvi+Pvg2w/4RHwfD5/hnXJ/wCy4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KeI/Gj9oO/0a2vIfhrcaB4ouNFmdfFVzaXEeq3XhqJCMyzaZFcQyzDCzBlSVZFKDbHLlgqbt/X4+i6voNJvYw9a8a/G+L4++DbD/AIRHwfD5/hnXJ/7Lj8c332O42XWkr50p/soYlj8zag8tsrPN8yYxIa141+N8Xx98G2H/AAiPg+Hz/DOuT/2XH45vvsdxsutJXzpT/ZQxLH5m1B5bZWeb5kxiT6A06/vb46XNCtneaXcWbTTX6SvG5lPlmLy4SrAo6tKxJkBTagAfeSlqSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lKatoSndXR866141+N8Xx98G2H/CI+D4fP8ADOuT/wBlx+Ob77HcbLrSV86U/wBlDEsfmbUHltlZ5vmTGJDWvGvxvi+Pvg2w/wCER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KIZ81a/r/AMYT+0l4Fkk8C+B11JfCXiFYLdfGl4YXiN5ovmO0n9kgqysIgqhGDB3JZNgD29a8a/G+L4++DbD/AIRHwfD5/hnXJ/7Lj8c332O42XWkr50p/soYlj8zag8tsrPN8yYxIeNda+KcX7U/hH7B4N8H3Pl+GfEken/afFt1D9otft2jZlmxpj+TKMQ4iXzFO+T94Ng8z6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQA+dda8a/G+L4++DbD/hEfB8Pn+Gdcn/ALLj8c332O42XWkr50p/soYlj8zag8tsrPN8yYxIa141+N8Xx98G2H/CI+D4fP8ADOuT/wBlx+Ob77HcbLrSV86U/wBlDEsfmbUHltlZ5vmTGJPoqSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAD511rxr8b4vj74NsP8AhEfB8Pn+Gdcn/suPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEhrXjX43xfH3wbYf8ACI+D4fP8M65P/Zcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJPoqSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lPKfG/xK8aeHvj54M8OJpVtpnw71SCSKfxDdWbXb3epHLRWUXlXCm2zGkrmaaNkJVUXls0r6pd/wCv689A6N9ji9a8a/G+L4++DbD/AIRHwfD5/hnXJ/7Lj8c332O42XWkr50p/soYlj8zag8tsrPN8yYxIa141+N8Xx98G2H/AAiPg+Hz/DOuT/2XH45vvsdxsutJXzpT/ZQxLH5m1B5bZWeb5kxiT6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJRgfOuteNfjfF8ffBth/wAIj4Ph8/wzrk/9lx+Ob77HcbLrSV86U/2UMSx+ZtQeW2Vnm+ZMYkNa8a/G+L4++DbD/hEfB8Pn+Gdcn/suPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEn0VJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgB866141+N8Xx98G2H/CI+D4fP8M65P/Zcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJDWvGvxvi+Pvg2w/4RHwfD5/hnXJ/7Lj8c332O42XWkr50p/soYlj8zag8tsrPN8yYxI3xV8eviJo/i3xL4asrbwzNKnjKx8Mabq89rdbbNbq3tLmNp7VZD9oKxS3ILieAF44gFxIdnqvwZ+IWsfEzwN4c16702xtlure6i1J4blwY7yCcQYhjKHdE5SdtzOGQLGNr72KVyu1/T8Un+TX3+o5Jwai+qv8r2T+dn92p5Z8R/GvxvsPFXgtdN8I+D4fEk96Y4dIsvHN9cRXtgXiF89xA2lIixRIUcXJZWikMSIZTcG1uSj9pr9o/WPgv8R/COlWXifwdpOh38STa1/b2n3M9zplu13FAt4WjuI08lnlEQDAEP8APlkWTyytqFCWITlDo7bN/kmc9Wr7KXK1f7v1aPpWqkkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KW6qSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpzm5594n+BHhbxZ441nWNV0R9Ti8Q6JJo2sSXOu3ux4FZPJgSy3GALh7h/NXY8b8qGMrsvR+DfBVn8OrW00Pw9pscOgYubq5urrUZ7i9e6eVX3O0od5zJvmZ5ZJdwKIMOGJTekkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJR3ew229/66floEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KIQSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpy3xE+HFh8TZbHTNbtrufw+sM7XIstfvdPaRz5arDJBbsi3MLoZt4lfaNqjY4kYp1Mkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KA72GgXdvqFpb29parpIt5PMl84pLFIpjESJEEKshUyksXUqUQBX3ko6SS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAQSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAfOvjXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU+dfGutfFOL9qfwj9g8G+D7ny/DPiSPT/tPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnJ6l8M9N1L4m6X4puLS5vZLSGSRJLnXr0wWtwFWOJotOLG13GOS4DTYV1woAfzGKdZJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSh1uHkEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgB5nqn7OvhDU9d1959Hu7m08S3Carq17J4m1FbiPULd4TaSWqCTEBVVYeZC8TIIYkCsp/d9z4c8Ow+C7LRfD2g6VZ2PhewsmgQLcOJYGQxiFFjKHerKZS0jSBgUXh97MmnJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSju7WG25O7LdFFFIQVUkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJS3VSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUravf6np8jS2ulDU7OO0nmeOC5VLuSddnlQxRuFjbeDLl3ljClUGCHZk+cNZ+IWr61+0x8OvPvV05Z4pbO6+HFx4gNtrelybXkTUZrewvJra7t3RCCJwBH+7Kks5WhJuSiuv+T/AMv1egPSLl2/r+vw1L3jXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU+dfGutfFOL9qfwj9g8G+D7ny/DPiSPT/tPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgBbooooAKqSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpbqpJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KAHzr411r4pxftT+EfsHg3wfc+X4Z8SR6f8AafFt1D9otft2jZlmxpj+TKMQ4iXzFO+T94Ng8z6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJT518a618U4v2p/CP2Dwb4PufL8M+JI9P+0+LbqH7Ra/btGzLNjTH8mUYhxEvmKd8n7wbB5n0VJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KAFuiiigAqpJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSluqkkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAfOvjXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU+dfGutfFOL9qfwj9g8G+D7ny/DPiSPT/ALT4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAW6KKKACqkkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95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 Correct ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect Graph the hyperbola. -  = 1 Graph the hyperbola.

 -  = 1
]]> 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 Incorrect ]]> 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 Correct ]]> 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w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPnXxrrXxTi/an8I/YPBvg+58vwz4kj0/7T4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KfOvjXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAt0UUUAFVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUt15/460b4hnxVY6t4N13T0sIrJ0u9C12MNZ3MiurII2iiE8MsoLobgyyxxKi4tJ2csgB2skl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KeVSfGDxr4O1W3/4WB8O7fQ/DAhlm1DxdoWvpqWm6YN0axeessNvcBeZjLKITFAoidnKGZrfoPB3xz8D/EnxUmkeDfG3g/xZ5dlNd3cejeIYLu8h2vEqEQRbsxHzH3SFl2sIwFbzCUAO1kkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJT5++Ivia7t/wBrPwDY23i3S9Xs3he0uPBdjrl3Z6pp8hR5V1CS1gmMd3AyqUYXMarHiMoxZyKFdyUV1/yb/r/IHpFvsVvGutfFOL9qfwj9g8G+D7ny/DPiSPT/ALT4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KfOvjXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lOf8AHXxH0P4afYb/AMV674f8L+G598DaprurpZf6V8rQwxiQBH3ItwxPmKy+UuFcMxQA6CSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lPKpP2mPDutarb23gK2uPipbyQy75/BmbyFbhWjKwG9IXT428syyOs93FIoWELHIZ0q3a618Z9f13RGTwv4P8IeG3vVn1CXUdYuNT1QWW1j5AtYoIoIrlj5as4upo4/nK+eAuQD1WiiigAqpJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSluqkkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnP+OvBFn8QPsOmatYebpUW+7XUbPVLiw1Gyul2pGbaS32SJvikuUeRJkYKTHtdJn29BJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgB5VJ8F9e8JarbzfD3xlrGjo0MrXY8V6xfeJLSeUNGIUe2u5WlChHuW3W13bEOsXmLcL8qW/+L3+H/wDon/j3zv8Ar+8MfZMf+DLz9+f+mOzZ/wAtN/yelSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAeVSftI6dpOq29t4l8L+KPB1ukMr6lPrGh3skOmsGjMTS3tpDPp/kGNpJJJ/tYWEKofB8zyur8FfF3wr8T9Vlj8E+KvC/jDTbOEtqNxomuRXk1pKzL9nQxxBhtkVbg7mdSDEAFfcxTqpJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU5Xx98K/CvxP1XSY/F/gXwv4w02zhuGjuNfsorya0lZocJDHJCw2yKrl23qQYoxtfcSgB1Ukl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KeVSfsz+D7XVbe30bT9Y8NeHvJlZrLwx4z1fRLS1lDR7Eg0+zmjt0V8zO7LsO8AlZDK7KSfCf4iWWq272Hxn8UXdukMspbWLPRZIftCtH5MctvBpkLywODL5hS5gkAVVRgX3xgHqskl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KeVSaB8fRqtvHH46+G7aa0MrT3DeC9QEySho/LRY/7WIZWUylmLqVKIAr7yUt/218b7P/R/+EN+H+r+V+7/ALQ/4S2+sPtWOPN+zf2ZP5G773ledLszt8x8biAef+Nda+KcX7U/hH7B4N8H3Pl+GfEken/afFt1D9otft2jZlmxpj+TKMQ4iXzFO+T94Ng8z6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJT5q1/X/jCf2kvAskngXwOupL4S8QrBbr40vDC8RvNF8x2k/skFWVhEFUIwYO5LJsAf0v/hI/jf8A9E8+H/8A4Xl9/wDKagD0qSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lPKpLL4+6rqtvPHrPw38LabNDK09g2kahrU1pKrRrGi3H2mzE6yL5rsxhhMZCIFlyZASeCPjLrWq29pq/xO0fTNC8mWWS+8GeHFsNSW4DRiKMi/l1CF4GRpy5CRyK0cO1irOKAPVZJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUyvFvjGx8C2x1fxBqOj6D4Tt4Wa+1rV9SW0W2lMkSQJ86hCrl3BZpFIYRqFfzCU8/k+ADapqtu3iPxn448VJ5MofVG8XXWiTQkNH5UK2mkraW8indOzTOPNBCLmRSvlavhv4BeAvBXjLTda0P4d+F7fUoYZ3l8UyWyPrX2hgqbmuHiaWdpUe4Ms8k3mE43eZ5rMoBlSftN+Fdb1W3s/AE1v8WHaGVp7fwPexX81vKGj8tJZMi0t1eP7Q4a6uYCxg2RLMzEJb/wCEy+J/jT/RNC8Cf8K9x/rtX8dT2t7s7r5Flp93J9oztZW8y5ttm9GXzsMg9KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQA8qk+GfxF8Warb2fjfx5b3PhgQytPb+B7e58NzTS7o/LSWT7RcXBXhnDW9zalSmx1uEmIj6Dwd8H9A+H/ipNS0jRvtl3NZTW9x4k13WLvVNYjTfE0dpHPdGWU2zESSGPzlRHVSI2MrsvaySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KAFuiiigAqpJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSluqkkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAfOvjXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU+dfGutfFOL9qfwj9g8G+D7ny/DPiSPT/tPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgBbooooA+avhx41+N9/wCKvGi6l4R8HzeJIL0RzaRe+Ob63isrAPKLF7eBdKdGilQO5uQzNLIJUcxG3FrbGteNfjfF8ffBth/wiPg+Hz/DOuT/ANlx+Ob77HcbLrSV86U/2UMSx+ZtQeW2Vnm+ZMYk+lawfFXi2z8FQNq2u3+kaJ4VtoHe+1jVdRFqttJviWFfnXZsbfJl2kUqyxgK+8lDYNzwjWvGvxvi+Pvg2w/4RHwfD5/hnXJ/7Lj8c332O42XWkr50p/soYlj8zag8tsrPN8yYxIa141+N8Xx98G2H/CI+D4fP8M65P8A2XH45vvsdxsutJXzpT/ZQxLH5m1B5bZWeb5kxiRPiN+0x4i8J6346udB/wCEZ8UeE7Twjp+vaFf2rSlmubu6ktYlkeN3S4ty0bSmRPKKrhcPkuvpXwc8e+JvGS6vZa7baTLdaBql9o+palpxlt0nniMLwPDbP5hVHimYvumJR4wB5gfcl8rTae9r/K9vza+8clyWb62X3rmX3q/3eh5trXjX43xfH3wbYf8ACI+D4fP8M65P/Zcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJDWvGvxvi+Pvg2w/4RHwfD5/hnXJ/7Lj8c332O42XWkr50p/soYlj8zag8tsrPN8yYxJ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpAj511rxr8b4vj74NsP8AhEfB8Pn+Gdcn/suPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEhrXjX43xfH3wbYf8ACI+D4fP8M65P/Zcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJPoqSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lPEfjR+0Hf6NbXkPw1uNA8UXGizOviq5tLiPVbrw1EhGZZtMiuIZZhhZgypKsilBtjlywVN2/r8fRdX0Gk3sYeteNfjfF8ffBth/wiPg+Hz/DOuT/2XH45vvsdxsutJXzpT/ZQxLH5m1B5bZWeb5kxiQ1rxr8b4vj74NsP+ER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSfQGnX97fHS5oVs7zS7izaaa/SV43Mp8sxeXCVYFHVpWJMgKbUAD7yUtSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpTVtCU7q6PnXWvGvxvi+Pvg2w/4RHwfD5/hnXJ/7Lj8c332O42XWkr50p/soYlj8zag8tsrPN8yYxIa141+N8Xx98G2H/CI+D4fP8M65P/Zcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJPoqSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lEM+atf1/4wn9pLwLJJ4F8DrqS+EvEKwW6+NLwwvEbzRfMdpP7JBVlYRBVCMGDuSybAHt6141+N8Xx98G2H/CI+D4fP8M65P/Zcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJDxrrXxTi/an8I/YPBvg+58vwz4kj0/7T4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KAHzrrXjX43xfH3wbYf8ACI+D4fP8M65P/Zcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJDWvGvxvi+Pvg2w/4RHwfD5/hnXJ/7Lj8c332O42XWkr50p/soYlj8zag8tsrPN8yYxJ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAfOuteNfjfF8ffBth/wiPg+Hz/DOuT/2XH45vvsdxsutJXzpT/ZQxLH5m1B5bZWeb5kxiQ1rxr8b4vj74NsP+ER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KeU+N/iV408PfHzwZ4cTSrbTPh3qkEkU/iG6s2u3u9SOWisovKuFNtmNJXM00bISqovLZpX1S7/1/XnoHRvscXrXjX43xfH3wbYf8Ij4Ph8/wzrk/9lx+Ob77HcbLrSV86U/2UMSx+ZtQeW2Vnm+ZMYkNa8a/G+L4++DbD/hEfB8Pn+Gdcn/suPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEn0VJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSjA+dda8a/G+L4++DbD/hEfB8Pn+Gdcn/suPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEhrXjX43xfH3wbYf8Ij4Ph8/wzrk/wDZcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJPoqSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAD511rxr8b4vj74NsP+ER8Hw+f4Z1yf8AsuPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEhrXjX43xfH3wbYf8Ij4Ph8/wAM65P/AGXH45vvsdxsutJXzpT/AGUMSx+ZtQeW2Vnm+ZMYkb4q+PXxE0fxb4l8NWVt4ZmlTxlY+GNN1ee1uttmt1b2lzG09qsh+0FYpbkFxPAC8cQC4kOz1X4M/ELWPiZ4G8Oa9d6bY2y3VvdRak8Ny4Md5BOIMQxlDuicpO25nDIFjG197FK5Xa/p+KT/ACa+/wBRyTg1F9Vf5Xsn87P7tTyz4j+NfjfYeKvBa6b4R8Hw+JJ70xw6RZeOb64ivbAvEL57iBtKRFiiQo4uSytFIYkQym4NrclH7TX7R+sfBf4j+EdKsvE/g7SdDv4km1r+3tPuZ7nTLdruKBbwtHcRp5LPKIgGAIf58siyeWVtQoSxCcodHbZv8kznq1fZS5Wr/d+rR9K1UkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJS3VSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lOc3PPvE/wI8LeLPHGs6xquiPqcXiHRJNG1iS51292PArJ5MCWW4wBcPcP5q7HjflQxldl6Pwb4Ks/h1a2mh+HtNjh0DFzdXN1dajPcXr3Tyq+52lDvOZN8zPLJLuBRBhwxKb0kl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KO72G23v8A10/LQJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUQgkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJTlviJ8OLD4my2Oma3bXc/h9YZ2uRZa/e6e0jny1WGSC3ZFuYXQzbxK+0bVGxxIxTqZJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUB3sNAu7fULS3t7S1XSRbyeZL5xSWKRTGIkSIIVZCplJYupUogCvvJR0kl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KeVSftV/Da61W3g0Dxbo/ja3MMr3MHgyabxBqUDBoxGxstPinfyCGkDzsUVG8lPmMo2kn7QN9quq28fhH4YeOPFumrDK1/cNpTaFNaS7o/IRY9X+xidZF+0FmidjGYkDL+9UgEeqySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kp5VJ8WPiZqmq29jo3wO1ixSWGVm1HxX4h0uztIZVaMoj/AGOe8l2snnfMsTEOsSldsjyRW/8AhI/jf/0Tz4f/APheX3/ymoA8/wDGutfFOL9qfwj9g8G+D7ny/DPiSPT/ALT4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KfNWv6/wDGE/tJeBZJPAvgddSXwl4hWC3XxpeGF4jeaL5jtJ/ZIKsrCIKoRgwdyWTYA/pf/CR/G/8A6J58P/8AwvL7/wCU1AHpUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KeVSfGD4iWWq29pP8B/FF3bpDKt5faXreiyQ/aFaMILYTXkLywODMRJKkEgCx5hBdhGSftENpOq29t4j+Hnjjw0jwyyOjaBdaxNkNGIiraTHeW+1v3+4POkqGJP3TLKrgA9VkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJTk9S+Gem6l8TdL8U3Fpc3slpDJIklzr16YLW4CrHE0WnFja7jHJcBpsK64UAP5jFOWk/ay+E0Oq28E/xM8D6Zb+TL9sg1jxFDYalZ3AaMJBLZTBXjbBmEiymOSJo1Qxks3l+qySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kodbh5BJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAeZ6p+zr4Q1PXdfefR7u5tPEtwmq6teyeJtRW4j1C3eE2klqgkxAVVWHmQvEyCGJArKf3fc+HPDsPguy0Xw9oOlWdj4XsLJoEC3DiWBkMYhRYyh3qymUtI0gYFF4fezJpySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3ko7u1htuTuy3RRRSEFVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUt1xXjXVfHv9qxaZ4O0DR3t3hDXGv6/qLxw2zOzKDDawxu900YUu8byWysGjVJiWkMQB1Ukl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95Kc/wCOviPofw0+w3/ivXfD/hfw3PvgbVNd1dLL/SvlaGGMSAI+5FuGJ8xWXylwrhmKcVJ8K/HvirVbePxr8Q7i70J4ZVurHwYj+HIZGVozACVae93EtKzyRX8C4ihTyXV5Seg8HfCLSPAHipL/AEq21DUPNspoJNU8Q+JtR1a8tcvEwhtxePN5cUu0tKUkjy1vBlZMKYgDn5P2ktJ1/VbeH4c6VcfF6xEMr3l54MureaG1kDRhIzdTPFZM2GYvF9qFwoaFhC8btJHb/wCEh+K/jnjRPDen/DK0j+9deNVj1a8mcdUSzsLsRLEQwIma83ho3U2+GWSvSpJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPKpPhL4y8X6rbr4+8b3GqaQsMpNr4MuLvwtDFMrR+S5WCaS6lYq9yHJvVhAWHFsz/vVJP2XfhtdarbjV/AOj+Nrcwy+Zq/ji5m8QalAwaPyoIpL8Tv5BDTsVEqKjcrGxldl9VkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lK2r3+p6fI0trpQ1OzjtJ5njguVS7knXZ5UMUbhY23gy5d5YwpVBgh2ZPnDWfiFq+tftMfDrz71dOWeKWzuvhxceIDba3pcm15E1Ga3sLya2u7d0QgicAR/uypLOVoSbkorr/k/8v1egPSLl2/r+vw1L3jXWvinF+1P4R+weDfB9z5fhnxJHp/2nxbdQ/aLX7do2ZZsaY/kyjEOIl8xTvk/eDYPM+ipJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU+dfGutfFOL9qfwj9g8G+D7ny/DPiSPT/ALT4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kp5VJ+y78NrLVbcaB4B0fwdbvDL9p1fwZczeHNS3Bo/LgMmniF5YHBkZ1aUKGihPlucNH6rJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgB5VJ8G/Fuh6rbx+Evih4o0zQoYZZYrHWLm21iGK4DRmOOU3Vq97cwSEzNITfxyIAqRMqspht/8ACVfFfwb+71vwVp/xAtF+RdR8FXsdjeTOfmDPp9/KkUMSjKFlvpnZgjCMB2EXpUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KAHlUn7SWk+HtVt4fH2lXHwmsZIZXN544ure2heTdGIY4rqB5rJ2cfaSYjdLcKINwhaNvMXtfB3xH0P4k7L/AMG674f8WeG4/Ogu9U0bV0u/Jul8pkhAiDIcpI7MTIrLiPCsJCU6CSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lOK8dfB/QPH3iqx1K/0b7PdpZPby+JNG1i70jWERXVorQT2hjlktmLzSNG0wQOkZ8tyd0YB2skl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KeVSfDz4i+BNVt4/AHiy31LwwIZZZ9G8eT3OpTJKjRmO3tb3P2iNZt1wZJ7p7sxEQiKEoClW9N+LHi/TvFWlaN4w+GmoaNaXe63k1/Q7o61pxvHeP7PFGIYhcrEY2mMtxcwW8UTQ7dzh0cgHqtFFFABVSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lLdVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQA+dfGutfFOL9qfwj9g8G+D7ny/DPiSPT/tPi26h+0Wv27RsyzY0x/JlGIcRL5infJ+8GweZ9FSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kp86+Nda+KcX7U/hH7B4N8H3Pl+GfEken/afFt1D9otft2jZlmxpj+TKMQ4iXzFO+T94Ng8z6KkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAC3RRRQAVUkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJS3VSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUAPnXxrrXxTi/an8I/YPBvg+58vwz4kj0/wC0+LbqH7Ra/btGzLNjTH8mUYhxEvmKd8n7wbB5n0VJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSnzr411r4pxftT+EfsHg3wfc+X4Z8SR6f9p8W3UP2i1+3aNmWbGmP5MoxDiJfMU75P3g2DzPoqSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUALdFFFABVSSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lLdVJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lAAkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQAJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUACSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lCSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lADwr9qf4ga1o3w1+JVnJoer+GvD9h4Wvr6Lx5Hr0GnomoIkZs4YBDcC53NIzKSyxjdGqASLLx5PN8VPEOsftMeFY9K8Ty31veJoLaRZWuuStBqGmTQym9uFs1XybpP+PhnuWctC1tbKufOIr7NkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJS4ytbTZp+tuj8ns/L1uVJ3g4eTX321+Vrrz16Hzr411r4pxftT+EfsHg3wfc+X4Z8SR6f9p8W3UP2i1+3aNmWbGmP5MoxDiJfMU75P3g2DzPoqSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lPnXxrrXxTi/an8I/YPBvg+58vwz4kj0/7T4tuoftFr9u0bMs2NMfyZRiHES+Yp3yfvBsHmfRUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KQSEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgASSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KEkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KABJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeShJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSgBbooooAKKKKACiiigAooooAKKKKACiiigAooooA+avGvxH1yw/an8I6avgvULnxJF4Z8SWum28RdtOvY5b7RmguXvhFsgiVInM4dfMiZCiJOZbU3P0rRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB//9k= Incorrect ]]> 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 Incorrect Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.3 Hyperbolas/8.3.4 Find Equation of Hyperbola Given Conditions Find an equation in standard form for the hyperbola that satisfies the given ... Find an equation in standard form for the hyperbola that satisfies the given conditions.

Center (-1, 3), focus (-1, 8), vertex (-1, 5)]]> 1.0000000 0.3333333 0 true true abc  +  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect  -  = 1]]> 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Correct Find an equation in standard form for the hyperbola that satisfies the given ... Find an equation in standard form for the hyperbola that satisfies the given conditions.

Center (2, -3), focus (7, -3), vertex (5, -3)]]> 1.0000000 0.3333333 0 true true abc  -  = 1]]> 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Correct  -  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect Find an equation in standard form for the hyperbola that satisfies the given ... Find an equation in standard form for the hyperbola that satisfies the given conditions.

Vertices at (±3, 0), foci at (±9, 0)]]> 1.0000000 0.3333333 0 true true abc  -  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect  -  = 1]]> 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Correct Find an equation in standard form for the hyperbola that satisfies the given ... Find an equation in standard form for the hyperbola that satisfies the given conditions.

Foci at (0, ±10), a conjugate axis with length 8]]> 1.0000000 0.3333333 0 true true abc  -  = 1]]> 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Correct  -  = 1]]> 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 Incorrect  -  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect Find an equation in standard form for the hyperbola that satisfies the given ... Find an equation in standard form for the hyperbola that satisfies the given conditions.

Foci at (±8, 0), transverse axis with length 8]]> 1.0000000 0.3333333 0 true true abc  -  = 1]]> 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Correct  -  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect Find an equation in standard form for the hyperbola that satisfies the given ... Find an equation in standard form for the hyperbola that satisfies the given conditions.

Vertices at (0, ±4), asymptotes at y = ± x]]> 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1.0000000 0.3333333 0 true true abc  -  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect  -  = 1]]> 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Correct  -  = 1]]> 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Incorrect Find an equation in standard form for the hyperbola that satisfies the given ... Find an equation in standard form for the hyperbola that satisfies the given conditions.

Vertices at (0, ±3), foci at (0, ±9)]]> 1.0000000 0.3333333 0 true true abc  -  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect  -  = 1]]> 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Incorrect  -  = 1]]> 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 Correct Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.3 Hyperbolas/8.3.5 Find Eccentricity of Hyperbola Find the eccentricity of the hyperbola.16x2 - y2 = 1 Find the eccentricity of the hyperbola.

