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.
+ = 1]]>
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1.0000000
0.3333333
0
true
true
abc
Center: (-5, 3); Vertices: (3, -20), (3, 10); Foci: (3, -17), (3, 7)
Incorrect
Center: (-5, 3); Vertices: (-20, 3), (10, 3); Foci: (-17, 3), (7, 3)
Correct
Center: (-5, 3); Vertices: (-20, 3), (10, 3); Foci: (-14, 3), (4, 3)
Incorrect
Center: (-5, 3); Vertices: (3, -20), (3, 10); Foci: (3, -14), (3, 4)
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.
+ = 1]]>
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1.0000000
0.3333333
0
true
true
abc
Center: (0, 0); Vertices: (0, -5), (0, 5); Foci: (0, -3), (0, 3)
Correct
Center: (0, 0); Vertices: (-5, 0), (5, 0); Foci: (0, -4), (0, 4)
Incorrect
Center: (0, 0); Vertices: (-5, 0), (5, 0); Foci: (-3, 0), (3, 0)
Incorrect
Center: (0, 0); Vertices: (0, -5), (0, 5); Foci: (-4, 0), (4, 0)
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.
+ = 1]]>
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1.0000000
0.3333333
0
true
true
abc
Center: (0, 0); Vertices: (0, -25), (0, 25); Foci: (0, -15), (0, 15)
Incorrect
Center: (0, 0); Vertices: (-25, 0), (25, 0); Foci: (-20, 0), (20, 0)
Correct
Center: (0, 0); Vertices: (-25, 0), (25, 0); Foci: (-15, 0), (15, 0)
Incorrect
Center: (0, 0); Vertices: (0, -25), (0, 25); Foci: (0, -20), (0, 20)
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.
+ = 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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7i0sre1uL+YXN5LDEqNcyiNIhJIQMuwjijTccnbGg6KALdFFABXlX7P3/E70nxT4pv8A/SvEGoeJtb024v5OXa1sNXvbSzt17JFFDGMIoC73lkIMk0ruUUAf/9k=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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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fHVbeSO4t101YZVnt2t2Mzylo/LdZN4CqqiUMpRixdCGTYQ9T7Nrn9nbP7R0/wC3/bfM8/7A/lfZftG7yvL87Pm/Z/3fm79vmfvPL2/uaLm1t38VadcNon2i7jsrmOPW9kJ+yIzwF7fcW80ecVR8IpQ/ZvnKkRhsr+zNP/4RzyP+EJ/0b+2vtH9k+RZ/67+0fM/tDb5nl/63/Td27zv4tnnfu6AOgjjvhqtxJJcW7aa0MSwW627CZJQ0nmO0m8hlZTEFUIpUo5LPvASpa22uJZ6ItxqOny3cO3+1ZYrB0S7/AHLBvIQzEwZmKON7TYRWTksJFLa1t08VajcLon2e7ksraOTW9kI+1orzlLfcG80+SWd8OoQfafkLEyBcrTNM0+HR/BMUXgn+z4bPy/sWn+RZj/hHMWcqDhJCibUZrb/RjJ/rsDMRdwAat1ba49nra2+o6fFdzbv7KllsHdLT9yoXz0EwM+Jg7nY0OUZU4KmRrckd8dVt5I7i3XTVhlWe3a3YzPKWj8t1k3gKqqJQylGLF0IZNhD8/qemafNo/jaKXwT/AGhDeeZ9t0/yLM/8JHmziQ8PIEfcirbf6SY/9Tg4iCOdW5tbd/FWnXDaJ9ou47K5jj1vZCfsiM8Be33FvNHnFUfCKUP2b5ypEYYAPs2uf2ds/tHT/t/23zPP+wP5X2X7Ru8ry/Oz5v2f935u/b5n7zy9v7mrccd8NVuJJLi3bTWhiWC3W3YTJKGk8x2k3kMrKYgqhFKlHJZ94Cc//Zmn/wDCOeR/whP+jf219o/snyLP/Xf2j5n9obfM8v8A1v8Apu7d538Wzzv3datta26eKtRuF0T7PdyWVtHJreyEfa0V5ylvuDeafJLO+HUIPtPyFiZAoBVvbLxU/h6whtNZ0eDXUhK3l7NpEsltNL9ndQ8cAuVaNfPMcm0yufLV49wZhKnyBoGk/EXxN+0J4u8C6j4q8L3aT+LX8S6gIvDVzbwzS6boehNaSA/2g77Y7270iQ24KmQWs5Nwit5D/T+s6Fo9x8PdCspvhb/aunQWTRweFfsumt/ZifYJozb7JJhbrmNns8ROyf6RtJ8ku6/FXwG8H+FtQ/bC+N9uP2d/sVp4dsoo7bRLbT9CT7Gmo6RAJre5UXRibzhYFIBAzIv9oXnnlBMxQA/QqSO+Oq28kdxbrpqwyrPbtbsZnlLR+W6ybwFVVEoZSjFi6EMmwh6n2bXP7O2f2jp/2/7b5nn/AGB/K+y/aN3leX52fN+z/u/N37fM/eeXt/c0XNrbv4q064bRPtF3HZXMcet7IT9kRngL2+4t5o84qj4RSh+zfOVIjDZX9maf/wAI55H/AAhP+jf219o/snyLP/Xf2j5n9obfM8v/AFv+m7t3nfxbPO/d0AdBHHfDVbiSS4t201oYlgt1t2EyShpPMdpN5DKymIKoRSpRyWfeAnj/AO0Vba5oPws0PxtJqOntqvw8vYPFeqXUNg6/abW3glTU0s4mmZYpZrSW7jjEzSqPM27kfbcReq21rbp4q1G4XRPs93JZW0cmt7IR9rRXnKW+4N5p8ks74dQg+0/IWJkC5WmaZp8Oj+CYovBP9nw2fl/YtP8AIsx/wjmLOVBwkhRNqM1t/oxk/wBdgZiLuADVurbXHs9bW31HT4rubd/ZUstg7pafuVC+egmBnxMHc7GhyjKnBUyNbkjvjqtvJHcW66asMqz27W7GZ5S0flusm8BVVRKGUoxYuhDJsIfwr9nLTNPh/Z98QeH28E/2jp2i3ureFPsTQWbSeJ7XTJH0yB5N0gjklktrOG3cz+UpeJvlSHyzXtVza27+KtOuG0T7Rdx2VzHHreyE/ZEZ4C9vuLeaPOKo+EUofs3zlSIwwAfZtc/s7Z/aOn/b/tvmef8AYH8r7L9o3eV5fnZ837P+783ft8z955e39zVuOO+Gq3EklxbtprQxLBbrbsJklDSeY7SbyGVlMQVQilSjks+8BOf/ALM0/wD4RzyP+EJ/0b+2vtH9k+RZ/wCu/tHzP7Q2+Z5f+t/03du87+LZ537utW2tbdPFWo3C6J9nu5LK2jk1vZCPtaK85S33BvNPklnfDqEH2n5CxMgUALW21xLPRFuNR0+W7h2/2rLFYOiXf7lg3kIZiYMzFHG9psIrJyWEi27KO+S5v2u7i3nt3mDWaQ27RtDF5aApIxdhI3mCRtwCDayLtJUu/P6Zpmnw6P4Jii8E/wBnw2fl/YtP8izH/COYs5UHCSFE2ozW3+jGT/XYGYi7jV0a1t7fUdeeHRP7KknvVknu9kK/2m/2eFRcZjYs2FVIMyhX/wBHwBsCMwBrUUUUAFcpqep6fDo/jaWXxt/Z8Nn5n23UPPsx/wAI5izic8vGUTajLc/6SJP9dk5iKIOrrJurnXEs9ba307T5buHd/ZUUt+6Jd/uVK+e4hJgzMXQ7Fmwiq/JYxqAFzdW6eKtOt21v7PdyWVzJHom+Efa0V4A9xtK+afJLImUYIPtPzhiYyuV/aen/APCOef8A8Jt/o39tfZ/7W8+z/wBd/aPl/wBn7vL8v/W/6Ft2+d/Dv8795XQSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpU+065/Z2/8As7T/ALf9t8vyPt7+V9l+0bfN8zyc+b9n/eeVs2+Z+78zb++oALa6t38Vajbrrf2i7jsraSTRN8J+