Eksponente (GR10) Gee die antwoord van ... Gee die antwoord van «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mfenced»«mrow»«msup»«mn»3«/mn»«mn»4«/mn»«/msup»«mo»§#215;«/mo»«msup»«mn»5«/mn»«mn»2«/mn»«/msup»«/mrow»«/mfenced»«mn»3«/mn»«/msup»«/math»
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<question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mn>3</mn><mn>12</mn></msup><mo>&#xD7;</mo><msup><mn>5</mn><mn>6</mn></msup></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Gee die oplossing Gee die oplossing van:  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mi»m«/mi»«mrow»«mo»-«/mo»«mn»2«/mn»«mi»t«/mi»«/mrow»«/msup»«mo»§#215;«/mo»«msup»«mfenced»«mrow»«mn»3«/mn»«msup»«mi»m«/mi»«mi»t«/mi»«/msup»«/mrow»«/mfenced»«mn»3«/mn»«/msup»«/math»
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 2.0000000 0.3333333 0 0 27mt]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mn>27</mn><msup><mi>m</mi><mi>t</mi></msup></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Gee die oplossing... Gee die oplossing van: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»16«/mn»«mi»x«/mi»«/msup»«mo»-«/mo»«msup»«mn»144«/mn»«mi»b«/mi»«/msup»«/mrow»«mrow»«msup»«mn»4«/mn»«mi»x«/mi»«/msup»«mo»-«/mo»«msup»«mn»12«/mn»«mi»b«/mi»«/msup»«/mrow»«/mfrac»«/math»
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 2.0000000 0.3333333 0 0 4x+12b]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mn>4</mn><mi>x</mi></msup><mo>+</mo><msup><mn>12</mn><mi>b</mi></msup></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Los op Los op:  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»27«/mn»«mi»x«/mi»«/msup»«mo»-«/mo»«mn»1«/mn»«/mrow»«mrow»«msup»«mn»9«/mn»«mi»x«/mi»«/msup»«mo»+«/mo»«msup»«mn»3«/mn»«mi»x«/mi»«/msup»«mo»+«/mo»«mn»1«/mn»«/mrow»«/mfrac»«mo»=«/mo»«mo»-«/mo»«mfrac»«mn»8«/mn»«mn»9«/mn»«/mfrac»«/math»
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]]> 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 2.0000000 0.3333333 0 0 x=-2]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi><mo>=</mo><mo>-</mo><mn>2</mn></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Los op Los op: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfenced»«mrow»«mn»2«/mn»«mo»§#215;«/mo»«msup»«mn»2«/mn»«mi»x«/mi»«/msup»«mo»-«/mo»«mn»16«/mn»«/mrow»«/mfenced»«mfenced»«mrow»«msup»«mn»3«/mn»«mrow»«mi»x«/mi»«mo»+«/mo»«mn»1«/mn»«/mrow»«/msup»«mo»-«/mo»«mn»9«/mn»«/mrow»«/mfenced»«mo»=«/mo»«mn»0«/mn»«/math»
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 2.0000000 0.3333333 0 0 x=3 of x=1 <question><correctAnswers><correctAnswer>x=3 of x=1</correctAnswer></correctAnswers></question> Los op Los op «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«mn»4«/mn»«msup»«mi»x«/mi»«mn»3«/mn»«/msup»«/mrow»«mrow»«mn»2«/mn»«msup»«mi»x«/mi»«mn»5«/mn»«/msup»«/mrow»«/mfrac»«/math»
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<question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>2</mn><mrow><msup><mi>x</mi><mn>2</mn></msup></mrow></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Los op Los op: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mn»5«/mn»«mrow»«mn»2«/mn»«mi»x«/mi»«mo»+«/mo»«mn»2«/mn»«/mrow»«/msup»«mo»=«/mo»«mfrac»«mn»1«/mn»«mn»125«/mn»«/mfrac»«/math»
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 2.0000000 0.3333333 0 0 x=-52]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi><mo>=</mo><mo>-</mo><mfrac><mn>5</mn><mn>2</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Los op vir t Los op vir t:  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mn»5«/mn»«mi»t«/mi»«/msup»«mo»+«/mo»«mn»3«/mn»«mo»§#215;«/mo»«msup»«mn»5«/mn»«mrow»«mi»t«/mi»«mo»+«/mo»«mn»1«/mn»«/mrow»«/msup»«mo»=«/mo»«mn»400«/mn»«/math»
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 2.0000000 0.3333333 0 0 t=2]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t</mi><mo>=</mo><mn>2</mn></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Los op vir x Los op vir x:  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mn»2«/mn»«mi»x«/mi»«/msup»«mo»-«/mo»«msup»«mn»2«/mn»«mrow»«mn»4«/mn»«mo»-«/mo»«mi»x«/mi»«/mrow»«/msup»«mo»=«/mo»«mn»0«/mn»«/math»
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 2.0000000 0.3333333 0 0 x=2]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi><mo>=</mo><mn>2</mn></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Los op vir x Los op vir x : «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»8«/mn»«mi»x«/mi»«/msup»«mo»-«/mo»«mn»1«/mn»«/mrow»«mrow»«msup»«mn»2«/mn»«mi»x«/mi»«/msup»«mo»-«/mo»«mn»1«/mn»«/mrow»«/mfrac»«mo»=«/mo»«mn»8«/mn»«mo»§#215;«/mo»«msup»«mn»2«/mn»«mi»x«/mi»«/msup»«mo»+«/mo»«mn»9«/mn»«/math»