16x2 - y2 = 1]]> 1.0000000 0.3333333 0 true true abc  ]]> 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 Correct 4 Incorrect 17 Incorrect ]]> 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 Incorrect Find the eccentricity of the hyperbola.8x2 - 9y2 = 72 Find the eccentricity of the hyperbola.

8x2 - 9y2 = 72]]> 1.0000000 0.3333333 0 true true abc ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Correct Find the eccentricity of the hyperbola.x2 - 16y2 = 1 Find the eccentricity of the hyperbola.

x2 - 16y2 = 1]]> 1.0000000 0.3333333 0 true true abc 17 Incorrect 4 Incorrect ]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAoAB4DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U68D+KdvF43+Md7pmo3Pi2PRvB/heDUX0vwlrN/Yz6tc6ldyxQZ+xzQtmAaXKo8xih+3MzGIRFm7Hxr4b8a2niaLxfoutXGrJpswC+D7fZbQ3unmBlnh3yMUa7aYxzRzSFFAtorcG3Wa5nk5D4E+ObPx/pfxL+LHhm1u/GWieItVjbw3cWoSK6v9PtbC2gNvELpojEiXy6ntjlMa75JZBxLvaZbMqO6ucvZeGPCWv/Dnwj4w8NeHvjR4pt/EsCXMGn6d8RdUjubaNozIGnafWIoU7LxIxJIAz1r274QeKofFvgWznt9E1zQYLN305LXxFdR3d23kHyi7Tx3E4myVP7wyuzEEkkkmvL/hNo/xD0D9mLwV4OXwrf8AhnxTBBbaDey3d5ZOdPgCAT36NDPIrhVDCNQd5kKbkC7iPetL0y20XTLTT7KEW9naQpBBCpJCRqoVVGfQACtZpKcktr6f1/X4Ckleyf8Aw239fLozzT/hTfi7/ou3xA/8AfD3/wAqq5bxB4Ab4R6FFc6j8fPGfh3TLvU1gjWLS/Dyia9vLnsiaRlpJZpWdiBklndj95q9+r5T/bWvfHVpa2B0jwZD4r0r7Xpkln9iOpXN5BNDqEFxO7QWmmXARSkSL5jSqQok2q7HYxT5HUhGo7JtJvyvr/XccVzP+v68z1f/AIU34u/6Lt8QP/AHw9/8qq7XwV4Z1HwrpUtpqfizWPGNw8xlW+1uKyjmjUqoEYFpbwJtBUnJQtljliMAa+m3TX2nWty8ZheaJJGjIcFCQDjDqrDGf4lU+oB4qzUtW0ITTV0FFFFIYUUUUAf/2Q== Correct ]]> 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 Incorrect Find the eccentricity of the hyperbola.x2 - 2y2 = 6 Find the eccentricity of the hyperbola.

x2 - 2y2 = 6]]> 1.0000000 0.3333333 0 true true abc  ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Correct ]]> 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 Incorrect Find the eccentricity of the hyperbola.x2 - y2 = 49 Find the eccentricity of the hyperbola.

x2 - y2 = 49]]> 1.0000000 0.3333333 0 true true abc ]]> 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 Correct 1 Incorrect 0 Incorrect ]]> 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 Incorrect Pre-Calc/Chapter 8: Analytic Geometry in Two- and Three-Dimensions/8.3 Hyperbolas/8.3.6 Solve Apps: Hyperbolas Solve the problem.A comet follows the hyperbolic path described by  -   = 1, ... Solve the problem.

A comet follows the hyperbolic path described by  -   = 1, where x and y are in millions. If the sun is the focus of the path, how close to the sun is the vertex of the path?
  ]]> 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1.0000000 0.3333333 0 true true abc 2 million Incorrect 20 million Incorrect 4.5 million Incorrect 2.5 million Correct Solve the problem.The roof of a building is in the shape of the hyperbola  Solve the problem.

The roof of a building is in the shape of the hyperbola  where x and y are in meters. Refer to the figure and determine the height h of the outside walls.

a = b = 5 m]]> 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 1.0000000 0.3333333 0 true true abc -39 m Incorrect 59 m Incorrect 89 m Incorrect 9.4 m Correct Solve the problem.The roof of a building is in the shape of the hyperbola  Solve the problem.

The roof of a building is in the shape of the hyperbola  where x and y are in meters. Determine the distance, w, the outside walls are apart, if the height of each wall is 7 m.
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1.0000000 0.3333333 0 true true abc 13.3 m Correct 44 m Incorrect 7.3 m Incorrect 6.65 m Incorrect Pre-Calc/Chapter 9: Discrete Mathematics/9.1 Basic Combinatorics/9.1.1 Solve Apps: Multiplication Principle Auto Accessories A person ordering a certain model of car can choose any of #c colors, either manual or automatic transmission, and any of #a audio systems.  How many ways are there to order this model of car?

]]> 1.0000000 0.3333333 0 0 #answer]]> Great job!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>.</mo><mo>.</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>.</mo><mo>.</mo><mn>4</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>c</mi><mo>*</mo><mn>2</mn><mo>*</mo><mi>a</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> License Plates How many automobile license plates can be made involving #a letters followed by #b digits?  (Repetition is allowed)

]]> 1.0000000 0.3333333 0 0 #answer]]> Nice job!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>.</mo><mo>.</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>.</mo><mo>.</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><msup><mn>26</mn><mi>a</mi></msup><mo>*</mo><msup><mn>10</mn><mi>b</mi></msup></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"><![CDATA[<session lang="en" version="2.0"><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></data></localData></question> How many letters/numbers available for each spot?

]]> t

]]> Pre-Calc/Chapter 9: Discrete Mathematics/9.1 Basic Combinatorics/9.1.2 Evaluate Factorial, Combination, or Permulations Evaluating Combinations Evaluate «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«maction actiontype=¨argument¨»«mrow/»«/maction»«mrow»«mo»#«/mo»«mi»n«/mi»«/mrow»«/msub»«msub»«mi»C«/mi»«mrow»«mo»#«/mo»«mi»r«/mi»«/mrow»«/msub»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>7</mn><mo>,</mo><mn>13</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>r</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">C</csymbol><mi>n</mi><mi>r</mi></apply></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Evaluating Factorials Evaluate #n!

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>6</mn><mo>,</mo><mn>11</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>n</mi><mo>!</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Evaluating Permutations Evaluate «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«maction actiontype=¨argument¨»«mrow/»«/maction»«mrow»«mo»#«/mo»«mi»n«/mi»«/mrow»«/msub»«msub»«mi»P«/mi»«mrow»«mo»#«/mo»«mi»r«/mi»«/mrow»«/msub»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>7</mn><mo>,</mo><mn>13</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>r</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">V</csymbol><mi>n</mi><mi>r</mi></apply></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 9: Discrete Mathematics/9.1 Basic Combinatorics/9.1.3 Decide between Permutations and Combinations Permutations vs. Combinations #c cards are selected from a deck of 52 to form a hand for a certain card game.  This example describes a permutation.

]]> 1.0000000 1.0000000 0 True Great job.  The order in which the cards are drawn doesn't matter.

]]> False Does the order in which are card are drawn matter?

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>.</mo><mo>.</mo><mn>7</mn><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 9: Discrete Mathematics/9.1 Basic Combinatorics/9.1.4 Solve Apps: Combinations How many committees? How many committees of 5 people can be selected from #m men and #w women if the committee must have 3 men and 2 women?

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>m</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>.</mo><mo>.</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>w</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>.</mo><mo>.</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>m</mi><mo>*</mo><mo>(</mo><mi>m</mi><mo>-</mo><mn>1</mn><mo>)</mo><mo>*</mo><mo>(</mo><mi>m</mi><mo>-</mo><mn>2</mn><mo>)</mo><mo>*</mo><mi>w</mi><mo>*</mo><mo>(</mo><mi>w</mi><mo>-</mo><mn>1</mn><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 9: Discrete Mathematics/9.1 Basic Combinatorics/9.1.5 Solve Apps: Permutations Baseball Lineups Coach Zweigle has #p baseball players.  How many 9-player starting lineups can he create?

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>10</mn><mo>.</mo><mo>.</mo><mn>14</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">V</csymbol><mi>p</mi><mn>9</mn></apply></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"><![CDATA[<session lang="en" version="2.0"><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">PR</csymbol><mn>9</mn><mi>p</mi></apply></math></input></command></group></session>]]></data></localData></question> Pre-Calc/Chapter 9: Discrete Mathematics/9.2 The Binomial Theorem/9.2.1 Expand Binomial Expression Expand the Binomial «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»(«/mo»«mn»3«/mn»«mi»x«/mi»«mo»+«/mo»«mn»5«/mn»«msup»«mo»)«/mo»«mn»3«/mn»«/msup»«mo»=«/mo»«/math»

]]> 1.0000000 0.3333333 0 true true abc «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»9«/mn»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«mn»30«/mn»«mi»x«/mi»«mo»+«/mo»«mn»25«/mn»«/math»

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»27«/mn»«msup»«mi»x«/mi»«mn»3«/mn»«/msup»«mo»+«/mo»«mn»135«/mn»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«mn»225«/mn»«mi»x«/mi»«mo»+«/mo»«mn»125«/mn»«/math»

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»27«/mn»«msup»«mi»x«/mi»«mn»3«/mn»«/msup»«mo»+«/mo»«mn»135«/mn»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«mn»135«/mn»«mi»x«/mi»«mo»+«/mo»«mn»125«/mn»«/math»

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»9«/mn»«msup»«mi»x«/mi»«mn»6«/mn»«/msup»«mo»+«/mo»«mn»15«/mn»«msup»«mi»x«/mi»«mn»3«/mn»«/msup»«mo»+«/mo»«mn»15625«/mn»«/math»

]]> <question><correctAnswers><correctAnswer></correctAnswer></correctAnswers></question> Pre-Calc/Chapter 9: Discrete Mathematics/9.2 The Binomial Theorem/9.2.2 Evaluate a Binomial Coefficient Evaluating Combinations Evaluate combinations of #n objects chosen #r at a time.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>8</mn><mo>.</mo><mo>.</mo><mn>15</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>r</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>.</mo><mo>.</mo><mn>7</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">C</csymbol><mi>n</mi><mi>r</mi></apply></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 9: Discrete Mathematics/9.2 The Binomial Theorem/9.2.3 Find Coefficient of Given Term in Expansion Find coefficient of a given term Find the coefficient of the «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mi»x«/mi»«mrow»«mo»#«/mo»«mi»a«/mi»«/mrow»«/msup»«msup»«mi»y«/mi»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«/msup»«/math» term in the expansion of «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»(«/mo»«mi»x«/mi»«mo»+«/mo»«mi»y«/mi»«msup»«mo»)«/mo»«mrow»«mo»#«/mo»«mi»n«/mi»«/mrow»«/msup»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>6</mn><mo>.</mo><mo>.</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>.</mo><mo>.</mo><mn>7</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>n</mi><mo>-</mo><mi>a</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">C</csymbol><mi>n</mi><mi>a</mi></apply></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="cas">add</data><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 9: Discrete Mathematics/9.3 Probability/9.3.1 Calculate Probability (Dice) Probability of sum of two dice Two 6-sided dice are rolled.  What is the probability the sum of the two numbers will be 5?

]]> 1.0000000 0.3333333 0 0 19]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>9</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 9: Discrete Mathematics/9.3 Probability/9.3.4 Calculate Probability of Card Hand Probability of Card Hand (one condition) A 5-card hand is dealt from a deck of 52 cards.  What is the probability that #n are queens?  (Use the CAS tool to solve, then enter answer as fraction)

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>0</mn><mo>.</mo><mo>.</mo><mn>4</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">C</csymbol><mn>4</mn><mi>n</mi></apply><mo>*</mo><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">C</csymbol><mn>48</mn><mrow><mn>5</mn><mo>-</mo><mi>n</mi></mrow></apply></mrow><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">C</csymbol><mn>52</mn><mn>5</mn></apply></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="cas">add</data><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Probability of Card Hand (two conditions) A 5-card hand is dealt from a deck of 52 cards.  What is the probability that #n are kings, and the other cards aces?  (Use the CAS tool to solve, then enter answer as fraction)

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>.</mo><mo>.</mo><mn>4</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">C</csymbol><mn>4</mn><mi>n</mi></apply><mo>*</mo><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">C</csymbol><mn>4</mn><mrow><mn>5</mn><mo>-</mo><mi>n</mi></mrow></apply></mrow><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">C</csymbol><mn>52</mn><mn>5</mn></apply></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="cas">add</data><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 9: Discrete Mathematics/9.3 Probability/9.3.5 Solve Apps: Probability Probability: Multiple Slips of Paper A box contains 4 slips of paper, on each of which is written the number 1, 2, 3, or 4.  A slip of paper is drawn and the number on it is noted.  That slip is put aside, another drawn, and the number on it noted.  What is the probability that:

A)  the sum of the two numbers is 5?

B)  the first number drawn is a 2 and the second number is NOT a 5?

C)  the sum of the numbers is NOT 10?

]]> 1.0000000 0.3333333 0 0 13141]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>3</mn></mfrac><mspace linebreak="newline"/><mfrac><mn>1</mn><mn>4</mn></mfrac><mspace linebreak="newline"/><mn>1</mn></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputCompound">true</data><data name="gradeCompound">distribute</data><data name="gradeCompoundDistribution">33% 33% 34%</data><data name="inputField">popupEditor</data><data name="casSession">null</data></localData></question> Pre-Calc/Chapter 9: Discrete Mathematics/Binomial Probability Boys and Girls In South Africa, the probability of a child being born female is 51.2%.  What is the probability of a family of five children having exactly 4 girls?  (Round to hundredths)

]]> 1.0000000 0.3333333 0 0 0.17]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0</mn><mo>.</mo><mn>17</mn></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-2)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Boys and Girls (2) In South Africa, the probability of a child being born female is 51.2%.  What is the probability of a family of five children having at least 4 girls?  (Round to thousandths)

]]> 1.0000000 0.3333333 0 0 .203]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>.</mo><mn>203</mn></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Defective Batteries Duracell knows that a battery coming off the assembly line has a probability of .035 of being defective.  If four units are selected at random during the course of a workday, what is the probability that none of the four batteries are defective?  (Round to hundredths)

]]> 1.0000000 0.3333333 0 0 .87]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>.</mo><mn>87</mn></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-2)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Free Throws Logan is a 19% free throw shooter.  If he shoots 10 free throws in a row, what is the probability he makes exactly 6 of them?  (Round to thousandths)

]]> 1.0000000 0.3333333 0 0 .004]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">C</csymbol><mn>10</mn><mi>n</mi></apply><mo>*</mo><mo>(</mo><mo>.</mo><mn>19</mn><msup><mo>)</mo><mi>n</mi></msup><mo>*</mo><mo>(</mo><mo>.</mo><mn>81</mn><msup><mo>)</mo><mrow><mn>10</mn><mo>-</mo><mi>n</mi></mrow></msup></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>.</mo><mn>004</mn></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Medical Treatment A new medical treatment procedure boasts a 93% success rate for any given patient.  If twelve patients at a hospital undergo this treatment, what is the probability that at least 10 of the twelve recover from their illness?  (round to thousandths)

]]> 1.0000000 0.3333333 0 0 .953]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>.</mo><mn>953</mn></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Renting Cars Enterprise has 30 cars available for rental--22 mid-size cars, and 8 compact cars.  If two cars are selected at random, what is the probability that both are mid-size cars?  (Round to hundredths)

]]> 1.0000000 0.3333333 0 0 0.53]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0.53</mn></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-2)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Monopoly Quiz Appropriate cost of Boardwalk According to your trend line model, what would be the appropriate cost for landing on Boardwalk?  No comma is needed.  Round to nearest cent.

]]> 1.0000000 0.3333333 0 0 1637.29 <question><correctAnswers><correctAnswer></correctAnswer><correctAnswer id="1"></correctAnswer><correctAnswer id="2"></correctAnswer></correctAnswers></question> Bosco Blvd The new Bosco Blvd costs $700 for landing on it with a hotel.  How many spaces from GO is it?  Round to the nearest space (ones).

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 1.0000000 0.3333333 0 0 11 11.4 <question><correctAnswers><correctAnswer></correctAnswer><correctAnswer id="1"></correctAnswer><correctAnswer id="2"></correctAnswer></correctAnswers></question> Dore Drive Use your linear model to find the cost of Dore Drive, which is to be placed at the 46th space.  Round to the nearest cent.

 

]]> 1.0000000 0.3333333 0 0 1875.16]]> 1875.15 <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mn>1875</mn><mo>.</mo><mn>16</mn></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer><correctAnswer id="2"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Equation of Linear Model Give the equation in «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«mo»=«/mo»«mi»m«/mi»«mi»x«/mi»«mo»+«/mo»«mi»b«/mi»«/math» form for the cost of landing on a space with a hotel on it for any number of spaces from GO.

]]> 1.0000000 0.3333333 0 true true ABCD Your answer is correct.

]]> Your answer is partially correct.

]]> Your answer is incorrect.

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«mo»=«/mo»«mn»33«/mn»«mo».«/mo»«mn»981«/mn»«mi»x«/mi»«mo»+«/mo»«mn»312«/mn»«mo».«/mo»«mn»03«/mn»«/math»

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«mo»=«/mo»«mn»312«/mn»«mo».«/mo»«mn»03«/mn»«mi»x«/mi»«mo»+«/mo»«mn»33«/mn»«mo».«/mo»«mn»981«/mn»«/math»

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«mo»=«/mo»«mn»33«/mn»«mo».«/mo»«mn»981«/mn»«mi»x«/mi»«mo»-«/mo»«mn»78«/mn»«mo».«/mo»«mn»03«/mn»«/math»

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«mo»=«/mo»«mn»78«/mn»«mo».«/mo»«mn»058«/mn»«mi»x«/mi»«mo»+«/mo»«mn»312«/mn»«mo».«/mo»«mn»03«/mn»«/math»

]]> Correct Equation Not Shown

]]> <question><correctAnswers><correctAnswer></correctAnswer></correctAnswers></question> McWhinnie Lane Use your linear model to find the cost of McWhinnie Lane at the 48th space.  Round to the nearest cent.

]]> 1.0000000 0.3333333 0 0 1943.12 <question><correctAnswers><correctAnswer></correctAnswer><correctAnswer id="1"></correctAnswer><correctAnswer id="2"></correctAnswer></correctAnswers></question> Pre-Calc/Trig Unit 1: Trig Functions/1.1 Angles Complement of an Angle «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»F«/mi»«mi»i«/mi»«mi»n«/mi»«mi»d«/mi»«mo»§#160;«/mo»«mi»t«/mi»«mi»h«/mi»«mi»e«/mi»«mo»§#160;«/mo»«mi»c«/mi»«mi»o«/mi»«mi»m«/mi»«mi»p«/mi»«mi»l«/mi»«mi»e«/mi»«mi»m«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mo»§#160;«/mo»«mi»o«/mi»«mi»f«/mi»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«msup»«mo»§#160;«/mo»«mo»§#176;«/mo»«/msup»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>75</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>90</mn><mo>-</mo><mi>a</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Convert DMS to Degrees Convert «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«msup»«mi»a«/mi»«mrow»«mo»§#160;«/mo»«mo»§#176;«/mo»«mo»§#160;«/mo»«/mrow»«/msup»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»`«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»c«/mi»«mo»§#160;«/mo»«mo»``«/mo»«/math»to degrees.  Round to hundredths.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>89</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>0</mn><mo>,</mo><mn>59</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>0</mn><mo>,</mo><mn>59</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>(</mo><mi>a</mi><mo>+</mo><mfrac><mi>b</mi><mn>60</mn></mfrac><mo>+</mo><mfrac><mi>c</mi><mn>3600</mn></mfrac><mo>)</mo><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="precision">4</option><option name="tolerance">10^(-2)</option><option name="relative_tolerance">false</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Convert the angle to degrees, minutes, and seconds.28.34° Convert the angle to degrees, minutes, and seconds.

28.34°]]> 1.0000000 0.3333333 0 true true abc Correct Incorrect Incorrect Incorrect Converting Revolutions per Minute A wheel makes #a revolutions per minute.  How many revolutions does it make per second?  Round to tenths.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>200</mn><mo>,</mo><mn>300</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>(</mo><mi>a</mi><mo>/</mo><mn>60</mn><mo>)</mo><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find the angle of smallest possible positive measure coterminal with the ... Find the angle of smallest possible positive measure coterminal with the given angle.

840°]]> 1.0000000 0.3333333 0 true true abc 120° Correct 110° Incorrect 480° Incorrect 470° Incorrect Find the measure of each angle in the problem. Find the measure of each angle in the problem.


]]> 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 1.0000000 0.3333333 0 true true abc 45° and 135° Correct 60° and 120° Incorrect 90° and 270° Incorrect 45° and 55° Incorrect Find the measure of each angle in the problem. Find the measure of each angle in the problem.


]]> 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 1.0000000 0.3333333 0 true true abc 40° and 50° Correct 20° and 25° Incorrect 20° and 30° Incorrect 30° and 60° Incorrect Perform the calculation.

90° - 30°19'58"]]> 1.0000000 0.3333333 0 true true abc Correct Incorrect Incorrect Incorrect Provide an appropriate response.Find the complement of an angle whose ... Provide an appropriate response.

Find the complement of an angle whose measure is 34°21'49".]]> 1.0000000 0.3333333 0 true true abc Correct Incorrect Incorrect Incorrect Provide an appropriate response.Find the supplement of an angle whose ... Provide an appropriate response.

Find the supplement of an angle whose measure is 37°45'2"]]> 1.0000000 0.3333333 0 true true abc Correct Incorrect Incorrect Incorrect Supplement of an Angle «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»F«/mi»«mi»i«/mi»«mi»n«/mi»«mi»d«/mi»«mo»§#160;«/mo»«mi»t«/mi»«mi»h«/mi»«mi»e«/mi»«mo»§#160;«/mo»«mi»s«/mi»«mi»u«/mi»«mi»p«/mi»«mi»p«/mi»«mi»l«/mi»«mi»e«/mi»«mi»m«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mo»§#160;«/mo»«mi»o«/mi»«mi»f«/mi»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«msup»«mo»§#160;«/mo»«mo»§#176;«/mo»«/msup»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>160</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>180</mn><mo>-</mo><mi>a</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Trig Unit 1: Trig Functions/1.2 Angle Relationships Corresponding Sides of Triangles A triangle drawn on a map has sides of length #a cm, #b cm, and #c cm.  The shortest side corresponds to a real-life distance of 120 km.  What distance in km corresponds to the longest side of the triangle?  Round to tenths.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>6</mn><mo>,</mo><mn>7</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mn>8</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>(</mo><mo>(</mo><mi>c</mi><mo>*</mo><mn>120</mn><mo>)</mo><mo>/</mo><mi>a</mi><mo>)</mo><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find third angle of a triangle Find the third angle in triangle given these angles:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«mo»§#160;«/mo»«mi»a«/mi»«mi»n«/mi»«mi»d«/mi»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«/math»

Round to the nearest degree

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>10</mn><mo>,</mo><mn>50</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>12</mn><mo>,</mo><mn>70</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>180</mn><mo>-</mo><mo>(</mo><mi>a</mi><mo>+</mo><mi>b</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> The triangles are similar. Find the missing side, angle or value of the ... The triangles are similar. Find the missing side, angle or value of the variable.



a = 8
b = 10
c = 6
d = 4
e = 5]]> 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1.0000000 0.3333333 0 true true abc x = 12 Correct x = 6 Incorrect x = 18 Incorrect x = 14 Incorrect Use the properties of angle measures to find the measure of each marked ... Use the properties of angle measures to find the measure of each marked angle.

Find the measure of the marked angles.

a = (4x + 12)°, b = (2x + 66)°]]> 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 1.0000000 0.3333333 0 true true abc 20°, 70° Correct 2°, 88° Incorrect 2°, 178° Incorrect 20°, 66° Incorrect Pre-Calc/Trig Unit 1: Trig Functions/1.3 Trig Functions Evaluate Cos from random ordered pair Suppose that θ is in standard position and the given point is on the terminal side of θ. Give the exact value of the indicated trig function for θAnswer as a simplified fraction.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»(«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»)«/mo»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mi»f«/mi»«mi»i«/mi»«mi»n«/mi»«mi»d«/mi»«mo»§#160;«/mo»«mi»cos«/mi»«mo»§#160;«/mo»«mi»§#952;«/mi»«/math»

 

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>(</mo><mfrac><mi>a</mi><msqrt><mrow><msup><mi>a</mi><mn>2</mn></msup><mo>+</mo><msup><mi>b</mi><mn>2</mn></msup></mrow></msqrt></mfrac><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Evaluate Csc from random ordered pair Suppose that θ is in standard position and the given point is on the terminal side of θ. Give the exact value of the indicated trig function for θAnswer as a simplified fraction.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mi»o«/mi»«mi»r«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»)«/mo»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mi»f«/mi»«mi»i«/mi»«mi»n«/mi»«mi»d«/mi»«mo»§#160;«/mo»«mi»C«/mi»«mi»s«/mi»«mi»c«/mi»«mo»§#160;«/mo»«mi»§#952;«/mi»«/math»

 

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mn>0</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>8</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>-</mo><mn>1</mn></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/><assertion name="check_fraction_form"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Evaluate Sin from random ordered pair Suppose that θ is in standard position and the given point is on the terminal side of θ. Give the exact value of the indicated trig function for θAnswer as a simplified fraction.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mi»o«/mi»«mi»r«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»)«/mo»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mi»f«/mi»«mi»i«/mi»«mi»n«/mi»«mi»d«/mi»«mo»§#160;«/mo»«mi»sin«/mi»«mo»§#160;«/mo»«mi»§#952;«/mi»«/math»

 

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>(</mo><mfrac><mi>b</mi><msqrt><mrow><msup><mi>a</mi><mn>2</mn></msup><mo>+</mo><msup><mi>b</mi><mn>2</mn></msup></mrow></msqrt></mfrac><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Evaluate Tan from random ordered pair Suppose that θ is in standard position and the given point is on the terminal side of θ. Give the exact value of the indicated trig function for θAnswer as a simplified fraction.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mi»o«/mi»«mi»r«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»)«/mo»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mi»f«/mi»«mi»i«/mi»«mi»n«/mi»«mi»d«/mi»«mo»§#160;«/mo»«mi»T«/mi»«mi»a«/mi»«mi»n«/mi»«mo»§#160;«/mo»«mi»§#952;«/mi»«/math»

 

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>(</mo><mfrac><mi>b</mi><mi>a</mi></mfrac><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Evaluate the expression.sec 270° Evaluate the expression.

sec 270°]]> 1.0000000 0.3333333 0 true true abc Undefined Correct 0 Incorrect -1 Incorrect ]]> 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 Incorrect Evaluate the expression.sin2 270° + cos2 270° Evaluate the expression.

sin2 270° + cos2 270°]]> 1.0000000 0.3333333 0 true true abc 1 Correct ]]> 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 Incorrect ]]> 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 Incorrect 2 Incorrect If n is an integer, n ∙ 180° represents an integer multiple of 180°, and  If n is an integer, n ∙ 180° represents an integer multiple of 180°, and  represents an odd integer multiple of 90°. Decide whether the expression is equal to 0, 1, -1, or is undefined. 

tan((2n + 1) ∙ 90°)]]> 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 1.0000000 0.3333333 0 true true abc Undefined Correct 0 Incorrect -1 Incorrect 1 Incorrect If r is a positive number and the point (x, y) is in the indicated quadrant, ... If r is a positive number and the point (x, y) is in the indicated quadrant, decide whether the given ratio is positive or negative.