yIzzhLjaF80ecVdMuxQ/ZvkCkSFsrTNT0+bR/BMsXjb+0Ibzy/sWoefZn/hI82crjlIwj7kVrn/RhH/qcjEQdD0Ecl8dVuI5Le3XTVhiaC4W4YzPKWk8xGj2AKqqIirB2LF3BVNgL1LW51x7PRGuNO0+K7m2/wBqxRX7ulp+5Yt5DmEGfEwRBvWHKMz8FRGwBlanqenw6P42ll8bf2fDZ+Z9t1Dz7Mf8I5izic8vGUTajLc/6SJP9dk5iKINW5urdPFWnW7a39nu5LK5kj0TfCPtaK8Ae42lfNPklkTKMEH2n5wxMZUurnXEs9ba307T5buHd/ZUUt+6Jd/uVK+e4hJgzMXQ7Fmwiq/JYxrbkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJQA5/wDtPT/+Ec8//hNv9G/tr7P/AGt59n/rv7R8v+z93l+X/rf9C27fO/h3+d+8rVtrq3fxVqNuut/aLuOytpJNE3wn7IjPOEuNoXzR5xV0y7FD9m+QKRIWPtOuf2dv/s7T/t/23y/I+3v5X2X7Rt83zPJz5v2f955Wzb5n7vzNv76rccl8dVuI5Le3XTVhiaC4W4YzPKWk8xGj2AKqqIirB2LF3BVNgLgHFazruj2/w90K9m+KX9ladPZNJB4q+1aav9pp9gmkNxvkhNu2I1e8zEip/o+4jyQ6N81fA7x14Ok+Ivxe2ftR/a/N1qS4i/4mnhw/b4U8PWHmah8tmM/Z9knzR7YR9i/eI22bf9a3t74qTw9YTWmjaPPrrwlryym1eWO2hl+zuwSOcWzNIvniOPcYkPls8m0soifwr4K618U2+Ivxq83wb4PTd4mWS52eLbpvKuh4e0vyYkzpg3xNtg3SnayeZJiOTy18wA9/ubq3TxVp1u2t/Z7uSyuZI9E3wj7WivAHuNpXzT5JZEyjBB9p+cMTGVyv7T0//hHPP/4Tb/Rv7a+z/wBrefZ/67+0fL/s/d5fl/63/Qtu3zv4d/nfvK6CSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lKn2nXP7O3/2dp/2/wC2+X5H29/K+y/aNvm+Z5OfN+z/ALzytm3zP3fmbf31ABbXVu/irUbddb+0XcdlbSSaJvhP2RGecJcbQvmjzirpl2KH7N8gUiQtlaZqenzaP4Jli8bf2hDeeX9i1Dz7M/8ACR5s5XHKRhH3IrXP+jCP/U5GIg6HoI5L46rcRyW9uumrDE0FwtwxmeUtJ5iNHsAVVURFWDsWLuCqbAXqWtzrj2eiNcadp8V3Nt/tWKK/d0tP3LFvIcwgz4mCIN6w5RmfgqI2APKvAN1b6TdftB282t/8Ipoum+JpJI9RR4YotISXQ9Nuri4QTK0Mf7+e4uWLqUMkkjuGLPn1W5urdPFWnW7a39nu5LK5kj0TfCPtaK8Ae42lfNPklkTKMEH2n5wxMZXzX4VyXz6/8d9U0a3t9Qe68WltMa4uGhtLyWDRNMtnTz1STCpc280EjKjlHhlUqWQrXqskl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KAHP/ANp6f/wjnn/8Jt/o39tfZ/7W8+z/ANd/aPl/2fu8vy/9b/oW3b538O/zv3lattdW7+KtRt11v7Rdx2VtJJom+E/ZEZ5wlxtC+aPOKumXYofs3yBSJCx9p1z+zt/9naf9v+2+X5H29/K+y/aNvm+Z5OfN+z/vPK2bfM/d+Zt/fVbjkvjqtxHJb266asMTQXC3DGZ5S0nmI0ewBVVREVYOxYu4KpsBcA5/TNT0+bR/BMsXjb+0Ibzy/sWoefZn/hI82crjlIwj7kVrn/RhH/qcjEQdDq6NdW9xqOvJDrf9qyQXqxz2m+Fv7Mf7PCwt8RqGXKsk+JSz/wCkZB2FFUtbnXHs9Ea407T4rubb/asUV+7pafuWLeQ5hBnxMEQb1hyjM/BURtbspL57m/W7t7eC3SYLZvDcNI00XloS8ilFEbeYZF2guNqo24FiiAFuiiigArlNT/sj+x/G3n/8JB9m/ef2l9l/tHz/APjzi3fYPL/ef6rZj7F/y28zb++8yurrJurbXHs9bW31HT4rubd/ZUstg7pafuVC+egmBnxMHc7GhyjKnBUyMAFz9j/4SrTt/wDaH2/7Fc+V5f2j7H5e+DzPN2/uPNz5ezzP3m3zvL+Xzqyv+JR/wjn/ADMH2P8Atr/qI/avtP8AaP8A3++zed/27/Z/+naugkjvjqtvJHcW66asMqz27W7GZ5S0flusm8BVVRKGUoxYuhDJsIep9m1z+ztn9o6f9v8Atvmef9gfyvsv2jd5Xl+dnzfs/wC783ft8z955e39zQAW32P/AISrUdn9ofb/ALFbeb5n2j7H5e+fy/K3fuPNz5m/y/3m3yfM+XyaytM/sj+x/BPkf8JB9m/d/wBm/av7R8//AI85dv2/zP3n+q35+2/8tvL3fvvLroI474arcSSXFu2mtDEsFutuwmSUNJ5jtJvIZWUxBVCKVKOSz7wEqWttriWeiLcajp8t3Dt/tWWKwdEu/wBywbyEMxMGZijje02EVk5LCRQDK1P+yP7H8bef/wAJB9m/ef2l9l/tHz/+POLd9g8v95/qtmPsX/LbzNv77zK1bn7H/wAJVp2/+0Pt/wBiufK8v7R9j8vfB5nm7f3Hm58vZ5n7zb53l/L51F1ba49nra2+o6fFdzbv7KllsHdLT9yoXz0EwM+Jg7nY0OUZU4KmRrckd8dVt5I7i3XTVhlWe3a3YzPKWj8t1k3gKqqJQylGLF0IZNhDgHP/APEo/wCEc/5mD7H/AG1/1EftX2n+0f8Av99m87/t3+z/APTtWrbfY/8AhKtR2f2h9v8AsVt5vmfaPsfl75/L8rd+483Pmb/L/ebfJ8z5fJo+za5/Z2z+0dP+3/bfM8/7A/lfZftG7yvL87Pm/Z/3fm79vmfvPL2/uatxx3w1W4kkuLdtNaGJYLdbdhMkoaTzHaTeQyspiCqEUqUcln3gIAcVrP8Awjn/AAr3QvtP/CYf2P8AYm+y/Yv7Z/tPy/sE2ftHlf6X5vk+Zjz/AN55/lY/0jyq+Kvgd/wgug/tbfGm7uv+FoRaL4i+zabos83/AAlUVw01roXn3dvctJtmluXgnlktUfzJkFq7RCItbmX71vbLxU/h6whtNZ0eDXUhK3l7NpEsltNL9ndQ8cAuVaNfPMcm0yufLV49wZhKnyBqfg74wtqfxd8S6Z4m8L6lrvgzxza68sGn+DbyS5upY/D2mpcLaQ/2kwZpLCea3W3cMXkclZoGdJIAD7Jufsf/AAlWnb/7Q+3/AGK58ry/tH2Py98Hmebt/cebny9nmfvNvneX8vnVlf8AEo/4Rz/mYPsf9tf9RH7V9p/tH/v99m87/t3+z/8ATtWrpupf8JB/ZWr6Rqun3/hu7smnSS2XzvtfmeW0E0M6ybPK2eZkbW3+ZGQyhCHPs2uf2ds/tHT/ALf9t8zz/sD+V9l+0bvK8vzs+b9n/d+bv2+Z+88vb+5oALb7H/wlWo7P7Q+3/YrbzfM+0fY/L3z+X5W79x5ufM3+X+82+T5ny+TWVpn9kf2P4J8j/hIPs37v+zftX9o+f/x5y7ft/mfvP9Vvz9t/5beXu/feXXQRx3w1W4kkuLdtNaGJYLdbdhMkoaTzHaTeQyspiCqEUqUcln3gJ5V8d73xVF8NNG8K6ZrtvaeMvF0w8NLqOn2stuwlmtJzcXlp+/zbtbRxzXyq8jlltDAreZKkigHP/s7f2Rc/Anxfqr/8JA2j69rWv+ITNa/2iJ57C/upr21msAn71fMs7i2cLagMszyLhbgSge1XP2P/AISrTt/9ofb/ALFc+V5f2j7H5e+DzPN2/uPNz5ezzP3m3zvL+Xzqq2WgX2h+Hr/SdDk0fSbeCEW2gQQ6Wy22mxJbokUckKTKJVWRWbbGYR5ZSMYKmRtWSO+Oq28kdxbrpqwyrPbtbsZnlLR+W6ybwFVVEoZSjFi6EMmwhwDn/wDiUf8ACOf8zB9j/tr/AKiP2r7T/aP/AH++zed/27/Z/wDp2rVtvsf/AAlWo7P7Q+3/AGK283zPtH2Py98/l+Vu/cebnzN/l/vNvk+Z8vk0fZtc/s7Z/aOn/b/tvmef9gfyvsv2jd5Xl+dnzfs/7vzd+3zP3nl7f3NW4474arcSSXFu2mtDEsFutuwmSUNJ5jtJvIZWUxBVCKVKOSz7wEAOf0z+yP7H8E+R/wAJB9m/d/2b9q/tHz/+POXb9v8AM/ef6rfn7b/y28vd++8utXRvsf8AaOvfZv7Q877av2r7b9o8rzPs8OPs/m/J5Wzy8+R+78zzc/vfNotbbXEs9EW41HT5buHb/assVg6Jd/uWDeQhmJgzMUcb2mwisnJYSLbso75Lm/a7uLee3eYNZpDbtG0MXloCkjF2EjeYJG3AINrIu0lS7gFuiiigCpHq1jNqtxpkd