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 2.0000000 0.3333333 0 0 x=3]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi><mo>=</mo><mn>3</mn></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Los op vir x... Los op vir x  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mn»3«/mn»«mrow»«mi»x«/mi»«mo»+«/mo»«mn»1«/mn»«/mrow»«/msup»«mo»=«/mo»«mn»9«/mn»«/math»
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iVBORw0KGgoAAAANSUhEUgAAAj8AAADDCAYAAABtY3B8AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAB/ZSURBVHhe7Z09j2S1toY7R4iMBAmJjGRiiEggQyIgQiJAkw4p2kQk3CGcgGgidCVOhER0hURKdDN+wv0tffvp0+9o4eP9UdX11eUneFRle3l5ednb++1d1d03//t//7oVERERGQXFj4iIiAyF4kdERESGQvEjIiIiQ6H4ERERkaFQ/IiIiMhQKH5ERERkKBQ/Ikfk979e3b7+7YfbX//46U0dZfjz79f/sJXLh3Vk7VhXyqxh1rO1FZHLZZP4+fHnb2+//PrT248+eXb/eikXOgfQi++/2usmQh/mA599/nHXhnnTXm9clwLzvrm5uf3w2Qfd9mPAePDql+/uy7ySn2s8+JkXc/3mxRfd9q301qnN47XANcX5AL32a6DdF+z9rKdiVuTpsCp+OMjefuet2+nl8/sLHaHw3vvv/sMmP93WumPCWMT12EMnBxn0BA7t7VwvhUsQP4xNeU48PmXmxA+CuJbXGEn8MJ/M7RJ/YGjh3Nh1DRQ/ItfBovjJYdb+JFdvABwC9TA4NtxoEWO8PvbQYR7xMd2Ju9qGz179pXAJ4idPxk4pfE9Fe5PjZo4Qpm6X/Tbakx+uy6fw5Ie9yzmy6/Wj+BG5DhbFTw5uLvheO7SHwbHhgIFDHTocgPhon/BMd6KHtny2f2lcgvi5Zg51kxtJ/Dwl9r1+FD8i18Gi+JnuBEAubC76VghQV8UD5RwAHAocENTx0yDl9MsTAw4gbgC0U65PlNZYOnT4KX26i33LYUSM8VMf1XMoEle1Jb7ESr/qP3NlPsSWOWNDLOnHnHv98J28QPuxAbmPLa9AzO3hvU+MtX+l+qr5zk07/pjfXL82hh7Y87QA+0piS5kcJEfxiU369uaTvtST+9i1MVU/zIdX5kr8jEmeM//Y0A8/vM982/Xt3WTjp4qfur74qm09YktsyQm0+6bmltc1MV/9ZIy2H23UJ4/MEZvUQ83B0twSOz7onzzGps6tri0+s54V4ohNXdPERz2x5Cke5xft8d36Zfz4A+rohw/K9Mt6bp2ziJyfRfHDBRxxE3Lg0c5rexhQl0OHg2O6uzHERw6S3BCoxx/2ublQzvhLzB06kPG2+OJAjB/ioo55U86BCImPuvRhHGxpTx7qTZI28oBfDj/iob4+ZUo/fNE3/SnnsK7rMN3lE3gP2MfXvjGmf4X1pJ0+xF775CBv1x7WYmjJXshNKz6pz7pShvhO/uhDOeMn5viqfYkB37np1TVgPqljj8Yv4DN7OnWUE9va+mZ+xJ66+EkeMz7xUY6fmteW5Il54Tu5oZx9M93tE3zgP7mp7T2wgeQCH+mX66HmIuOShzZH2K7NLflp55E+bR2x4xv7zCXjEnPmlvlmH9FGmXgot+uSeBlzupszc8+4dT8l74l/nzmLyPlZ/cIzFzKHTC5wqId7exj0aA+aeuDlwODQiv+lwzn0Dp2QQ2vrYRN74qFMvzpHDkLaEz9k3jkYU8bH9HB4tnEBNkBea7/qOwc1eaKcmzGHaGxyoKbfIWNEqGAHWYu6Pm3syfOWGFqyt+Kz3StAOXWMAVn/uod6caecGKsNPqhLvqe7nFCGxJV+S/utEpst84lNvTFTrmPNicYt+6alXa8eGbf6yF7L/qvxUUfc0MvR2tySn7qO6UO8lGsd9tODIJvLaV3j+Mw4+Knl6qOlN582h/vMmToROS+r4ge4qDksckOA6eFGMXeg0oeLn3oOGGxy0MwdPPFNe63v0Tt0AuUtAipMD4cp4Jd51hhy+KcecsBlDslD7yZPLNPdGBExkIOxl7+2rr0RQ5vDx8ZYmUo+am5TNxf7lhha0o6goZwc5UYLlKtNtVvbQykn5rauJ+qgndvSfltaX+KgXOOsNnV85ox9z0/Lln0D3GzJG3W9fdTSGzdzoD9zn7uZtznaMrdeftbmxnx4z96hrYqdrEXK2DNG+gOx9cYNzKPXh7Y2tn3mXMcSkfOwSfwEDhkOCy7iXPy9g4rDiYOStt5BM3fwUNf6mmPpZrQr9fDMDaIe6pkjhy3jVjjsqk2NnbhSn0OP97Xc69fWpU+1aXO4b4w94htqblM3F/uWGFpoI+f0Ydzsm5r/dlzIWGt7qNe31jF+z6adW7VLTrasb2+vV5vqF1vKlbm93cbXq+O1lnt9WmiHmot2P9SYa3xtfS3Pza2Xny1zi9BGWPCefTPdiR7aarzJcaXa1HHZo+xD4D228ZN5tnG0NrU8N+eMJyLnY/U7P+1NK4fG9HDQtIdBFRJzN4CUOWQoA4dC+tWf8Oeoh0x7oBDzdBffLgdNDlNgTrWNuVHPAVvrK70DOz/xzd345vq1dfSnjL/YJKb43jfGHsSGHUSE1PWZi31LDD3YD+SfNe2JpHZcaOcPvT3U61vr5vZdcp659fbblvVt935rU8efHq6pLaztmzwdgcS7Zf3Tp+Yiuc71OnfttfVb5tbLz9rcKLMv6UOcjFvjIK8Zt7efoDcu86tj9ObZxrHPnEXk/CyKHy5sDoRc+LxyWMDcYcBh0178sclBk4MHGIM6bClz46w/9c/RO5gCPqjnhlrrl6g3i6k5tIgnPom91udw7R3YEVQRAzXm3Bx7/dq65As/zBVyUCen+8bYA/+tr+lhfWAu9i0xtCTvzIc+gH/6xKYdF2hPfWzjq+7PXt+2LvPglXLdw5lbb79tWV/mQznrBK0NY1DO+sauxtzSW8taN5X1Yj51TWuflvRJLui3RRTM1a/NrZeftblRTkwIUHxMd/Nl/Njjj/bMAxg/Nr1xk5+cG7GBxN7Gsc+cReT8LIofbiZcwMBFn9d6Y+KCzoXORc9hUC9+Dpf8hEyZ9hwqHGD4y4FCuR5gS/QOnZCDLwfUFvARf3V+gfFy4PLKGLzGtj0UgZtO+mCPTWLLAdvr16vLjTZjx4b3sdknxjnwxXphT7+MDznEe/7WYmghRxmnQl0EU+ramwdlfAN7ij7stTpWr29bh33WJbnNHOrcYkM7421Z395NljJkfPYe46QeP8yFvunT0st9rcNnysTI+FlD3s+tB+2ALXaZX33qOHft9erX5tbLz9rcKOdMaUmczC99GC/j1jWnnD6cdTnvqCMe6lOeHn4gauPYZ84icn42feeHQ56LvB50Fep77dTlPYdNbmbtgUd92raSMesYtW1Xf7AlDubBmO3Ng369eqCu1mOXXPX6zfmiTH3KvO/FG7u2/1KMc1T7+F2KPcR2bSxuOOwDbkrY1xtQvcHUcVsSR6+913fOH36ST9qwaeOvNgGbald9Jw+1z9z4ta2tb8EfdnXcXh1j1LF5X9tbcsNmPZKDNs7Ut3HO1YdeWy8/a3NjHAQF+yM+qziv8Sam6r/SjgPYxkf617baJ+3VprLUJiLnY6cvPB+K3k97MiYInYickP0xNR8/yvGJgMgTkkuEfdGKHKCOJ1VtvYhIi+JHzgo3q3rD4pWf6tkb3sROz1MQPzwdJMapiGPipY62aisi0uMs4ofHwAigenjJmPAxAh9Z8AQI0cN7ngQpfM4D1yXMfUx0KRBj/S4TXLJgE5HL4iziR0RERORcKH5ERERkKBQ/IiIiMhSKHxERERkKxY+IiIgMheJHREREhkLxIyIiIkOh+BEREZGhUPyIiFwpa3+skj80e0l/aZ8/bsofOeWPWBIXrz07kcei+BERuVLmhA3/mBVhwX+uvyTxQ0z5y/8IIf8bvhwLxY+IyJWyJmzyhKXXdg7yr0pSzv/5qzYih0DxIyJyYfBkhv+BCPX/3PEewUI9oiD/C48nOLV/uFTxk7ktfSyXJz/+D0g5BoofEZELgRs+Tzv47/SIA8QJAiD/tBWxEMGAaFkTBpcmfpgXgo25MSfGplwFXkDQQa9N5LEofkRELgTEzM3Nzb1ISB1iCAFURQDvsYsQ4kkRr4iZCv/5vpar39ifUvwwD8bLXBBBzIM4qh2ih1