IV, ]]> 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 1.0000000 0.3333333 0 true true abc Negative Correct Positive Incorrect Place your graphing calculator in parametric and degree modes. Set the ... Place your graphing calculator in parametric and degree modes. Set the window for Tmin=0, Tmax=360, Tstep=1, Xmin= -1.8, Xmax=1.8, Xscl=1, Ymin= -1.2, Ymax=1.2, Yscl=1. Set the functions to X1T=cos T, Y1T=sin T. Graph the circle of radius 1 on the screen. Use the trace feature to move a short distance around the circle.

For what angle T is sin T ≈ 0.087? (Assume 0° ≤ T ≤ 90°.)]]> 1.0000000 0.3333333 0 true true abc Correct 85° Incorrect 0.087° Incorrect 57.079° Incorrect Sketch an angle θ in standard position such that θ has the smallest positive ... Sketch an angle θ in standard position such that θ has the smallest positive measure and the given point is on the terminal side of θ.

(-5, -3)
 ]]> 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Correct ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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Incorrect Suppose that θ is in standard position and the given point is on the ... Suppose that θ is in standard position and the given point is on the terminal side of θ. Give the exact value of the indicated trig function for θ.

(0, -4); Find csc θ.]]> 1.0000000 0.3333333 0 true true abc -1 Correct 1 Incorrect -4 Incorrect 4 Incorrect Suppose that θ is in standard position and the given point is on the ... Suppose that θ is in standard position and the given point is on the terminal side of θ. Give the exact value of the indicated trig function for θ.

(-20, 48); Find sin θ.]]> 1.0000000 0.3333333 0 true true abc ]]> 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Correct ]]> 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Incorrect ]]> 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Incorrect ]]> 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 Incorrect Trig Function Given Equation An equation of the terminal side of an angle θ in standard position is given along with the quadrant of the angle θ.  Find sin θ.  Enter answer as a simplified fraction.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»-«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mi»x«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mi»y«/mi»«mo»=«/mo»«mn»0«/mn»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mi»x«/mi»«mo»§#8805;«/mo»«mn»0«/mn»«mo».«/mo»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>a</mi><mo>/</mo><mo>(</mo><msqrt><mrow><msup><mi>a</mi><mn>2</mn></msup><mo>+</mo><mn>1</mn></mrow></msqrt><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Trig Unit 1: Trig Functions/1.4 Using Trig Functions Cos function given ordered pair Suppose that θ is in standard position and the given point is on the terminal side of θ.  Give the exact value of the indicated trig function for θ.

(#a , #b );  Find cos θ

Give answer as a simplified fraction

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>5</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mi>a</mi><msqrt><mrow><msup><mi>a</mi><mn>2</mn></msup><mo>+</mo><msup><mi>b</mi><mn>2</mn></msup></mrow></msqrt></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Identify the quadrant for the angle θ satisfying the following conditions.... Identify the quadrant for the angle θ satisfying the following conditions.

sin θ > 0 and cos θ < 0]]> 1.0000000 0.3333333 0 true true abc Quadrant II Correct Quadrant I Incorrect Quadrant III Incorrect Quadrant IV Incorrect Sin function given ordered pair Suppose that θ is in standard position and the given point is on the terminal side of θ.  Give the exact value of the indicated trig function for θ.

(#a , #b );  Find sin θ

Give answer as a simplified fraction

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>5</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mi>b</mi><msqrt><mrow><msup><mi>a</mi><mn>2</mn></msup><mo>+</mo><msup><mi>b</mi><mn>2</mn></msup></mrow></msqrt></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Tan function given ordered pair Suppose that θ is in standard position and the given point is on the terminal side of θ.  Give the exact value of the indicated trig function for θ.

(#a , #b );  Find tan θ

Give answer as a simplified fraction

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>5</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mi>b</mi><mi>a</mi></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Trig Values given quadrant II Find tan θ, given that  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mo»§#160;«/mo»«mi»§#952;«/mi»«mo»=«/mo»«mo»-«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»a«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«/mfrac»«/math» and θ is in quadrant II.  Enter answer as a simplified fraction.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>4</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>&nbsp;</mo><mo>(</mo><mn>5</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>-</mo><mfrac><msqrt><mrow><msup><mi>b</mi><mn>2</mn></msup><mo>-</mo><msup><mi>a</mi><mn>2</mn></msup></mrow></msqrt><mi>a</mi></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Trig Values given quadrant III Find cos θ, given that  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mo»§#160;«/mo»«mi»§#952;«/mi»«mo»=«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»a«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«/mfrac»«/math» and θ is in quadrant II.  Enter answer as a simplified fraction.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>&nbsp;</mo><mo>(</mo><mn>5</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>-</mo><mfrac><mi>b</mi><msqrt><mrow><msup><mi>b</mi><mn>2</mn></msup><mo>+</mo><msup><mi>a</mi><mn>2</mn></msup></mrow></msqrt></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Trig Values given quadrant IV Find sin θ, given that  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mo»§#160;«/mo»«mi»§#952;«/mi»«mo»=«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»a«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«/mfrac»«/math» and θ is in quadrant IV.  Enter answer as a simplified fraction.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>4</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>&nbsp;</mo><mo>(</mo><mn>5</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>-</mo><mfrac><msqrt><mrow><msup><mi>b</mi><mn>2</mn></msup><mo>-</mo><msup><mi>a</mi><mn>2</mn></msup></mrow></msqrt><mi>b</mi></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Trig Values given sign of cofunction Find cos θ, given that  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mo»§#160;«/mo»«mi»§#952;«/mi»«mo»=«/mo»«mo»-«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»a«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«/mfrac»«/math» and sin θ > 0.  Enter answer as a simplified fraction.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>&nbsp;</mo><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>-</mo><mfrac><mi>b</mi><msqrt><mrow><msup><mi>b</mi><mn>2</mn></msup><mo>+</mo><msup><mi>a</mi><mn>2</mn></msup></mrow></msqrt></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Use Reciprocal Identities (Fractions) Use the appropriate identity to find the indicated function value. Simplify the fraction.


cos θ, given that sec θ = #a

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>8</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mn>1</mn><mi>a</mi></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Use Reciprocal Identity (Decimal) Use the appropriate identity to find the indicated function value. If the given value is a decimal, round your answer to three decimal places.

cot θ, given that tan θ = #a

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>0</mn><mo>.</mo><mn>0004</mn><mo>,</mo><mn>0</mn><mo>.</mo><mn>9999</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mn>1</mn><mi>a</mi></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Trig Unit 1: Trig Functions/2.1 Trig Functions: Acute Angles Evaluate the function requested. Write your answer as a fraction in lowest ... Evaluate the function requested. Write your answer as a fraction in lowest terms.




Find tan A.]]> 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 1.0000000 0.3333333 0 true true abc ]]> 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 Correct ]]> 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 Incorrect ]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAmABMDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9Bvid488T+DvH/wAOLGwg0lvDniDWf7JvXuRK92WNpdTgxAFUjC/Zl5bfu8wjam3Lcx8TvjJrnw/+LXhLQ28VeAoYNc1W0sYvCN6zprdxbSsyNdxTG4VRtYHEf2dg3llRJucAdN8X/hl4p+IGv+CL/QfE+kaBB4a1T+1zBqOhy37XM3kTQBd6XcARNlxJxtY7tpyACrV/Fvwl8S+PtTk07xD4t07UPAbahDqI0pdCMepBoZknii+2C48vyxIiji3EhTjzN3z1StaL6p6+mnrur/8AAdmVUaa93+X8ddflp/w10erUUUVJJ4D8TvgD8E/h/wCCNR12L4MfCx3tjEo/tnSLLT7Nd8qR7prj7NJ5SDdktsbp0rN+DnwQ+DfxO8KNrc/we+Cc9s87R29z4Njs9cs5VXAbM5sYAGDZBUKcY69h7d47g12fQd3h3T9G1bUoZ4plsNemkgtptjhh++SOUxOrBXV/Kk5QDaM7lwvhX4G1Dw3d+KNf1u202w17xPfR317Y6PK01rblII4FAmaONpmKxBmkaNCdwXbhASR63/r+v66Dlayt/X9f11O/ooooEFFFFABRRRQB/9k= Incorrect ]]> 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 Incorrect Find a solution for the equation. Assume that all angles are acute angles.... Find a solution for the equation. Assume that all angles are acute angles.

sin(2β + 15°) = cos(3β - 25°)]]> 1.0000000 0.3333333 0 true true abc 20° Correct 21° Incorrect 22° Incorrect 19.5° Incorrect Give exact function value Without using a calculator, give the exact trig function value with rational denominator at «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»45«/mn»«mo»§#176;«/mo»«/math» for:

#a =

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f</mi><mo>(</mo><mi>x</mi><mo>)</mo><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mi>sin</mi><mo>(</mo><mi>x</mi><mo>)</mo><mo>,</mo><mi>cos</mi><mo>(</mo><mi>x</mi><mo>)</mo><mo>,</mo><mi>sec</mi><mo>(</mo><mi>x</mi><mo>)</mo><mo>,</mo><mi>cosec</mi><mo>(</mo><mi>x</mi><mo>)</mo><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>f</mi><mo>(</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>&nbsp;</mo><mi>f</mi><mo>(</mo><mn>45</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Solve cofunctions equation for an angle Find a solution.  Assume all angles are acute.  Round to tenths.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«mi»c«/mi»«mo»(«/mo»«mi»§#952;«/mi»«mo»+«/mo»«mn»15«/mn»«mo»§#176;«/mo»«mo»)«/mo»«mo»=«/mo»«mi»c«/mi»«mi»s«/mi»«mi»c«/mi»«mo»(«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mi»§#952;«/mi»«mo»+«/mo»«mn»0«/mn»«mo»§#176;«/mo»«mo»)«/mo»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>(</mo><mfrac><mn>75</mn><mrow><mo>(</mo><mi>a</mi><mo>+</mo><mn>1</mn><mo>)</mo></mrow></mfrac><mo>)</mo><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Suppose ABC is a right triangle with sides of lengths a, b, and c and right ... Suppose ABC is a right triangle with sides of lengths a, b, and c and right angle at C. Find the unknown side length using the Pythagorean theorem and then find the value of the indicated trigonometric function of the given angle. Rationalize the denominator if applicable.

Find csc B when a = 9 and b = 10.]]> 1.0000000 0.3333333 0 true true abc ]]> 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Correct ]]> 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Incorrect ]]> 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Incorrect ]]> 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Incorrect Trig function given 2 sides of right triangle Suppose ABC is a right triangle with sides of length a, b, and c and right angle at C.  Find the unknown side using the Pythagorean Theorem, then find the value of:

csc B when a=#a and b=#b

Rational if necessary.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>6</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mi>b</mi><msqrt><mrow><msup><mi>a</mi><mn>2</mn></msup><mo>+</mo><msup><mi>b</mi><mn>2</mn></msup></mrow></msqrt></mrow><mrow><mo>(</mo><msup><mi>a</mi><mn>2</mn></msup><mo>+</mo><msup><mi>b</mi><mn>2</mn></msup><mo>)</mo></mrow></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Trig function given 2 sides of right triangle (II) Suppose ABC is a right triangle with sides of length a, b, and c and right angle at C.  Find the unknown side using the Pythagorean Theorem, then find the value of:

Sin A when b=#b and c=#c

Rational if necessary.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>4</mn><mo>,</mo><mn>7</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>15</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><msqrt><mrow><msup><mi>c</mi><mn>2</mn></msup><mo>-</mo><msup><mi>b</mi><mn>2</mn></msup></mrow></msqrt><mi>c</mi></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Write function in terms of cofunction (II) Write the function in terms of its cofunction.  Assume that any angle in which an unknown appears is an acute angle

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»sin«/mi»«mo»(«/mo»«mi»§#952;«/mi»«mo»+«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«mo»)«/mo»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>20</mn><mo>,</mo><mn>60</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>cos</mi><mo>(</mo><mn>90</mn><mo>-</mo><mi>a</mi><mo>-</mo><mi>θ</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Write the function in terms of its cofunction. Assume that any angle in ... Write the function in terms of its cofunction. Assume that any angle in which an unknown appears is an acute angle.

sec(θ - 21°)]]> 1.0000000 0.3333333 0 true true abc csc(111° - θ) Correct sec(159° - θ) Incorrect cos(111° - θ) Incorrect csc(69° - θ) Incorrect Write the function in terms of its cofunction. Assume that any angle in ... Write the function in terms of its cofunction. Assume that any angle in which an unknown appears is an acute angle.

tan 83°]]> 1.0000000 0.3333333 0 true true abc cot 7° Correct cot 97° Incorrect cot 83° Incorrect tan 173° Incorrect Pre-Calc/Trig Unit 1: Trig Functions/2.2 Trig Functions: Non-Acute Angles Find all values of θ, if θ is in the interval [0, 360°) and has the given ... Find all values of θ, if θ is in the interval [0, 360°) and has the given function value.

sin θ = - ]]> 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 1.0000000 0.3333333 0 true true abc 210° and 330° Correct 60° and 120° Incorrect 60° and 300° Incorrect 150° and 210° Incorrect Find Reference Angle Find the reference angle for:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«msup»«mo»§#160;«/mo»«mo»§#176;«/mo»«/msup»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>190</mn><mo>,</mo><mn>260</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>a</mi><mo>-</mo><mn>180</mn></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find the exact trigonometric function value.sec (-135°) Find the exact trigonometric function value.

sec (-135°)]]> 1.0000000 0.3333333 0 true true abc ]]> 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 Correct ]]> 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 Incorrect -1 Incorrect ]]> 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 Incorrect Give the exact value.cos 210° Give the exact value.

cos 210°]]> 1.0000000 0.3333333 0 true true abc ]]> 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 Correct ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect Pre-Calc/Trig Unit 1: Trig Functions/2.3 Find Trig Values: Calculator Evaluate Csc (degree/minutes) Use a calculator to find the function value. Give your answer rounded to three decimal places.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»c«/mi»«mi»s«/mi»«mi»c«/mi»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»`«/mo»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>70</mn><mo>,</mo><mn>88</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>59</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mn>1</mn><mrow><mi>sin</mi><mo>(</mo><mo>&nbsp;</mo><mi>a</mi><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mi>b</mi><csymbol definitionURL="http://.../units/minute/angular">&apos;</csymbol><mo>)</mo></mrow></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Evaluate Tan (degree/minutes) Use a calculator to find the function value. Give your answer rounded to four decimal places, if necessary.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»`«/mo»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>10</mn><mo>,</mo><mn>40</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>59</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>tan</mi><mo>(</mo><mo>&nbsp;</mo><mi>a</mi><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mi>b</mi><csymbol definitionURL="http://.../units/minute/angular">&apos;</csymbol><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find a value of θ in [0°, 90°] that satisfies the statement. Leave answer in ... Find a value of θ in [0°, 90°] that satisfies the statement. Leave answer in decimal degrees rounded to seven decimal places, if necessary.

csc θ = 1.3749283]]> 1.0000000 0.3333333 0 true true abc 46.6614079° Correct 36.0287946° Incorrect 43.3385921° Incorrect 53.9712054° Incorrect Find a value of θ in [0°, 90°] that satisfies the statement. Leave answer in ... Find a value of θ in [0°, 90°] that satisfies the statement. Leave answer in decimal degrees rounded to seven decimal places, if necessary.

cos θ = 0.32512855]]> 1.0000000 0.3333333 0 true true abc 71.0266367° Correct 288.973363° Incorrect 108.973363° Incorrect 18.9733633° Incorrect Grade Resistance (solve for F) The grade resistance F of a car traveling up or down a hill is modeled by the equation F = W sin θ, where W is the weight of the car and θ is the angle of the hill's grade (θ > 0 for uphill travel, θ < 0 for downhill travel). What is the grade resistance (to the nearest pound) of a #a -lb car traveling uphill on a 1° grade ()?

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>9000</mn><mo>,</mo><mn>11000</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>a</mi><mo>*</mo><mo>(</mo><mi>sin</mi><mo>&nbsp;</mo><mo>(</mo><mn>1</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_no_more_decimals"><param name="digits">0</param></assertion><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Grade Resistance (solve for W) The grade resistance F of a car traveling up or down a hill is modeled by the equation F = W sin θ, where W is the weight of the car and θ is the angle of the hill's grade (θ > 0 for uphill travel, θ < 0 for downhill travel). What is the weight of a car that experiences a grade resistance of #a when traveling downhill on a 4° grade  (θ= - 4°) ?  Round to the nearest pound.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>195</mn><mo>,</mo><mo>-</mo><mn>150</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mi>a</mi><mrow><mo>(</mo><mi>sin</mi><mo>&nbsp;</mo><mo>(</mo><mo>-</mo><mn>4</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo><mo>)</mo></mrow></mfrac></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_no_more_decimals"><param name="digits">0</param></assertion><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Inverse Cos (degrees) (calculator) Find a value of θ in [0°, 90°] that satisfies the statement. Leave answer in decimal degrees rounded to two decimal places, if necessary.

cos θ = #a

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>0</mn><mo>.</mo><mn>02</mn><mo>,</mo><mn>0</mn><mo>.</mo><mn>92</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mo>(</mo><mi>acos</mi><mo>(</mo><mi>a</mi><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>convert</mi><mo>(</mo><mi>b</mi><mo>,</mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>c</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"><param name="functions">exp, log, ln, sinh, cosh, tanh, asinh, acosh, atanh, min, max, sign</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Inverse Cos (radians) (calculator) Find θ in the interval «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfenced open=¨[¨ close=¨]¨»«mrow»«mn»0«/mn»«mo»,«/mo»«mfrac»«mi mathvariant=¨normal¨»§#960;«/mi»«mn»2«/mn»«/mfrac»«/mrow»«/mfenced»«/math» such that cos θ = #a

If your answer is greater than 1, round to thousandths.  If answer is less than 1, round to ten thousandths.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>0</mn><mo>.</mo><mn>02</mn><mo>,</mo><mn>0</mn><mo>.</mo><mn>92</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>(</mo><mi>acos</mi><mo>(</mo><mi>a</mi><mo>)</mo><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Inverse Tan (radians) (calculator) Find θ in the interval «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfenced open=¨[¨ close=¨]¨»«mrow»«mn»0«/mn»«mo»,«/mo»«mfrac»«mi mathvariant=¨normal¨»§#960;«/mi»«mn»2«/mn»«/mfrac»«/mrow»«/mfenced»«/math» such that tan θ = #a

If your answer is greater than 1, round to thousandths.  If answer is less than 1, round to ten thousandths.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>0</mn><mo>.</mo><mn>22</mn><mo>,</mo><mn>3</mn><mo>.</mo><mn>92</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>(</mo><mi>atan</mi><mo>(</mo><mi>a</mi><mo>)</mo><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Solve the problem.A formula used by an engineer to determine the safe radius ... Solve the problem.

A formula used by an engineer to determine the safe radius of a curve, R, when designing a road is: 
 where α is the superelevation of the road and V is the velocity (in feet per second) for which the curve is designed. If   ft per sec, f = 0.1 and  find R. Round to the nearest foot.]]> 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1.0000000 0.3333333 0 true true abc R = 1903 ft Correct R = 1906 ft Incorrect R = 1900 ft Incorrect R = 1913 ft Incorrect Pre-Calc/Trig Unit 1: Trig Functions/2.4 Solving Right Triangles Find distance to ranger station (Angle of Depression) From a balloon 900 feet high, the angle of depression to the ranger headquarters is «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»`«/mo»«/math».  How far is the headquarters from a point on the ground directly below the balloon (to the nearest foot)?

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>50</mn><mo>,</mo><mn>70</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>55</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mn>900</mn><mrow><mi>tan</mi><mo>&nbsp;</mo><mo>(</mo><mi>a</mi><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mi>b</mi><csymbol definitionURL="http://.../units/minute/angular">&apos;</csymbol><mo>)</mo></mrow></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find distance to tower (Angle of Depression) From the top of a vertical tower, #a feet above the the surface of the earth, the angle of depression to a doghouse is «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mn»61«/mn»«mo»§#176;«/mo»«/msup»«mn»45«/mn»«mo»`«/mo»«/math».  How far is it from the doghouse to the foot of the tower? Round your answer to the hundredths place.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>320</mn><mo>,</mo><mn>340</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mi>a</mi><mrow><mi>tan</mi><mo>(</mo><mn>61</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mn>45</mn><csymbol definitionURL="http://.../units/minute/angular">&apos;</csymbol><mo>)</mo></mrow></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units">m, s, g</param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-2)</option><option name="relative_tolerance">false</option><option name="precision">5</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find height of building (Angle of Elevation) A contractor needs to know the height of a building to estimate the cost of a job. From a point #a ft from the base of the building, the angle of elevation to the top of the building is found to be 40°46'. Find the height of the building. Round your answer to the hundredths place.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>75</mn><mo>,</mo><mn>90</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>tan</mi><mo>(</mo><mn>40</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mn>46</mn><csymbol definitionURL="http://.../units/minute/angular">&apos;</csymbol><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-2)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find height of cliff (Angle of Elevation) From a boat on a lake, the angle of elevation to the top of a cliff is «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»`«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»c«/mi»«mo»§#160;«/mo»«mo»``«/mo»«/math».  If the base of the cliff is 655 feet from the boat, how high is the cliff (to the nearest foot)?

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>25</mn><mo>,</mo><mn>35</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>10</mn><mo>,</mo><mn>50</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>55</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>655</mn><mo>*</mo><mi>tan</mi><mo>(</mo><mi>a</mi><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mi>b</mi><csymbol definitionURL="http://.../units/minute/angular">&apos;</csymbol><mi>c</mi><csymbol definitionURL="http://.../units/second/angular">&apos;&apos;</csymbol><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find length of shadow (Pythagorean Theorem) On a sunny day, a tree and its shadow form the sides of a right triangle.  If the hypotenuse is 35 meters long and the tree is #a meters tall, how long is the shadow?  Round to the nearest meter.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>25</mn><mo>,</mo><mn>30</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><msqrt><mrow><msup><mn>35</mn><mn>2</mn></msup><mo>-</mo><msup><mi>a</mi><mn>2</mn></msup></mrow></msqrt><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Solve the right triangle. If two sides are given, give angles in degrees ... Solve the right triangle. If two sides are given, give angles in degrees and minutes.




A = 18° 19', c = 276 ft
Round side lengths to two decimal places.]]> 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1.0000000 0.3333333 0 true true abc B = 71° 41'; a = 86.74 ft; b = 262.02 ft Correct B = 71° 40'; a = 89.94 ft; b = 263.22 ft Incorrect B = 71° 41'; a = 86.17 ft ; b = 261.13 ft Incorrect B = 72° 40'; a = 86.74 ft; b = 258.02 ft Incorrect Solve the right triangle.B = 42.1°, c = 4.2 mm, C = 90° Solve the right triangle.

B = 42.1°, c = 4.2 mm, C = 90°]]> 1.0000000 0.3333333 0 true true abc a = 3.1 mm, A = 47.9°, b = 2.8 mm Correct a = 2.8 mm, A = 47.9°, b = 3.1 mm Incorrect a = 2.3 mm, A = 47.9°, b = 3.5 mm Incorrect a = 3.1 mm, A = 47.9°, b = 2.3 mm Incorrect Pre-Calc/Trig Unit 1: Trig Functions/2.5 Apps of Right Triangles Bearing and distrance traveled (Pythagorean Theorem) A ship travels #a km on a bearing of 10°, and then travels on a bearing of 100° for #b km. Find the shortest distance from the starting point to the end of the trip, to the nearest kilometer.

]]> 1.0000000 0.3333333 0 0 #answer <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>90</mn><mo>,</mo><mn>110</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>140</mn><mo>,</mo><mn>160</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>(</mo><msqrt><mrow><msup><mi>a</mi><mn>2</mn></msup><mo>+</mo><msup><mi>b</mi><mn>2</mn></msup></mrow></msqrt><mo>)</mo><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer>#answer</correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="precision">3</option><option name="relative_tolerance">false</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Describe bearing An observer for a radar station is located at the origin of a coordinate system. For the point given, find the bearing of an airplane located at that point. Express the bearing using both methods.
(#a , #a)
 
]]> 1.0000000 0.3333333 0 true true ABCD 315°; N 45° W

]]> 225°; S 45° W

]]> 225°; S 45° E

]]> 315°; N 45° E

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">1</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> Distance to fire (bearing) A fire is sighted due west of lookout A.  The bearing of the fire from lookout B, which is #a miles due south of lookout A, is «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»N«/mi»«mo»§#160;«/mo»«mn»48«/mn»«mo»§#176;«/mo»«mn»22«/mn»«mo»`«/mo»«mo»§#160;«/mo»«mi»W«/mi»«/math».  How far is the fire from lookout B (to the nearest tenth of a mile)?

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>4</mn><mo>.</mo><mn>5</mn><mo>,</mo><mn>5</mn><mo>.</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mi>a</mi><mrow><mi>cos</mi><mo>(</mo><mn>48</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mn>22</mn><csymbol definitionURL="http://.../units/minute/angular">&apos;</csymbol><mo>)</mo></mrow></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="precision">3</option><option name="relative_tolerance">false</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Radio direction finders Radio direction finders are set up at points A and B, #a miles apart on an east-west line.  From A it is found that the bearing of a signal from a transmitter is «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»N«/mi»«mo»§#160;«/mo»«mn»54«/mn»«mo».«/mo»«mn»3«/mn»«mo»§#176;«/mo»«mo»§#160;«/mo»«mi»E«/mi»«/math», while from B it is «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»N«/mi»«mo»§#160;«/mo»«mn»35«/mn»«mo».«/mo»«mn»7«/mn»«mo»§#176;«/mo»«mo»§#160;«/mo»«mi»W«/mi»«/math».  Find the distance of the transmitter from B (to the nearest tenth of a mile).