7bvqVtDFcz2ayqZoopGkWORkzlVdoZQrEYJjcDO044rXdZ8J2/hr4pTXuhafc6dp/nf8JFbyyWATU8abBI/nmSURrm2aKI/a2i+RFLYh2O3mvw8/Z+8eeGdV8WWV38XvHECXepyarHrdrb+H3Gpidmwswk015VngSOOEgkxeUlv5RRc21v5p46+B3i6T4bftRp/wt7xBP8AaPtn7i6n8PRQX+fDliv+nyfY1+y5x5Z+e3xCkcny7/OcA+tb290lPH+jWk1hbya7Lpl9La3zNb+dDbrLaCeNQziYq7vbljGhjzEnmMrGIPz/APbPhP8A4Qv7T/YWn/2P/wAJN9l+x+ZYeV/aP9s+V9pz5vleb9s/f43ef5nGz7R+6ryrWvgr4ub4++DZf+F1eMH2+GdcX7ZInh5byLN1pJ8uKH+zhvibbl38ttjRwjfH5m2Tz/8A4Ud4u/4Uv5X/AAt7xB/yU3zfsvn+Hvsv/I5b/P8AN+x/8fP/AC28jzP+Pj9z5P8Ay70AfWtle6S/j/WbSGwt49di0yxlur5Wt/Omt2luxBGwVzMFR0uCpkQR5lfy2ZhKE5/QtZ8J3Hhr4WzWWhafbadqHk/8I7bxSWBTTM6bPInkGOUxti2WWIfZGl+R2K5h3uvlWi/BXxcvx98ZS/8AC6vGCbvDOhr9sjTw815Li61Y+XLD/Zx2RLuyj+Wu9pJhvk8vbH5/4G+B3i6P4bfsuJ/wt7xBB9n+x/uLWfw9LBYY8OXy/wCgSfY2+1Yz5Y+e4zC8knzbPOQA+ldd1nwnb+GvilNe6Fp9zp2n+d/wkVvLJYBNTxpsEj+eZJRGubZooj9raL5EUtiHY7dBe3ukp4/0a0msLeTXZdMvpbW+ZrfzobdZbQTxqGcTFXd7csY0MeYk8xlYxB/krx18DvF0nw2/ajT/AIW94gn+0fbP3F1P4eigv8+HLFf9Pk+xr9lzjyz89viFI5Pl3+c/oGtfBXxc3x98Gy/8Lq8YPt8M64v2yRPDy3kWbrST5cUP9nDfE23Lv5bbGjhG+PzNsgB6r/bPhP8A4Qv7T/YWn/2P/wAJN9l+x+ZYeV/aP9s+V9pz5vleb9s/f43ef5nGz7R+6roLK90l/H+s2kNhbx67FpljLdXytb+dNbtLdiCNgrmYKjpcFTIgjzK/lszCUJ8lf8KO8Xf8KX8r/hb3iD/kpvm/ZfP8PfZf+Ry3+f5v2P8A4+f+W3keZ/x8fufJ/wCXevQNF+Cvi5fj74yl/wCF1eME3eGdDX7ZGnh5ryXF1qx8uWH+zjsiXdlH8td7STDfJ5e2MA9Av7/wXqvwx8DKvgbT9d0TVrLy9D8ORf2VIiI2lXLi3gDzi3fdarNbgQO6FJW58jzJF+dfhL4c8AeHfGHxr1PUP2aLfQ9N03U7gyXl3YeGoYdJtP8AhHLFp7J3+24jWZWlJ2Ew4vCZXTM2w8OfCTxB4d+EP7NGoan8a9Y0fTdKhtrm6lN54c+xaTEnhq/3yWk7WZFwqLlNxeceS0kpzs85OJ1HUdC8deE/2mtC0L9pr+29V1T7ebHTW1fwyia+i+GbLfLI/wBkXEQ8uWF5IXiREtmJZXSSQgH1Vov9h/BL4j2Ph7VP7Ph0XVfNj8HXB2B9Ehc2kc+lAHMkds9yLdoXB8kPNDaYhMdkk/V/2z4T/wCEL+0/2Fp/9j/8JN9l+x+ZYeV/aP8AbPlfac+b5Xm/bP3+N3n+Zxs+0fuq8f8AGH7P3iDxB8aPDNjqfxe8Uarpt34S1+0uhf2/hx5nikudKDwC2bTcSwSLnzWMThSkSlk8zbJ5r4c/Zm1rwl8C207R/ir4gsLD/hZsckWkRXegf2bbJH4sjRGgzabIJVSJJRaRMqfad0fkbnaEgH1V4o+Jngf4e+KtUl12fT9G1VrKwiN4zwNeal5j3ptbKGFGa6nl3Q3RjiEZ3tI4h8xxKq8V8P8AQ9Bn1rwP441LR9HjOrQw6V4J0uxmsZbbw5p62V1OjWziTaZ54AyzGx3KY0t41EkVs9y/n/gr9lnVfD/7SXjvWYPjH44m1K58P6ZINYvbnRL/AFJBPeai81siT2MhtbTdFCyRxRxRM3mAb/KxHz/gb4HeLo/ht+y4n/C3vEEH2f7H+4tZ/D0sFhjw5fL/AKBJ9jb7VjPlj57jMLySfNs85AD6V13WfCdv4a+KU17oWn3Onaf53/CRW8slgE1PGmwSP55klEa5tmiiP2tovkRS2Idjt0F7e6Snj/RrSawt5Ndl0y+ltb5mt/Oht1ltBPGoZxMVd3tyxjQx5iTzGVjEH+SvHXwO8XSfDb9qNP8Ahb3iCf7R9s/cXU/h6KC/z4csV/0+T7Gv2XOPLPz2+IUjk+Xf5z+ga18FfFzfH3wbL/wurxg+3wzri/bJE8PLeRZutJPlxQ/2cN8Tbcu/ltsaOEb4/M2yAHqv9s+E/wDhC/tP9haf/Y//AAk32X7H5lh5X9o/2z5X2nPm+V5v2z9/jd5/mcbPtH7qugsr3SX8f6zaQ2FvHrsWmWMt1fK1v501u0t2II2CuZgqOlwVMiCPMr+WzMJQnyV/wo7xd/wpfyv+FveIP+Sm+b9l8/w99l/5HLf5/m/Y/wDj5/5beR5n/Hx+58n/AJd69A0X4K+Ll+PvjKX/AIXV4wTd4Z0NftkaeHmvJcXWrHy5Yf7OOyJd2Ufy13tJMN8nl7YwD1XQtZ8J3Hhr4WzWWhafbadqHk/8I7bxSWBTTM6bPInkGOUxti2WWIfZGl+R2K5h3uvQeGb3SbrWvFkWnWFvZ3ltqaRalNC1uWurg2Vs6ySeU7OGELwR4mCSbY0IUxmNm+SvA3wO8XR/Db9lxP8Ahb3iCD7P9j/cWs/h6WCwx4cvl/0CT7G32rGfLHz3GYXkk+bZ5yegfDT4K+LovGnxYb/hdXjC28zxNA3m2SeHppbj/iTaYPMuE/s5/JlGNgTbHmNIn2Hf5kgB9FaTq1jr+lWWp6Ze2+o6bewpc2t5aSrLDPE6hkkR1JDKykEMCQQQRRXgHwq/Z+8eaTpWr3t98XvHHht9a1ObVU0S3t/D8psRKqbllI01ovPkdXmlFuFi82aTBmbfczlAH0VXz9+0z8Qdc0r4TfGO21DQtW8J6Zpeg3N1o3ja01+C0t551to3gUPHOl1BN9qYxBPLZHCL8583y6+ga5TU/wCyP7H8bef/AMJB9m/ef2l9l/tHz/8Ajzi3fYPL/ef6rZj7F/y28zb++8yguEuWSl2PA7z4g/25+0B8JJtJ8eaL4r0i/wBLSOTwxpXiK5h1C2d4TMupvDbzmK9t2VSrfaIwqYjKMzORX0j9p1z+zt/9naf9v+2+X5H29/K+y/aNvm+Z5OfN+z/vPK2bfM/d+Zt/fUXP2P8A4SrTt/8AaH2/7Fc+V5f2j7H5e+DzPN2/uPNz5ezzP3m3zvL+Xzqyv+JR/wAI5/zMH2P+2v8AqI/avtP9o/8Af77N53/bv9n/AOnaqbXRW1f4u/8AX+Whklb7kvu/r+ndnQRyXx1W4jkt7ddNWGJoLhbhjM8paTzEaPYAqqoiKsHYsXcFU2AvUtbnXHs9Ea407T4rubb/AGrFFfu6Wn7li3kOYQZ8TBEG9YcozPwVEbFt9j/4SrUdn9ofb/sVt5vmfaPsfl75/L8rd+483Pmb/L/ebfJ8z5fJrK0z+yP7H8E+R/wkH2b93/Zv2r+0fP8A+POXb9v8z95/qt+ftv8Ay28vd++8upKNW6udcSz1trfTtPlu4d39lRS37ol3+5Ur57iEmDMxdDsWbCKr8ljGtuSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lOf1P+yP7H8bef/wAJB9m/ef2l9l/tHz/+POLd9g8v95/qtmPsX/LbzNv77zK1bn7H/wAJVp2/+0Pt/wBiufK8v7R9j8vfB5nm7f3Hm58vZ5n7zb53l/L51AB9p1z+zt/9naf9v+2+X5H29/K+y/aNvm+Z5OfN+z/vPK2bfM/d+Zt/fVbjkvjqtxHJb266asMTQXC3DGZ5S0nmI0ewBVVREVYOxYu4KpsBfn/+JR/wjn/MwfY/7a/6iP2r7T/aP/f77N53/bv9n/6dq1bb7H/wlWo7P7Q+3/YrbzfM+0fY/L3z+X5W79x5ufM3+X+82+T5ny+TQBVvb3xUnh6wmtNG0efXXhLXllNq8sdtDL9ndgkc4tmaRfPEce4xIfLZ5NpZRE/hXwV1r4pt8RfjV5vg3wem7xMslzs8W3TeVdDw9pfkxJnTBvibbBulO1k8yTEcnlr5nqus/wDCOf8ACvdC+0/8Jh/Y/wBib7L9i/tn+0/L+wTZ+0eV/pfm+T5mPP8A3nn+Vj/SPKr5q+B3/Cuv+Fi/F7yv+Fwf8hqT7P53/CZf8e3/AAj1h5vnb/8Al5/13leb/pH/AB7+T/y70AfZUkl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KVPtOuf2dv/ALO0/wC3/bfL