wofORYKH5ERC4ExAxip34chFhAIPAe8RIRQx3iAAGBUIh9ZU3YnFr88BEdpMzTn1b80B6Rxvzqd4BEDoXiR0TkQuGJDuIgggGRgxjgyQgiCdEAc09IloQN/fJUifd5enRKmEdEHGXmSblShZHIoVD8iIhcGDz5yXdiHnPzP9RTnfoF7C30fIQ8rWJexFefcomcCsWPiMiFgSBAIPCUh6cza4Jijn37tewiftbETMQPH23lO0lzT65EjoXiR0TkQkEU8LEUIuEaBQLCh4+2ppXfWhM5NIofEZELIU9Fah1PfhAI+XX3pwxPhep3i5grczvll65FQPEjInIh8DEXYqAKoIifVhSdEsbmKc0W2l+nDwgf5sF8UhfxU+tEToHiR0TkQkA88BQkH3Hxei1PRvIRXhVH+e2ua3iqJU8LxY+IyAWBOJhePr8XQvwq+NyTlKcIH3llbggfOMev2IsofkRERGQoFD8iIiIyFIofERERGQrFj4iIiAyF4kdERESGQvEjIiIiQ6H4ERERkaFQ/IiIiMhQKH5ERERkKBQ/IiIiMhSKHxERERkKxY+IiIgMheJHREREhkLxIyIiIkOh+BEREZGhUPyIiIjIUCh+REREZCgUPyIiIjIUih8REREZCsWPiIiIDIXiR0RERIZC8SMiIiJDofgRERGRoVD8iIiIyFAofkRERGQoFD8iIiIyFIofERERGQrFj4iIiAyF4kdERESGQvEjIiIiQ6H4ERERkaFQ/IiIiMhQKH5ERERkKBQ/IiIiMhSKHxERERkKxY+IiIgMheJHREREhkLxIyIiIkOh+BEREZGhUPyIiIjIUCh+5B+8/u2He/78+3W3fSs//vzt7Yvvv7r3lTrK8Ptfr/5he06YZ+bcaz82vTyF6eXz248+edZdi1PGnXEeuyfmePXLdyeby6Vy7Bz3yJjkv9cux4HzL2dhr70Fe9aIs6LXfgwu8aw+NKvih4vxy68/vX3v/Xdvb25u7l+3LtoxYAN8+OyD+5sC8Xz2+ce3v/7xU9d2C8wFPz0YpzfX9DnlZjwVmftjD8SszzcvvnhTdwjfh849h3/iyo0nsZ/iwu/lCSi3cVV6cR+LjHOsm+RcDkaizTGvb7/z1v3Z29oeilxLnHO9djkOu167p7zWQ8Y71jV/CSyKHxLNhYHgicCYHn4arXbciE4hBBijLgixPHZTVPETH7zim8OHeuZf+5AT6hFetf4aSC7qpufi64nAJY4lfg6d+/ZggZSnuz3Q63NIenlCdDFPYiG+7MvKKQ/EjHOsg1Dx8585jvjl7DnW+o4ofri2jikot7DrtfvYa50+rPUuDwky3rGu+UtgUfxEbLSHEouR96c8uIinPQyySNOeN6qe+AksfNrqzZ9NRPkaHwlmvtn0+x6QxxI/h85972AhvuluP+1z0OxKL0+MjfCudi2Kn+uizTFryj6vZ+2h2ffafqqc8ppZYtc4Hht3+u5y/e7T56mxKH5ycSz99HHqg6s9DLJI+46fOUJvjsydtrWb0bWQXGTT73tAHkv8HJpzH4i9PPFUq+apF9cp4844x1o3xc95rg3FT9/u2Owax2PjTt9d9tY+fZ4am578ADf/9qMtLpr60RCHGD+Rs0BcWLSnL+X0y0XHIc+BFx88jtxlcRmLflBjwwe+65hzJBbojU18ac9jw95hzQZlzOSE90tPJxgr36WKP6DMhsuGxxfjYpNDKvlN3+S3xh9/08t/f0xZfbUxJP81F8SQ+NIXP7kYyHeNu127tNUcxbZeUPhhXpkH9tVPS88vceMDiJfc1T4V5h9xkfESV8ZNuca5tr5zMeCzbZvKU8p2PnU9sr6MsyXutbG2gI+lPYFNbw3auvhJHJlH7Cs9f8yVGMhjnRd21FOOba4VIEbG4z32yc0cxJR9nljrWbLVN23UMRfimxbyviXHqcNn+iXWxMlr9tkctM/t294Y013c1PFKeW5eWTN81H1Z1wWydsQbH5Rr7uibMeMXu/asoh+xAP6wT3v6sYfIUXxmLbGlX+qxT6y75jXrlznFJ+Ws31Le657CV+Kifx2HesZp7WkjN5Rpp44ysQDjpV+ND3/EQf+1fKZP5nONrH7nh6QkEdBuyiS3Hly0s+lYbN5ncWND0uNvekg4i0W53QBL0Dd9simg+l/axFBtq49eezZCO+dsTurxkTK56vmEzHdq5t/6jJ/alnwmHnJNmXrKUPsyhxxQEJs6D+JMDBDfmX/1nXrWNgdHa9PbF3O+Y5MyfdOnpfU7PRxqyTM+5tYcm+SSnFFOLiE+Uk6ca+s7LcSQeNu9g00t1zy1dfjdEvfaWFuoY+O3tye2xMx+o2/aKSfOlrYvc2S+yeHaeZL1ANqYb2zwnXFa8Mc4kBvT0nU455uYKMcHfZZyXuc7l2P6U2YsytjVWFPGJnlqSeyMh33K9KPcjsE8aJsezqSleWUO2FOPv+SlrnvqMq/HnlVr1xGQV0g5+cn8gXipSx5ha16zXtPK2T2X9zaO5ATIOT6IJeXWHsgf4/Iee3zjh/fUReRA+iZ3sJbPXp9rY1H8AItQN1ZI0tOWhe+RjZgNn4uuipYsNsxtupYIs3aBchFn89W2lsQCPdva3m6UzDkXa81B+kwPF0hL2uMz4yRHdcPTRmzMKxdKzR2vsU3uUp4exq82jJmDDXK41TWYi6sHtumXmHr7IjbxnUMm5TrnHAItrd+UyUvGnmO6ywW2zCW29eBJXcqJa21952KoOU598sncKffy1NZNG+LeMtYaW/fElph5zx5NnyVqX+ZFvEtnAHbY966V7BvGTV1dk0puWvVGUftR3uI7eSau5G2OrTlur7up7IH4St5q/JW1fVvHIC7yTn1sl+bVG7vuyVo+5FkVP+3e7sXDvKjL/Otaxs+0R17jY26t1vLei4N51D7YEQfvqz3rwDhV+KQd++zRSvom3i35bPtcI6viJ5DgbCYgWdRno9SFjj11LFJssjnazRLiu/XVAxtsp3Kx7kNigWyESjZybW/nnHY2Dm1przYtsZke4m8vmN4FUu3Wcpdy3by1bm7e1Yby3FpxEdLG+m7JEcQG33V+HI7Y1/01d9G1fnlNH6C9t46QvnUuvTynnBhSnlvfuRhqjhmT+gh2wCa+ap7aupSX4t4yVvrOsXVPbIm5rmVr25K+iZfX1mbpPOmtYa+upb3hQO3X7tM539ilDMTfuwnB1hzHLnPMnIH3kPjrvqjEfm7fZgza46uKnKV5xddS7o5xVuGLsdu93YunreutZc0J72Etr+kzzZzd8TeX914cdS0oM7/ko9pn3ghL2oA1S8zxUdtTH39b8pn3dU2ujc3iJ7QLnYWtmy4/UaWuvZDbcqCu9dWDBcFueqTwgboR6mEUsqmYZ+raOaf/WtwVNmz88Mo4xJIYehcIpM9a7lKum7fWzc272lDurVV+oiMW+i4dKjUnscF37VNjXKP1y3jZb4E92vaDXu56saecuFKeW9+5GNb2FvTy1NZtiXvLWGts3RNbYuYmmbowzVyvsav2xJL2tfOkt4a9upa013m0+3Krb2Jqb0DxWdma43aOyU3dA2vEZ51fJWNw48vNj3Fam968Es9S7uZijk361j6tDXVzOav04mnreus2F+MSa2d3xpjLey8OfNZ+rEfaqn3GZcyaC/JUBQxEqKbc7i2oPiptn2tkUfyQvHbySVzq2w1GnzZx6ZMNlnI9IOriLyUc//SbmoOU/nnPgubmU216LG2E2lZjauccQbjLBZQYd7lAYLqbN3Vs9NTV3NGPupRr3LWu+s9F0luDdu2A/FOX2HuxtjmC2MR362cLPb/AuIgyfM6tQ2/fRchBYk85cW5d3zaG3rXQ0ptPW7cl7i1jYYevrHfL1j2R+BAl6ZuDt10X+if+uXWu840t0Lc3r9hkPXr7r1fXknWt80heyTX9dvVNjMTVa4OtOW7nOD1c9zA3n5a1fVvHqHGRg9a2nVfWjDFi0+7J6UBn1Za9veU66q3btEdesVs6u9fyPrd/0g+mcn+r9uSPvcn7um8DuYqf5Cp9U96Sz7X2a2BR/DBxEpBNyiuJJ+lZtCQ6C1E3N5uDcg7GbIZ6wE0Pi0z/2MxtwrrwLXUjVv+JfY5qm3HZHPhL/VQ2IrQXVd1M+MMPseZ97RvwmT74A/xls81dILxPDjK3zKGuS/rWzdvW5TBjDSlnDarN9BBnPcDqejJevWgzfu8wik3ru9aRS+aTPi2tX2zrGhMTflOu1P2DDbEmBzCXu7X1XYohuSFn+KEOv7nB9PLU1m2Ne20s/NFOX8o94ndpT8QPMHdsE19ipi5x8UpbYmqp88U2+4t65s77tFOu+4/+vWtl7vqpxIbYY5NYpof12+KbMnmIX+JM/npsyTH+KGeOjJN50488UMfaMn58V7bs2zoGfiknH0vzSp6AcbDPvJgPNtRlXyTGjLnrWZXYHnMd1XyQB+qIYde8Tnd7I34YAxgjsa7lHb9pTw4g9eQs8dX62E9l/MRIDLEnDuYU31mD5ArW8hn/mdM1sih+SCxJSvLY3FnA2JC4uunpQ8Ky8ehPQkkyfmjPBUA/Ng31QP+66C1ZsB510xMT/oihxtojsbTQl3h6i5+5tWP2clX7VYgrF10LY7YbvvYlR8SWOTIWOa521ddcHX7qRTDdXVSJKTb4jA1jMU6da8ZOTvBBv16OKFffwPvYAu9re0vrd3qIGWhr92cLec1+5ZX+WbP0Syw1jqX1xcdSDJQzJv3xgz/a2vnM1W2JG5bGSn0OuB5b9wT7L2MwZhtz9idj0rY0ZtuXcSjDdDd+3SPEhi9iwj956V0rS9dPBbusK7Hyvq77Ft+U6YsP4lw7x7bkmJxSxm/6Je+x5ZXy0vyW9m07BnHFjj5L88p6UFfngs8aD/bYxAf+WL9qQ1+oee/V4Zv+1OOPcXe9jnhP38RK3a55pT62LYl3Ke+9PRXwS79a17NPHrD/7//5rzdrwJx5T5/0z/VCO/OPj6V8Ugc1/9fGzt/5OQQkncSS+F77CLAJ2ajZiBwS2Yj1YhU5BOwz9hYHXHvgiuxKT1iMwjHPbkRIFS5yPBQ/Z6J3oSQv16y25TxwoHKw5id3kccwsvg51tnNExruif5wchoUP2cih0dUPo8b1x63iuwL15yiWg7FyOLnWGc3PrhOe21yeM4ifvjpk40z8uM9LpLp5b//kBVwiHhzEpGnADd8zu98R2QkjnF2557ok9nTcRbxIyIiInIuFD8iIiIyFIofERERGQrFj4iIiAyF4kdERESGQvEjIiIiQ6H4ERERkaFQ/IiIiMhQKH5ERERkKBQ/IiIiMhSKHxERERkKxY+IiIgMheJHREREhkLxIyIiIkOh+BEREZGhUPyIiIjIUCh+REREZCgUPyIiIjIUih8REREZCsWPiIiIDIXiR0RERIZC8SMiIiJDofgRERGRoVD8iIiIyFAofkRERGQoFD8iIiIyFIofERERGQrFj4iIiAyF4kdERP7B73+9uv3s849v//z7dbf9GLz+7Yfbb158cc+XX396H0PPTuQQKH5ERK6UF99/1a2f48efv73v89Enz25vbm5OJn5e/fLdvdhKeXr5/H584ql2IodC8SMicqXsK2AQQKcUP++9/+5/CB3qoNaJHArFj4jIBcLHQDwB4WMgRAhlRMkuT0Oeivh5+5237qnjnfrpk4yF4kdE5ML49Y+f7r/3wnvEz4fPPrgXPdCKhCWeivjh+z3td3x88iPHRPEjInJh8P2XiAGESAQP7yOKtnBs8ZOnUVuYXj7v+uiByGP8XZ5yieyC4kdE5MKoN32EEB8B1fYeCJEWBARfJm7re/0riJVTPvmpMCZibxexJLIrih8RkQsGIYAY6bUFBEMrcGBO/KyJmnOJH8ZD6Cl85NgofkRELhS++4MIQbBQjshp7ebYV8BsFT/Egu0W1j7CivCp8/NjLzkWih8RkQsCwYMI4JUnIFWEICJ4ktP2mePY4ueQ8PFeK+y2fNwnsg+KHxGRC4KnHfyWEyKHLzfzm16IAup3fRKyq4DhS9aMhRChL+O1guQYME/Ga6l/+FDkkCh+REQuDEQIT35S5v0+T2EQEPuIn5ae7SHpjQntr7+LHArFj4jIlcLHV6f86ErkqaD4ERERkaFQ/IiIiMhQKH5ERERkKBQ/IiIiMhSKHxERERkKxY+IiIgMheJHREREhkLxIyIiIkOh+BEREZGhUPyIiIjIUCh+REREZCgUPyIiIjIUih8REbkI+O/1n33+8e03L77otoscCsWPiIicld//enX/H+hf/fLd7c3NjeJHjo7iR0RELgbFj5wCxY+IyJXBx0cfffLs/klKr70HfXj6gvAAyj/+/O29H57M9PocA8WPnALFj4jIlZGPjxAzvfYefNcmIoe+Kb/9zlsnFSOKHzkFih8RkcHhCc/08vmbMgKE8p9/v74XUHNPfvJdna3gr+enoviRU6D4EREZHERMhMnr3364FyB87NXanQLFj5wCxY+IiLyBJzTvvf/upqc0x0DxI6dA8SMiIm/gC8583ydlxFBtr+z6sVfPR4viR06B4kdEZHA+fPbBvejhaU8VH4ibL7/+9D/sj4niR06B4kdE5Imz9ivpa7/6jsBBcAA2PPnhdXr40nOvz6HhyRDjI3742I0y3z/q2Yo8FsWPiMgTB9HAr6TPiZt9fvVd5JpR/IiIiMhQKH5ERERkKBQ/IiIiMhSKHxERERkKxY+IiIgMheJHREREhkLxIyIiIkOh+BEREZGhUPyIiIjIUCh+REREZCgUPyIiIjIUih8REREZCsWPiIiIDIXiR0RERIZC8SMiIiJDofgRERGRoVD8iIiIyFAofkRERGQoFD8iIiIyFIofERERGQrFj4iIiAyF4kdERESGQvEjIiIiQ6H4ERERkaFQ/IiIiMhQKH5ERERkIP51+//vXu+Vgl17FgAAAABJRU5ErkJggg== 2.0000000 0.3333333 0 0 x=1]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi><mo>=</mo><mn>1</mn></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Los op vir y... Los op vir y  :  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mn»64«/mn»«mrow»«mi»y«/mi»«mo»+«/mo»«mn»1«/mn»«/mrow»«/msup»«mo»=«/mo»«msup»«mn»16«/mn»«mrow»«mn»2«/mn»«mi»y«/mi»«mo»+«/mo»«mn»5«/mn»«/mrow»«/msup»«/math»
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 2.0000000 0.3333333 0 0 y=-7]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>y</mi><mo>=</mo><mo>-</mo><mn>7</mn></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Vereenvoudig Vereenvoudig: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»6«/mn»«mn»4«/mn»«/msup»«mo»§#215;«/mo»«msup»«mn»12«/mn»«mn»3«/mn»«/msup»«mo»§#215;«/mo»«msup»«mn»4«/mn»«mn»5«/mn»«/msup»«/mrow»«mrow»«msup»«mn»30«/mn»«mn»3«/mn»«/msup»«mo»§#215;«/mo»«msup»«mn»3«/mn»«mn»6«/mn»«/msup»«/mrow»«/mfrac»«/math»
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 2.0000000 0.3333333 0 0 21732·53]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><msup><mn>2</mn><mn>17</mn></msup></mrow><mrow><msup><mn>3</mn><mn>2</mn></msup><mo>&#xB7;</mo><msup><mn>5</mn><mn>3</mn></msup></mrow></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Vereenvoudig Vereenvoudig:  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«mn»16«/mn»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«/mrow»«msup»«mfenced»«mrow»«mn»4«/mn»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«/mrow»«/mfenced»«mstyle displaystyle=¨true¨»«mfrac»«mn»1«/mn»«mn»2«/mn»«/mfrac»«/mstyle»«/msup»«/mfrac»«/math»
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 2.0000000 0.3333333 0 0 8x <question><correctAnswers><correctAnswer>8x</correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Vereenvoudig Vereenvoudig: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mfenced»«mfrac»«mrow»«mn»2«/mn»«msup»«mi»x«/mi»«mrow»«mn»2«/mn»«mi»a«/mi»«/mrow»«/msup»«/mrow»«msup»«mi»y«/mi»«mrow»«mo»-«/mo»«mi»b«/mi»«/mrow»«/msup»«/mfrac»«/mfenced»«mn»3«/mn»«/msup»«/math»
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 2.0000000 0.3333333 0 0 8x6ay3b]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mn>8</mn><msup><mi>x</mi><mrow><mn>6</mn><mi>a</mi></mrow></msup><msup><mi>y</mi><mrow><mn>3</mn><mi>b</mi></mrow></msup></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Vereenvoudig Vereenvoudig: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»5«/mn»«mrow»«mn»2«/mn»«mi»y«/mi»«mo»-«/mo»«mn»3«/mn»«/mrow»«/msup»«mo»§#215;«/mo»«msup»«mn»2«/mn»«mrow»«mn»4«/mn»«mi»y«/mi»«mo»+«/mo»«mn»4«/mn»«/mrow»«/msup»«/mrow»«msup»«mn»10«/mn»«mrow»«mo»-«/mo»«mn»5«/mn»«mi»y«/mi»«mo»+«/mo»«mn»5«/mn»«/mrow»«/msup»«/mfrac»«/math»
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2.0000000 0.3333333 0 0 57y-8×29y-1]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mn>5</mn><mrow><mn>7</mn><mi>y</mi><mo>-</mo><mn>8</mn></mrow></msup><mo>&#xD7;</mo><msup><mn>2</mn><mrow><mn>9</mn><mi>y</mi><mo>-</mo><mn>1</mn></mrow></msup></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Vereenvoudig Vereenvoudig  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mn»2«/mn»«mrow»«mn»3«/mn»«mi»x«/mi»«/mrow»«/msup»«mo»§#215;«/mo»«msup»«mn»2«/mn»«mrow»«mn»4«/mn»«mi»x«/mi»«/mrow»«/msup»«/math»
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 2.0000000 0.3333333 0 0 39x+3]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mn>3</mn><mrow><mn>9</mn><mi>x</mi><mo>+</mo><mn>3</mn></mrow></msup></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Vereenvoudig Vereenvoudig «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mfenced»«mrow»«mn»0«/mn»«mo»,«/mo»«mn»008«/mn»«/mrow»«/mfenced»«mfrac»«mn»1«/mn»«mn»3«/mn»«/mfrac»«/msup»«/math»
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 2.0000000 0.3333333 0 0 15]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>5</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Vereenvoudig Vereenvoudig  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»3«/mn»«mi»n«/mi»«/msup»«mo»§#215;«/mo»«msup»«mn»9«/mn»«mrow»«mi»n«/mi»«mo»-«/mo»«mn»3«/mn»«/mrow»«/msup»«/mrow»«msup»«mn»27«/mn»«mrow»«mi»n«/mi»«mo»-«/mo»«mn»1«/mn»«/mrow»«/msup»«/mfrac»«/math»
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 2.0000000 0.3333333 0 0 127]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>27</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Vereenvoudig... Vereenvoudig:  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»12«/mn»«mi»y«/mi»«/msup»«mo»-«/mo»«msup»«mn»96«/mn»«mi»y«/mi»«/msup»«/mrow»«mrow»«msup»«mn»3«/mn»«mi»y«/mi»«/msup»«mo»+«/mo»«msup»«mn»6«/mn»«mi»y«/mi»«/msup»«/mrow»«/mfrac»«/math»
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 2.0000000 0.3333333 0 0 4y-25y3]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><msup><mn>4</mn><mi>y</mi></msup><mo>-</mo><msup><mn>2</mn><mrow><mn>5</mn><mi>y</mi></mrow></msup></mrow><mn>3</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Vereenvoudig... Vereenvoudig  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»2«/mn»«msup»«mi»x«/mi»«mfrac»«mn»1«/mn»«mn»2«/mn»«/mfrac»«/msup»«mo»§#215;«/mo»«mn»4«/mn»«msup»«mi»x«/mi»«mrow»«mo»-«/mo»«mfrac»«mn»1«/mn»«mn»2«/mn»«/mfrac»«/mrow»«/msup»«/math»
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Vereenvoudig «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»2«/mn»«mrow»«mn»2«/mn»«mi»n«/mi»«/mrow»«/msup»«mo»§#215;«/mo»«msup»«mn»4«/mn»«mi»n«/mi»«/msup»«mo»§#215;«/mo»«mn»2«/mn»«/mrow»«msup»«mn»16«/mn»«mi»n«/mi»«/msup»«/mfrac»«/math»
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2.0000000 0.3333333 0 0 2 <question><correctAnswers><correctAnswer>2</correctAnswer></correctAnswers></question> Vereenvoudig... 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iVBORw0KGgoAAAANSUhEUgAAAvkAAADUCAYAAAAGETy5AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAACZ7SURBVHhe7d35l1Tlve9xeuD8Epk0cUqQybM8KgLJWkcZkhMExHhk0MQJI6NrXYFuslaERkQlDA1ZUQETaODcJNANxzCFGwO0WevGxCBw71GSdX+8CeT+Lc+tz1P9rf7W7l3VVc2Qql3vH14Les9j7c9+9rOfPex//b9jAQAAAEB2EPIBAACAjCHkAwAAABlDyAcAAAAyhpAPAAAAZAwhHwAAAMgYQj4AAACQMYR8AAAAIGMI+QAAAEDGEPIBAACAjCHkAwAAABlDyAcAAAAyhpAPAAAAZAwhHwAAAMgYQj4AAACQMYR8AAAAIGMI+TVo3eaXQ9ubS6JDp7akDlNvzlzYE9fFXP770dThUN8One7fx7/+0+7UYbLsd385WHSc6++04WqNzs9297tz+tPG23cAkDXXFfLtgt6IF/Pr4QNvWv9xE+8Jzc3NOU3hjZ0rU4e5lTr3rQszZk8NO37WPuRwvmnXq6G5JbdOOWPH3xUuXu0p9FMQOta7KzftgeOhvtz+lVGhpW8/b9u7tmZv5vTbdTMCuM7p4cNbC8f6+S+6UoerNfoNb9Vy535zpPu3OzgfAaDOVR3ydWF8fvn8/AWh70Kmi/rYCXeHPYc7UsepZVbydvT8zpt+Udt7pCOMm3Rvbnu1uG3XEr73ytzw8ZUDheFmzJ4SmpqawrBhw8KBE+8UTeNWeyG3r1taW+LyrH3jpXD52tBC28GT78T1kUe/NTlcupYP+brhsWCo7ZAcD/XFH7v7f/VWTYZ83bDqmH5o6sRwyd1s3ghaX53Tdqxf/Ft36nC1yC/3Z3W03ACAdFWFfAXiyd/451jK/K/fnBz2fbg5dOUu5N/9/