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>7</mn><mo>.</mo><mn>5</mn><mo>,</mo><mn>9</mn><mo>.</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>sin</mi><mo>(</mo><mn>35</mn><mo>.</mo><mn>7</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="precision">2</option><option name="relative_tolerance">false</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Solve the problem.The angle of elevation from a point on the ground to the ... Solve the problem.

The angle of elevation from a point on the ground to the top of a tower is 37° 52'.
The angle of elevation from a point 106 feet farther back from the tower is 24° 9'. Find the height of the tower. Round your answer to the hundredths place.

]]> 1.0000000 0.3333333 0 true true ABCD 112.26 ft

]]> Correct

]]> 122.76 ft

]]> Incorrect

]]> 108.02 ft

]]> Incorrect

]]> 1122.64 ft

]]> Incorrect

]]> 140.78 ft

]]> Use bearing to find distance traveled (Cos) An airplane travels at 110 km/h for 5 hr in a direction (bearing)  of «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«/math» from Glenview Naval Air Station. At the end of this time, how far east of the Glenview Naval Air Station is the plane (to the nearest kilometer)?

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>105</mn><mo>,</mo><mn>160</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>550</mn><mo>*</mo><mi>cos</mi><mo>(</mo><mi>a</mi><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>-</mo><mn>90</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="precision">3</option><option name="relative_tolerance">false</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Use bearing to find distance traveled (Sin) A boat sails for 5 hours at 30 mph in a bearing of «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«mo»§#160;«/mo»«mn»30«/mn»«mo»`«/mo»«/math». How far south has it sailed (to the nearest mile)?

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>93</mn><mo>,</mo><mn>150</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>150</mn><mo>*</mo><mi>sin</mi><mo>(</mo><mo>(</mo><mi>a</mi><mo>-</mo><mn>90</mn><mo>)</mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mn>30</mn><csymbol definitionURL="http://.../units/minute/angular">&apos;</csymbol><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Trig Unit 2: Circular Functions/3.1 Radian Measure Circular pulley rotating about its center Solve the problem.
A circular pulley is rotating about its center. Through how many radians would it turn in #a  rotations?
 
]]> 1.0000000 0.3333333 0 true true ABCD #b

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]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mn>2</mn><mo>*</mo><mi>a</mi><mo>*</mo><pi/></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>a</mi><mo>*</mo><pi/></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mn>2</mn><mo>*</mo><mi>a</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>e</mi><mo>=</mo><mn>4</mn><mo>*</mo><mi>a</mi><mo>*</mo><pi/></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> Circular pulley rotating about its center (answer not given) Solve the problem.
A circular pulley is rotating about its center. Through how many degrees would it turn in #a  rotations?
 
]]> 1.0000000 0.3333333 0 true true ABCD #b

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]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mn>2</mn><mo>*</mo><mi>a</mi><mo>*</mo><pi/></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mn>360</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mn>720</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>e</mi><mo>=</mo><mo>(</mo><mn>360</mn><mo>*</mo><mi>a</mi><mo>-</mo><mn>90</mn><mo>)</mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> Convert degrees to radians (decimals) Convert the degree measure to radians, correct to four decimal places. Use 3.1416 for π.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»`«/mo»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>15</mn><mo>,</mo><mn>22</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>10</mn><mo>,</mo><mn>55</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mo>(</mo><mi>a</mi><mo>+</mo><mfrac><mi>b</mi><mn>60</mn></mfrac><mo>)</mo></mrow><mn>180</mn></mfrac><mo>*</mo><pi/><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Convert degrees to radians (multiple of pi) Convert the degree measure to radians.  Leave answer in terms of π.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«/math»

 

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mn>225</mn><mo>,</mo><mn>240</mn><mo>,</mo><mn>270</mn><mo>,</mo><mn>300</mn><mo>,</mo><mn>315</mn><mo>,</mo><mn>330</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mi>a</mi><mn>180</mn></mfrac><mo>*</mo><pi/></math></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Convert radians to degrees (decimals) Convert the radian measure to degrees. Give answer using decimal degrees to the nearest tenth. Use 3.1416 for π.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>6</mn><mo>.</mo><mn>0</mn><mo>,</mo><mo>-</mo><mn>4</mn><mo>.</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mi>a</mi><mo>*</mo><mn>180</mn></mrow><pi/></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find exact value (quadrantal angle) Find the exact value.  Answer should be properly simplified.

tan #a

]]> 1.0000000 0.3333333 0 true true ABCD Undefined

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]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>2</mn></mfrac><mo>,</mo><mfrac><mrow><mn>7</mn><pi/></mrow><mn>2</mn></mfrac><mo>,</mo><mfrac><mrow><mn>11</mn><pi/></mrow><mn>2</mn></mfrac><mo>,</mo><mfrac><mrow><mn>15</mn><pi/></mrow><mn>2</mn></mfrac><mo>}</mo><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> Find exact value with radians (cos) Find the exact value without using a calculator. Answer should be properly simplified.

cos #a

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><pi/><mn>6</mn></mfrac><mo>,</mo><mfrac><pi/><mn>4</mn></mfrac><mo>,</mo><mfrac><pi/><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>2</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>6</mn></mfrac><mo>,</mo><mfrac><mrow><mn>7</mn><pi/></mrow><mn>6</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>4</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>7</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>11</mn><pi/></mrow><mn>6</mn></mfrac><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>cos</mi><mo>(</mo><mi>a</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find exact value with radians (sin) Find the exact value without using a calculator. Answer should be properly simplified.

sin #a

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><pi/><mn>6</mn></mfrac><mo>,</mo><mfrac><pi/><mn>4</mn></mfrac><mo>,</mo><mfrac><pi/><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>2</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>6</mn></mfrac><mo>,</mo><mfrac><mrow><mn>7</mn><pi/></mrow><mn>6</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>4</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>7</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>11</mn><pi/></mrow><mn>6</mn></mfrac><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>sin</mi><mo>(</mo><mi>a</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find exact value with radians (tan) Find the exact value without using a calculator. Answer should be properly simplified.

tan #a

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><pi/><mn>6</mn></mfrac><mo>,</mo><mfrac><pi/><mn>4</mn></mfrac><mo>,</mo><mfrac><pi/><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>2</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>6</mn></mfrac><mo>,</mo><mfrac><mrow><mn>7</mn><pi/></mrow><mn>6</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>4</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>7</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>11</mn><pi/></mrow><mn>6</mn></mfrac><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>tan</mi><mo>(</mo><mi>a</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Trig Unit 2: Circular Functions/3.2 Apps of Radian Measure Angle that wheel turns Solve the problem.

A car wheel has a #a -inch radius. Through what angle (to the nearest tenth of a degree) does the wheel turn when the car rolls forward 1.5 ft?

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>15</mn><mo>,</mo><mn>18</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mn>18</mn><mi>a</mi></mfrac><mo>*</mo><mfrac><mn>180</mn><pi/></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Area from motion detector Solve the problem. Round answer to the nearest square foot.

A sensor light installed on the edge of a home can detect motion for a distance of #a ft in front and with a range of motion of «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«/math» Over what area will the sensor detect motion and become illuminated?
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>45</mn><mo>,</mo><mn>55</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>195</mn><mo>,</mo><mn>210</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><msup><mi>a</mi><mn>2</mn></msup><mo>*</mo><mi>b</mi><mo>*</mo><mfrac><pi/><mn>180</mn></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Difference in wiper coverage Solve the problem. Round answer to 1 decimal place.
What is the difference in area covered by a single 10-inch windshield wiper operating with a central angle of «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«/math» compared to a pair of 3-inch wipers operating together each having a central angle of «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«/math»?
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>120</mn><mo>,</mo><mn>128</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>108</mn><mo>,</mo><mn>118</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>(</mo><mn>50</mn><mo>*</mo><mi>a</mi><mo>*</mo><mfrac><pi/><mn>180</mn></mfrac><mo>-</mo><mn>9</mn><mo>*</mo><mi>b</mi><mo>*</mo><mfrac><pi/><mn>180</mn></mfrac><mo>)</mo><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="precision">3</option><option name="relative_tolerance">false</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find arc length Find the length of an arc intercepted by a central angle θ in a circle of radius r. Round your answer to 1 decimal place.

r = #a cm.; θ = #b radians

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>10</mn><mo>,</mo><mn>20</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>2</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>2</mn></mfrac><mo>,</mo><mfrac><mrow><mn>7</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>6</mn></mfrac><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>b</mi><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find area of sector Find the area of a sector of a circle having radius r and central angle θ.  Express the answer to the nearest tenth.

r = #a m, θ = #b °

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>15</mn><mo>,</mo><mn>25</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>15</mn><mo>,</mo><mn>30</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><msup><mi>a</mi><mn>2</mn></msup><mo>*</mo><mi>b</mi><mo>*</mo><mfrac><pi/><mn>180</mn></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find distance between cities, given latitudes Assume that the cities lie on the same north-south line and that the radius of the earth is 6400 km.

Find the distance between Johnson City, #a ° N and Lexington, #b ° S. (Round to the nearest kilometer.)

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>35</mn><mo>,</mo><mn>45</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>55</mn><mo>,</mo><mn>65</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>6400</mn><mo>*</mo><mo>(</mo><mi>a</mi><mo>+</mo><mi>b</mi><mo>)</mo><mo>*</mo><mfrac><pi/><mn>180</mn></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">5</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find latitude, given distance between cities Assume that the cities lie on the same north-south line and that the radius of the earth is 6400 km.

Find the latitude of Winnipeg, Canada if Winnipeg and Austin, TX,  40° N, are #a km apart.  (Round to the nearest degree.)

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1100</mn><mo>,</mo><mn>1600</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mi>a</mi><mn>6400</mn></mfrac><mo>*</mo><mfrac><mn>180</mn><pi/></mfrac><mo>*</mo><mn>1</mn><mo>.</mo><mo>+</mo><mn>40</mn></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Length of pendulum Solve the problem.
A pendulum swinging through a central angle of «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«/math» completes an arc of length 6.4 cm. What is the length of the pendulum, rounded to the nearest tenth?
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>70</mn><mo>,</mo><mn>85</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mn>6</mn><mo>.</mo><mn>4</mn></mrow><mi>a</mi></mfrac><mo>*</mo><mfrac><mn>180</mn><pi/></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="precision">2</option><option name="relative_tolerance">false</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Rotations of a pulley Solve the problem.
A pulley rotates through «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«/math» in one minute. How many rotations does the pulley make in an hour?  Round to the nearest tenth of a rotation.
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>77</mn><mo>,</mo><mn>85</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mi>a</mi><mn>1</mn></mfrac><mo>*</mo><mfrac><mn>60</mn><mn>1</mn></mfrac><mo>*</mo><mfrac><mn>1</mn><mn>360</mn></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="precision">3</option><option name="relative_tolerance">false</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Trig Unit 2: Circular Functions/3.3 Unit Circle Angle for exact value (Cos-3rd quadrant) Find the exact value of θ in the given interval that has the given circular function value.
«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfenced open=¨[¨ close=¨]¨»«mrow»«mi mathvariant=¨normal¨»§#960;«/mi»«mo»,«/mo»«mfrac»«mrow»«mn»3«/mn»«mi mathvariant=¨normal¨»§#960;«/mi»«/mrow»«mn»2«/mn»«/mfrac»«/mrow»«/mfenced»«/math»; cos θ = «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«/math»
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mo>-</mo><mfrac><mn>1</mn><mn>2</mn></mfrac><mo>,</mo><mo>-</mo><mfrac><msqrt><mn>2</mn></msqrt><mn>2</mn></mfrac><mo>,</mo><mo>-</mo><mfrac><msqrt><mn>3</mn></msqrt><mn>2</mn></mfrac><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mn>2</mn><pi/></mrow><mn>1</mn></mfrac><mo>-</mo><mo>(</mo><mfrac><mrow><mi>arccos</mi><mo>&nbsp;</mo><mi>a</mi></mrow><mn>1</mn></mfrac><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Angle for exact value (Sin-2nd quadrant) *issue w/decimals Find the exact value of θ in the given interval that has the given circular function value.
«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfenced open=¨[¨ close=¨]¨»«mrow»«mfrac»«mi mathvariant=¨normal¨»§#960;«/mi»«mn»2«/mn»«/mfrac»«mo»,«/mo»«mi mathvariant=¨normal¨»§#960;«/mi»«/mrow»«/mfenced»«/math»; sin θ = «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«/math»
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><mn>1</mn><mn>2</mn></mfrac><mo>,</mo><mfrac><msqrt><mn>2</mn></msqrt><mn>2</mn></mfrac><mo>,</mo><mfrac><msqrt><mn>3</mn></msqrt><mn>2</mn></mfrac><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><pi/><mn>1</mn></mfrac><mo>-</mo><mo>(</mo><mfrac><mrow><mi>asin</mi><mo>&nbsp;</mo><mi>a</mi></mrow><mn>1</mn></mfrac><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-15)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Angle for exact value (Tan-3rd quadrant) Find the exact value of θ in the given interval that has the given circular function value.
«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfenced open=¨[¨ close=¨]¨»«mrow»«mi mathvariant=¨normal¨»§#960;«/mi»«mo»,«/mo»«mfrac»«mrow»«mn»3«/mn»«mi mathvariant=¨normal¨»§#960;«/mi»«/mrow»«mn»2«/mn»«/mfrac»«/mrow»«/mfenced»«/math»; tan θ = «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«/math»
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><msqrt><mn>3</mn></msqrt><mo>,</mo><mfrac><msqrt><mn>3</mn></msqrt><mn>3</mn></mfrac><mo>,</mo><mn>1</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><pi/><mn>1</mn></mfrac><mo>+</mo><mo>(</mo><mi>arctan</mi><mo>&nbsp;</mo><mi>a</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Evaluate sin w/calculator Use a calculator to evaluate the function.  Round to 4 decimal places.

sin #a
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>0</mn><mo>.</mo><mn>1</mn><mo>,</mo><mn>3</mn><mo>.</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>sin</mi><mo>&nbsp;</mo><mi>a</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Exact value-radians (Cos) Find the exact circular function value.  Give answer as a properly simplified fraction.

cos #a
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><pi/><mn>6</mn></mfrac><mo>,</mo><mfrac><pi/><mn>4</mn></mfrac><mo>,</mo><mfrac><pi/><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>2</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>6</mn></mfrac><mo>,</mo><mfrac><mrow><mn>7</mn><pi/></mrow><mn>6</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>4</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>7</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>11</mn><pi/></mrow><mn>6</mn></mfrac><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>cos</mi><mo>&nbsp;</mo><mi>a</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-15)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Exact value-radians (Sin) Find the exact circular function value.  Give answer as a properly simplified fraction.

Sin #a
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><pi/><mn>6</mn></mfrac><mo>,</mo><mfrac><pi/><mn>4</mn></mfrac><mo>,</mo><mfrac><pi/><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>2</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>6</mn></mfrac><mo>,</mo><mfrac><mrow><mn>7</mn><pi/></mrow><mn>6</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>4</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>7</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>11</mn><pi/></mrow><mn>6</mn></mfrac><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>sin</mi><mo>&nbsp;</mo><mi>a</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-15)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Exact value-radians (Tan) Find the exact circular function value.  Give answer as a properly simplified fraction.

Tan #a
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><pi/><mn>6</mn></mfrac><mo>,</mo><mfrac><pi/><mn>4</mn></mfrac><mo>,</mo><mfrac><pi/><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>2</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>6</mn></mfrac><mo>,</mo><mfrac><mrow><mn>7</mn><pi/></mrow><mn>6</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>4</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>5</mn><pi/></mrow><mn>3</mn></mfrac><mo>,</mo><mfrac><mrow><mn>7</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>11</mn><pi/></mrow><mn>6</mn></mfrac><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>tan</mi><mo>&nbsp;</mo><mi>a</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-15)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find the exact value of s in the given interval that has the given circular ... Find the exact value of s in the given interval that has the given circular function value.

; tan s = 1]]> 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1.0000000 0.3333333 0 true true abc ]]> 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Correct ]]> 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Incorrect ]]> 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Incorrect ]]> 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Incorrect Find the exact value of s in the given interval that has the given circular ... Find the exact value of s in the given interval that has the given circular function value.

; sin s = ]]> 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1.0000000 0.3333333 0 true true abc ]]> 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Correct ]]> 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Incorrect ]]> 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Incorrect ]]> 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Incorrect Inverse sec (decimal) ***Wrong Find the value of t in the interval [0, π/2] that makes the statement true.  Round to the thousandths place.

sec t = #a
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>0</mn><mo>.</mo><mn>2</mn><mo>,</mo><mn>0</mn><mo>.</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mn>1</mn><mrow><mo>(</mo><mi>arccos</mi><mo>&nbsp;</mo><mi>a</mi><mo>)</mo></mrow></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Inverse tan (decimal) Find the value of s in the interval [0, π/2] that makes the statement true.  Round to the thousandths place.

tan s = #a
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>4</mn><mo>.</mo><mn>5</mn><mo>,</mo><mn>6</mn><mo>.</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>arctan</mi><mo>&nbsp;</mo><mi>a</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Solve the problem.The maximum afternoon temperature in Granderson is modeled ... Solve the problem.

The maximum afternoon temperature in Granderson is modeled by  where t represents the maximum afternoon temperature in degrees Fahrenheit in month x, with  representing January,  representing February, and so on. Find the maximum afternoon temperature in May.]]> 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1.0000000 0.3333333 0 true true abc 77°F Correct 88°F Incorrect 47°F Incorrect 82°F Incorrect Pre-Calc/Trig Unit 2: Circular Functions/3.4 Linear and Angular Speed Angular speed of pulley Solve the problem.
Two pulleys of diameters 6 m and 3 m are connected by a belt. The larger pulley rotates #a times per min. Find the angular speed of the smaller pulley.
 
]]> 1.0000000 0.3333333 0 true true ABCD «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mi»r«/mi»«mi»a«/mi»«mi»d«/mi»«mi»i«/mi»«mi»a«/mi»«mi»n«/mi»«mi»s«/mi»«/mrow»«mrow»«mi»m«/mi»«mi»i«/mi»«mi»n«/mi»«mi»u«/mi»«mi»t«/mi»«mi»e«/mi»«/mrow»«/mfrac»«/math»

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«mo»#«/mo»«mi»c«/mi»«mo»§#160;«/mo»«mi»r«/mi»«mi»a«/mi»«mi»d«/mi»«mi»i«/mi»«mi»a«/mi»«mi»n«/mi»«mi»s«/mi»«/mrow»«mrow»«mi»m«/mi»«mi»i«/mi»«mi»n«/mi»«mi»u«/mi»«mi»t«/mi»«mi»e«/mi»«/mrow»«/mfrac»«/math»

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«mo»#«/mo»«mi»d«/mi»«mo»§#160;«/mo»«mi»r«/mi»«mi»a«/mi»«mi»d«/mi»«mi»i«/mi»«mi»a«/mi»«mi»n«/mi»«mi»s«/mi»«/mrow»«mrow»«mi»m«/mi»«mi»i«/mi»«mi»n«/mi»«mi»u«/mi»«mi»t«/mi»«mi»e«/mi»«/mrow»«/mfrac»«/math»

]]> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«mo»#«/mo»«mi»e«/mi»«mo»§#160;«/mo»«mi»r«/mi»«mi»a«/mi»«mi»d«/mi»«mi»i«/mi»«mi»a«/mi»«mi»n«/mi»«mi»s«/mi»«/mrow»«mrow»«mi»m«/mi»«mi»i«/mi»«mi»n«/mi»«mi»u«/mi»«mi»t«/mi»«mi»e«/mi»«/mrow»«/mfrac»«/math»

]]> Answer not shown

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>25</mn><mo>,</mo><mn>40</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mn>4</mn><mo>*</mo><mi>a</mi><mo>*</mo><pi/></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mn>2</mn><mo>*</mo><mi>a</mi><mo>*</mo><pi/></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mi>a</mi><mo>*</mo><pi/><mo>&nbsp;</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>e</mi><mo>=</mo><msup><mi>a</mi><mn>2</mn></msup><mo>*</mo><pi/></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> RPM of tire Solve the problem.
Each tire of an automobile has a radius of 2 feet. How many revolutions per minute (rpm) does a tire make when the automobile is traveling at a speed of #a feet per second. Round your answer to the nearest tenth.
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>75</mn><mo>,</mo><mn>84</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mn>60</mn><mo>*</mo><mi>a</mi></mrow><mrow><mn>4</mn><mo>*</mo><pi/></mrow></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Solve for missing variable Use the formula s = rωt to find the value of the missing variable.  Round to 3 decimal places.
s = #a m, r = #b m, ω = #c radians per sec.
 
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>6</mn><mo>.</mo><mn>5</mn><mo>,</mo><mn>7</mn><mo>.</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>.</mo><mn>5</mn><mo>,</mo><mn>4</mn><mo>.</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>0</mn><mo>.</mo><mn>4</mn><mo>,</mo><mn>0</mn><mo>.</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mi>a</mi><mrow><mi>b</mi><mo>*</mo><mi>c</mi></mrow></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Solve for missing variable (II) Use the formula v = rω to find the value of the missing variable.  Round to 3 decimal places.

v = #a ft per sec, r = #b ft
 
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>6</mn><mo>.</mo><mn>5</mn><mo>,</mo><mn>7</mn><mo>.</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>.</mo><mn>5</mn><mo>,</mo><mn>4</mn><mo>.</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mi>a</mi><mi>b</mi></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Solve for missing variable (III)
Use the formula «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#969;«/mi»«mo»=«/mo»«mfrac»«mi»§#952;«/mi»«mi»t«/mi»«/mfrac»«/math» to find the value of the missing variable.  Give answer as properly simplified fraction.

ω = #a radian per min, t = #b min
 
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><pi/><mn>10</mn></mfrac><mo>,</mo><mfrac><pi/><mn>9</mn></mfrac><mo>,</mo><mfrac><pi/><mn>8</mn></mfrac><mo>,</mo><mfrac><pi/><mn>7</mn></mfrac><mo>,</mo><mfrac><pi/><mn>6</mn></mfrac><mo>,</mo><mfrac><pi/><mn>5</mn></mfrac><mo>,</mo><mfrac><pi/><mn>4</mn></mfrac><mo>,</mo><mfrac><pi/><mn>3</mn></mfrac><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>9</mn><mo>,</mo><mn>15</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>b</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_simplified"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-15)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Speed of point on rim of tire Solve the problem.
A wheel with a 13-inch diameter is turning at the rate of  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mfrac»«mrow»«mi»r«/mi»«mi»e«/mi»«mi»v«/mi»«mi»o«/mi»«mi»l«/mi»«mi»u«/mi»«mi»t«/mi»«mi»i«/mi»«mi»o«/mi»«mi»n«/mi»«mi»s«/mi»«/mrow»«mrow»«mi»m«/mi»«mi»i«/mi»«mi»n«/mi»«mi»u«/mi»«mi»t«/mi»«mi»e«/mi»«/mrow»«/mfrac»«/math». To the nearest inch, what is the speed of a point on the rim in «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«mi»i«/mi»«mi»n«/mi»«mi»c«/mi»«mi»h«/mi»«mi»e«/mi»«mi»s«/mi»«/mrow»«mrow»«mi»m«/mi»«mi»i«/mi»«mi»n«/mi»«mi»u«/mi»«mi»t«/mi»«mi»e«/mi»«/mrow»«/mfrac»«/math» ?
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>50</mn><mo>,</mo><mn>60</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>a</mi><mo>*</mo><mn>26</mn><mo>*</mo><pi/><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Trig Unit 2: Circular Functions/4.1 Graphs of Sin//Cos Determine amplitude from equation Give the amplitude or period as requested.  Do not use decimals.

Amplitude of y = #a sin #b x

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mo>-</mo><mn>6</mn><mo>,</mo><mo>-</mo><mn>5</mn><mo>,</mo><mo>-</mo><mn>4</mn><mo>,</mo><mo>-</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn><mo>,</mo><mn>3</mn><mo>,</mo><mn>4</mn><mo>,</mo><mn>5</mn><mo>,</mo><mn>6</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfenced close="|" open="|"><mi>a</mi></mfenced></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer><correctAnswer id="2"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Determine period from equation Give the amplitude or period as requested.  Do not use decimals.