8j7e/lfZftG3zfM8nPm/Z/3nlbNvmfu/M2/vqLn7H/wlWnb/AO0Pt/2K58ry/tH2Py98Hmebt/cebny9nmfvNvneX8vnVlf8Sj/hHP8AmYPsf9tf9RH7V9p/tH/v99m87/t3+z/9O1AHQRyXx1W4jkt7ddNWGJoLhbhjM8paTzEaPYAqqoiKsHYsXcFU2AvUtbnXHs9Ea407T4rubb/asUV+7pafuWLeQ5hBnxMEQb1hyjM/BURsW32P/hKtR2f2h9v+xW3m+Z9o+x+Xvn8vyt37jzc+Zv8AL/ebfJ8z5fJrK0z+yP7H8E+R/wAJB9m/d/2b9q/tHz/+POXb9v8AM/ef6rfn7b/y28vd++8ugDVurnXEs9ba307T5buHd/ZUUt+6Jd/uVK+e4hJgzMXQ7Fmwiq/JYxrbkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJTn9T/sj+x/G3n/8JB9m/ef2l9l/tHz/APjzi3fYPL/ef6rZj7F/y28zb++8ytW5+x/8JVp2/wDtD7f9iufK8v7R9j8vfB5nm7f3Hm58vZ5n7zb53l/L51AB9p1z+zt/9naf9v8Atvl+R9vfyvsv2jb5vmeTnzfs/wC88rZt8z935m399VuOS+Oq3EclvbrpqwxNBcLcMZnlLSeYjR7AFVVERVg7Fi7gqmwF+f8A+JR/wjn/ADMH2P8Atr/qI/avtP8AaP8A3++zed/27/Z/+natW2+x/wDCVajs/tD7f9itvN8z7R9j8vfP5flbv3Hm58zf5f7zb5PmfL5NAHzR4i+JV1pXx18eaHN4/wBB8GalP4H0671VdU8TSXVj4dum+2pJc28EpjVtrfYQRi2DJIsrEMQj9p+ztqN/rv7P+qLPFceII4Zb+ystR0fxPe3smvxR5T7VbXd3L5kHnOH8sC4dUG0rNjkenaZ/ZH9j+CfI/wCEg+zfu/7N+1f2j5//AB5y7ft/mfvP9Vvz9t/5beXu/feXWro32P8AtHXvs39oed9tX7V9t+0eV5n2eHH2fzfk8rZ5efI/d+Z5uf3vm0StLy0t+L/z/wA76WuUk5KSW1vyS/G1/wCnf5H+E3hz4q+AvD1xpni34bfE/wAZ6g06XEWpxfEmF9sT28J8ht+ow5eJ98bOECyMhkGPM2gr7Oorup4uVOCgltpvL/5I4JYWlJttL7l/kFZN1ba49nra2+o6fFdzbv7KllsHdLT9yoXz0EwM+Jg7nY0OUZU4KmRtauU1PTNPm0fxtFL4J/tCG88z7bp/kWZ/4SPNnEh4eQI+5FW2/wBJMf8AqcHEQRzwnYdBJHfHVbeSO4t101YZVnt2t2Mzylo/LdZN4CqqiUMpRixdCGTYQ9T7Nrn9nbP7R0/7f9t8zz/sD+V9l+0bvK8vzs+b9n/d+bv2+Z+88vb+5oubW3fxVp1w2ifaLuOyuY49b2Qn7IjPAXt9xbzR5xVHwilD9m+cqRGGyv7M0/8A4RzyP+EJ/wBG/tr7R/ZPkWf+u/tHzP7Q2+Z5f+t/03du87+LZ537ugDoI474arcSSXFu2mtDEsFutuwmSUNJ5jtJvIZWUxBVCKVKOSz7wEqWttriWeiLcajp8t3Dt/tWWKwdEu/3LBvIQzEwZmKON7TYRWTksJFLa1t08VajcLon2e7ksraOTW9kI+1orzlLfcG80+SWd8OoQfafkLEyBcrTNM0+HR/BMUXgn+z4bPy/sWn+RZj/AIRzFnKg4SQom1Ga2/0Yyf67AzEXcAGrdW2uPZ62tvqOnxXc27+ypZbB3S0/cqF89BMDPiYO52NDlGVOCpka3JHfHVbeSO4t101YZVnt2t2Mzylo/LdZN4CqqiUMpRixdCGTYQ/P6npmnzaP42il8E/2hDeeZ9t0/wAizP8AwkebOJDw8gR9yKtt/pJj/wBTg4iCOdW5tbd/FWnXDaJ9ou47K5jj1vZCfsiM8Be33FvNHnFUfCKUP2b5ypEYYAPs2uf2ds/tHT/t/wBt8zz/ALA/lfZftG7yvL87Pm/Z/wB35u/b5n7zy9v7mrccd8NVuJJLi3bTWhiWC3W3YTJKGk8x2k3kMrKYgqhFKlHJZ94Cc/8A2Zp//COeR/whP+jf219o/snyLP8A139o+Z/aG3zPL/1v+m7t3nfxbPO/d1q21rbp4q1G4XRPs93JZW0cmt7IR9rRXnKW+4N5p8ks74dQg+0/IWJkCgFW9svFT+HrCG01nR4NdSEreXs2kSyW00v2d1DxwC5Vo188xybTK58tXj3BmEqeFfBXRfimvxF+NXm+MvB77fEyx3OzwldL5t0fD2l+TKmdTOyJd0G6I7mfy5MSR+Yvl+q6zoWj3Hw90Kym+Fv9q6dBZNHB4V+y6a39mJ9gmjNvskmFuuY2ezxE7J/pG0nyS7r81fA7wL4Oj+Ivxe2fsufZPK1qS3i/4lfhwfYIX8PWHmaf8t4cfaN8nyx7oT9t/eOu6bYAfZUkd8dVt5I7i3XTVhlWe3a3YzPKWj8t1k3gKqqJQylGLF0IZNhD1Ps2uf2ds/tHT/t/23zPP+wP5X2X7Ru8ry/Oz5v2f935u/b5n7zy9v7mi5tbd/FWnXDaJ9ou47K5jj1vZCfsiM8Be33FvNHnFUfCKUP2b5ypEYbK/szT/wDhHPI/4Qn/AEb+2vtH9k+RZ/67+0fM/tDb5nl/63/Td27zv4tnnfu6AOgjjvhqtxJJcW7aa0MSwW627CZJQ0nmO0m8hlZTEFUIpUo5LPvASpa22uJZ6ItxqOny3cO3+1ZYrB0S7/csG8hDMTBmYo43tNhFZOSwkUtrW3TxVqNwuifZ7uSyto5Nb2Qj7WivOUt9wbzT5JZ3w6hB9p+QsTIFytM0zT4dH8ExReCf7Phs/L+xaf5FmP8AhHMWcqDhJCibUZrb/RjJ/rsDMRdwAat1ba49nra2+o6fFdzbv7KllsHdLT9yoXz0EwM+Jg7nY0OUZU4KmRrckd8dVt5I7i3XTVhlWe3a3YzPKWj8t1k3gKqqJQylGLF0IZNhD8/qemafNo/jaKXwT/aEN55n23T/ACLM/wDCR5s4kPDyBH3Iq23+kmP/AFODiII51bm1t38VadcNon2i7jsrmOPW9kJ+yIzwF7fcW80ecVR8IpQ/ZvnKkRhgA+za5/Z2z+0dP+3/AG3zPP8AsD+V9l+0bvK8vzs+b9n/AHfm79vmfvPL2/uatxx3w1W4kkuLdtNaGJYLdbdhMkoaTzHaTeQyspiCqEUqUcln3gJz/wDZmn/8I55H/CE/6N/bX2j+yfIs/wDXf2j5n9obfM8v/W/6bu3ed/Fs8793WrbWtunirUbhdE+z3cllbRya3shH2tFecpb7g3mnySzvh1CD7T8hYmQKAFrba4lnoi3Go6fLdw7f7VlisHRLv9ywbyEMxMGZijje02EVk5LCRbdlHfJc37Xdxbz27zBrNIbdo2hi8tAUkYuwkbzBI24BBtZF2kqXfn9M0zT4dH8ExReCf7Phs/L+xaf5FmP+EcxZyoOEkKJtRmtv9GMn+uwMxF3Gro1rb2+o688Oif2VJPerJPd7IV/tN/s8Ki4zGxZsKqQZlCv/AKPgDYEZgDWooooAK5TU9T0+HR/G0svjb+z4bPzPtuoefZj/AIRzFnE55eMom1GW5/0kSf67JzEUQdXWTdXOuJZ621vp2ny3cO7+yopb90S7/cqV89xCTBmYuh2LNhFV+SxjUALm6t08Vadbtrf2e7ksrmSPRN8I+1orwB7jaV80+SWRMowQfafnDExlcr+09P8A+Ec8/wD4Tb/Rv7a+z/2t59n/AK7+0fL/ALP3eX5f+t/0Lbt87+Hf537yugkkvhqtvHHb27aa0MrT3DXDCZJQ0flosewhlZTKWYupUogCvvJSp9p1z+zt/wDZ2n/b/tvl+R9vfyvsv2jb5vmeTnzfs/7zytm3zP3fmbf31ABbXVu/irUbddb+0XcdlbSSaJvhP2RGecJcbQvmjzirpl2KH7N8gUiQtlaZqenzaP4Jli8bf2hDeeX9i1Dz7M/8JHmzlccpGEfcitc/6MI/9TkYiDoegjkvjqtxHJb266asMTQXC3DGZ5S0nmI0ewBVVREVYOxYu4KpsBepa3OuPZ6I1xp2nxXc23+1Yor93S0/csW8hzCDPiYIg3rDlGZ+CojYAytT1PT4dH8bSy+Nv7Phs/M+26h59mP+EcxZxOeXjKJtRluf9JEn+uycxFEGrc3VunirTrdtb+z3cllcyR6JvhH2tFeAPcbSvmnySyJlGCD7T84YmMqXVzriWettb6dp8t3Du/sqKW/dEu/3KlfPcQkwZmLodizYRVfksY1tySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3koAc/wD2np//AAjnn/8ACbf6N/bX2f8Atbz7P/Xf2j5f9n7vL8v/AFv+hbdvnfw7/O/eVq211bv4q1G3XW/tF3HZW0kmib4T9kRnnCXG0L5o84q6Zdih+zfIFIkLH2nXP7O3/wBnaf8Ab/tvl+R9vfyvsv2jb5vmeTnzfs/7zytm3zP3fmbf31W45L46rcRyW9uumrDE0FwtwxmeUtJ5iNHsAVVURFWDsWLuCqbAXAOK1nXdHt/h7oV7N8Uv7K06eyaSDxV9q01f7TT7BNIbjfJCbdsRq95mJFT/AEfcR5IdG+avgd468HSfEX4vbP2o/tfm61JcRf8AE08OH7fCnh6w8zUPlsxn7Psk+aPbCPsX7xG2zb/rW9vfFSeHrCa00bR59deEteWU2ryx20Mv2d2CRzi2ZpF88Rx7jEh8tnk2llET+FfBXWvim3xF+NXm+DfB6bvEyyXOzxbdN5V0PD2l+TEmdMG+JtsG6U7WTzJMRyeWvmAHv9zdW6eKtOt21v7PdyWVzJHom+Efa0V4A9xtK+afJLImUYIPtPzhiYyuV/aen/8ACOef/wAJt/o39tfZ/wC1vPs/9d/aPl/2fu8vy/8AW/6Ft2+d/Dv8795XQSSXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpU+065/Z2/+ztP+3/bfL8j7e/lfZftG3zfM8nPm/Z/3nlbNvmfu/M2/vqAC2urd/FWo26639ou47K2kk0TfCfsiM84S42hfNHnFXTLsUP2b5ApEhbK0zU9Pm0fwTLF42/tCG88v7FqHn2Z/wCEjzZyuOUjCPuRWuf9GEf+pyMRB0PQRyXx1W4jkt7ddNWGJoLhbhjM8paTzEaPYAqqoiKsHYsXcFU2AvUtbnXHs9Ea407T4rubb/asUV+7pafuWLeQ5hBnxMEQb1hyjM/BURsAZWp6np8Oj+NpZfG39nw2fmfbdQ8+zH/COYs4nPLxlE2oy3P+kiT/AF2TmIog1bm6t08Vadbtrf2e7ksrmSPRN8I+1orwB7jaV80+SWRMowQfafnDExlS6udcSz1trfTtPlu4d39lRS37ol3+5Ur57iEmDMxdDsWbCKr8ljGtuSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lADn/7T0/8A4Rzz/wDhNv8ARv7a+z/2t59n/rv7R8v+z93l+X/rf9C27fO/h3+d+8rVtrq3fxVqNuut/aLuOytpJNE3wn7IjPOEuNoXzR5xV0y7FD9m+QKRIWPtOuf2dv8A7O0/7f8AbfL8j7e/lfZftG3zfM8nPm/Z/wB55Wzb5n7vzNv76rccl8dVuI5Le3XTVhiaC4W4YzPKWk8xGj2AKqqIirB2LF3BVNgLgHP6ZqenzaP4Jli8bf2hDeeX9i1Dz7M/8JHmzlccpGEfcitc/wCjCP8A1ORiIOh1dGure41HXkh1v+1ZIL1Y57TfC39mP9nhYW+I1DLlWSfEpZ/9IyDsKKpa3OuPZ6I1xp2nxXc23+1Yor93S0/csW8hzCDPiYIg3rDlGZ+Coja3ZSXz3N+t3b28FukwWzeG4aRpovLQl5FKKI28wyLtBcbVRtwLFEALdFFFABXKan/ZH9j+NvP/AOEg+zfvP7S+y/2j5/8Ax5xbvsHl/vP9Vsx9i/5beZt/feZXV1k3Vtrj2etrb6jp8V3Nu/sqWWwd0tP3KhfPQTAz4mDudjQ5RlTgqZGAC5+x/wDCVadv/tD7f9iufK8v7R9j8vfB5nm7f3Hm58vZ5n7zb53l/L51ZX/Eo/4Rz/mYPsf9tf8AUR+1faf7R/7/AH2bzv8At3+z/wDTtXQSR3x1W3kjuLddNWGVZ7drdjM8paPy3WTeAqqolDKUYsXQhk2EPU+za5/Z2z+0dP8At/23zPP+wP5X2X7Ru8ry/Oz5v2f935u/b5n7zy9v7mgAtvsf/CVajs/tD7f9itvN8z7R9j8vfP5flbv3Hm58zf5f7zb5PmfL5NZWmf2R/Y/gnyP+Eg+zfu/7N+1f2j5//HnLt+3+Z+8/1W/P23/lt5e7995ddBHHfDVbiSS4t201oYlgt1t2EyShpPMdpN5DKymIKoRSpRyWfeAlS1ttcSz0RbjUdPlu4dv9qyxWDol3+5YN5CGYmDMxRxvabCKyclhIoBlan/ZH9j+NvP8A+Eg+zfvP7S+y/wBo+f8A8ecW77B5f7z/AFWzH2L/AJbeZt/feZWrc/Y/+Eq07f8A2h9v+xXPleX9o+x+Xvg8zzdv7jzc+Xs8z95t87y/l86i6ttcez1tbfUdPiu5t39lSy2Dulp+5UL56CYGfEwdzsaHKMqcFTI1uSO+Oq28kdxbrpqwyrPbtbsZnlLR+W6ybwFVVEoZSjFi6EMmwhwDn/8AiUf8I5/zMH2P+2v+oj9q+0/2j/3++zed/wBu/wBn/wCnatW2+x/8JVqOz+0Pt/2K283zPtH2Py98/l+Vu/cebnzN/l/vNvk+Z8vk0fZtc/s7Z/aOn/b/ALb5nn/YH8r7L9o3eV5fnZ837P8Au/N37fM/eeXt/c1bjjvhqtxJJcW7aa0MSwW627CZJQ0nmO0m8hlZTEFUIpUo5LPvAQA4rWf+Ec/4V7oX2n/hMP7H+xN9l+xf2z/afl/YJs/aPK/0vzfJ8zHn/vPP8rH+keVXzV8Dv+Fdf8LF+L3lf8Lg/wCQ1J9n87/hMv8Aj2/4R6w83zt//Lz/AK7yvN/0j/j38n/l3r61vbLxU/h6whtNZ0eDXUhK3l7NpEsltNL9ndQ8cAuVaNfPMcm0yufLV49wZhKnhXwV0X4pr8RfjV5vjLwe+3xMsdzs8JXS+bdHw9pfkypnUzsiXdBuiO5n8uTEkfmL5YB7/c/Y/wDhKtO3/wBofb/sVz5Xl/aPsfl74PM83b+483Pl7PM/ebfO8v5fOrK/4lH/AAjn/MwfY/7a/wCoj9q+0/2j/wB/vs3nf9u/2f8A6dq6CSO+Oq28kdxbrpqwyrPbtbsZnlLR+W6ybwFVVEoZSjFi6EMmwh6n2bXP7O2f2jp/2/7b5nn/AGB/K+y/aN3leX52fN+z/u/N37fM/eeXt/c0AFt9j/4SrUdn9ofb/sVt5vmfaPsfl75/L8rd+483Pmb/AC/3m3yfM+XyaytM/sj+x/BPkf8ACQfZv3f9m/av7R8//jzl2/b/ADP3n+q35+2/8tvL3fvvLroI474arcSSXFu2mtDEsFutuwmSUNJ5jtJvIZWUxBVCKVKOSz7wEqWttriWeiLcajp8t3Dt/tWWKwdEu/3LBvIQzEwZmKON7TYRWTksJFAMrU/7I/sfxt5//CQfZv3n9pfZf7R8/wD484t32Dy/3n+q2Y+xf8tvM2/vvMrVufsf/CVadv8A7Q+3/YrnyvL+0fY/L3weZ5u39x5ufL2eZ+82+d5fy+dRdW2uPZ62tvqOnxXc27+ypZbB3S0/cqF89BMDPiYO52NDlGVOCpka3JHfHVbeSO4t101YZVnt2t2Mzylo/LdZN4CqqiUMpRixdCGTYQ4Bz/8AxKP+Ec/5mD7H/bX/AFEftX2n+0f+/wB9m87/ALd/s/8A07Vq232P/hKtR2f2h9v+xW3m+Z9o+x+Xvn8vyt37jzc+Zv8AL/ebfJ8z5fJo+za5/Z2z+0dP+3/bfM8/7A/lfZftG7yvL87Pm/Z/3fm79vmfvPL2/uatxx3w1W4kkuLdtNaGJYLdbdhMkoaTzHaTeQyspiCqEUqUcln3gIAc/pn9kf2P4J8j/hIPs37v+zftX9o+f/x5y7ft/mfvP9Vvz9t/5beXu/feXWro32P+0de+zf2h5321ftX237R5XmfZ4cfZ/N+Tytnl58j935nm5/e+bRa22uJZ6ItxqOny3cO3+1ZYrB0S7/csG8hDMTBmYo43tNhFZOSwkW3ZR3yXN+13cW89u8wazSG3aNoYvLQFJGLsJG8wSNuAQbWRdpKl3ALdFFFABXKanpmnzaP42il8E/2hDeeZ9t0/yLM/8JHmziQ8PIEfcirbf6SY/wDU4OIgjnq6ybrRry4s9bhTXdQtpNQ3fZriKO3L6ZmFYx5AaIq2GUyjzll+d2Bym1FAC5tbd/FWnXDaJ9ou47K5jj1vZCfsiM8Be33FvNHnFUfCKUP2b5ypEYbK/szT/wDhHPI/4Qn/AEb+2vtH9k+RZ/67+0fM/tDb5nl/63/Td27zv4tnnfu66CSymfVbe7W/uI7eKGWJ7FVj8mZmaMrIxKFwyBGChXC4lfcrEIUqf2Nef2d9m/t3UPO+2/avtnl2/m+X9o837NjytnlbP3GdvmeXzv8AN/e0AFta26eKtRuF0T7PdyWVtHJreyEfa0V5ylvuDeafJLO+HUIPtPyFiZAuVpmmafDo/gmKLwT/AGfDZ+X9i0/yLMf8I5izlQcJIUTajNbf6MZP9dgZiLuOgjspk1W4u2v7iS3lhiiSxZY/JhZWkLSKQgcs4dQwZyuIk2qpLl6lro15b2eiQvruoXMmn7ftNxLHbh9TxC0Z88LEFXLMJT5KxfOigYTcjAGVqemafNo/jaKXwT/aEN55n23T/Isz/wAJHmziQ8PIEfcirbf6SY/9Tg4iCOdW5