txY+rOibfGAcVQKPHPOtLCxc2VNXfD1SFol5ro50cVeF/3Rt4/IBc15RYH7RtF2aB3eEkaM+lJYv3VZDEBb964NX73vzrjtfImfQogFJYVjP51bSdWGtE0eze1rLff1hHzdSFmA8CFfVQR0PKm71jk5Xr3QubHpx6/mbuLuCd1nOxu2FNQfu/ptqLWQrydGtnz69+LVGx9mi0L+TZj+zVKvyw0ASFdVyG/btCSWPt879ivh3H/tixdwuZQLfk8smBEOnHi7aPg7vjI6Dq+LaS2V6ql0WsF6zlOPhQt/PRJL81SK3JTrpmVV6L+Rj/I1rTFfHhUvngr4qqpi26777I4w/dtTikoUayHkq4R9zB0jw0/+44fxgq9l/vjPQ7/5KRXyVfd3VO5GQt0Xv/T4gPHqgYLj8H9SVYf8zUojl4LWeshXtTE7Dl95bUH87Uob7noQ8gEAtaCqkP+1cXfFC0AMaS6USu+VAwMu6Codt4tGLV3w39i5Ki7Tid//pNBNpfeqMqLuCimqf+7HuR4qxdfNjqadvNlRia+2nR++FkJ+rEOfC63L1iy8IUGoVMiX3i+64s3Oja46cato3Wz/SiMHpFoP+U8umhmX7YHJ48O5z/enDnO9CPkAgFpQVci3C4CqbiiYpQ0jKtlMBp+OHStiYE0rIbcXUVUvPtnP9xd7yVfTsXGqrRqh4LFstcJrcaj0FzlVTfH9rkf7m0vikwNNd83GFwet8lIu5KdtC/tbLFTZcPrb9097SdpvS/v/w9MmxWXQ0433f7G+5Lil+H2q/aP/27ZN1slXP62n/k1Ox9PLktUsQxp7WTztOBQ7dpPDaLy0Y03dddNopfjSdfztwrr46aWNf6x3Z6F/MhDbtim1ztVuD9u3pdZd0o4vKbUcye15PSFf09e0KjmnbTnLrUsaPZ3S79fh32wvLJttF5u3DTvUeaSFZTsOyu1LWwZbLtseadvQljlt2fz6pA3j5+WXp1zIL3VeAABq15BCvowdf3esnpN2AVI96xmP91/s5bF/eyQ8NHVSOHjqncI4KuH2L6KqJF11wFVf3gfhzn3thRd9VbVFpezWgoW99KsgmrYspSRLp3XhspJ86TnXWdT/emh9LOTr3+VrF5Wt+lIu5M+aMy0+IdF7EBaUtS+07NoeCpg7ctvLto8u1qp+pP/LgykvG6ouufrpHQHNb6b2Xd/yyoNTJsZpqLrWYDco2o6z5k4Lrbll1DS1XNrvusmz6fmQv+dIR2FZtW+T01Mg0Tpreupvx0g17wcorKW9LD599pS4n32gXLXumcKyax4K8Ld/Of9isOhYU517G/7JxbPitrH9pQCp5dRw6v/8stx8+6aXbFVINE1bplN/eK+o33dy01b3k667Xt6e/PX74zS1X1TVabB3Sez9Ex03WjaNq+VL24bJc01PmR7Rezi5v/0Nqs5d2y7qp381H41Tbcjv/x3on1apfaybovG5Yf27NDq+Kjn/FVQ17a171xSd/zpmY3Wrvnkr+NoxZ910zlb6RMuHZZ2PWl6/bqramHx654exc9j+9oHbtpW2j/a/hkn+/vn1kWQLP5O/cX9h2u/9fH2he6mQr+nZy/H6jajmdxYA8I9TVcif+++PFQV3XSRUl/30p+8XDacLs0Kcv2hc+L/5uu92gVBYUana0tcWhP0fbo4Xj1FjbstPNxcw/QVewVPzUj+FKA33k0M/jBdr/V/LpJJUXRyHegGKVWr6SmP1UnFaSaLCsIKNWhA5/cfidS5HpYO6QNq2UIBWMN/2QVvq8KVCvuav6ajuuq/3/di3HikMv2zNoqJqUrpYqylD+1vDJcOkQqO26/nP98ftp32n5bNx9v3n5vy+GyTkKAzkX8zOL8tr658P+3+1Od6Q+GPBh/xDuZs+27fq7qenfaLAqWXesnt1bKlEwTEGlNw8FJZsOuVomXST+aPcNFRdSsex5qfpjhozouipVHzvpG/5R46+LR5fWi5tH1t+jaN11fCav252bR107Hz21yOFML/7lxsKx5X4ba9SUesuySYndX6oWolNy7d0pO2hY0ABLt7E5eahwH/qj/3T1zLGgJ5bHy3/L3+zLU5LVaMUEjWOArINL/5c03o/1PdER3+v7siH/Px+ye9PLZ/e23jv56+HkX3noq1PJSHf/w5oeDunNX7yd0A3a1rHue5dGlsXzX+weakK2rynp6cO549PzeNfHpkQ183WR+ds2k1HmqJp5Y4VO+40b01PtM/8OL5VorRzWMPY/u/fl91xn2g/SseO/sYNigJ74h0R//ui5bLuReO4kD9/4Yw4vI65Ss43AEBtqCrk+zBj9OOv0KULYHL4UhcNUQBRQNFFQxcmOZAL6Ta86v9buFEY8vPVBV2lahpH87VQppKtaut1K2ToyYCChqahAJ1WV1cBQyXOGkbrrOCaHKYU3TCo1NgurCaGrFyISpYmp4V8lUJa6EsunwKsDa9geu/YOwvBVNtQTw18SFWpuoUBrZeCQ77uff+286FD4cu6l2MvZmucGHZz4ULz0b5SqLH5F4f8/n3rQ76OD3tZWS96202NpqeSS3XX8lVyY3cqd0Om7aDh8svTE+dl67ftg/5w7Z+6+GCsGwF7QVj8OxvJdfDbUdNVCLXxfJBXa1TWXZ59WU9n8v2s1NmG13FqwU/b1gc3leLqWFI/laTb/PVUwrq/tuH5QncdayqZthfN/ZMzvy5af/XX/HTcqSRfx5LtF4k3gH3nos5Lm59UEvJL/Q7YMvjfAa2Puq3e8EJhebUuGztXDigZT6NlLzWc/6169uU58UZNvyX+98UvSzl+Wtruduxp3nYMabv67074cz7tHNYTLT1ZUP9ncr9R9junAhYrQNBNlt2wlvvt9fPy53baOLqh07D6Xaxk3QEAtaOqkK8LkgKRlbR5uhCubC9uQrPchSaNLvh+mjZOMnjYhVF8KbkuRirZs36VUCm2qrBoXE1bgXn7TweWsGvZfMhb3fHCgGHK0QXeV2Uw+lulfb4ENhnyNW89Lo8BP7ZqVDxtH/I1zNncMAoBvoRaId6q4Dw4ZUIhJOSbsGwa8DSmVBAoRyFDw4tKL/1+UliyfpWE/FiFqC8wJoNzstSz0moUnt8evhqKD/lznnq0KNioSozN19/Ulgv5yfF8kNdNqboZNadq87MXn61al45Tm8b6bcuLtq2qlyTPAR0zegpi0z7ykeqg9y/Tjp+1Fbav9pvN16+L2BMUHS9aFlsu9dPNl7/Z0DL5c76SkJ9Gy27rI/Y7oGpk+lshWL9DH/85/zRlKPNI8svtb7rV+lPaspTjp5Xc7v5Y8Ddk/nwrnMO5fnYOq1qY9ddvj3+i4Oen6jfJ/ZBc5kpDfryxyB1D8abH7WcAQH2oKuSLLiAKpCrJtguFUWiq9EUuT6XJCg8P54KMn56N44OHShX9uLqA+vmo2o/vPxiFF1GJsMK21kkhJnnDIiphnPf09FiS6AN0pXTRVjixVoo8bU8Lf/4irOoeqlKhv1UtIi3Q+JBfahhf4qdhFQS17VRXW02JJoevNuRrH2pYk2xFSDcr1q+SkK9WUGz+6q6nSBpWbHuon9Y9GarLUYm49q0FfLFqKOrvQ74vMY79XFWeakK+bhoLgToXUBWotb20DnoB3C+L7Retv6oV2TSsFFeS21aS54CvdiPJkJbsb9WI/LoobCbHe27ZE0X7Jbmu/olVtSFfvx16B0K/AzYNsd+B7y2dV+im7ambboXm5A3qUPjt50N5sl+53zHjh09uv2R1MLu58udb2jlsTxpFN6jaf3Y++P1oN6zllrmSkK/j0J7YVPKUBABQe6oO+UaBVMFYpZH+gqyLtF2gBrs42seDNJyC79LVCwrD+3GSISo5HT8fXeSS/SuhZfaP5hW80oZRqPHBr1qaRu+VrrB2Y/+8pNQFX2HG/l+qOpIP+WkB0PgAtnzNohgUFPz1UbPksNWGfO0jDWuSAc/39+Gw1L71L27rCYtKPbX8ovXVsFJJE5+q+hJfgNULpbntOS93o6ZxbfolQ77rnuxXTchXibMvDVaAUlUN/V+lxv4csioxCvU/2rMmP/3TxUEuLTwnzwEfJiV5/vlllq7j+WkOti7xpey+ZU3rnzxuSh2LXv/vQHP42vj874C/8bFl9zeKRvNS2L/eD5D57VeuX9rvWFK54f0x5Pv77ZZ6E+du8vRb6c8H7QdjL8aWW4ZKQr4/NlbkboqH8rQMAPCPNeSQL7qYKHTqBUi7aCj8WDAqd6GxFjvUL75IqjqwufFseD9OqSBo/HwUzJL9K5Us3dR8KwkpQ6FtpLBn85K0C75KU62/uvn648aH/HLBKlmirKcHXx1354AX8+QfHvLd/O1lVo0zUPn9o5J7vUuhaelmQXXsNZ6CcFqYvxkhX/w5ohusJxbOiNVzFExVN99CrV741AvZ2k8nP3l3wPQlbR/7c2DD9uVFN6ySPP+S0zzy2/wThMHWxe+XwfqXOxaN/x1QtRDd6Gqfpv12aFqq95/2JGxe7sYtbbtXys+vXL/kdkxTbnh/DPnqWYNtNz/N1za8EJ8QaH2TbLxyy1Dq