Period of y = #a sin #b x

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mo>-</mo><mn>6</mn><mo>,</mo><mo>-</mo><mn>5</mn><mo>,</mo><mo>-</mo><mn>4</mn><mo>,</mo><mo>-</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn><mo>,</mo><mn>3</mn><mo>,</mo><mn>4</mn><mo>,</mo><mn>5</mn><mo>,</mo><mn>6</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfenced close="|" open="|"><mfrac><mrow><mn>2</mn><mo>*</mo><pi/></mrow><mi>b</mi></mfrac></mfenced></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Equation for weight attached to a spring Solve the problem.
A weight attached to a spring is pulled down #a inches below the equilibrium position. Assuming that the period of the system is #b second, determine a trigonometric model that gives the position of the weight at time t seconds.
Select one:
 
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]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><mn>1</mn><mn>10</mn></mfrac><mo>,</mo><mfrac><mn>1</mn><mn>8</mn></mfrac><mo>,</mo><mfrac><mn>1</mn><mn>6</mn></mfrac><mo>,</mo><mfrac><mn>1</mn><mn>5</mn></mfrac><mo>,</mo><mfrac><mn>1</mn><mn>4</mn></mfrac><mo>,</mo><mfrac><mn>1</mn><mn>3</mn></mfrac><mo>,</mo><mfrac><mn>1</mn><mn>2</mn></mfrac><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f1</mi><mo>=</mo><mo>-</mo><mi>a</mi><mo>&nbsp;</mo><mi>cos</mi><mo>&nbsp;</mo><mo>(</mo><mfrac><mrow><mn>2</mn><mo>*</mo><pi/><mo>*</mo><mi>t</mi></mrow><mi>b</mi></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f2</mi><mo>=</mo><mi>a</mi><mo>&nbsp;</mo><mi>cos</mi><mo>&nbsp;</mo><mo>(</mo><mn>4</mn><mo>*</mo><mi>b</mi><mo>*</mo><pi/><mo>*</mo><mi>t</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f3</mi><mo>=</mo><mo>-</mo><mi>a</mi><mo>&nbsp;</mo><mi>cos</mi><mo>&nbsp;</mo><mo>(</mo><mn>2</mn><mo>*</mo><mi>b</mi><mo>*</mo><pi/><mo>*</mo><mi>t</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f4</mi><mo>=</mo><mo>-</mo><mi>a</mi><mo>&nbsp;</mo><mi>cos</mi><mo>&nbsp;</mo><mo>(</mo><mfrac><mrow><pi/><mo>*</mo><mi>t</mi></mrow><mi>b</mi></mfrac><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> Find frequency of electrical circuit Solve the problem.
The voltage E in an electrical circuit is given by E = 4.3 cos #a π t, where t is time measured in seconds.  Find the frequency of the function (that is, find the number of cycles or periods completed in one second).
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mn>130</mn><mo>,</mo><mn>140</mn><mo>,</mo><mn>150</mn><mo>,</mo><mn>160</mn><mo>,</mo><mn>170</mn><mo>,</mo><mn>180</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mi>a</mi><mn>2</mn></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-15)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find period of electrical circuit Solve the problem.
The voltage E in an electrical circuit is given by E = 1.5 cos #a πt, where t is time measured in seconds.  Find the period.
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mn>20</mn><mo>,</mo><mn>24</mn><mo>,</mo><mn>28</mn><mo>,</mo><mn>32</mn><mo>,</mo><mn>36</mn><mo>,</mo><mn>40</mn><mo>,</mo><mn>44</mn><mo>,</mo><mn>48</mn><mo>,</mo><mn>52</mn><mo>,</mo><mn>56</mn><mo>,</mo><mn>60</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mn>2</mn><mi>a</mi></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-15)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Graph cos function Select the appropriate graph for this function.

y = #a cos #b x

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]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s1</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s2</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s3</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mo>-</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn><mo>,</mo><mn>3</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><pi/><mn>4</mn></mfrac><mo>,</mo><mfrac><pi/><mn>3</mn></mfrac><mo>,</mo><mfrac><pi/><mn>2</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>2</mn></mfrac><mo>,</mo><pi/><mo>,</mo><mn>2</mn><pi/><mo>,</mo><mn>3</mn><pi/><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f1</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>cos</mi><mo>(</mo><mi>b</mi><mo>*</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f2</mi><mo>=</mo><mo>-</mo><mi>a</mi><mo>*</mo><mi>cos</mi><mo>(</mo><mfrac><mi>x</mi><mi>b</mi></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f3</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>sin</mi><mo>(</mo><mi>b</mi><mo>*</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g1</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s1</mi><mo>,</mo><mi>f1</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g2</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s2</mi><mo>,</mo><mi>f2</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g3</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s3</mi><mo>,</mo><mi>f3</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> The function graphed is of the form y = a sin bx or y = a cos bx, where b > 0. Determine the equation of the graph.


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Ph8/wzrk/wDZcfjm++x3Gy60lfOlP9lDEsfmbUHltlZ5vmTGJAD2rx14F/4Sr7DqWm339h+K9K3tpesrF5vk79vmQTR7l862l2IJISy7tiOjRyxQyxngXx1/wlX27TdSsf7D8V6VsXVNGaXzfJ37vLnhk2r51tLscxzBV3bHR1jlimij5X/hI/jf/wBE8+H/AP4Xl9/8pq5Tx1pHxv8AFX2HUtN8FfD/AEPxXpW9tL1lfG99L5O/b5kE0f8AY6+dbS7EEkJZd2xHRo5YoZYwD6Aor5K/ZX+NXxh8efBfwdCvgzwve6xZeH9Me6fxJ43vItSu4pbZTBfyKulzBluVVpA6yyDcJY2bzYpUT2D/AISP43/9E8+H/wD4Xl9/8pqAPVaK+ata8a/G+L4++DbD/hEfB8Pn+Gdcn/suPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEnoH/AAkfxv8A+iefD/8A8Ly+/wDlNQB6rRXlX/CR/G//AKJ58P8A/wALy+/+U1ef/s9eNfjfrPwC+Gl//wAIj4P137V4Z0yf+1NW8c3y3l5utY286cf2VJiV87mHmP8AMT8zdSAfStFeVf8ACR/G/wD6J58P/wDwvL7/AOU1ef8Axr8a/G/SvCtrcWfhHwfp3iRb1BoNvpnjm+nl1C/2SbLVrY6VGlzE6eb5iSOipGrzGW3MIuIQD6Voryr/AISP43/9E8+H/wD4Xl9/8pqKAPVaKK43xt4obT7mXSr/AMPayPDdxYzSah4rttQtLOz02MI+8ySG6juYyFXPmRRnbuB3DBKpjSuzsq8q/ZO/5NY+Df8A2Jmjf+kMNct+z3488U+Kv2VfhtrfhN9I8fa5Np1vHfXGveI5oFZljImZ7mO3uneZZFClWUHliWBXBs/sVXviq6/Zt+Gsev6No+mabF4S0ZdLuNN1eW8muovsafPPG9tEIG2iM7VeUZZhu+UFtJx5JOPYGrOx7rRRRUCCvPvjv8TL/wCD/wAMtU8Wafo9nrktgY91pfai1jGwZggAkWGU7izKqqEOWYDIHI9BrzH9oXxUPB/gOG/bw3ovitRqEB/s3WnutpZSZI5IY7ayvJZZkeNHVVh4Cs+5dnMtpaydkNK+xd+BvxNvfi14Ej1/ULDSdLu2neF7LSNWbUVh24wJJGghKSEENsKcBlOTu49Bry39nzUrrWPBy6lD4V8G+GfDepKupaY3g3VZbyG8MxZ5ZZEextfLckqTwzMzPu2lefUqrVWT36+vUlNPVO66enQKKKKBhRXJfFvxRc+CPhj4o8Q2d7YadPpWnzXwu9Tgee3iWNS7M8aOjP8AKDhQ6knAyK82/ZS+MXif4t6J4gPjC+0V9f0u4hgudN0fRrix+wF49+yVpbiYO5BBwpUqMEj51oXvNrsk/vCXuqLfV2/C57tRRRQAV83+NPiV43+GXxw12Ga/vtW8Oy+GNQ1yx0/Wo7Kz0kvbPa7khu4Ee5i8uOR2kNwkgbd+7A24P0hXz78ZrGx+Ej69rejfCb4fanpfiSIQa5d3b3EGoatNI0heGS1s9Ku5LtSuXJJJOZMqApY5yfL717aP8U0t+zafqi422avqvw1evoVvhP451L9p7w63iVrHR/APjHQnB0i60zVn1ae3WVQ0kV5C1vbE20xjVXhzh/K3o8UsMMqeweBfHX/CVfbtN1Kx/sPxXpWxdU0ZpfN8nfu8ueGTavnW0uxzHMFXdsdHWOWKaKPzb4S614x1aCw8ReH/AIc/DPT/AA54lkgv7zV9B8VXJmuYmVV88xnR4vNlWMABZHQ/KFLLjj0nx14F/wCEq+w6lpt9/YfivSt7aXrKxeb5O/b5kE0e5fOtpdiCSEsu7Yjo0csUMse8rX0VjGF7Xbv/AJdPwOrorlPAvjr/AISr7dpupWP9h+K9K2LqmjNL5vk793lzwybV862l2OY5gq7tjo6xyxTRR9XUFhRXz7+2f4v8NeEvhvF/bXxAufAutXpkttANvrz6Ss1+yhY5ZnjIZoYSwdwxMe0nerEoK4vQ/wBpzxZdfHrSfCbeKfC914NuriztIb8eGbz7XezTWqXIgWQXYVZWieKQnydsYkO5cRklRfM2vNK/ra3nfXt27hL3Un5N/JdfTz8nex9bV8+/tgfHjX/gT4f0C/8ADmr+GLW8vJrnz7DxBY3FzJLbQwNNNcQ+TNHgQKhd1bO9SFVg5RX+gqKUk2tA6NHzP/w114J/6OD+Ff8A4Bt/8sKK+mKK9T6zS/k/9J/+QOL6s/5n98v/AJIKKK8z+M/juz8LaReW3iG113QvB72hl1LxtYajZ2dtpibjlGd7hblXbAQGGJmzKu1g3K+XJ2VzvjFydkemV5V+yd/yax8G/wDsTNG/9IYa4r9nnxzr3iP4E2+peANS0v4ludZu1hbxF4kuY/sli7vLDC98La5kuJ445IFbcDhi6mTMeG1f2Kr3xVdfs2/DWPX9G0fTNNi8JaMul3Gm6vLeTXUX2NPnnje2iEDbRGdqvKMsw3fKC1tNbq3qZp3R7rRRRSKCuN+LieOp/A99b/DqLRG8T3H7qGfX7yW2t7dCDulBihlZnHG1SoGTknja3ZUUmrqzGnZ3OP8AhB4XvfBPwz8PaBqFhpml3Om2wtfsej3EtxbQopIjVZZVR5Ds27nZVLNubAziuwooqm7u5KVlYKKKKQwooooAKKKKACuN+LieOp/A99b/AA6i0RvE9x+6hn1+8ltre3Qg7pQYoZWZxxtUqBk5J42t2VFJq6sxp2dzj/hB4XvfBPwz8PaBqFhpml3Om2wtfsej3EtxbQopIjVZZVR5Ds27nZVLNubAziuwooqm7u5KVlY5Tx14F/4Sr7DqWm339h+K9K3tpesrF5vk79vmQTR7l862l2IJISy7tiOjRyxQyxngXx1/wlX27TdSsf7D8V6VsXVNGaXzfJ37vLnhk2r51tLscxzBV3bHR1jlimij6uuU8deBf+Eq+w6lpt9/YfivSt7aXrKxeb5O/b5kE0e5fOtpdiCSEsu7Yjo0csUMsaGdXRXKeBfHX/CVfbtN1Kx/sPxXpWxdU0ZpfN8nfu8ueGTavnW0uxzHMFXdsdHWOWKaKPq6ACiiigAooooAKKK8z+NHjKPQ9Gv9N1XT9U0rw3c2TG78Zprtno9hppJKqkt01wtzCWbYvmQxOR5i4Oc4TdkVFczsj0yvKv2Tv+TWPg3/ANiZo3/pDDXIfs++JPHd5+zzo15olhZeKtaOqX8W7xJ4ruHtpLMXVx5UttqItJ5LuLYIfLeRMujbi+QA1/8AYqvfFV1+zb8NY9f0bR9M02Lwloy6Xcabq8t5NdRfY0+eeN7aIQNtEZ2q8oyzDd8oLU1Z2ITuj3WiiikMKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDlPHXgX/hKvsOpabff2H4r0re2l6ysXm+Tv2+ZBNHuXzraXYgkhLLu2I6NHLFDLGeBfHX/AAlX27TdSsf7D8V6VsXVNGaXzfJ37vLnhk2r51tLscxzBV3bHR1jlimij6uuU8deBf8AhKvsOpabff2H4r0re2l6ysXm+Tv2+ZBNHuXzraXYgkhLLu2I6NHLFDLGAdXRXn/hb4mfZtdtfBvjWfT9H8cS7hZRxv5Nvr8aKXa5sFdizYVSZbfc8lueGLxtDPN6BQAUUUUAFFFec/Fzxz408M6deWngv4d6z4u1aWyd7S/trrTorKCc5CrKLi7hlJGA2FQqQQN4ySqeg0rno1eVfsnf8msfBv8A7EzRv/SGGuH/AGbvGXxH1v8AZ202/tdHPiHxRHrurWlw3jnXVspJYE1C6USedaw3YLIQkQjCKo2NtIRU37H7FV74quv2bfhrHr+jaPpmmxeEtGXS7jTdXlvJrqL7GnzzxvbRCBtojO1XlGWYbvlBZkp3Vz3WiiigYUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBk+KfC2l+NNCutH1i1+12FxtLKsjROjoweOWORCHilR1R0kQq6OisrKygjWoooAKKKKACiivN/jB42v/AA7pOo2EcVz4a0+406Uv8QLyWwGlaHIysqyXCS3kMzFTtI2KVyy/MOcTJ8qbRSV3Y9Iryr9k7/k1j4N/9iZo3/pDDXL/AAN8QeLJfgTpk/hKy0nxlqMWpXNodQ1nxdqDWWpQRySIb63u5or2ZkkZFKxEsgDNtkYKpex+xVe+Krr9m34ax6/o2j6ZpsXhLRl0u403V5bya6i+xp888b20QgbaIztV5RlmG75QWtqzsQnc91ooopDCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAOf8a+JL7wnpUWp2ui3GuWcMwOoxWO57uG12tumggVSbhkbYTCpDsnmGMSSBIZPKv2KvEl94h/Zt+Gqtotxp2j2XhLRrS1vb3dFNfSpZos7pAygrArBVSViDKRIyp5XlSzFFAHutFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf/Z 1.0000000 0.3333333 0 true true ABCD y = 5 cos 

]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAmABwDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD73/Z/e58SfCqy+JLRRX/izxxp0WvM13KU8qCZWnsdO80K22G2inEIZEAZvOnMYknk3a3wI8c694+8Hajd+JF04avYa7qmkSNpUMkUDi1vJYFYK7uwJEYJy3UngdKzP2Vllb9lH4PiB0jmPgrRwjyIXVW+ww4JUEZGe2R9RVj4M/D7xD8IPDniOLxL4j0/xNHd6ne64raNoM9m8T3E0lxOnlm5uGl+eQhFXDAAD5yc1ScUpOXb9S9HFJLW/wCFn+tjpviZ4F/4T/wrPY2t9/YuvW+660XXUi82XSb8I6xXSLuXdt3sGjJCyxvJE+6OR1NX4N/Eab4rfDvT/EV3odx4Z1J5rqw1DRrmeOdrK9tbmW1uYhLGSkirNBIFkGNyhWwucB3gz4w+E/iFLZR+HtRm1J7q2kuhssLhBbqkpiZLgtGPs8nmJInlTbHJikAU+W+Od/Zp/wCSdav/ANjn4s/9SHUaTTW5mmnscT8Hvhj4Q+IX7IvwXuPE3gDQvH91pvgjS20+01nT7a5KM9jb7ljadSI92xNxGM7R1wKd8F/hx4as/F3ieKH4I/D34beOvDaxfYdc8OWUF9b/AOkwPgpMttaShlG4SRYQlJFw+JOOg/Z1/tofsd/CY+HlsH1lfBWitbR6mXW3kIsoCUdkBZQwyN4DbSQdrY2lfgZ8Dx8OvFXiLxOfC/hfwDLrFrb2b+G/BcrSWBMLyv8AapHNvbh5m83bxCu1U5Z93yzvdf0v6/4JTdkmt7mr8NfgzqPw08V3+qWnilr2x1tPtWvafc2XF3quAHvoGEn+j7wAHiw6kJHtKFWLt/Zp/wCSdav/ANjn4s/9SHUa9Vryr9mn/knWr/8AY5+LP/Uh1GnsrIXVvv8A1/X3h8FP+KFvNV+Er/vo/CNla3Wk3Ef3Bo1zNdx2FswPzCW3WzktySXMiQxSs5eaRI/VaKKAPP8A4y+KdU0fR9J8P+Hrr+zfFPjC9k0HSNVeNZItNnNnc3LXbowIk8qG1mdYiMSSLHGxjV2kToPAHgDw78LPBuk+E/Cek2+h+HtKhFvZ2NsDtjXJJJJJLMzFmZ2JZmZmYkkklFAH/9k= Correct

]]> y = 5 cos (3x)

]]> Incorrect

]]> y = 5 sin 

]]> 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 Incorrect

]]> y = -5 cos (3x)

]]> Incorrect

]]> Answer not shown

]]> Incorrect

]]> The function graphed is of the form y = a sin bx or y = a cos bx, where b > 0. Determine the equation of the graph.


]]> 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/jf/ANE8+H//AIXl9/8AKaj/AISP43/9E8+H/wD4Xl9/8pqAPVaK+av2evGvxv1n4BfDS/8A+ER8H679q8M6ZP8A2pq3jm+W8vN1rG3nTj+ypMSvncw8x/mJ+Zup9A/4SP43/wDRPPh//wCF5ff/ACmoA9Vor5q1rxr8b4vj74NsP+ER8Hw+f4Z1yf8AsuPxzffY7jZdaSvnSn+yhiWPzNqDy2ys83zJjEnoH/CR/G//AKJ58P8A/wALy+/+U1AHqtFeVf8ACR/G/wD6J58P/wDwvL7/AOU1ef8A7PXjX436z8Avhpf/APCI+D9d+1eGdMn/ALU1bxzfLeXm61jbzpx/ZUmJXzuYeY/zE/M3UgH0rRXlX/CR/G//AKJ58P8A/wALy+/+U1ef6141+N8Xx98G2H/CI+D4fP8ADOuT/wBlx+Ob77HcbLrSV86U/wBlDEsfmbUHltlZ5vmTGJAD6Voryr/hI/jf/wBE8+H/AP4Xl9/8pqP+Ej+N/wD0Tz4f/wDheX3/AMpqAPVaK+av2evGvxv1n4BfDS//AOER8H679q8M6ZP/AGpq3jm+W8vN1rG3nTj+ypMSvncw8x/mJ+Zup9A/4SP43/8ARPPh/wD+F5ff/KagD1WivmrWvGvxvi+Pvg2w/wCER8Hw+f4Z1yf+y4/HN99juNl1pK+dKf7KGJY/M2oPLbKzzfMmMSegf8JH8b/+iefD/wD8Ly+/+U1AHqtFeVf8JH8b/wDonnw//wDC8vv/AJTV5/8As9eNfjfrPwC+Gl//AMIj4P137V4Z0yf+1NW8c3y3l5utY286cf2VJiV87mHmP8xPzN1IB9K0V5V/wkfxv/6J58P/APwvL7/5TV5/8a/Gvxv0rwra3Fn4R8H6d4kW9QaDb6Z45vp5dQv9kmy1a2OlRpcxOnm+YkjoqRq8xltzCLiEA+laK8q/4SP43/8ARPPh/wD+F5ff/KaigD1WuK8a+Nb631WLwr4Vit77xhdwi4JulZ7TSbVmZReXYVlJUsjrFCrK9w6MqsiRzzwdrXG+NvFDafcy6Vf+HtZHhu4sZpNQ8V22oWlnZ6bGEfeZJDdR3MZCrnzIozt3A7hglUxpXZP4F+G+l+A/t1xBcahq+tajsOoa3rN211eXZTcQCx+WKINJK628KxwRtNJ5caByDyv7J3/JrHwb/wCxM0b/ANIYa5b9nvx54p8Vfsq/DbW/Cb6R4+1ybTreO+uNe8RzQKzLGRMz3MdvdO8yyKFKsoPLEsCuDZ/YqvfFV1+zb8NY9f0bR9M02Lwloy6Xcabq8t5NdRfY0+eeN7aIQNtEZ2q8oyzDd8oLaTjyScewNWdj3WiiioEFeffHf4mX/wAH/hlqnizT9Hs9clsDHutL7UWsY2DMEAEiwyncWZVVQhyzAZA5HoNeY/tC+Kh4P8Bw37eG9F8VqNQgP9m6091tLKTJHJDHbWV5LLMjxo6qsPAVn3Ls5ltLWTshpX2LvwN+Jt78WvAkev6hYaTpd207wvZaRqzaisO3GBJI0EJSQghthTgMpyd3HoNeW/s+aldax4OXUofCvg3wz4b1JV1LTG8G6rLeQ3hmLPLLIj2Nr5bklSeGZmZ920rz6lVaqye/X16kpp6p3XT06BRRRQMKK5L4t+KLnwR8MfFHiGzvbDTp9K0+a+F3qcDz28SxqXZnjR0Z/lBwodSTgZFebfspfGLxP8W9E8QHxhfaK+v6XcQwXOm6Po1xY/YC8e/ZK0txMHcgg4UqVGCR860L3m12Sf3hL3VFvq7fhc92ooooAK+b/GnxK8b/AAy+OGuwzX99q3h2XwxqGuWOn61HZWekl7Z7XckN3Aj3MXlxyO0huEkDbv3YG3B+kK+ffjNY2PwkfXtb0b4TfD7U9L8SRCDXLu7e4g1DVppGkLwyWtnpV3JdqVy5JJJzJlQFLHOT5fevbR/imlv2bT9UXG2zV9V+Gr19Dov2bfjnqXx18O6hqeqaHo/h2e3eMLp+n64+ozqrqTumV7aAxZIIXhg21+Rt59grwv4S614x1aCw8ReH/hz8M9P8OeJZIL+81fQfFVyZrmJlVfPMZ0eLzZVjAAWR0PyhSy4490reVr6KxjC9rt3/AMun4BRRRUFhRXz7+2f4v8NeEvhvF/bXxAufAutXpkttANvrz6Ss1+yhY5ZnjIZoYSwdwxMe0nerEoK4vQ/2nPFl18etJ8Jt4p8L3Xg26uLO0hvx4ZvPtd7NNapciBZBdhVlaJ4pCfJ2xiQ7lxGSVF8za80r+tred9e3buEvdSfk38l19PPyd7H1tXz7+2B8eNf+BPh/QL/w5q/hi1vLya58+w8QWNxcyS20MDTTXEPkzR4ECoXdWzvUhVYOUV/oKilJNrQOjR8z/wDDXXgn/o4P4V/+Abf/ACwor6Yor1PrNL+T/wBJ/wDkDi+rP+Z/fL/5IKKK8z+M/juz8LaReW3iG113QvB72hl1LxtYajZ2dtpibjlGd7hblXbAQGGJmzKu1g3K+XJ2VzvjFydkemV5V+yd/wAmsfBv/sTNG/8ASGGuK/Z58c694j+BNvqXgDUtL+JbnWbtYW8ReJLmP7JYu7ywwvfC2uZLieOOSBW3A4YupkzHhtX9iq98VXX7Nvw1j1/RtH0zTYvCWjLpdxpury3k11F9jT5543tohA20RnaryjLMN3ygtbTW6t6mad0e60UUUigrjfi4njqfwPfW/wAOotEbxPcfuoZ9fvJba3t0IO6UGKGVmccbVKgZOSeNrdlRSaurMadnc4/4QeF73wT8M/D2gahYaZpdzptsLX7Ho9xLcW0KKSI1WWVUeQ7Nu52VSzbmwM4rsKKKpu7uSlZWCiiikMKKKKACiiigArjfi4njqfwPfW/w6i0RvE9x+6hn1+8ltre3Qg7pQYoZWZxxtUqBk5J42t2VFJq6sxp2dzj/AIQeF73wT8M/D2gahYaZpdzptsLX7Ho9xLcW0KKSI1WWVUeQ7Nu52VSzbmwM4rsKKKpu7uSlZWCiiikMKKKKACiiigAooooAKKK8z+NHjKPQ9Gv9N1XT9U0rw3c2TG78Zprtno9hppJKqkt01wtzCWbYvmQxOR5i4Oc4TdkVFczsj0yvKv2Tv+TWPg3/ANiZo3/pDDXIfs++JPHd5+zzo15olhZeKtaOqX8W7xJ4ruHtpLMXVx5UttqItJ5LuLYIfLeRMujbi+QA1/8AYqvfFV1+zb8NY9f0bR9M02Lwloy6Xcabq8t5NdRfY0+eeN7aIQNtEZ2q8oyzDd8oLU1Z2ITuj3WiiikMKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoorzn4ueOfGnhnTry08F/DvWfF2rS2TvaX9tdadFZQTnIVZRcXcMpIwGwqFSCBvGSVT0Glc9Gryr9k7/k1j4N/wDYmaN/6Qw1w/7N3jL4j63+ztpt/a6OfEPiiPXdWtLhvHOurZSSwJqF0ok861huwWQhIhGEVRsbaQipv2P2Kr3xVdfs2/DWPX9G0fTNNi8JaMul3Gm6vLeTXUX2NPnnje2iEDbRGdqvKMsw3fKCzJTurnutFFFAwooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiivN/jB42v8Aw7pOo2EcVz4a0+406Uv8QLyWwGlaHIysqyXCS3kMzFTtI2KVyy/MOcTJ8qbRSV3Y9Iryr9k7/k1j4N/9iZo3/pDDXL/A3xB4sl+BOmT+ErLSfGWoxalc2h1DWfF2oNZalBHJIhvre7mivZmSRkUrESyAM22Rgql7H7FV74quv2bfhrHr+jaPpmmxeEtGXS7jTdXlvJrqL7GnzzxvbRCBtojO1XlGWYbvlBa2rOxCdz3WiiikMKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA5/xr4kvvCelRana6Lca5ZwzA6jFY7nu4bXa26aCBVJuGRthMKkOyeYYxJIEhk8q/Yq8SX3iH9m34aq2i3GnaPZeEtGtLW9vd0U19KlmizukDKCsCsFVJWIMpEjKnleVLMUUAe60UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB//9k= 1.0000000 0.3333333 0 true true ABCD y = 4 sin 

]]> 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 Correct

]]> y = 4 sin (3x)

]]> Incorrect

]]> y = 4 cos (3x)

]]> Incorrect

]]> y = 4 cos 

]]> 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 Incorrect

]]> Answer not shown

]]> Incorrect

]]> Pre-Calc/Trig Unit 2: Circular Functions/4.2 Translations of Sin//Cos Estimate temperature in Fairbanks Solve the problem.