tbd/FWnXDaJ9ou47K5jj1vZCfsiM8Be33FvNHnFUfCKUP2b5ypEYYutGvLiz1uFNd1C2k1Dd9muIo7cvpmYVjHkBoirYZTKPOWX53YHKbUW3JZTPqtvdrf3EdvFDLE9iqx+TMzNGVkYlC4ZAjBQrhcSvuViEKAHP/2Zp/8Awjnkf8IR/o39s/aP7J8iz/139o+Z/aG3zPL/ANb/AKbu3ed/Fs8793XkniX4otqvxS8Aal4Ws9f0GDUdeh8P6xdav4b/ALOXWIPseo3CQf6ZAt0RbyRb1ZNkX+luFaRjIE9w/sa8/s77N/buoed9t+1fbPLt/N8v7R5v2bHlbPK2fuM7fM8vnf5v72srxH8MfDfjPxBZat4k0jT/ABG+neVJplvq2nW1wmmzq7M1xbu0RkSR8xhjvI/cR7Qp3Frg1GSbV0Umle/Z/k/11PB/Aza1Pr+ueFPHfw6m1e0t9OW/0LwPZLolzpuj6XJa3dvFAoZIDHO0aSWciebNCTcYR/IMrR8b8DvAvg6P4i/F7Z+y59k8rWpLeL/iV+HB9ghfw9YeZp/y3hx9o3yfLHuhP239467ptn0p4d+Cmi+CfD507wlKPB95cAvqOr6FpWm211qc5t5IvtFwotfKaQPIJ8rGo8yNRgxl428r+Cvw08RxfEX41bvix4wm8jxMtrJvtNG/0iR/D2l7Ll8aeMSx+Ym0JtjPkR70fMnmZpWil2X9f11JfxNr+v6/DbXc9/ubW3fxVp1w2ifaLuOyuY49b2Qn7IjPAXt9xbzR5xVHwilD9m+cqRGGyv7M0/8A4RzyP+EJ/wBG/tr7R/ZPkWf+u/tHzP7Q2+Z5f+t/03du87+LZ537uugkspn1W3u1v7iO3ihliexVY/JmZmjKyMShcMgRgoVwuJX3KxCFKn9jXn9nfZv7d1Dzvtv2r7Z5dv5vl/aPN+zY8rZ5Wz9xnb5nl87/ADf3tMAtrW3TxVqNwuifZ7uSyto5Nb2Qj7WivOUt9wbzT5JZ3w6hB9p+QsTIFytM0zT4dH8ExReCf7Phs/L+xaf5FmP+EcxZyoOEkKJtRmtv9GMn+uwMxF3HQR2UyarcXbX9xJbywxRJYssfkwsrSFpFIQOWcOoYM5XESbVUly9S10a8t7PRIX13ULmTT9v2m4ljtw+p4haM+eFiCrlmEp8lYvnRQMJuRgDK1PTNPm0fxtFL4J/tCG88z7bp/kWZ/wCEjzZxIeHkCPuRVtv9JMf+pwcRBHOrc2tu/irTrhtE+0Xcdlcxx63shP2RGeAvb7i3mjziqPhFKH7N85UiMMXWjXlxZ63Cmu6hbSahu+zXEUduX0zMKxjyA0RVsMplHnLL87sDlNqLbkspn1W3u1v7iO3ihliexVY/JmZmjKyMShcMgRgoVwuJX3KxCFADn/7M0/8A4RzyP+EJ/wBG/tr7R/ZPkWf+u/tHzP7Q2+Z5f+t/03du87+LZ537utW2tbdPFWo3C6J9nu5LK2jk1vZCPtaK85S33BvNPklnfDqEH2n5CxMgU/sa8/s77N/buoed9t+1fbPLt/N8v7R5v2bHlbPK2fuM7fM8vnf5v72rcdlMmq3F21/cSW8sMUSWLLH5MLK0haRSEDlnDqGDOVxEm1VJcuAc/pmmafDo/gmKLwT/AGfDZ+X9i0/yLMf8I5izlQcJIUTajNbf6MZP9dgZiLuNXRrW3t9R154dE/sqSe9WSe72Qr/ab/Z4VFxmNizYVUgzKFf/AEfAGwIzFro15b2eiQvruoXMmn7ftNxLHbh9TxC0Z88LEFXLMJT5KxfOigYTcjW7Kymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVALdFFFABRRRQAUUUUAFFFFABRRRQAUUUUAVNW0mx1/Sr3TNTsrfUdNvYXtrqzu4llhnidSrxujAhlZSQVIIIJBrwD9n/4VWOk/Fr4vX17q+seIn0TxbFDpKa3crcCxL+H9KBmDbQ8s/kyLb+fM0kvlIRv3T3LzlFAH0VRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH//2Q==
Incorrect
]]>
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
Correct
Graph the ellipse. + = 1
Graph the ellipse.
+ = 1
]]>
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
Correct
]]>
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
Incorrect
]]>
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
Incorrect
]]>
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/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/Kvw31L4ZeD/ij8aLOf8AZj8m7029a9uUTTvDESaBpT6Jp8c0VzM98sVvFMHupNofZKklwQWMdwsdTxd4e8QfBX9mb9nvxdf/ABd1iNNGhsRBZHUvDkNlb3Unh+8gtobS7axdJFeaWK3852uESGWSdztiadOf0eDSte+G37SHhfTv2pf+Eq8Sap/aM8dv/bPh9IPEkjeHLOS4mzNC7w2wcTw4imSOCG22hlMTvQB9v+EvidoPjHx/Z6TeeHLjw949tNMu5pNO1s2I1KwtDLbA48ueQyQTt5LebbmWHdbmOR0mjEdW/wC2fCf/AAhf2n+wtP8A7H/4Sb7L9j8yw8r+0f7Z8r7TnzfK837Z+/xu8/zONn2j91Xzr+0F4K8efDfxbpvjSy+Mvii6Tw74S1rU76e8h8P/AG1dPhvtHlvYrW3FgnmM9tHOVdkKpNHah5IlkYSVP+FHeLv+FL+V/wALe8Qf8lN837L5/h77L/yOW/z/ADfsf/Hz/wAtvI8z/j4/c+T/AMu9AH1rZXukv4/1m0hsLePXYtMsZbq+VrfzprdpbsQRsFczBUdLgqZEEeZX8tmYShOf0LWfCdx4a+Fs1loWn22nah5P/CO28UlgU0zOmzyJ5BjlMbYtlliH2RpfkdiuYd7r5VovwV8XL8ffGUv/AAurxgm7wzoa/bI08PNeS4utWPlyw/2cdkS7so/lrvaSYb5PL2x+f+Bvgd4uj+G37Lif8Le8QQfZ/sf7i1n8PSwWGPDl8v8AoEn2NvtWM+WPnuMwvJJ82zzkAPpXXdZ8J2/hr4pTXuhafc6dp/nf8JFbyyWATU8abBI/nmSURrm2aKI/a2i+RFLYh2O3QXt7pKeP9GtJrC3k12XTL6W1vma386G3WW0E8ahnExV3e3LGNDHmJPMZWMQf5K8dfA7xdJ8Nv2o0/wCFveIJ/tH2z9xdT+HooL/PhyxX/T5Psa/Zc48s/Pb4hSOT5d/nP6BrXwV8XN8ffBsv/C6vGD7fDOuL9skTw8t5Fm60k+XFD/Zw3xNty7+W2xo4Rvj8zbIAeq/2z4T/AOEL+0/2Fp/9j/8ACTfZfsfmWHlf2j/bPlfac+b5Xm/bP3+N3n+Zxs+0fuq6CyvdJfx/rNpDYW8euxaZYy3V8rW/nTW7S3YgjYK5mCo6XBUyII8yv5bMwlCfJX/CjvF3/Cl/K/4W94g/5Kb5v2Xz/D32X/kct/n+b9j/AOPn/lt5Hmf8fH7nyf8Al3r0DRfgr4uX4++Mpf8AhdXjBN3hnQ1+2Rp4ea8lxdasfLlh/s47Il3ZR/LXe0kw3yeXtjAPVdC1nwnceGvhbNZaFp9tp2oeT/wjtvFJYFNMzps8ieQY5TG2LZZYh9kaX5HYrmHe69B4ZvdJuta8WRadYW9neW2ppFqU0LW5a6uDZWzrJJ5Ts4YQvBHiYJJtjQhTGY2b5K8DfA7xdH8Nv2XE/wCFveIIPs/2P9xaz+HpYLDHhy+X/QJPsbfasZ8sfPcZheST5tnnJ6B8NPgr4ui8afFhv+F1eMLbzPE0DebZJ4emluP+JNpg8y4T+zn8mUY2BNseY0ifYd/mSAH0VpOrWOv6VZanpl7b6jpt7Clza3lpKssM8TqGSRHUkMrKQQwJBBBFFeAfCr9n7x5pOlave33xe8ceG31rU5tVTRLe38PymxEqpuWUjTWi8+R1eaUW4WLzZpMGZt9zOUAfRVfP37TPxB1zSvhN8Y7bUNC1bwnpml6Dc3WjeNrTX4LS3nnW2jeBQ8c6XUE32pjEE8tkcIvznzfLr6BrlNT/ALI/sfxt5/8AwkH2b95/aX2X+0fP/wCPOLd9g8v95/qtmPsX/LbzNv77zKC4S5ZKXY8DvPiD/bn7QHwkm0nx5ovivSL/AEtI5PDGleIrmHULZ3hMy6m8NvOYr23ZVKt9ojCpiMozM5FfSP2nXP7O3/2dp/2/7b5fkfb38r7L9o2+b5nk5837P+88rZt8z935m399