3Pbj6HfHhtGxmXxZHwBQ+6oK+b4qjnfgRH84VpAc7EITXyJ0AUP1zK2fdfPj+OChC6MNK8n6u2rNxfcvReMluyWDTyXtdVdK1TOS3TRtBSVdTGP95rQL/vG3C8Pob70PkawqVGnIV3d7aVU0jr7AmzZ8qSBQiranTVeSrZ1s2pX/AJn4cJgMlTa8L4lW8E17glEJX5c9/4XT/HR8CL4VIX/jzpW5cfPDaH00HT2FUD9/c6llVcn+A5MnFI4HbUd/LiX3cfIcUD1wf05KMujtOdxRWJ74cmffjd5g65K8IUnuF1+tpNyxKMnfAV8tpNRvh6an7aKbXX/c69/kOlbDz69cv0rmUW54X1VM1bFs+w4W8v1TuEqeXpVbhkpC/tn/va/oHST//gAAoD5UFfJ1gVcd8eQFyAcGe1FQSl1o2t/Mv+xZ6NcXMJJB0cZJhm8f0BUUbN6iZiCtXykK3GoWLnnRUtvUPvgkA/6qHzwbS4UVlNVii+9XjpZXzTimBVUFJV1w/Sf2/UVYAVDvQPgwlGyzu9KQL8kS3lJf/aw25ItuwGy6ySCiutzWr5KQn3yheqjNo/q67P6FRWtdJt/95of85Mux+let4qif1su3wKP+alLSbz8f8qzetfXz54C9DKtjzoe05PZbue6ZwvqrBL3U/hhwjrgXdrU8vg12v45xnoMci8nfAeuevGmx3wF1t3Nf09WyqdlITcPfJA+F/60q1y8ZmNP44e0dC+vn3zfwT+UGC/kbO/tvEvUUbrB3gvwyJNvQ9+dEqZCvY0jL5/d1Jd8iAADUjqpCvkpz1H66r/+qi4aVlioU+eF9qbF/3JtsO9wCiOrmWjcpFfKfWzqvEID00Rq7OPqS2nJsnOQF2Jf6bti+omgc1ev2F8dqmtDU8iu0JMO5NU+nGwoftpMhX918OFc488teTcj3rYWomlSp7TWUkK/6wD6IWItB2najXQlvJSFf6+aruKh023+gTMfdus0vx/WxbmnSXtLVuL7Kx/WGfB9ufRWMJH8+iN9Pfl1F347w/bXuNg8tu5/H8+5lWP/S5sYYDPPd/Yvdoheu1V3Hnv/mw2AhX9P26+GPab0Y69dhsGMx+Tugeau7b1lJ7HdA3f25L3sO56ehKix+X1XrZoV8Vc2y5dX5bvtQ1WH8thks5KvwxH+7QseLf/Khggs1MWrz8se9zh0FdBXG+N84m5dNI7meWgbdXFo3HXd6n8iGBwDUtqpCvoKbLhAKAfrx14VJwVfdFLCTF9kVbf2lpWqmUsFILxwqOPiLkFq10d+6GClY2EVFw+vipq/kWvBQiZ2WQ8PflwsbNg1dNEuVSnsKeGqRw+a7MReEFBQU/C0Q6SNOyYusxhtqE5qqqqIgom2hC7WagLxvwj1xnRQKD/9mW8kLvoX85EXePz6vJuSLPmCm4ZNB0htKyNe0bNoaT9tX66pS6meWPF5Y9kpCvijEWPgVBSQtlx13+bBbPnT5NuQ1DbXXr+XRkwY7NjUdu3EdSsgXfzxrmfXUS19n9TeRvvnEZCtRvjqPgneyVRZNR+tiH3/TPFQlR8uk7aJxkh8r0v7QcmqaGkf/1/Gk5hi1HjqXdOz5+QwW8kXbSvs2Tjc3Ha27vveQr2bUX5d7sGNR/Qb8DvRNR/O27vY7EKu69K27qgXqt+S+3M2K5lnJE7xyblTI1++E9oeq4qipU70wa9vHB3xfRVGS51vadtN217bRcKLfI433sKadm49/IpM87vV/0XnoP55XLuSrm24urZuowYDruZkCANw6VYV8PZrXh5TmPT09BktRM4MnPnk3NQyoVEmPfDW8aFxr7k5VV6yfLjp6WVAXapUU6WKlbioF06f6fcjXxV/LsTx3A6H562KqVkiSoagcLZdeNFS1BwUvBVGFPi2DbhR8SaGnJjRVIrohd/GupmqALth6WqE23W27aR213JqOD4KiC7fWU3yb/bpwa1x1179qVlLT1ja04TVMuWAlaiElljiX2WbzF84sTFP7KW2YNNp2WldtJ1tP3UyoepNNz4cRlS4+9u38Oqn7wOnlmzdN23aV7HNtCz1FUomzjdt1/K24nLY9dQzZdlNoVjctT7JajEKm9UuGfB23Or5tHtpmCnx+GAVs3Zxp/K19LecYVU+yfmpdJu0Y1PKpmoamrfXRcWLHo47btP2u5T+ZW38tW/5YnxqPddt+yWPP7w8dV2nntcbRctj6iv6vbtouto2SVYTS+N8BjaPp2O9APIbc74CWRV/E1Y2kzln113as5txPo1Jw2/bi3z3SUyjfb7AvXZ+5sDt+wEzLqnXXEzctr7ZJud8qf76VOoe13W176XsLtu3VDKvOMf+bpPF13Kufn7eGadtUvI80fHI97VsBoptdG17D0KQmANSHqkK+6OKhC5gZrFTHD5+8cJXqZ90s6KSV9qpf2riVihcwNw1Nb7Dp5Jd38OHS2Lj98yu93KWGyU9jYL+0bqWoOUaV+pV64dZUM82k/HL2L2vachYPO7C7l5yeVLtMacvj513o5ofL/b/kNBL9JG16lfaPAa6vn+bj+yXlp1N+XknF45Q+hvPD2XKk7w/jh7XpFW2/EvNISpuO+OUtHrb6eQzGpie+e/F+Kb89jF+m/PiDL6+fx2DrlNwG+n/p6Q6cd9o+Sq6n/rZp+OHFugMAalvVIf8foVyVDlTH3keopGoTAAAA6hMhv4FYKX65F24BAABQ/+oi5PsmOgn5Q6dmE1W3ttxXcQEAAFD/6iLk60U4vSypliD0IlvaMBic1c8l4AMAAGRbXYR8UTDNS+8PAAAAIK9uQj4AAACAyhDyAQAAgIwh5AMAAAAZQ8gHAAAAMoaQDwAAAGQMIR8AAADIGEI+AAAAkDGEfAAAACBjCPkAAABAxhDyAQAAgIwh5AMAAAAZQ8gHAAAAMoaQDwAAAGQMIR8AAADIGEI+AAAAkDGEfAAAACBjCPkAAABAxhDyAQAAgIwh5AMAAAAZQ8gHAAAAMoaQDwAAAGQMIR8AAADIGEI+AAAAkDGEfAAAACBjCPkAAABAxhDyAQAAgIwh5AMAAAAZQ8gHAAAAMoaQDwAAAGQMIR8AAADIGEI+AAAAkDGEfAAAACBjCPkAAABAxhDyAQAAgIwh5AMAAAAZQ8gHAAAAMoaQDwAAAGQMIR8AAADIGEI+AAAAkDGEfAAAACBjCPkAAABAxhDyAQAAgIwh5AMAgEw4dHpLWLnumdC2aUmY+fi0MH/hzNBzrjNc/nv68ECWEfIBAEDdU8B/ctHMcP7z/eHStaM5PeG5pfNCa2tL6D67I3UcIMsI+QAAoO49uXhWeHDKxNB7pavQ7fSn74eWluYw7+npRcMCjYCQDwAAataZC3tSu//uLwcj+3tF2+IwasxtsdTeV89paWkJ//LIhMLfQKMg5AMAgJqkKjjD/6k1PDRtUlj7xkuh7c0lkerbj75jZFGgVxWdi1d7cn8fLRq/uaU5LH1tQaEb0CgI+QAAoCYdOpUP6U1NTaG5uZ9K5g//ZntRoE8z+Rv3hwcmTwgnP3k3tT+QZYR8AABQkxTyx46/K2zduyas2fhi2LB9eTjy0fZw8Wr3oC3mvLB8fqyjf+L37w56MwBkESEfAADUJIX8h6ZOjCH98rUc/VtBc5gK+N/9/txYgk/AR6Mi5AMAgJpkIT+tXykK+B07VsTSfv2tF3dnzZk2YDgg6wj5AACgJvmQr7Cuv4+e31myNF8BX9V7VLXHXtJVW/nL1ixMHR7IMkI+AACoSfk6+XfHoK6v2B448XZozwX3cRPvif/3VXFW/eDZ2Cb+sGHDil7S1Uu7qsvvpws0AkI+AACoSQr5o24fEXqvHIhNZFrdfDWnOeaOkeHA8f6gn29CszsV9fLRiAj5AACgJimcq+37ZHdV2VGpvVrPuZTSHwAhHwAA1BnVydeXbFUV59Qf3ksdBmh0hHwAAFCTOvetC2/sWpXaTyFf9e/f+/n61P5AoyPkAwCAmnOsd1cYPrw1NDc3x7r5yXr1FvL3/+qtou4A8gj5AACg5vz6T7vjS7dznnp0QMBXc5qqkz9i1JfCZ3/Lt4cPoBghHwAA1KQZs6ekltS3b345No+5ZfdqWs4BSiDkAwCAmqSmM2fOmRbbyd/9yw1hz+GO8OTiWbGEf/3WZbSsA5RByAcAADXr0rWe+OErfQyrbdNL8UXb85/vj+3ipw0PII+QDwAAapqq5OgjWBHVc4CKEPIBAACAjCHkAwAAABlDyAcAAAAyhpAPAAAAZAwhHwAAAMgYQj4AAKjI3iMdYdacaWHG7KlD0nOuM1z+e/q0AdxYhHwAAFCR3/3lYGyzvuv40ND8JXDrEPIBAEDFYpv1Q5Q2PQA3ByEfAADUlP/2w+fC8OGtoaWl5YZa8Ny/xS/ops0TyBpCPgAAqCmXrh0NF69233AEfDQSQj4AAKgIL94C9YOQDwAAKsKLt0D9IOQDAICKJV+mrUba9ADcHIR8AAAAIGMI+QAAoO6cubAnrFr3TGjbtCTMXzgzbP9pG08LAIeQDwAA6krnvnXhyUUzw8k/vBdbzOk52xnGfHlkGDvh7tB