The temperature in Fairbanks is approximated by

  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»T«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«mn»37«/mn»«mi»sin«/mi»«mfenced open=¨[¨ close=¨]¨»«mrow»«mfrac»«mrow»«mn»2«/mn»«mi mathvariant=¨normal¨»§#960;«/mi»«/mrow»«mn»365«/mn»«/mfrac»«mo»(«/mo»«mi»x«/mi»«mo»-«/mo»«mn»101«/mn»«mo»)«/mo»«/mrow»«/mfenced»«mo»+«/mo»«mn»25«/mn»«/math»

where T(x) is the temperature on day x, with x = 1 corresponding to Jan. 1 and x = 365 corresponding to Dec. 31. Estimate the temperature on day #a.  Round to the nearest degree.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>25</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>37</mn><mo>*</mo><mi>sin</mi><mo>(</mo><mo>(</mo><mfrac><mrow><mn>2</mn><mo>*</mo><pi/></mrow><mn>365</mn></mfrac><mo>)</mo><mo>(</mo><mi>a</mi><mo>-</mo><mn>101</mn><mo>)</mo><mo>)</mo><mo>+</mo><mn>25</mn></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find amplitude from equation Find the specified quantity.
Find the amplitude of:
 
«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mi»sin«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mi»x«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»c«/mi»«mo»)«/mo»«/math»
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mo>-</mo><mn>6</mn><mo>,</mo><mo>-</mo><mn>5</mn><mo>,</mo><mo>-</mo><mn>4</mn><mo>,</mo><mo>-</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn><mo>,</mo><mn>3</mn><mo>,</mo><mn>4</mn><mo>,</mo><mn>5</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>5</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfenced close="|" open="|"><mi>a</mi></mfenced></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find period from equation Find the specified quantity.
Find the period of:
 
«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mi»sin«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mi»x«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»c«/mi»«mo»)«/mo»«/math»
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mo>-</mo><mn>6</mn><mo>,</mo><mo>-</mo><mn>5</mn><mo>,</mo><mo>-</mo><mn>4</mn><mo>,</mo><mo>-</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn><mo>,</mo><mn>3</mn><mo>,</mo><mn>4</mn><mo>,</mo><mn>5</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>5</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mn>2</mn><mo>*</mo><pi/></mrow><mi>b</mi></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find phase shift Find the phase shift of the function.  Enter a positive number for a shift to the right, and negative for a shift to the left.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mi»sin«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mi»x«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»c«/mi»«mo»)«/mo»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><pi/><mo>,</mo><mn>2</mn><pi/><mo>,</mo><mn>3</mn><pi/><mo>,</mo><mn>4</mn><pi/><mo>,</mo><mn>5</mn><pi/><mo>,</mo><mn>6</mn><pi/><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mo>-</mo><mfrac><mi>c</mi><mi>b</mi></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-15)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find phase shift from equation Find the specified quantity.
Find the phase shift of:
 
«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mi»cos«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mi»x«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»c«/mi»«mo»)«/mo»«/math»
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mo>-</mo><mn>6</mn><mo>,</mo><mo>-</mo><mn>5</mn><mo>,</mo><mo>-</mo><mn>4</mn><mo>,</mo><mo>-</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn><mo>,</mo><mn>3</mn><mo>,</mo><mn>4</mn><mo>,</mo><mn>5</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>5</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mo>-</mo><mi>c</mi></mrow><mi>b</mi></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find smallest time in alternating current Solve the problem.
A generator produces an alternating current according to the equation «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»I«/mi»«mo»=«/mo»«mn»80«/mn»«mo»§#160;«/mo»«mi»sin«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mi mathvariant=¨normal¨»§#960;«/mi»«mo»§#160;«/mo»«mi mathvariant=¨normal¨»t«/mi»«mo»)«/mo»«/math», where t is time in seconds and I is the current in amperes.  What is the smallest time t such that I = 40?
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>100</mn><mo>,</mo><mn>110</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mo>(</mo><mi>arcsin</mi><mo>(</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>)</mo><mo>)</mo></mrow><mrow><mo>(</mo><mi>b</mi><mo>*</mo><pi/><mo>)</mo></mrow></mfrac></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find vertical shift Find the vertical translation of «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mi»cos«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mo»#«/mo»«mi»c«/mi»«mo»§#160;«/mo»«mi»x«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»d«/mi»«mo»§#8201;«/mo»«mo»)«/mo»«/math». 

Use a positive number for shifting up, and a negative for down.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>8</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>a</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Graph the function over a one-period interval.y = 3cos  Graph the function over a one-period interval.

y = 3cos 
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Correct ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect Graph the function over a one-period interval.y = 4 + 2 sin(x - π) Graph the function over a one-period interval.

y = 4 + 2 sin(x - π)
]]> 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Correct ]]> 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 Incorrect ]]> 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Incorrect ]]> 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 Incorrect Matching phase shifts with equations Find and match the phase shift of the function.
]]> 1.0000000 0.3333333 0 true «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«mo»=«/mo»«mo»-«/mo»«mn»3«/mn»«mo»§#160;«/mo»«mi»cos«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mi»x«/mi»«mo»+«/mo»«mn»7«/mn»«mo»)«/mo»«/math»

]]> shifted 7 units to the left «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«mo»=«/mo»«mn»4«/mn»«mo»§#160;«/mo»«mi»sin«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mn»2«/mn»«mi»x«/mi»«mo»-«/mo»«mn»8«/mn»«mo»)«/mo»«/math»

]]> shifted 4 units to the right «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«mo»=«/mo»«mi»cos«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mi»§#960;x«/mi»«mo»+«/mo»«mi mathvariant=¨normal¨»§#960;«/mi»«mo»)«/mo»«/math»

]]> shifted 1 unit to the left shifted 7 units to the right shifted 4 units to the left There is no phase shift <question><correctAnswers><correctAnswer></correctAnswer></correctAnswers></question> Solve the problem.Use regression to find constants a, b, c, and d so that ... Solve the problem.

Use regression to find constants a, b, c, and d so that f(x) = a sin (bx + c) + d models the data given below.
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 1.0000000 0.3333333 0 true true abc 5.099259265; 0.5315780435; -1.738394218; 6.659926499 Correct 5.277184939; 0.06297637; -2.04256248; 6.904195597 Incorrect 5.099259265; 0.5315780435; -1.738394218; 8.659926499 Incorrect 4.708150061; 1.025102863; -2.474285177; 7.076487153 Incorrect The function graphed is of the form    or where d is the least possible ... The function graphed is of the form    or where d is the least possible positive value. Determine the equation of the graph.


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1.0000000 0.3333333 0 true true abc y = sin x - 1 Correct y = sin (x - 1) Incorrect y = cos (x + 1) Incorrect y = cos x - 1 Incorrect Pre-Calc/Trig Unit 2: Circular Functions/4.3 Graphs of Tan//Cot Graph cot function Select the appropriate graph for this function.

y = #a cotan #b x

]]> 1.0000000 0.3333333 0 true true ABCD #g1

]]> #g2

]]> #g3

]]> Graph not given

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s1</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s2</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s3</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mo>-</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn><mo>,</mo><mn>3</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><pi/><mn>4</mn></mfrac><mo>,</mo><mfrac><pi/><mn>3</mn></mfrac><mo>,</mo><mfrac><pi/><mn>2</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>2</mn></mfrac><mo>,</mo><pi/><mo>,</mo><mn>2</mn><pi/><mo>,</mo><mn>3</mn><pi/><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f1</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>cotan</mi><mo>(</mo><mi>b</mi><mo>*</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f2</mi><mo>=</mo><mo>-</mo><mi>a</mi><mo>*</mo><mi>cotan</mi><mo>(</mo><mfrac><mi>x</mi><mi>b</mi></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f3</mi><mo>=</mo><mo>(</mo><mo>-</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>a</mi><mo>)</mo><mo>*</mo><mi>cotan</mi><mo>(</mo><mi>b</mi><mo>*</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g1</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s1</mi><mo>,</mo><mi>f1</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g2</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s2</mi><mo>,</mo><mi>f2</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g3</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s3</mi><mo>,</mo><mi>f3</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> Graph tan function Select the appropriate graph for this function.

y = #a tan #b x

]]> 1.0000000 0.3333333 0 true true ABCD #g1

]]> #g2

]]> #g3

]]> Graph not given

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s1</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s2</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s3</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mo>-</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn><mo>,</mo><mn>3</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><pi/><mn>4</mn></mfrac><mo>,</mo><mfrac><pi/><mn>3</mn></mfrac><mo>,</mo><mfrac><pi/><mn>2</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>2</mn></mfrac><mo>,</mo><pi/><mo>,</mo><mn>2</mn><pi/><mo>,</mo><mn>3</mn><pi/><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f1</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>tan</mi><mo>(</mo><mi>b</mi><mo>*</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f2</mi><mo>=</mo><mo>-</mo><mi>a</mi><mo>*</mo><mi>tan</mi><mo>(</mo><mfrac><mi>x</mi><mi>b</mi></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f3</mi><mo>=</mo><mo>(</mo><mo>-</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>a</mi><mo>)</mo><mo>*</mo><mi>tan</mi><mo>(</mo><mi>b</mi><mo>*</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g1</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s1</mi><mo>,</mo><mi>f1</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g2</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s2</mi><mo>,</mo><mi>f2</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g3</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s3</mi><mo>,</mo><mi>f3</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> Graph the function.y =  cot x  Graph the function.

y =  cot x
 ]]> 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 Correct ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect Graph the function.y = tan 2x Graph the function.

y = tan 2x
]]> 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 Correct ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect The function graphed is of the form y = a tan bx or y = a cot bx, where b > 0. Determine the equation of the graph.


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 1.0000000 0.3333333 0 true true abc y = cot 2x Correct y = tan 2x Incorrect y = 2 cot x Incorrect y = 2 tan x Incorrect Pre-Calc/Trig Unit 2: Circular Functions/4.4 Graphs of Sec//Csc Determine the equation of the graph. Determine the equation of the graph.


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 1.0000000 0.3333333 0 true true abc y = -csc 4x Correct y = -sec 4x Incorrect y = 4 csc x Incorrect y = -4 sec x Incorrect Graph csc function Select the appropriate graph for this function.

y = #a csc #b x

]]> 1.0000000 0.3333333 0 true true ABCD #g1

]]> #g2

]]> #g3

]]> #g4

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s1</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s2</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s3</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s4</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mo>-</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn><mo>,</mo><mn>3</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><pi/><mn>4</mn></mfrac><mo>,</mo><mfrac><pi/><mn>3</mn></mfrac><mo>,</mo><mfrac><pi/><mn>2</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>2</mn></mfrac><mo>,</mo><pi/><mo>,</mo><mn>2</mn><pi/><mo>,</mo><mn>3</mn><pi/><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f1</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>csc</mi><mo>(</mo><mi>b</mi><mo>*</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f2</mi><mo>=</mo><mo>-</mo><mi>a</mi><mo>*</mo><mi>csc</mi><mo>(</mo><mfrac><mi>x</mi><mi>b</mi></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f3</mi><mo>=</mo><mo>(</mo><mo>-</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>a</mi><mo>)</mo><mo>*</mo><mi>csc</mi><mo>(</mo><mi>b</mi><mo>*</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f4</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>cosec</mi><mo>(</mo><mfrac><mi>x</mi><mi>b</mi></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g1</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s1</mi><mo>,</mo><mi>f1</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g2</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s2</mi><mo>,</mo><mi>f2</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g3</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s3</mi><mo>,</mo><mi>f3</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g4</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s4</mi><mo>,</mo><mi>f4</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> Graph sec function Select the appropriate graph for this function.

y = #a sec #b x

]]> 1.0000000 0.3333333 0 true true ABCD #g1

]]> #g2

]]> #g3

]]> #g4

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s1</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s2</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s3</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s4</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mo>-</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn><mo>,</mo><mn>3</mn><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>{</mo><mfrac><pi/><mn>4</mn></mfrac><mo>,</mo><mfrac><pi/><mn>3</mn></mfrac><mo>,</mo><mfrac><pi/><mn>2</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>4</mn></mfrac><mo>,</mo><mfrac><mrow><mn>3</mn><pi/></mrow><mn>2</mn></mfrac><mo>,</mo><pi/><mo>,</mo><mn>2</mn><pi/><mo>,</mo><mn>3</mn><pi/><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f1</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>sec</mi><mo>(</mo><mi>b</mi><mo>*</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f2</mi><mo>=</mo><mo>-</mo><mi>a</mi><mo>*</mo><mi>sec</mi><mo>(</mo><mfrac><mi>x</mi><mi>b</mi></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f3</mi><mo>=</mo><mo>(</mo><mo>-</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>a</mi><mo>)</mo><mo>*</mo><mi>sec</mi><mo>(</mo><mi>b</mi><mo>*</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f4</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>sec</mi><mo>(</mo><mfrac><mi>x</mi><mi>b</mi></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g1</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s1</mi><mo>,</mo><mi>f1</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g2</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s2</mi><mo>,</mo><mi>f2</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g3</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s3</mi><mo>,</mo><mi>f3</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g4</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s4</mi><mo>,</mo><mi>f4</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> Rotating beacon Solve the problem.
A rotating beacon is located 10 ft from a wall. The distance from the beacon to the point on the wall where the beacon is aimed is given by «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«mo»=«/mo»«mn»10«/mn»«mfenced open=¨|¨ close=¨|¨»«mrow»«mi»s«/mi»«mi»e«/mi»«mi»c«/mi»«mo»§#160;«/mo»«mn»2«/mn»«mi»§#960;t«/mi»«/mrow»«/mfenced»«mo»,«/mo»«/math» where t is time measured in seconds since the beacon started rotating. Find d for t = #a seconds. Round your answer to the nearest hundredth.
 
]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>0</mn><mo>.</mo><mn>3</mn><mo>,</mo><mn>0</mn><mo>.</mo><mn>4</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>10</mn><mo>*</mo><mfenced close="|" open="|"><mrow><mi>sec</mi><mo>(</mo><mn>2</mn><mo>*</mo><pi/><mo>*</mo><mi>a</mi><mo>)</mo></mrow></mfenced></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-2)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Trig Unit 2: Circular Functions/4.5 Harmonic Motion Find frequency and period Solve the problem.
The position of a weight attached to a spring is  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mo»(«/mo»«mi»t«/mi»«mo»)«/mo»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mi»cos«/mi»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mi»t«/mi»«/math» inches after t seconds. What are the frequency and period of the system?
 
]]> 1.0000000 0.3333333 0 0 frequency=#fperiod=#p]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f</mi><mo>=</mo><mfrac><mi>b</mi><mrow><mn>2</mn><mo>*</mo><pi/></mrow></mfrac></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p</mi><mo>=</mo><mfrac><mrow><mn>2</mn><mo>*</mo><pi/></mrow><mi>b</mi></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f</mi><mi>r</mi><mi mathvariant="normal">e</mi><mi>q</mi><mi>u</mi><mi mathvariant="normal">e</mi><mi>n</mi><mi>c</mi><mi>y</mi><mo>=</mo><mo>#</mo><mi>f</mi><mspace linebreak="newline"/><mi>p</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">i</mi><mi>o</mi><mi mathvariant="normal">d</mi><mo>=</mo><mo>#</mo><mi>p</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputCompound">true</data><data name="gradeCompound">distribute</data><data name="gradeCompoundDistribution">50/50</data><data name="inputField">popupEditor</data><data name="casSession">null</data></localData></question> Maximum distance from equilibrium Solve the problem.

The position of a weight attached to a spring is «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mo»(«/mo»«mi»t«/mi»«mo»)«/mo»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mi»cos«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mi mathvariant=¨normal¨»§#960;«/mi»«mo»§#160;«/mo»«mi mathvariant=¨normal¨»t«/mi»«mo»)«/mo»«/math»  inches after t seconds. What is the maximum height that the weight rises above the equilibrium position?

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>10</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfenced close="|" open="|"><mi>a</mi></mfenced></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Solve the problem.A guitar string is plucked so that it vibrates with a ... Solve the problem.

A guitar string is plucked so that it vibrates with a frequency of  Suppose the maximum displacement at the center of the string is  Find an equation of the form  to model this displacement. Round constants to 2 decimal places.

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1.0000000 0.3333333 0 true true ABCD s(t) = 0.55 cos 464.96t

]]> Correct

]]> s(t) = 1.10 cos 464.96t

]]> Incorrect

]]> s(t) = 0.55 cos 11.78t

]]> Incorrect

]]> s(t) = 1.10 cos 11.78t

]]> Incorrect

]]> Answer not given

]]> Solve the problem.A weight attached to a spring is pulled down 5 inches ... Solve the problem.

A weight attached to a spring is pulled down 5 inches below the equilibrium position. Assuming that the period of the system is  second, determine a trigonometric model that gives the position of the weight at time t seconds.]]> 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 1.0000000 0.3333333 0 true true abc s(t) = -5cos 6πt Correct s(t) = 5cos 6πt Incorrect s(t) = -5cos 3πt Incorrect t]]> 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 Incorrect Solve the problem.The formula for the up and down motion of a weight on a ... Solve the problem.

The formula for the up and down motion of a weight on a spring is given by  If the spring constant is 5, then what mass m must be used in order to produce a period of 4 seconds?]]> 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1.0000000 0.3333333 0 true true abc ]]> 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Correct ]]> 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Incorrect ]]> 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Incorrect ]]> 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Incorrect Pre-Calc/Trig Unit 3: Analytic Trig and Applications/5.1 Fundamental Identities Use the fundamental identities to find the value of the trigonometric ... Use the fundamental identities to find the value of the trigonometric function.

Find csc θ if sin θ = -  and θ is in quadrant IV.

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]]>

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]]> Use the fundamental identities to find the value of the trigonometric ... Use the fundamental identities to find the value of the trigonometric function.

Find cos θ if sin θ = -  and θ is in quadrant III.

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]]> 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 Incorrect.  Try one of the Pythagorean Identities.

]]>

]]> 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 Correct. 

]]>

]]> 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 Incorrect.  Try one of the Pythagorean Identities.

]]>

]]> 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 Incorrect.  Try one of the Pythagorean Identities.

]]> Write the expression in terms of sine and cosine, and simplify so that no ... Write the expression in terms of sine and cosine, and simplify so that no quotients appear in the final expression.

]]> 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 1.0000000 0.3333333 0 true true abc sec x

]]> Correct

]]> csc x

]]> Incorrect.  Think "Pythagorean Identity".

]]> 1

]]> Incorrect.  Think "Pythagorean Identity".

]]> -sec x

]]> Incorrect.  Think "Pythagorean Identity".

]]> Write the expression in terms of sine and cosine, and simplify so that no ... Write the expression in terms of sine and cosine, and simplify so that no quotients appear in the final expression.

]]> 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 1.0000000 0.3333333 0 true true abc secx

]]> Incorrect.  Re-write in terms of sin and cos, then simplify.

]]> cotx

]]> Correct

]]> cscx

]]> Incorrect.  Re-write in terms of sin and cos, then simplify.

]]> 1

]]> Incorrect.  Re-write in terms of sin and cos, then simplify.

]]> Pre-Calc/Trig Unit 3: Analytic Trig and Applications/5.2 Verifying Trig Identities Perform the indicated operations and simplify the result.tan θ(cot θ - cos θ) Perform the indicated operations and simplify the result.

tan θ(cot θ - cos θ)

]]> 1.0000000 0.3333333 0 true true abc 1

]]> Incorrect.  Distribute, then change to "sin" and "cos" before simplifying. 

]]> - sec2θ

]]> Incorrect.  Distribute, then change to "sin" and "cos" before simplifying. 

]]> 0

]]> Incorrect.  Distribute, then change to "sin" and "cos" before simplifying. 

]]> 1 - sin θ

]]> Correct. 

]]> Simplify the expression.sin θ cos θ sec θ csc θ Simplify the expression.

sin θ cos θ sec θ csc θ

]]> 1.0000000 0.3333333 0 true true abc sec2θ

]]> Incorrect.  Change to "sin" and "cos"

]]> csc2θ

]]> Incorrect.  Change to "sin" and "cos"

]]> 1

]]> Correct

]]> tan2θ

]]> Incorrect.  Change to "sin" and "cos"

]]> Simplify the expression.sin2 x(cot2 x + 1) Simplify the expression.

sin2 x(cot2 x + 1)

]]> 1.0000000 0.3333333 0 true true abc cos2 x + 1

]]> Incorrect.  Substitute something in for (cot2 x + 1)

]]> tan2 x

]]> Incorrect.  Substitute something in for (cot2 x + 1)

]]> 1

]]> Correct

]]> -1

]]> Incorrect.  Substitute something in for (cot2 x + 1)

]]> Solve the problem.A wooden block sitting at rest on a flat, level board will ... Solve the problem.

A wooden block sitting at rest on a flat, level board will just begin to slide when the board is tilted up to a critical angle of inclination, θs . An experiment that determines this critical angle can be used to find the coefficient of static friction, μs , for the block on the board by using the relation   Rewrite this relation using a quotient identity.]]> 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 1.0000000 0.3333333 0 true true abc s = tan θs]]> Correct s = tan2 θs]]> Incorrect s = cot θs]]> Incorrect s = sec θs]]> Incorrect Use the fundamental identities to simplify the expression. Use the fundamental identities to simplify the expression.

]]> 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 1.0000000 0.3333333 0 true true abc 1

]]> Incorrect.  Change all to "sin" and "cos" before simplifying.

]]> cot2θ

]]> Correct

]]> csc2θ

]]> Incorrect.  Change all to "sin" and "cos" before simplifying.

]]> sec2θ

]]> Incorrect.  Change all to "sin" and "cos" before simplifying.

]]> Use the fundamental identities to simplify the expression.tan2θ csc2θ Use the fundamental identities to simplify the expression.

tan2θ csc2θ

]]> 1.0000000 0.3333333 0 true true abc sin θ

]]> Incorrect.  Change all to "sin" and "cos" before simplifying.

]]> sec2θ

]]> Correct

]]> cos3θ

]]> Incorrect.  Change all to "sin" and "cos" before simplifying.

]]> tan2θ

]]> Incorrect.  Change all to "sin" and "cos" before simplifying.

]]> Pre-Calc/Trig Unit 3: Analytic Trig and Applications/5.3 and 5.4 Sum//Difference Identities Find the exact value by using a sum or difference identity.sin 15° Find the exact value by using a sum or difference identity.

sin 15°

]]> 1.0000000 0.3333333 0 true true abc

]]> 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 Correct

]]>

]]> 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 Incorrect.  Think of 15 as 45 - 30.

]]>

]]> 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 Incorrect.  Think of 15 as 45 - 30.

]]>

]]> 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 Incorrect.  Think of 15 as 45 - 30.

]]> Find the exact value by using a sum or difference identity.tan 75° Find the exact value by using a sum or difference identity.

tan 75°]]> 1.0000000 0.3333333 0 true true abc  - 2]]> 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 Incorrect  + 2]]> 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 Correct  - 2]]> 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 Incorrect  + 2]]> 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Incorrect Solve the problem.When a person bends at the waist with a straight back, the ... Solve the problem.

When a person bends at the waist with a straight back, the force, F, exerted by the person's lower back muscles can be estimated with the formula  where w is the person's weight, and θ is the angle made by the person's torso relative to the horizontal. Suppose that a  person bends at an angle of 30°. Determine the force exerted by the person's back muscles, and estimate the angle that requires the back muscles to exert a force of 346 pounds.]]> 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1.0000000 0.3333333 0 true true abc 289 pounds; 47.3° Incorrect 501 pounds; 53.2° Correct 26 pounds; 53.2° Incorrect 501 pounds; 30° Incorrect Use a sum or difference identity to find the exact value.tan  Use a sum or difference identity to find the exact value.

tan ]]> 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1.0000000 0.3333333 0 true true abc ]]> 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Incorrect ]]> 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 Incorrect ]]> 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 Correct ]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAATABQDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6+TL4Q+JU8ZeO9U0n4peK2uvEOq28GjeC/Ft9p0Gk2WmSnTWwo1C0gcyy2MtztQGXN0V2uI/MPfeJPF19+zHbal43+Ivi241vwJdwwHWtSNuwXRdQMjIJobVPMcWkwktrYQxl2haCJ3E7XF1cpzdr4H8RWX7P3gDwJ4k+HXinxDcSaFbPrs/hTxTDptyurPEftxvJReW5mEk0ssjusk3muzsyk4Zple3u7/ANf1+q3Kja95bf1/X6M988B32map4G8O3uizXdxo9zp1tNZTX80s1w8DRKY2leYtI7lSCzSEuTksScmiqPwo8N6z4O+GfhfQ/EOp/wBs63p2nQ2t3fBi/myIgBO4gF8YxvIBbG4gEkUVpK3M+XYzhflXNudBq2k2Ov6Ve6Zqdlb6jpt7C9tdWd3EssM8TqVeN0YEMrKSCpBBBINW6KKkoKKKKAP/2Q== Incorrect Use Identities to find the exact value.cos -75° Use Identities to find the exact value.

cos -75°]]> 1.0000000 0.3333333 0 true true abc  - ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Correct  - ]]> 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 Incorrect Use Identities to find the exact value.cos 165° Use Identities to find the exact value.

cos 165°]]> 1.0000000 0.3333333 0 true true abc ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Correct Use Identities to find the exact value.cos 36° cos 24° - sin 36° sin 24° Use Identities to find the exact value.

cos 36° cos 24° - sin 36° sin 24°

]]> 1.0000000 0.3333333 0 true true abc

]]> 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 Correct

]]> 1

]]> Incorrect.  36+24=60.  Evaluate Cos 60

]]>

]]> 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 Incorrect.  36+24=60.  Evaluate Cos 60

]]>

]]> 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 Incorrect.  36+24=60.  Evaluate Cos 60

]]> Use identities to write each expression as a function of θ.cos (θ + 90°) Use identities to write each expression as a function of θ.

cos (θ + 90°)]]> 1.0000000 0.3333333 0 true true abc -cos θ Incorrect cos θ Incorrect sin θ Incorrect -sin θ Correct Use the cofunction identities to find an angle θ that makes the statement ... Use the cofunction identities to find an angle θ that makes the statement true.

sec (6θ + 17°) = csc (2θ - 7°)

]]> 1.0000000 0.3333333 0 true true abc θ = 10°

]]> Correct

]]> θ = 40°

]]> Incorrect.  These are cofunctions.  The angles add up to 90.

]]> θ = 

]]> 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 Incorrect.  These are cofunctions.  The angles add up to 90.

]]> θ = 

]]> 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 Incorrect.  These are cofunctions.  The angles add up to 90.

]]> Use trigonometric identities to find the exact value.sin 20° cos 100° + cos ... Use trigonometric identities to find the exact value.

sin 20° cos 100° + cos 20° sin 100°]]> 1.0000000 0.3333333 0 true true abc ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Incorrect ]]> 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 Correct Write in terms of the cofunction of a complementary angle.sec 68° 28' Write in terms of the cofunction of a complementary angle.

sec 68° 28']]> 1.0000000 0.3333333 0 true true abc csc 22° 28' Incorrect csc 21° 32' Correct cos 21° 32' Incorrect cos 111° 32' Incorrect Pre-Calc/Trig Unit 3: Analytic Trig and Applications/5.5 Double Angle Identities Solve the problem.Suppose that for an electrical appliance, voltage is given ... Solve the problem.

Suppose that for an electrical appliance, voltage is given by  and amperage by  where t is time in seconds. The wattage is given by  Find the maximum wattage used by the appliance.]]> 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 1.0000000 0.3333333 0 true true abc 189 Incorrect 404.46 Incorrect 101.115 Incorrect 202.23 Correct Use an identity to write the expression as a single trigonometric function ... Use an identity to write the expression as a single trigonometric function or as a single number.

2 cos22.5° - 1

]]> 1.0000000 0.3333333 0 true true abc

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]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAoABgDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6+ffi4j+M/jHcaTNF4yvdP8KeGoL7+w/BuvXOmT6vc6ldyxxM0kN1bKotk0qfHnSbG+2t9woPM7fxr4b8a2niaLxfoutXGrJpswC+D7fZbQ3unmBlnh3yMUa7aYxzRzSFFAtorcG3Wa5nk80+HPxLv/ABb4W+JHxY+HGgXXxFt/FWtwQ+GLqFoYJJNOt7G2t2JW8mt2SCG+XU2EDMhZ5JWUATGQzLYqKu7HpfwBvdBvPB9+uhweKLCS21Oe11HTfGGr3Op6hZXce1XiaWe4uPl2hHURStGQ4Zfvkkq78GVu4vC08d/4W13wzfG6kmuW8RS2El1fzSHfJcE2dxNGASdoUldoUKFCqtFaS0f9fh5fj3IXX5/d0+dtzEn+EXiq1gkmm+PXj2KGNS7yPZeHQqqBkkk6VwAK4T4aaNbeKb/U9B8L/HP4jabe2hbUrjTbzwto+kySC4mkd7pI7jRIjKkk3msZkDKzliWJPP0Zf3sem2NxdyrK8UEbSutvC80hCjJCxoCznjhVBJPABNeNfCPx5p/xK+Il94hu9E8S6RrbWDWdhaav4T1TTo7OyWUOwe5uLeOJ5pW8tmRWIURqq7tru6jrK3l/X9aaXfSzpr3OZf1/S/Gy6nceCvAGu+FdVlu9T+JXijxjbvCYlsdbttKjhjYspEgNpZQPuAUjBcrhjlScEFdrRSEFFFFABRRRQB//2Q== Correct

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]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAATABQDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6+TL4Q+JU8ZeO9U0n4peK2uvEOq28GjeC/Ft9p0Gk2WmSnTWwo1C0gcyy2MtztQGXN0V2uI/MPfeJPF19+zHbal43+Ivi241vwJdwwHWtSNuwXRdQMjIJobVPMcWkwktrYQxl2haCJ3E7XF1cpzdr4H8RWX7P3gDwJ4k+HXinxDcSaFbPrs/hTxTDptyurPEftxvJReW5mEk0ssjusk3muzsyk4Zple3u7/ANf1+q3Kja95bf1/X6M988B32map4G8O3uizXdxo9zp1tNZTX80s1w8DRKY2leYtI7lSCzSEuTksScmiqPwo8N6z4O+GfhfQ/EOp/wBs63p2nQ2t3fBi/myIgBO4gF8YxvIBbG4gEkUVpK3M+XYzhflXNudBq2k2Ov6Ve6Zqdlb6jpt7C9tdWd3EssM8TqVeN0YEMrKSCpBBBINW6KKkoKKKKAP/2Q== Incorrect.  Think of "doubling" 22.5°.

]]>

]]> 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 Incorrect.  Think of "doubling" 22.5°.

]]> Use identities to find the indicated value for each angle measure.cos θ = , ... Use identities to find the indicated value for each angle measure.

cos θ = , sin θ < 0Find sin(2θ).

]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAmABMDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9Bvid488T+DvH/wAOLGwg0lvDniDWf7JvXuRK92WNpdTgxAFUjC/Zl5bfu8wjam3LQ+MvEvxB8J+OvDsySeHtR8KatrEWk/2LFZTrqaI8bsblbozeW+zYZGi8gYjVz5hK8y/F/wCGXin4ga/4Iv8AQfE+kaBB4a1T+1zBqOhy37XM3kTQBd6XcARNlxJxtY7tpyACrVJvhx8RW+KU/ihfGnhabTS6w2un3vhW5luLKzyDJDFMupKiyPjLS+SSSFyCqKgtcvu+rv8Ah+e2mq33saT5Wml/L+Ov5aPs9trnrNFFFQZnzT4/+Dvwg8EeOfAuiJ+zx4AvdL8Sal/ZkmrvomnxC2lNvcTqEiEDNIcWzbs7AN6YZjuC0vGXwZ+HvhHxjotv/wAMy/DW88J6jqtvpB1JbGxGoLJLn98lmLMo8KnliZ1cKrt5eF59J+N3hHxx4p8SfDu78KaZ4fvbPw7rf9s3bazrE9lI+La4txHGsdpMDxcl9xZeUC4O7cvO/En4H6z8WPHdjc654V8EQx6ZqFtdad47tZpf+EgtLeC4W4S3iiNv+7JIaMuLrb87P5Rzsqly2i/PX00/pd+lyqjjb3d+X8df+A3/AMOe+UUUVJIUUUUAFFFFAH//2Q==/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAARADIDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6KKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/9k= 1.0000000 0.3333333 0 true true abc

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]]>

]]> 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 Correct

]]>

]]> 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 Incorrect.  Did you use the identity:  sin 2A=2 sin A cos A   ?

]]>

]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAAmABoDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9Bvid488T+DvH/wAOLGwg0lvDniDWf7JvXuRK92WNpdTgxAFUjC/Zl5bfu8wjam3LU/F3xK8V+FvjRpOgDTdOvvDeoaDqmpW9vaiR9RnntPspADErGgc3LIE2sfkVt43FRb+L/wAMvFPxA1/wRf6D4n0jQIPDWqf2uYNR0OW/a5m8iaALvS7gCJsuJONrHdtOQAVZPFPwy8U658bPCnjay8UaRZaRoVndWJ0i40OWe4nS5aBpz9pF2iq3+jRhP3RC5bIfIxa5XFLZ+98tNH9//DG3NBNXV1b73d/8A86+Cn7Td14+8e+HdDufFHg7xYniHS59QNr4Vtp45/D80Sxu1peO08yu+JSvzLbuGiY+V8xCfSlec+B/hPd6V4uufGXi7Xl8W+MJIHsra6isRZWem2jOGMFrb75Cm4hS7vJI7lV+YKqovo1S7WVv6/z0/p7vCzTavf8AX+vlp0Wx80+P/g78IPBHjnwLoifs8eAL3S/Empf2ZJq76Jp8QtpTb3E6hIhAzSHFs27OwDemGY7gsXir4T/Bmw1vVtM8OfAL4da63h+NLnxBdXOh2dtDYRFBJ5SbLWV5rkxESLEFC7cbpELoG9B+N3hHxx4p8SfDu78KaZ4fvbPw7rf9s3bazrE9lI+La4txHGsdpMDxcl9xZeUC4O7cvnfin9le+1f4n+IdWh0LwndRazrdrrtv4yvbm4GuaE8S24eG0iELLhvsww63EQ/enfHIE2yO3MlZ2eu/ysrdt3utt72NJOKasuiv97669Ld99jN+E/h/4YTfEDwZHe/Af4ZeE73xBYHxH4V1HQorK7vFSHypQ8qi0hMEqiWJlaFpkDBh5gwpf6wrwr4O/s523hD4gX3jvU/D3hPwrq8kUtrZaH4KtRDZW8buDJNPN5UTXdy+1QZGjQIo2quSzv7rSey/r/h/lYzs02mFFFFIYUUUUAf/2Q== Incorrect.  Did you use the identity:  sin 2A=2 sin A cos A   ?

]]> Write the product as a sum or difference of trigonometric functions.cos 44° ... Write the product as a sum or difference of trigonometric functions.

cos 44° sin 15°]]> 1.0000000 0.3333333 0 true true abc (cos 59° - cos 29°)]]> 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 Incorrect (sin 59° + sin 29°)]]> 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 Incorrect (cos 59° + cos 29°)]]> 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 Incorrect (sin 59° - sin 29°)]]> 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 Correct Pre-Calc/Trig Unit 3: Analytic Trig and Applications/5.6 Half-Angle Identities Find the exact value by using a half-angle identity.cos 22.5° Find the exact value by using a half-angle identity.

cos 22.5°]]> 1.0000000 0.3333333 0 true true abc  ]]> 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Incorrect  ]]> 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 Incorrect  ]]> 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Correct  ]]> 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Incorrect Use an identity to write the expression as a single trigonometric function ... Use an identity to write the expression as a single trigonometric function or as a single number.

]]> 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 1.0000000 0.3333333 0 true true abc cot 23°

]]> Incorrect.  Did you choose the Half-Angle identity for sin ?

]]> tan 23°

]]> Incorrect.  Did you choose the Half-Angle identity for sin ?

]]> sin 23°

]]> Correct

]]> cos 23°

]]> Incorrect.  Did you choose the Half-Angle identity for sin ?

]]> Pre-Calc/Trig Unit 3: Analytic Trig and Applications/7.1 and 7.2 Law of Sines and Area of Triangle Area of painted triangle A painter is going to apply a special coating to a triangular metal plate on a new building.  Two sides measure are 13.2 m and 5.4 m.  She knows that the angle between these sides is «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«/math».  What is the area of the surface she plans to cover with the coating? Round to the nearest square meter.

]]> Did you use «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«mo»=«/mo»«mfrac»«mn»1«/mn»«mn»2«/mn»«/mfrac»«mi»b«/mi»«mi»c«/mi»«mo»§#160;«/mo»«mi»S«/mi»«mi»i«/mi»«mi»n«/mi»«mo»§#160;«/mo»«mi»A«/mi»«/math» ?  The angle must be between the two known sides.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>24</mn><mo>,</mo><mn>32</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mn>13</mn><mo>.</mo><mn>2</mn><mo>*</mo><mn>5</mn><mo>.</mo><mn>4</mn><mo>*</mo><mi>sin</mi><mo>(</mo><mi>a</mi><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer><correctAnswer id="2"></correctAnswer><correctAnswer id="3"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Area of triangle Find the area of triangle ABC with the given parts. Round to the nearest tenth.

A = 26.4°
b = #a in.
c = #b in.

]]> Did you use «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«mo»=«/mo»«mfrac»«mn»1«/mn»«mn»2«/mn»«/mfrac»«mi»b«/mi»«mi»c«/mi»«mo»§#160;«/mo»«mi»S«/mi»«mi»i«/mi»«mi»n«/mi»«mo»§#160;«/mo»«mi»A«/mi»«/math» ?  The angle must be between the two known sides.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>10</mn><mo>.</mo><mn>0</mn><mo>,</mo><mn>13</mn><mo>.</mo><mn>1</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>12</mn><mo>.</mo><mn>1</mn><mo>,</mo><mn>14</mn><mo>.</mo><mn>1</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>a</mi><mo>*</mo><mi>b</mi><mo>*</mo><mi>sin</mi><mo>(</mo><mn>26</mn><mo>.</mo><mn>4</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Distance of ship from port It is #a km from Lighthouse A to Port B. The bearing of the port from the lighthouse is N «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«/math»E. A ship has sailed due west from the port and its bearing from the lighthouse is N31°E. How far has the ship sailed from the port? Round to the nearest tenth of a kilometer.

]]> Draw a diagram and use the Law of Sines.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>.</mo><mn>9</mn><mo>,</mo><mn>5</mn><mo>.</mo><mn>2</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>70</mn><mo>,</mo><mn>75</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mi>a</mi><mo>*</mo><mo>(</mo><mi>sin</mi><mo>(</mo><mi>b</mi><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>-</mo><mn>31</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo><mo>)</mo></mrow><mrow><mo>(</mo><mi>sin</mi><mo>(</mo><mn>121</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo><mo>)</mo></mrow></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find the missing parts of the triangle. Find the missing parts of the triangle.


]]> 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1.0000000 0.3333333 0 true true abc no such triangle Incorrect ]]> 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Incorrect ]]> 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Correct B = 60°, C = 90°, b = 9 Incorrect Find the missing parts of the triangle.B = 11.4°b = 10.38a = 26.26 Find the missing parts of the triangle.

B = 11.4°
b = 10.38
a = 26.26]]> 1.0000000 0.3333333 0 true true abc 1 = 30°, C1 = 138.6°, c1 = 34.73;
A2 = 150°, C2 = 18.6°, c2 = 16.75]]> Correct no such triangle Incorrect A = 150°, C = 18.6°, c = 16.75 Incorrect A = 30°, C = 138.6°, c = 34.73 Incorrect Find the missing parts of the triangle.B = 42°30'b = 8.67a = 21.01 Find the missing parts of the triangle.

B = 42°30'
b = 8.67
a = 21.01]]> 1.0000000 0.3333333 0 true true abc A = 40°15', C = 97°15', c = 29.68 Incorrect A = 38°15', C = 99°15', c = 26.68 Incorrect A = 41°15', C = 98°15', c = 31.18 Incorrect no such triangle Correct Height of airplane An airplane is sighted at the same time by two ground observers who are #b miles apart and both to the west side of the airplane. They report the angles of elevation as 14° and «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«/math» .  How high is the airplane?

]]> Draw a diagram.  Find one of the missing sides with Law of Sines.  Then that side becomes the hypotenuse for a right triangle showing the height of the airplane.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>18</mn><mo>,</mo><mn>23</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>,</mo><mn>7</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>r</mi><mo>=</mo><mfrac><mrow><mn>5</mn><mo>*</mo><mo>(</mo><mi>sin</mi><mo>(</mo><mn>14</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo><mo>)</mo></mrow><mrow><mo>(</mo><mi>sin</mi><mo>(</mo><mi>a</mi><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>-</mo><mn>14</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo><mo>)</mo></mrow></mfrac></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>r</mi><mo>*</mo><mo>(</mo><mi>sin</mi><mo>(</mo><mi>a</mi><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Length of guy wire A guy wire to a tower makes a 66° angle with level ground. At a point #a ft farther from the tower than the wire but on the same side of the base as the wire, the angle of elevation to the top of the pole is 36°. Find the wire length (to the nearest foot).

]]> Draw a diagram.  Use the Law of Sines to find one of the missing sides of the triangle.  Then use that side as the hypotenuse of a right triangle to find the height of the tower, which is the opposite side of this right triangle.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>30</mn><mo>,</mo><mn>40</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mrow><mi>a</mi><mo>*</mo><mi>sin</mi><mo>(</mo><mn>36</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></mrow><mrow><mi>sin</mi><mo>(</mo><mn>30</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></mrow></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Solve the triangle.B = 34.4°C = 114.2°b = 29.50 Solve the triangle.

B = 34.4°
C = 114.2°
b = 29.50]]> 1.0000000 0.3333333 0 true true abc A = 29.4°, a = 47.63, c = 27.20 Incorrect A = 31.4°, a = 29.20, c = 49.63 Incorrect A = 29.4°, a = 49.63, c = 29.20 Incorrect A = 31.4°, a = 27.20, c = 47.63 Correct Tracking Station Two tracking stations are on the equator #m miles apart.  A weather balloon is located on a bearing of «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»N«/mi»«mo»§#160;«/mo»«msup»«mn»42«/mn»«mi»o«/mi»«/msup»«mo»§#160;«/mo»«mi»E«/mi»«/math» from the western station and on a bearing of «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»N«/mi»«mo»§#160;«/mo»«msup»«mn»22«/mn»«mi»o«/mi»«/msup»«mi»E«/mi»«/math» from the eastern station.  How far is the balloon from the western station?  (Round answer to nearest mile)

]]> Draw a diagram.  Find the angle between the eastern station and the western station by adding 90 to 22.  Then use the Law of Sines.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>m</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>120</mn><mo>.</mo><mo>.</mo><mn>130</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>m</mi><mo>*</mo><mo>(</mo><mi>sin</mi><mo>(</mo><mn>112</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo><mo>)</mo><mo>/</mo><mo>(</mo><mi>sin</mi><mo>(</mo><mn>20</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo><mo>)</mo></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="check_no_more_decimals"><param name="digits">0</param></assertion><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Trig Unit 3: Analytic Trig and Applications/7.3 Law of Cosines and Heron's Formula Cans of paint needed A  painter needs to cover a triangular region #a meters by #b meters by 73 meters.  A can of paint covers 70 square meters.  How many cans will be needed?  (When rounding, consider how many can will need to be purchased to get the job done).

]]> Use Heron's Formula to find the area of the triangle needing paint.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>65</mn><mo>,</mo><mn>70</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>60</mn><mo>,</mo><mn>66</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mo>(</mo><mi>a</mi><mo>+</mo><mi>b</mi><mo>+</mo><mn>73</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t</mi><mo>=</mo><msqrt><mrow><mi>s</mi><mo>*</mo><mo>(</mo><mi>s</mi><mo>-</mo><mi>a</mi><mo>)</mo><mo>*</mo><mo>(</mo><mi>s</mi><mo>-</mo><mi>b</mi><mo>)</mo><mo>*</mo><mo>(</mo><mi>s</mi><mo>-</mo><mn>73</mn><mo>)</mo></mrow></msqrt></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfenced close="⌉" open="⌈"><mfrac><mi>t</mi><mn>70</mn></mfrac></mfenced></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="precision">4</option><option name="relative_tolerance">false</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Cost to carpet room A room in the shape of a triangle has sides of length 10.0 yards, #a yards, and #b yards.  If carpeting costs $13.90 per square yard, padding costs $ #c per square yard, and there is no charge for installation, how much, to the nearest dollar, will it cost to carpet the room?  (Round area up next integer before applying cost).

]]> Use Heron's Formula to find the required area.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>9</mn><mo>,</mo><mn>13</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>12</mn><mo>,</mo><mn>17</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>.</mo><mn>25</mn><mo>,</mo><mn>1</mn><mo>.</mo><mn>90</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mo>(</mo><mi>a</mi><mo>+</mo><mi>b</mi><mo>+</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t</mi><mo>=</mo><msqrt><mrow><mi>s</mi><mo>*</mo><mo>(</mo><mi>s</mi><mo>-</mo><mi>a</mi><mo>)</mo><mo>*</mo><mo>(</mo><mi>s</mi><mo>-</mo><mi>b</mi><mo>)</mo><mo>*</mo><mo>(</mo><mi>s</mi><mo>-</mo><mn>10</mn><mo>)</mo></mrow></msqrt></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfenced close="⌉" open="⌈"><mi>t</mi></mfenced><mo>*</mo><mo>(</mo><mn>13</mn><mo>.</mo><mn>9</mn><mo>+</mo><mi>c</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="precision">3</option><option name="relative_tolerance">false</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Distance between Two Towns To find the distance between 2 small towns, and electronic distance measuring (EDM) instrument is placed on a hill from which both towns are visible.  If the distance from the EDM to the towns is #a miles and #b miles and the angle between the two lines of sight is 70o, what is the distance between the two towns?  (Round answer to nearest tenth of a mile.)

]]> Draw a diagram.  Law of Cosines.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>4</mn><mo>.</mo><mn>1</mn><mo>,</mo><mn>5</mn><mo>.</mo><mn>1</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>3</mn><mo>.</mo><mn>1</mn><mo>,</mo><mn>4</mn><mo>.</mo><mn>1</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><msqrt><mrow><msup><mi>a</mi><mn>2</mn></msup><mo>+</mo><msup><mi>b</mi><mn>2</mn></msup><mo>-</mo><mn>2</mn><mo>*</mo><mi>a</mi><mo>*</mo><mi>b</mi><mo>*</mo><mi>cos</mi><mo>(</mo><mn>70</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></mrow></msqrt></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find area using Heron's Formula Find the area of triangle ABC with the given parts. Round to the nearest whole number.

a = #a cm
b = 15.0 cm
c = 13.0 cm

]]> Heron's Formula

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>15</mn><mo>,</mo><mn>22</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>(</mo><mi>a</mi><mo>+</mo><mn>15</mn><mo>+</mo><mn>13</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><msqrt><mrow><mi>s</mi><mo>*</mo><mo>(</mo><mi>s</mi><mo>-</mo><mi>a</mi><mo>)</mo><mo>*</mo><mo>(</mo><mi>s</mi><mo>-</mo><mn>15</mn><mo>)</mo><mo>*</mo><mo>(</mo><mi>s</mi><mo>-</mo><mn>13</mn><mo>)</mo></mrow></msqrt></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find the indicated angle or side.Find the length of side a. Find the indicated angle or side.

Find the length of side a.
]]> 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 1.0000000 0.3333333 0 0 7 * Find the indicated angle or side.Find the measure of angle A. Find the indicated angle or side.

Find the measure of angle A.

]]> 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 1.0000000 0.3333333 0 0 120° * Find the missing parts of the triangle. (Find angles to the nearest ... Find the missing parts of the triangle. (Find angles to the nearest hundredth of a degree.)

a = 6.1 in.
b = 13.6 in.
c = 16.0 in.]]> 1.0000000 0.3333333 0 true true abc A = 21.92°, B = 56.34°, C = 101.74° Correct A = 19.92°, B = 56.34°, C = 103.74° Incorrect A = 23.92°, B = 54.34°, C = 101.74° Incorrect No triangle satisfies the given conditions. Incorrect Find the missing parts of the triangle.B = 63°30'a = 12.20 ftc = 7.80 ft Find the missing parts of the triangle.

B = 63°30'
a = 12.20 ft
c = 7.80 ft]]> 1.0000000 0.3333333 0 true true abc No triangle satisfies the given conditions. Incorrect b = 11.17 ft, A = 77°49', C = 38°41' Correct b = 13.17 ft, A = 73°07', C = 37°23' Incorrect b = 12.17 ft, A = 75°07', C = 41°23' Incorrect Two planes leave airport at same time Two airplanes leave an airport at the same time, one going northwest (bearing 315°) at #a mph and the other going east at #b mph.  How far apart are the planes after #c hours (to the nearest mile)?

]]> Draw a diagram.  Find distance each plane travels, then use Law of Cosines

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>400</mn><mo>,</mo><mn>430</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>330</mn><mo>,</mo><mn>340</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><msqrt><mrow><mo>(</mo><mi>a</mi><mo>*</mo><mi>c</mi><msup><mo>)</mo><mn>2</mn></msup><mo>+</mo><mo>(</mo><mi>b</mi><mo>*</mo><mi>c</mi><msup><mo>)</mo><mn>2</mn></msup><mo>-</mo><mn>2</mn><mo>*</mo><mi>a</mi><mo>*</mo><mi>b</mi><mo>*</mo><msup><mi>c</mi><mn>2</mn></msup><mo>*</mo><mi>cos</mi><mo>(</mo><mn>135</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></mrow></msqrt><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Two ships leave port at same time Two ships leave a harbor together traveling on courses that have an angle of #a ° between them.  If they each travel #b miles, how far apart are they (to the nearest mile)?

]]> Draw a diagram.  Law of Cosines.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>110</mn><mo>,</mo><mn>130</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>480</mn><mo>,</mo><mn>540</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><msqrt><mrow><mo>(</mo><mi>b</mi><msup><mo>)</mo><mn>2</mn></msup><mo>+</mo><mo>(</mo><mi>b</mi><msup><mo>)</mo><mn>2</mn></msup><mo>-</mo><mn>2</mn><mo>*</mo><mi>b</mi><mo>*</mo><mi>b</mi><mo>*</mo><mi>cos</mi><mo>(</mo><mi>a</mi><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></mrow></msqrt><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Pre-Calc/Trig Unit 3: Analytic Trig and Applications/7.4 Vectors Angle between vectors Find the angle between the pair of vectors to the nearest tenth of a degree.
(Include degree symbol in answer--located in "x" menu).

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfenced open=¨§lt;¨ close=¨§#62;¨»«mrow»«mn»5«/mn»«mo»,«/mo»«mn»5«/mn»«/mrow»«/mfenced»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mfenced open=¨§lt;¨ close=¨§#62;¨»«mrow»«mo»-«/mo»«mn»3«/mn»«mo»,«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«/mrow»«/mfenced»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t</mi><mo>=</mo><mi>arccos</mi><mo>(</mo><mfrac><mrow><mo>(</mo><mo>-</mo><mn>15</mn><mo>+</mo><mn>5</mn><mo>*</mo><mi>a</mi><mo>)</mo></mrow><mrow><mn>5</mn><mo>*</mo><msqrt><mn>2</mn></msqrt><mo>*</mo><msqrt><mrow><mn>9</mn><mo>+</mo><msup><mi>a</mi><mn>2</mn></msup></mrow></msqrt></mrow></mfrac><mo>)</mo><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>w</mi><mo>=</mo><mi>convert</mi><mo>(</mo><mi>t</mi><mo>,</mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>w</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find component form of vector Find the component form of the indicated vector.
Let u = «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfenced open=¨§lt;¨ close=¨§#62;¨»«mrow»«mo»-«/mo»«mn»9«/mn»«mo»,«/mo»«mo»-«/mo»«mn»9«/mn»«/mrow»«/mfenced»«/math», v =«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfenced open=¨§lt;¨ close=¨§#62;¨»«mrow»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«/mrow»«/mfenced»«/math». Find -u + 9v.