7pSt1HKDREPIBAEDdUAn+uIn3hBOfvFsouVeLPcvXLgrNzc3hu9+fG5vgTI4HNBpCPgAAqBubdr0amluaw4NTJ4ZLV/vbvT948p3YfeTo20LvF5TmA4R8AABQN3b8rD2W2H/1vjuLquYcOrUlhvxhw4aF84R8gJAPAADqh6rodJ/dEYO8/7DWpl2rYvj/129OLirhBxoVIR8AANSV5Fdz9ZEu1dMfMepL4fBH2wf0BxoRIR8AANQdBXtV0dmxrz08NHVSeHbJnL6Az0u3gBDyAQBA3TlzYXd82VaefXlOGDv+rtjCDi3rAHmEfAAAUJdUai9qK3/tGy+FlpaW8MSCGfHvtOGBRkLIBwAAde/0p7tzIb85NDU1hW0frKXaDhoeIR8AANSNvUc6Yks6aSFeJflqQnPe09MpzUfDI+QDAIC6cKx3Vxg+vDU2lanqOZcT9e8t5D/6rcmEfDQ8Qj4AAKgLx3p3xio5CvLv/vfXi0rzz1zYU+i3fttyquug4RHyAQBAXVD79997ZW5Y3fHCgA9efWfxrFgf/4HJ48P5z/cX9QMaESEfAADUDTWR2fbmkvDw1+/PBf55oW3TkjBj9tQwasxt4ZXXFoTP/tqdOh7QaAj5AACgrqguvkrye851hgMn3gndZzvDxb91xxuAtOGBRkTIBwAAdUnVd1T3Xv+m9QcaGSEfAAAAyBhCPgAAAJAxhHwAAAAgYwj5AAAAQMYQ8gEAAICMIeQDAAAAGUPIBwAANe3Xf9odNu16NbS/uSS8sXNV/DttuN/95WCU1q/UOEBWEfIBAEDNWvWDZ8NDUyeF937+enj/FxvCw9MmhdG3jwgbO1fGNvL9sOs2vxxah7eGJxbMiF/C1ZdxV7Yvjl/HHTvh7nDxak/R8ECWEfIBAEBN2nukI8yYPTV+3Tb/0aujofdKVy70TwzNLc1h2wdri4K+Qn1zc1NoamqK/8b/58x96rHQ+0VX0bSBrCPkAwCAmjRu0r3h8EfbB3Tf/tO2XIBvDl8bd1cM/dZdIX/e09PD+m3Lw5qOF8PWPWvCyU/ejTcJfnygERDyAQBAzTnWuyu0tDSHUWNGhEOnthSV2H/854Ox37Bhw0LX8bcK3RXyl69dFKvlXL6WL/m3fkCjIeQDAICac6x3ZyHIq369Qrvv39LSEvuprr51s5B/KTEs0IgI+QAAoOZc/vux8P4v1oeO7SsGBPwzF/YUbgCO/HZHobsP+XoSoCcAtKqDRkXIBwAANcletk1279zXHuvkPzB5fLh4tbvQXSF/+uwpYf7CGWH7B23h4Ml3wpOLZoYZj08l7KPhEPIBAEDdUDv44ybdE0aM+lLY9+HmopuAGPK/PSV89tfuwg3CpWs9sYUeNcN56o/vF00LyDJCPgAAqBur1j0TS/HXb10WA7zvp2o9yW6iNvXVrCb19dFICPkAAKAudO5bF1pbW8LruYBfzYetVG1H9ffV5CYfxEKjIOQDAICapxdpx3x5ZPjJoR+mltarGs+mH78a9hzeMKAev17AVciX83wUCw2CkA8AAGqamtNUPfx9/7m5qLrNodNbwtHzO+P/FfBVyj9qzG0Dvm5rIV/1+An5aBSEfAAAULPUXObY8XfnX7JN1Kd/cvGswsu0O37WHqvjvLbhhQH17nfsa48hf85Tj/L1WzQMQj4AAKhJqoIz+Rv/HNZsfDEcOPF2LJE3ew53hNG3jyiUzOsruGpB5+Qf3h0wnZlzpsVS/MMfbQ9qfz/ZH8giQj4AAKg5FvDVKk5zc05Lc7Hm5nDv2DuLXqTtOdcZJn/9/rCibXF82VYl+PpbJfxdx98aUFcfyDJCPgAAqDlnLuwOa994KazueLGkrXvXFAV3ldL3XukKu3+5IbRtWhLH7/rVW+Hi3/Lt5vvpA1lHyAcAADVJdfDLKhHc1X2wYYCsI+QDAAAAGUPIBwAAADKGkA8AAABkDCEfAAAAyBhCPgAAAJAxhHwAAFCRvUc6wqw508KM2VOHRO3Y8zEq4NYg5AMAgIroA1X68mzX8aGhOUvg1iHkAwCAisU26IcobXpp/uf/+Y/wPz7bG85cuPHO/df+1HkCWUPIBwAANeX1Hy0NY8ffFb467s4b7omFM8Klaz2p8wWyhJAPAABqikr9L17tuSkI+GgUhHwAAFARXrwF6gchHwAAVIQXb4H6QcgHAAAV8y/SVittegBuDkI+AAAAkDGEfAAAUJc6960LK9ufCc8tnRdWtC8Opz99P3U4oBER8gEAQF3RuwGz5k4L2z5YW2gx57mlT4TW1pbQsWMlVYOAHEI+AACoK88vnx/WbHwxBnzr9vGVA6GlpTmMHHNb6D5LKz4AIR8AANSVMXeMjGFeJfm+1H767Cmhqakp3gBcvkZpPhobIR8AANSVsRPujmF+w/YVRSFfbfGr+7I1C8MlQj4aHCEfAADUld4rXaH77I4BX69VCf+wYcPC/g83Uy8fDY+QDwAA6k6yzv2mH78ampubw+KXHi+qqw80KkI+AACoS8d6d4VDp7aEle2LYxWe9VuX5QJ+d+qwQKMh5AMAgLqkgH/w5Dth2wdtYez4u8L0bz8Ses7Rsg4ghHwAAFCXVO/eqJ7+6DtGhlG3jwgHjr8du6WNAzQKQj4AAMiE770yLzQ1N4Wvjb+LevloeIR8AABQN/S123WbXw5Hz+8cUC2nbdOS0JwL+WphR63vUG0HjYyQDwAA6sZ3Fs+KX7YdNWZE6P2iq6hf25v9Ib/r+FtU2UFDI+QDAIC6MX/hzPjBqwcmjx9QJee5pU/EfveO/Uo4n7gBABoNIR8AANQNtZ7z4JSJ4cTv3y3qruY0W1tbYin+lt2rKcVHwyPkAwCAuqF69gr6M+dMCzNmT4318NVOvr52++g3J4d9H24Ol64R8AFCPgAAqCsK+peu9YTeKwdiO/kHTrwdzn++P1y62kMJPtCHkA8AAOqWQj3BHhiIkA8AAABkDCEfAAAAyBhCPgAAAJAxhHwAAAAgYwj5AAAAQMYQ8gEAAICMIeQDAAAAGUPIBwAAADKGkA8AAABkDCEfAAAAyBhCPgAAAJAxhHwAAAAgYwj5AAAAQMYQ8gEAAICMIeQDAAAAGUPIBwAAADKGkA8AAABkDCEfAAAAyBhCPgAAAJAxhHwAAAAgU46F/w8JS+DDtgzvMwAAAABJRU5ErkJggg== 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 <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>25</mn><mn>3</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Vereenvoudig... Vereenvoudig  «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mfenced»«mfrac»«mrow»«mn»2«/mn»«mi»x«/mi»«mi»p«/mi»«/mrow»«mrow»«mn»6«/mn»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«/mrow»«/mfrac»«/mfenced»«mn»3«/mn»«/msup»«/math»
]]> 2.0000000 0.3333333 0 0 p327x3]]>

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<question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><msup><mi>p</mi><mn>3</mn></msup></mrow><mrow><mn>27</mn><msup><mi>x</mi><mn>3</mn></msup></mrow></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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> Vind die antwoord.. Vind die antwoord «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»2«/mn»«mi»t«/mi»«/msup»«mo»-«/mo»«msup»«mn»2«/mn»«mrow»«mi»t«/mi»«mo»-«/mo»«mn»2«/mn»«/mrow»«/msup»«/mrow»«mrow»«mn»3«/mn»«mo»§#215;«/mo»«msup»«mn»2«/mn»«mi»t«/mi»«/msup»«mo»-«/mo»«msup»«mn»2«/mn»«mi»t«/mi»«/msup»«/mrow»«/mfrac»«/math»
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 2.0000000 0.3333333 0 0 38]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>3</mn><mn>8</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</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>