]]> 1.0000000 0.3333333 0 true true abc #t1

]]> #t2

]]> #t3

]]> #t4

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>4</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t1</mi><mo>=</mo><mfenced close="]" open="["><mrow><mn>9</mn><mo>+</mo><mn>9</mn><mo>*</mo><mi>a</mi><mo>,</mo><mn>9</mn><mo>+</mo><mn>9</mn><mo>*</mo><mi>b</mi></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t2</mi><mo>=</mo><mfenced close="]" open="["><mrow><mn>9</mn><mo>-</mo><mn>9</mn><mo>*</mo><mi>a</mi><mo>,</mo><mn>9</mn><mo>-</mo><mn>9</mn><mo>*</mo><mi>b</mi></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t3</mi><mo>=</mo><mfenced close="]" open="["><mrow><mo>-</mo><mn>9</mn><mo>+</mo><mn>9</mn><mo>*</mo><mi>a</mi><mo>,</mo><mo>-</mo><mn>9</mn><mo>+</mo><mn>9</mn><mo>*</mo><mi>b</mi></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t4</mi><mo>=</mo><mfenced close="]" open="["><mrow><mn>9</mn><mo>*</mo><mn>9</mn><mo>*</mo><mi>a</mi><mo>,</mo><mn>9</mn><mo>*</mo><mn>9</mn><mo>*</mo><mi>b</mi></mrow></mfenced></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> Find dot product Find the dot product between these vectors

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfenced open=¨§lt;¨ close=¨§#62;¨»«mrow»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«/mrow»«/mfenced»«mo»§#160;«/mo»«mo»§#160;«/mo»«mfenced open=¨§lt;¨ close=¨§#62;¨»«mrow»«mo»#«/mo»«mi»c«/mi»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»d«/mi»«mo»§#160;«/mo»«/mrow»«/mfenced»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>8</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>c</mi><mo>+</mo><mi>b</mi><mo>*</mo><mi>d</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find dot product (i/j format) Find the dot product between these vectors

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo mathvariant=¨bold¨»§#160;«/mo»«mi mathvariant=¨bold-italic¨»i«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mi mathvariant=¨bold-italic¨»j«/mi»«mspace linebreak=¨newline¨/»«mo»#«/mo»«mi»c«/mi»«mo mathvariant=¨bold¨»§#160;«/mo»«mi mathvariant=¨bold-italic¨»i«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»d«/mi»«mo»§#160;«/mo»«mi mathvariant=¨bold-italic¨»j«/mi»«/math»

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>8</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>c</mi><mo>+</mo><mi>b</mi><mo>*</mo><mi>d</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Find magnitude and direction angle Find the magnitude and direction angle (to the nearest unit) for each vector. Give the measure of the direction angle as an angle in [0,360°].  Also round to the nearest unit.  Include degree symbol in answer for angle.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfenced open=¨§lt;¨ close=¨§#62;¨»«mrow»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«/mrow»«/mfenced»«/math»

]]> 1.0000000 0.3333333 0 0 magnitude=#mdirection angle=#d]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>16</mn><mo>,</mo><mo>-</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>16</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>m</mi><mo>=</mo><msqrt><mrow><msup><mi>a</mi><mn>2</mn></msup><mo>+</mo><msup><mi>b</mi><mn>2</mn></msup></mrow></msqrt><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t</mi><mo>=</mo><mi>convert</mi><mo>(</mo><mi>atan</mi><mo>(</mo><mfrac><mi>b</mi><mfenced close="|" open="|"><mi>a</mi></mfenced></mfrac><mo>)</mo><mo>,</mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mn>180</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>-</mo><mi>t</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t</mi><mo>=</mo><mi>convert</mi><mo>(</mo><mi>atan</mi><mo>(</mo><mfrac><mi>b</mi><mfenced close="|" open="|"><mi>a</mi></mfenced></mfrac><mo>)</mo><mo>,</mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>45.</mn><mo>&nbsp;</mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mn>180</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>-</mo><mi>t</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>135.</mn><mo>&nbsp;</mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi mathvariant="normal">m</mi><mi>ag</mi><mi>n</mi><mi mathvariant="normal">i</mi><mi>t</mi><mi>u</mi><mi>d</mi><mi mathvariant="normal">e</mi><mo>=</mo><mo>#</mo><mi mathvariant="normal">m</mi><mspace linebreak="newline"/><mi>dir</mi><mi mathvariant="normal">e</mi><mi>c</mi><mi>t</mi><mi mathvariant="normal">i</mi><mi>o</mi><mi>n</mi><mo>&#160;</mo><mi>a</mi><mi>ng</mi><mi mathvariant="normal">l</mi><mi mathvariant="normal">e</mi><mo>=</mo><mo>#</mo><mi>d</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputCompound">true</data><data name="gradeCompound">distribute</data><data name="gradeCompoundDistribution">50 50</data><data name="inputField">popupEditor</data><data name="casSession">null</data></localData></question> Find scalar multiple Find the indicated vector.
Let a = «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfenced open=¨§lt;¨ close=¨§#62;¨»«mrow»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«/mrow»«/mfenced»«/math». Find -3a.
 
]]> 1.0000000 0.3333333 0 true true ABCD #t1

]]> #t2

]]> #t3

]]> #t4

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>4</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t1</mi><mo>=</mo><mfenced close="]" open="["><mrow><mo>-</mo><mn>3</mn><mo>*</mo><mi>a</mi><mo>,</mo><mo>-</mo><mn>3</mn><mo>*</mo><mi>b</mi></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t2</mi><mo>=</mo><mfenced close="]" open="["><mrow><mn>3</mn><mo>*</mo><mi>a</mi><mo>,</mo><mn>3</mn><mo>*</mo><mi>b</mi></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t3</mi><mo>=</mo><mfenced close="]" open="["><mrow><mi>a</mi><mo>+</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>3</mn><mo>*</mo><mi>b</mi></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t4</mi><mo>=</mo><mfenced close="]" open="["><mrow><mi>a</mi><mo>-</mo><mn>3</mn><mo>,</mo><mi>b</mi><mo>-</mo><mn>3</mn></mrow></mfenced></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> Find the angle between the pair of vectors to the nearest tenth of a degree.,  Find the angle between the pair of vectors to the nearest tenth of a degree.

]]> 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 1.0000000 0.3333333 0 true true abc 32.8° Incorrect 75.6° Incorrect 22.8° Incorrect 65.6° Correct Find the magnitude and direction angle (to the nearest tenth) for each ... Find the magnitude and direction angle (to the nearest tenth) for each vector. Give the measure of the direction angle as an angle in [0,360°].

]]> 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 1.0000000 0.3333333 0 true true abc 5; 216.9° Incorrect 7; 233.1° Incorrect 5; 233.1° Correct 5; 53.1° Incorrect Find vertical component of vector Vector v has the given magnitude and direction. Find the magnitude of the indicated component of v.  Round to the nearest tenth.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#946;«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«mo»§#160;«/mo»«mo»;«/mo»«mo»§#160;«/mo»«mfenced open=¨|¨ close=¨|¨»«mi»v«/mi»«/mfenced»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«/math»
Find the vertical component of v.

]]> 1.0000000 0.3333333 0 0 #answer]]> Great job!!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>20</mn><mo>,</mo><mn>88</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>210</mn><mo>,</mo><mn>350</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>b</mi><mo>*</mo><mo>(</mo><mi>sin</mi><mo>(</mo><mi>a</mi><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Did you draw a vector and its components on a graph?

]]> Did you use the appropriate trig function for opposite and hypotenuse in a right triangle?

]]> Two forces act at a point in the plane. The angle between the two forces is ... Two forces act at a point in the plane. The angle between the two forces is given. Find the magnitude of the resultant force.

forces of 25.0 and 31.8 lb, forming an angle of 162.8°

]]> 1.0000000 0.3333333 0 0 11 *

]]> Write the vector in the form <a, b>.


]]> 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 1.0000000 0.3333333 0 true true abc ]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAARAEUDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9CPhFq19471XxR46e9uD4e1WaPT/D1n5rfZ30+1aVRfKmSha6mluJEmjYrLarYNgENU/xZvfHGkWx1Tw54i8M+HdEsrWSa+k1vQ7jVJ5ZARsWJIry2C8bhyWLMVAA78r4H+D/AIe1Lw5d/DLxz4J0zxNoPg67VPDUmvaTHeWsmlOhNmIzIjqJLZPMsmBdpmFqk0mBcpnrX+Dmk2LeE9M8P2+neF/Bmh3j6hJ4b0jTkt4Lu4HzQE+WVVEjlJmKhDukWNsjYQyauv6/r5DJki+JN78M9KVL3w3pnj2VITfXFzp08+nwkkGUJbpch2IXIA8/GedxHXwLxz+0l47+GEWnHxX4u8D6Loeq3t7b2Pji58L3o03dbRpiB7ddQZlaV/tGyVplUi34RzIuPonxr4b8VeJbDW9P0zxRa+H7S+tI7e2uLfTXe9tHLnz5BL54Uloztj/djy3+cmQfJWF4l+FWr22reH9U8Ba3pXhi60jS30SO21fR31K0+xlomCoiXNu6ODDGA3mFSuQUJClZfNKWmif4f8Npb11TtZkbLfW39fr+HzOr+Hmuan4m8CeH9W1mzt9P1W+sYbi5trScTQpIyAkI4+8vOQfQiuAgv/izZ/EfRtMvfEPgu+067nnurrTLLw9dR3Frp6EhW+1NflWkJaJf9QAxLkKApI3/AISeDtU+Hun/APCMIIU8J6NawWemvLCi3dzKNzzzt5beWkRLqqRrGhUo/G3ZWr4V8F3eg6t4o1i91VdV1jWrrdHO1uY47S1jBW2tVTecrHudicje8srYXcFGk3efMlpvb9P+H6b2ZKXu2fp/we/49t1qcn8XdR+J+iTXF94V1/wjp+nMsNtp+m6roFzf3d7eyMVCeal9bpGpJT+FtoDsTgYHiHxy+O3j+78d3vw00DxH4Y8MeObW80eTSNE1K3u7eXxE+6K4aaG8WcKlp5kUsUsHlyO8UciF0aZcfR9l4G1u98WeH9d8Sa/aao2j2Dxx2On6c9pbm/kysl4A08pH7omNEJOwSSks28bfM/jF8K/ElhofjO50q9g1/wAP6vfQ6w/hRNFaTVL7UVMCwW8V+JTHbQvLBbgzSWz+QhkcyIqBophdTV7W31v3207699Ol9U9LPv8A0+nbbp117+yeAPGtj8RfBuk+I9PiuLW3v4RI1neqqXNnKCVltrhFZhHPDIrxSR5JSSN1PKmiqnwt8C/8K38CaZoUl9/at/H5t1qOp+V5P2+/nlee8uvK3MIvOuJZpfLU7U37VwqgApgdXRRRQAUUUUAFFFFABRRRQAUUUUAf/9k= Incorrect ]]> 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 Incorrect ]]> 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Incorrect ]]> 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 Correct Pre-Calc/Trig Unit 3: Analytic Trig and Applications/7.5 Apps of Vectors Airspeed of aircraft A pilot wants to fly on a bearing of «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#176;«/mo»«/math».  By flying due east, he finds that a #b -mph wind, blowing from the south, puts him on course.  Find the airspeed of the plane, rounded to the nearest mph.

]]> 1.0000000 0.3333333 0 0 #answer]]> Great!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>58</mn><mo>,</mo><mn>63</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>50</mn><mo>,</mo><mn>60</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mi>b</mi><mrow><mi>tan</mi><mo>(</mo><mn>90</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>-</mo><mi>a</mi><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></mrow></mfrac></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer><correctAnswer id="2"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Angle between forces Two forces of #a newtons and #b newtons act at a point.  The resultant force is 691 newtons. Find the angle between the forces.  Round to the nearest tenth of a degree.  (Include degree symbol)

]]> 1.0000000 0.3333333 0 0 #answer]]> Awesome!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>615</mn><mo>,</mo><mn>630</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>160</mn><mo>,</mo><mn>180</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>arccos</mi><mo>(</mo><mfrac><mrow><msup><mn>691</mn><mn>2</mn></msup><mo>-</mo><msup><mi>a</mi><mn>2</mn></msup><mo>-</mo><msup><mi>b</mi><mn>2</mn></msup></mrow><mrow><mo>-</mo><mn>2</mn><mo>*</mo><mi>a</mi><mo>*</mo><mi>b</mi></mrow></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mi>convert</mi><mo>(</mo><mi>c</mi><mo>,</mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>180</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>-</mo><mi>d</mi></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>615</mn><mo>,</mo><mn>630</mn><mo>)</mo></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>617</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>160</mn><mo>,</mo><mn>180</mn><mo>)</mo></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>160</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>arccos</mi><mo>(</mo><mfrac><mrow><msup><mn>691</mn><mn>2</mn></msup><mo>-</mo><msup><mi>a</mi><mn>2</mn></msup><mo>-</mo><msup><mi>b</mi><mn>2</mn></msup></mrow><mrow><mo>-</mo><mn>2</mn><mo>*</mo><mi>a</mi><mo>*</mo><mi>b</mi></mrow></mfrac><mo>)</mo></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>1.9397</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mi>convert</mi><mo>(</mo><mi>c</mi><mo>,</mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>111.14</mn><mo>&nbsp;</mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mn>180</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>-</mo><mi>d</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>68.864</mn><mo>&nbsp;</mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer><correctAnswer id="2"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Angle rope makes with vertical (needs more work) A box weighing #a lb is hanging from the end of a rope.  The box is pulled sideways by a horizontal rope with a force of #b lb.  What angle, to the nearest degree, does the first rope make with the vertical?

]]> 1.0000000 0.3333333 0 0 #answer]]> Great job!!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>70</mn><mo>,</mo><mn>90</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>20</mn><mo>,</mo><mn>30</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>arcsin</mi><mo>(</mo><mfrac><mi>b</mi><mi>a</mi></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>convert</mi><mo>(</mo><mi>c</mi><mo>,</mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Find magnitude of norther and eastern vectors A ship leaves point A and travels directly north to point B. From point B, the ship then travels due east to point C.  The magnitude of the vector from point A to point C is #a.  Find the magnitude of the northern vector and the magnitude of the eastern vector.  Round to the nearest tenth.
 
 
]]> 1.0000000 0.3333333 0 0 East component=#eNorth component=#n]]> Great job!!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>120</mn><mo>,</mo><mn>150</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>e</mi><mo>=</mo><mfrac><mi>a</mi><msqrt><mn>2</mn></msqrt></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mfrac><mi>a</mi><msqrt><mn>2</mn></msqrt></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi mathvariant="normal">E</mi><mi>as</mi><mi>t</mi><mo>&#160;</mo><mi>c</mi><mi>o</mi><mi mathvariant="normal">m</mi><mi>p</mi><mi>o</mi><mi>n</mi><mi mathvariant="normal">e</mi><mi>n</mi><mi>t</mi><mo>=</mo><mo>#</mo><mi mathvariant="normal">e</mi><mspace linebreak="newline"/><mi mathvariant="normal">N</mi><mi>o</mi><mi>r</mi><mi>t</mi><mi mathvariant="normal">h</mi><mo>&#160;</mo><mi>c</mi><mi>o</mi><mi mathvariant="normal">m</mi><mi>p</mi><mi>o</mi><mi>n</mi><mi mathvariant="normal">e</mi><mi>n</mi><mi>t</mi><mo>=</mo><mo>#</mo><mi>n</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-1)</option><option name="relative_tolerance">false</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputCompound">true</data><data name="gradeCompound">distribute</data><data name="gradeCompoundDistribution">50 50</data><data name="inputField">popupEditor</data><data name="casSession">null</data></localData></question> Did you draw a right triangle with North and East legs?

]]> Did you recognize it was a 45-45-90 right triangle?

]]> Solve the problem.A box weighing 80 lb is hanging from the end of a rope. ... Solve the problem.

A box weighing 80 lb is hanging from the end of a rope. The box is pulled sideways by a horizontal rope with a force of 24 lb. What angle, to the nearest degree, does the first rope make with the vertical?]]> 1.0000000 0.3333333 0 0 17° * Solve the problem.A fishing boat leaves port on a bearing of 35° and travels ... Solve the problem.

A fishing boat leaves port on a bearing of 35° and travels 13.3 mi. The boat then turns due east and travels   How far is the fishing boat from port, and what is its bearing from port?]]> 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 1.0000000 0.3333333 0 true true abc 11.5 mi; 46.9° Incorrect 15.9 mi; 46.9° Correct 10.3 mi; 11.9° Incorrect 15.9 mi; 11.9° Incorrect Solve the problem.A hot-air balloon is rising vertically 12 ft/sec while the ... Solve the problem.

A hot-air balloon is rising vertically 12 ft/sec while the wind is blowing horizontally at 5 ft/sec. Find the angle that the balloon makes with the horizontal.]]> 1.0000000 0.3333333 0 0 67.4° * Solve the problem.A plane is heading due south with an airspeed of 264 mph. ... Solve the problem.

A plane is heading due south with an airspeed of 264 mph. A wind from a direction of 59° is blowing at 13 mph. Find the bearing of the plane.]]> 1.0000000 0.3333333 0 0 182° * Solve the problem.A ship leaves point A and travels directly north to point ... Solve the problem.

A ship leaves point A and travels directly north to point B. From point B, the ship then travels due east to point C. The magnitude of the vector from point A to point C is 134. Find the magnitude of the northern vector. Find the magnitude of the eastern vector.]]> 1.0000000 0.3333333 0 true true abc  north; 67 east]]> /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAATABQDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6+SdRlt9fXxp4+1rSPin4mt5tf1aFdP8GeLL6wttFstMlOmtiNNQtUlMsljPdbYY2lzclNr7Vd/QfEni6+/ZjttS8b/ABF8W3Gt+BLuGA61qRt2C6LqBkZBNDap5ji0mEltbCGMu0LQRO4na4urlOd06x+IPgz4HfDfwOfh54i1i5udBgPjDUNCvtL+0/bHiDXse+4vYd0887zPJcqXJLuwZnfeid9Lf16+Xf8ADUuCTfvbf1t59v8AI+gPB8um3HhLRJdGupr7R3sYGsrq5uJbiWaAxr5bvLKTJIxXBLuSzE5YkkmipfDcvneH9Of+x5vD4NumNKuPJ8y0G0YibyXePK9PkZl44JFFXKyk7bGUb8q5tyfVtJsdf0q90zU7K31HTb2F7a6s7uJZYZ4nUq8bowIZWUkFSCCCQat0UVJQUUUUAf/Z/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAATABQDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6+SdRlt9fXxp4+1rSPin4mt5tf1aFdP8GeLL6wttFstMlOmtiNNQtUlMsljPdbYY2lzclNr7Vd/QfEni6+/ZjttS8b/ABF8W3Gt+BLuGA61qRt2C6LqBkZBNDap5ji0mEltbCGMu0LQRO4na4urlOd06x+IPgz4HfDfwOfh54i1i5udBgPjDUNCvtL+0/bHiDXse+4vYd0887zPJcqXJLuwZnfeid9Lf16+Xf8ADUuCTfvbf1t59v8AI+gPB8um3HhLRJdGupr7R3sYGsrq5uJbiWaAxr5bvLKTJIxXBLuSzE5YkkmipfDcvneH9Of+x5vD4NumNKuPJ8y0G0YibyXePK9PkZl44JFFXKyk7bGUb8q5tyfVtJsdf0q90zU7K31HTb2F7a6s7uJZYZ4nUq8bowIZWUkFSCCCQat0UVJQUUUUAf/Z Correct  east]]> 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 Incorrect 67 north; 67 east Incorrect  north; 67 east]]> 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 Incorrect Solve the problem.Two people are carrying a box. One person exerts a force ... Solve the problem.

Two people are carrying a box. One person exerts a force of 135 pounds at an angle of 47.7° with the horizontal. The other person exerts a force of 95 pounds at an angle of 50.9°. Find the weight of the box.]]> 1.0000000 0.3333333 0 0 176 lb * Solve the problem.What is the minimum force required to prevent a ball ... Solve the problem.

What is the minimum force required to prevent a ball weighing 26.7 lb from rolling down a ramp inclined 32.3° with the horizontal?]]> 1.0000000 0.3333333 0 0 14.3 lb * Weight of boat being pulled up ramp A force of #a lb is required to pull a boat up a ramp inclined at 18° with the horizontal.  How much does the boat weigh?  Round to the nearest pound.

]]> 1.0000000 0.3333333 0 0 #answer]]> Nice work!

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>500</mn><mo>,</mo><mn>800</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mfrac><mi>a</mi><mrow><mo>(</mo><mi>sin</mi><mo>&nbsp;</mo><mn>18</mn><csymbol definitionURL="http://.../units/degree/angular">°</csymbol><mo>)</mo></mrow></mfrac><mo>*</mo><mn>1</mn><mo>.</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer><correctAnswer id="2"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-0)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Pre-Calc/WIRIS examples Decimal check what is #a  +   #b

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>7</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>a</mi><mo>+</mo><mi>b</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer><correctAnswer id="2"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> Random Ordered Pairs How far from the origin is #P ?  Round to hundredths.

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>5</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mo>-</mo><mn>5</mn><mo>,</mo><mn>5</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>P</mi><mo>=</mo><mi>point</mi><mo>(</mo><mi>a</mi><mo>,</mo><mi>b</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><msqrt><mrow><msup><mi>a</mi><mn>2</mn></msup><mo>+</mo><msup><mi>b</mi><mn>2</mn></msup></mrow></msqrt><mo>/</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>ns</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, sr, E, K, mol, cd, rad, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="unitprefixes">M, k, c, m, y, z, a, f, p, n, µ, d, da, h, G, T, P, E, Z, Y</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-2)</option><option name="relative_tolerance">false</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question> WIRIS Compound Question For a rectangle with length #l and width #w, find the Area and Perimeter.

]]> 1.0000000 0.3333333 0 0 Area=#aPerimeter=#p]]> Nice work

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>l</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>8</mn><mo>.</mo><mo>.</mo><mn>20</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>w</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>.</mo><mo>.</mo><mn>7</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>l</mi><mo>*</mo><mi>w</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p</mi><mo>=</mo><mn>2</mn><mo>*</mo><mi>l</mi><mo>+</mo><mn>2</mn><mo>*</mo><mi>w</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>A</mi><mi>r</mi><mi mathvariant="normal">e</mi><mi>a</mi><mo>=</mo><mo>#</mo><mi>a</mi><mspace linebreak="newline"/><mi>P</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">i</mi><mi>m</mi><mi mathvariant="normal">e</mi><mi>t</mi><mi mathvariant="normal">e</mi><mi>r</mi><mo>=</mo><mo>#</mo><mi>p</mi><mspace linebreak="newline"/></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression" correctAnswer="1"/><assertion name="equivalent_symbolic" correctAnswer="1"/><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputCompound">true</data><data name="gradeCompound">distribute</data><data name="gradeCompoundDistribution">50 50</data><data name="inputField">popupEditor</data><data name="casSession">null</data></localData></question> WIRIS Matching (Degree of equations) Match the following equations with these descriptions:

]]> 1.0000000 0.3333333 0 true «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«mn»2«/mn»«msup»«mi»x«/mi»«mn»3«/mn»«/msup»«mo»+«/mo»«mn»7«/mn»«mi»x«/mi»«mo»-«/mo»«mn»4«/mn»«/math»

]]> Cubic «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«mn»8«/mn»«msup»«mi»x«/mi»«mn»5«/mn»«/msup»«mo»-«/mo»«mn»8«/mn»«msup»«mi»x«/mi»«msup»«mn»4«/mn»«mrow/»«/msup»«/msup»«mo»+«/mo»«mn»6«/mn»«mi»x«/mi»«/math»

]]> Quintic Quartic Linear Quadratic <question><correctAnswers><correctAnswer></correctAnswer></correctAnswers></question> WIRIS Matching (Degree of equations) Match the following equations with these descriptions:

]]> 1.0000000 0.3333333 0 true «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«mn»2«/mn»«msup»«mi»x«/mi»«mn»3«/mn»«/msup»«mo»+«/mo»«mn»7«/mn»«mi»x«/mi»«mo»-«/mo»«mn»4«/mn»«/math»

]]> Cubic «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«mo»=«/mo»«mn»8«/mn»«msup»«mi»x«/mi»«mn»5«/mn»«/msup»«mo»-«/mo»«mn»8«/mn»«msup»«mi»x«/mi»«msup»«mn»4«/mn»«mrow/»«/msup»«/msup»«mo»+«/mo»«mn»6«/mn»«mi»x«/mi»«/math»

]]> Quintic Quartic Linear Quadratic <question><correctAnswers><correctAnswer></correctAnswer></correctAnswers></question> WIRIS Matching Question Match the following:

]]> 1.0000000 0.3333333 0 true 2.4

]]> Real «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»-«/mo»«mn»3«/mn»«mi»i«/mi»«/math»

]]> Complex Irrational <question><correctAnswers><correctAnswer></correctAnswer></correctAnswers></question> WIRIS Matching with Graphs Match each graph with the function that generated it.

]]> 1.0000000 0.3333333 0 true #g1

]]> #f1 #g2

]]> #f2 #f3 <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s1</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo><mo>;</mo><mi>s2</mi><mo>=</mo><mi>plotter</mi><mo>(</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f1</mi><mo>=</mo><msup><mn>2</mn><mi>x</mi></msup></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f2</mi><mo>=</mo><mi>sin</mi><mo>(</mo><mi>x</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f3</mi><mo>=</mo><mn>3</mn><mi>x</mi><mo>+</mo><mn>7</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g1</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s1</mi><mo>,</mo><mi>f1</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g2</mi><mo>=</mo><mi>plot</mi><mo>(</mo><mi>s2</mi><mo>,</mo><mi>f2</mi><mo>)</mo></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> WIRIS MC (Variables) «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»W«/mi»«mi»h«/mi»«mi»a«/mi»«mi»t«/mi»«mo»§#160;«/mo»«mi»i«/mi»«mi»s«/mi»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#215;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»?«/mo»«/math»

]]> 1.0000000 0.3333333 0 true true abc «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»c«/mi»«/math»

]]> 7

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]]> #d

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>.</mo><mo>.</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>.</mo><mo>.</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>b</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>.</mo><mo>.</mo><mn>30</mn><mo>)</mo></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> WIRIS MC question (no variables) What is the «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msqrt»«mn»16«/mn»«/msqrt»«/math» ?

]]> 1.0000000 0.3333333 0 true true abc 4

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]]> <question><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession"><![CDATA[<session lang="en" version="2.0"><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></data></localData></question> WIRIS MC w/variables in answers Find the area of a rectangle with length #l and width #w

]]> 1.0000000 0.3333333 0 true true abc #answer

]]> #answer1

]]> #answer2

]]> #answer3

]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>l</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>w</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>l</mi><mo>*</mo><mi>w</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer1</mi><mo>=</mo><mi>l</mi><mo>+</mo><mi>w</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer2</mi><mo>=</mo><mn>2</mn><mo>*</mo><mi>l</mi><mo>+</mo><mn>2</mn><mo>*</mo><mi>w</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer3</mi><mo>=</mo><mo>(</mo><mi>l</mi><mo>*</mo><mi>w</mi><msup><mo>)</mo><mn>2</mn></msup></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer></correctAnswer></correctAnswers><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession">null</data></localData></question> WIRIS Short Answer (variables) What is #a * #b

]]> 1.0000000 0.3333333 0 0 #answer]]> <question><wirisCasSession><![CDATA[<session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>.</mo><mo>.</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>.</mo><mo>.</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>answer</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>b</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi>a</mi><mi>n</mi><mi>s</mi><mi>w</mi><mi mathvariant="normal">e</mi><mi>r</mi></math>]]></correctAnswer><correctAnswer id="1"></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession">null</data></localData></question>