Rc/Y/wDhKtO3/wBofb/sVz5Xl/aPsfl74PM83b+483Pl7PM/ebfO8v5fOrK/4lH/AAjn/MwfY/7a/wCoj9q+0/2j/wB/vs3nf9u/2f8A6dqptdFbV/i7/wBf5aGSVvuS+7+v6d2dBHJfHVbiOS3t101YYmguFuGMzylpPMRo9gCqqiIqwdixdwVTYC9S1udcez0RrjTtPiu5tv8AasUV+7pafuWLeQ5hBnxMEQb1hyjM/BURsW32P/hKtR2f2h9v+xW3m+Z9o+x+Xvn8vyt37jzc+Zv8v95t8nzPl8msrTP7I/sfwT5H/CQfZv3f9m/av7R8/wD485dv2/zP3n+q35+2/wDLby9377y6ko1bq51xLPW2t9O0+W7h3f2VFLfuiXf7lSvnuISYMzF0OxZsIqvyWMa25JL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yU5/U/7I/sfxt5//AAkH2b95/aX2X+0fP/484t32Dy/3n+q2Y+xf8tvM2/vvMrVufsf/AAlWnb/7Q+3/AGK58ry/tH2Py98Hmebt/cebny9nmfvNvneX8vnUAH2nXP7O3/2dp/2/7b5fkfb38r7L9o2+b5nk5837P+88rZt8z935m399VuOS+Oq3EclvbrpqwxNBcLcMZnlLSeYjR7AFVVERVg7Fi7gqmwF+f/4lH/COf8zB9j/tr/qI/avtP9o/9/vs3nf9u/2f/p2rVtvsf/CVajs/tD7f9itvN8z7R9j8vfP5flbv3Hm58zf5f7zb5PmfL5NAHlXxqudcubr4K28unafLqt54maS50R79zp091DoeqXUMTzGHc0Ud3bwSLKYNytDHKIw6KByvwV1r4pt8RfjV5vg3wem7xMslzs8W3TeVdDw9pfkxJnTBvibbBulO1k8yTEcnlr5mr8av7ItvD/wV1CX/AISCLwlZ6032m6f+0RqcFtN4f1S1h3sf9MW5kluIIVyftDTzRoMzOoPlXwO/4V1/wsX4veV/wuD/AJDUn2fzv+Ey/wCPb/hHrDzfO3/8vP8ArvK83/SP+Pfyf+XegD6/1vTf7d8zSL/StP1Tw3f2VxBqEd62/wAzdsUQmAxlJYnRpt5Zhjao2uHJTzX9m7X/ABVqfwB8LRatHb6l4s0WaTw1q1xc6pLKt3Lp98+n3d4J2h3u0gtpZ1V0BZmVGZcmQelXP2P/AISrTt/9ofb/ALFc+V5f2j7H5e+DzPN2/uPNz5ezzP3m3zvL+Xzq8q+B/wBj/wCFU6l9u/tDyf8AhYHiHb/Zn2jzfM/4Sq98vd9n+fyt+3zM/u/L3+b+630AewRyXx1W4jkt7ddNWGJoLhbhjM8paTzEaPYAqqoiKsHYsXcFU2AvUtbnXHs9Ea407T4rubb/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+HUIPtPyFiZAoBwHxx8G+L/FfwaNppM+n6n4v0v7NrUVuloYINU1KxK3dpCgef/R4pL23tt2+R8Q+Ym9WYTJ5V+zRffEDxvrfxR8SaT488H6joura1b3sVyng69h+1PP4a0qS0uEV9S3RRBZLYtC4Z22SfPGZB5XtWs6Fo9x8PdCspvhb/aunQWTRweFfsumt/ZifYJozb7JJhbrmNns8ROyf6RtJ8ku6/IHwO+H+leFPi78Xl079lD7f4bbWpIo4vs3h9tR0eS40mwNxZb5tRKNbTpdTv5UTLHEsmweYJnjtwD7U+IfjH/hXehX3ie9f7RounWUrSaXaWvmX9/dM0a2sFqTKqmWRt0KQlS0sk8IVlIIfn/gp4B8VfDr4JeEPDOrato914ssIYP7W1O2spXgvJTMJLuQhpVeSeYNKWuHILzSNO0fzGKsqy8M6j8UfH+heJPGfgu40XT9Lhmk0jTL1rKaa2mWW3YyX0kM0gZmkjjkgghaSFDaLPM/ni2S27X+zNP8A+Ec8j/hCf9G/tr7R/ZPkWf8Arv7R8z+0NvmeX/rf9N3bvO/i2ed+7oA6COO+Gq3EklxbtprQxLBbrbsJklDSeY7SbyGVlMQVQilSjks+8BKlrba4lnoi3Go6fLdw7f7VlisHRLv9ywbyEMxMGZijje02EVk5LCRS2tbdPFWo3C6J9nu5LK2jk1vZCPtaK85S33BvNPklnfDqEH2n5CxMgXK0zTNPh0fwTFF4J/s+Gz8v7Fp/kWY/4RzFnKg4SQom1Ga2/wBGMn+uwMxF3ABq3Vtrj2etrb6jp8V3Nu/sqWWwd0tP3KhfPQTAz4mDudjQ5RlTgqZGtyR3x1W3kjuLddNWGVZ7drdjM8paPy3WTeAqqolDKUYsXQhk2EPz+p6Zp82j+NopfBP9oQ3nmfbdP8izP/CR5s4kPDyBH3Iq23+kmP8A1ODiII51bm1t38VadcNon2i7jsrmOPW9kJ+yIzwF7fcW80ecVR8IpQ/ZvnKkRhgA+za5/Z2z+0dP+3/bfM8/7A/lfZftG7yvL87Pm/Z/3fm79vmfvPL2/uatxx3w1W4kkuLdtNaGJYLdbdhMkoaTzHaTeQyspiCqEUqUcln3gJz/APZmn/8ACOeR/wAIT/o39tfaP7J8iz/139o+Z/aG3zPL/wBb/pu7d538Wzzv3datta26eKtRuF0T7PdyWVtHJreyEfa0V5ylvuDeafJLO+HUIPtPyFiZAoAWttriWeiLcajp8t3Dt/tWWKwdEu/3LBvIQzEwZmKON7TYRWTksJFt2Ud8lzftd3FvPbvMGs0ht2jaGLy0BSRi7CRvMEjbgEG1kXaSpd+f0zTNPh0fwTFF4J/s+Gz8v7Fp/kWY/wCEcxZyoOEkKJtRmtv9GMn+uwMxF3Gro1rb2+o688Oif2VJPerJPd7IV/tN/s8Ki4zGxZsKqQZlCv8A6PgDYEZgDWooooAK5TU9T0+HR/G0svjb+z4bPzPtuoefZj/hHMWcTnl4yibUZbn/AEkSf67JzEUQdXWTdXOuJZ621vp2ny3cO7+yopb90S7/AHKlfPcQkwZmLodizYRVfksY1AC5urdPFWnW7a39nu5LK5kj0TfCPtaK8Ae42lfNPklkTKMEH2n5wxMZXK/tPT/+Ec8//hNv9G/tr7P/AGt59n/rv7R8v+z93l+X/rf9C27fO/h3+d+8roJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUqfadc/s7f/Z2n/b/ALb5fkfb38r7L9o2+b5nk5837P8AvPK2bfM/d+Zt/fUAFtdW7+KtRt11v7Rdx2VtJJom+E/ZEZ5wlxtC+aPOKumXYofs3yBSJC2Vpmp6fNo/gmWLxt/aEN55f2LUPPsz/wAJHmzlccpGEfcitc/6MI/9TkYiDoegjkvjqtxHJb266asMTQXC3DGZ5S0nmI0ewBVVREVYOxYu4KpsBepa3OuPZ6I1xp2nxXc23+1Yor93S0/csW8hzCDPiYIg3rDlGZ+CojYAytT1PT4dH8bSy+Nv7Phs/M+26h59mP8AhHMWcTnl4yibUZbn/SRJ/rsnMRRBq3N1bp4q063bW/s93JZXMkeib4R9rRXgD3G0r5p8ksiZRgg+0/OGJjKl1c64lnrbW+nafLdw7v7Kilv3RLv9ypXz3EJMGZi6HYs2EVX5LGNbckl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KAHP/2np/8Awjnn/wDCbf6N/bX2f+1vPs/9d/aPl/2fu8vy/wDW/wChbdvnfw7/ADv3lattdW7+KtRt11v7Rdx2VtJJom+E/ZEZ5wlxtC+aPOKumXYofs3yBSJCx9p1z+zt/wDZ2n/b/tvl+R9vfyvsv2jb5vmeTnzfs/7zytm3zP3fmbf31W45L46rcRyW9uumrDE0FwtwxmeUtJ5iNHsAVVURFWDsWLuCqbAXAOK1nXdHt/h7oV7N8Uv7K06eyaSDxV9q01f7TT7BNIbjfJCbdsRq95mJFT/R9xHkh0b5q+B3jrwdJ8Rfi9s/aj+1+brUlxF/xNPDh+3wp4esPM1D5bMZ+z7JPmj2wj7F+8Rts2/61vb3xUnh6wmtNG0efXXhLXllNq8sdtDL9ndgkc4tmaRfPEce4xIfLZ5NpZRE/hXwV1r4pt8RfjV5vg3wem7xMslzs8W3TeVdDw9pfkxJnTBvibbBulO1k8yTEcnlr5gB7/c3VunirTrdtb+z3cllcyR6JvhH2tFeAPcbSvmnySyJlGCD7T84YmMrlf2np/8Awjnn/wDCbf6N/bX2f+1vPs/9d/aPl/2fu8vy/wDW/wChbdvnfw7/ADv3ldBJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSlT7Trn9nb/7O0/7f9t8vyPt7+V9l+0bfN8zyc+b9n/eeVs2+Z+78zb++oALa6t38Vajbrrf2i7jsraSTRN8J+yIzzhLjaF80ecVdMuxQ/ZvkCkSFsrTNT0+bR/BMsXjb+0Ibzy/sWoefZn/hI82crjlIwj7kVrn/AEYR/wCpyMRB0PQRyXx1W4jkt7ddNWGJoLhbhjM8paTzEaPYAqqoiKsHYsXcFU2AvUtbnXHs9Ea407T4rubb/asUV+7pafuWLeQ5hBnxMEQb1hyjM/BURsAZWp6np8Oj+NpZfG39nw2fmfbdQ8+zH/COYs4nPLxlE2oy3P8ApIk/12TmIog1bm6t08Vadbtrf2e7ksrmSPRN8I+1orwB7jaV80+SWRMowQfafnDExlS6udcSz1trfTtPlu4d39lRS37ol3+5Ur57iEmDMxdDsWbCKr8ljGtuSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lADn/wC09P8A+Ec8/wD4Tb/Rv7a+z/2t59n/AK7+0fL/ALP3eX5f+t/0Lbt87+Hf537ytW2urd/FWo26639ou47K2kk0TfCfsiM84S42hfNHnFXTLsUP2b5ApEhY+065/Z2/+ztP+3/bfL8j7e/lfZftG3zfM8nPm/Z/3nlbNvmfu/M2/vqtxyXx1W4jkt7ddNWGJoLhbhjM8paTzEaPYAqqoiKsHYsXcFU2AuAc/pmp6fNo/gmWLxt/aEN55f2LUPPsz/wkebOVxykYR9yK1z/owj/1ORiIOh1dGure41HXkh1v+1ZIL1Y57TfC39mP9nhYW+I1DLlWSfEpZ/8ASMg7CiqWtzrj2eiNcadp8V3Nt/tWKK/d0tP3LFvIcwgz4mCIN6w5RmfgqI2t2Ul89zfrd29vBbpMFs3huGkaaLy0JeRSiiNvMMi7QXG1UbcCxRAC3RRRQAVymp/2R/Y/jbz/APhIPs37z+0vsv8AaPn/APHnFu+weX+8/wBVsx9i/wCW3mbf33mV1dZN1ba49nra2+o6fFdzbv7KllsHdLT9yoXz0EwM+Jg7nY0OUZU4KmRgAufsf/CVadv/ALQ+3/YrnyvL+0fY/L3weZ5u39x5ufL2eZ+82+d5fy+dWV/xKP8AhHP+Zg+x/wBtf9RH7V9p/tH/AL/fZvO/7d/s/wD07V0Ekd8dVt5I7i3XTVhlWe3a3YzPKWj8t1k3gKqqJQylGLF0IZNhD1Ps2uf2ds/tHT/t/wBt8zz/ALA/lfZftG7yvL87Pm/Z/wB35u/b5n7zy9v7mgAtvsf/AAlWo7P7Q+3/AGK283zPtH2Py98/l+Vu/cebnzN/l/vNvk+Z8vk1laZ/ZH9j+CfI/wCEg+zfu/7N+1f2j5//AB5y7ft/mfvP9Vvz9t/5beXu/feXXQRx3w1W4kkuLdtNaGJYLdbdhMkoaTzHaTeQyspiCqEUqUcln3gJUtbbXEs9EW41HT5buHb/AGrLFYOiXf7lg3kIZiYMzFHG9psIrJyWEigGVqf9kf2P428//hIPs37z+0vsv9o+f/x5xbvsHl/vP9Vsx9i/5beZt/feZWrc/Y/+Eq07f/aH2/7Fc+V5f2j7H5e+DzPN2/uPNz5ezzP3m3zvL+XzqLq21x7PW1t9R0+K7m3f2VLLYO6Wn7lQvnoJgZ8TB3OxocoypwVMjW5I746rbyR3FuumrDKs9u1uxmeUtH5brJvAVVUShlKMWLoQybCHAOf/AOJR/wAI5/zMH2P+2v8AqI/avtP9o/8Af77N53/bv9n/AOnatW2+x/8ACVajs/tD7f8AYrbzfM+0fY/L3z+X5W79x5ufM3+X+82+T5ny+TR9m1z+ztn9o6f9v+2+Z5/2B/K+y/aN3leX52fN+z/u/N37fM/eeXt/c1bjjvhqtxJJcW7aa0MSwW627CZJQ0nmO0m8hlZTEFUIpUo5LPvAQA4rWf8AhHP+Fe6F9p/4TD+x/sTfZfsX9s/2n5f2CbP2jyv9L83yfMx5/wC88/ysf6R5VfNXwO/4V1/wsX4veV/wuD/kNSfZ/O/4TL/j2/4R6w83zt//AC8/67yvN/0j/j38n/l3r61vbLxU/h6whtNZ0eDXUhK3l7NpEsltNL9ndQ8cAuVaNfPMcm0yufLV49wZhKnhXwV0X4pr8RfjV5vjLwe+3xMsdzs8JXS+bdHw9pfkypnUzsiXdBuiO5n8uTEkfmL5YB7/AHP2P/hKtO3/ANofb/sVz5Xl/aPsfl74PM83b+483Pl7PM/ebfO8v5fOrK/4lH/COf8AMwfY/wC2v+oj9q+0/wBo/wDf77N53/bv9n/6dq6CSO+Oq28kdxbrpqwyrPbtbsZnlLR+W6ybwFVVEoZSjFi6EMmwh6n2bXP7O2f2jp/2/wC2+Z5/2B/K+y/aN3leX52fN+z/ALvzd+3zP3nl7f3NABbfY/8AhKtR2f2h9v8AsVt5vmfaPsfl75/L8rd+483Pmb/L/ebfJ8z5fJrK0z+yP7H8E+R/wkH2b93/AGb9q/tHz/8Ajzl2/b/M/ef6rfn7b/y28vd++8uugjjvhqtxJJcW7aa0MSwW627CZJQ0nmO0m8hlZTEFUIpUo5LPvASpa22uJZ6ItxqOny3cO3+1ZYrB0S7/AHLBvIQzEwZmKON7TYRWTksJFAMrU/7I/sfxt5//AAkH2b95/aX2X+0fP/484t32Dy/3n+q2Y+xf8tvM2/vvMrVufsf/AAlWnb/7Q+3/AGK58ry/tH2Py98Hmebt/cebny9nmfvNvneX8vnUXVtrj2etrb6jp8V3Nu/sqWWwd0tP3KhfPQTAz4mDudjQ5RlTgqZGtyR3x1W3kjuLddNWGVZ7drdjM8paPy3WTeAqqolDKUYsXQhk2EOAc/8A8Sj/AIRz/mYPsf8AbX/UR+1faf7R/wC/32bzv+3f7P8A9O1att9j/wCEq1HZ/aH2/wCxW3m+Z9o+x+Xvn8vyt37jzc+Zv8v95t8nzPl8mj7Nrn9nbP7R0/7f9t8zz/sD+V9l+0bvK8vzs+b9n/d+bv2+Z+88vb+5q3HHfDVbiSS4t201oYlgt1t2EyShpPMdpN5DKymIKoRSpRyWfeAgBz+mf2R/Y/gnyP8AhIPs37v+zftX9o+f/wAecu37f5n7z/Vb8/bf+W3l7v33l1q6N9j/ALR177N/aHnfbV+1fbftHleZ9nhx9n835PK2eXnyP3fmebn975tFrba4lnoi3Go6fLdw7f7VlisHRLv9ywbyEMxMGZijje02EVk5LCRbdlHfJc37Xdxbz27zBrNIbdo2hi8tAUkYuwkbzBI24BBtZF2kqXcAt0UUUAFcpqemafNo/jaKXwT/AGhDeeZ9t0/yLM/8JHmziQ8PIEfcirbf6SY/9Tg4iCOerrJutGvLiz1uFNd1C2k1Dd9muIo7cvpmYVjHkBoirYZTKPOWX53YHKbUUALm1t38VadcNon2i7jsrmOPW9kJ+yIzwF7fcW80ecVR8IpQ/ZvnKkRhsr+zNP8A+Ec8j/hCf9G/tr7R/ZPkWf8Arv7R8z+0NvmeX/rf9N3bvO/i2ed+7roJLKZ9Vt7tb+4jt4oZYnsVWPyZmZoysjEoXDIEYKFcLiV9ysQhSp/Y15/Z32b+3dQ877b9q+2eXb+b5f2jzfs2PK2eVs/cZ2+Z5fO/zf3tABbWtunirUbhdE+z3cllbRya3shH2tFecpb7g3mnySzvh1CD7T8hYmQLlaZpmnw6P4Jii8E/2fDZ+X9i0/yLMf8ACOYs5UHCSFE2ozW3+jGT/XYGYi7joI7KZNVuLtr+4kt5YYoksWWPyYWVpC0ikIHLOHUMGcriJNqqS5epa6NeW9nokL67qFzJp+37TcSx24fU8QtGfPCxBVyzCU+SsXzooGE3IwBlanpmnzaP42il8E/2hDeeZ9t0/wAizP8AwkebOJDw8gR9yKtt/pJj/wBTg4iCOdW5tbd/FWnXDaJ9ou47K5jj1vZCfsiM8Be33FvNHnFUfCKUP2b5ypEYYutGvLiz1uFNd1C2k1Dd9muIo7cvpmYVjHkBoirYZTKPOWX53YHKbUW3JZTPqtvdrf3EdvFDLE9iqx+TMzNGVkYlC4ZAjBQrhcSvuViEKAHP/wBmaf8A8I55H/CEf6N/bP2j+yfIs/8AXf2j5n9obfM8v/W/6bu3ed/Fs8793XkniX4otqvxS8Aal4Ws9f0GDUdeh8P6xdav4b/s5dYg+x6jcJB/pkC3RFvJFvVk2Rf6W4VpGMgT3D+xrz+zvs39u6h53237V9s8u383y/tHm/ZseVs8rZ+4zt8zy+d/m/vayvEfwx8N+M/EFlq3iTSNP8Rvp3lSaZb6tp1tcJps6uzNcW7tEZEkfMYY7yP3Ee0Kdxa4NRkm1dFJpXv2f5P9dTwfwM2tT6/rnhTx38OptXtLfTlv9C8D2S6Jc6bo+lyWt3bxQKGSAxztGklnInmzQk3GEfyDK0fG/A7wL4Oj+Ivxe2fsufZPK1qS3i/4lfhwfYIX8PWHmaf8t4cfaN8nyx7oT9t/eOu6bZ9KeHfgpovgnw+dO8JSjwfeXAL6jq+haVpttdanObeSL7RcKLXymkDyCfKxqPMjUYMZeNvK/gr8NPEcXxF+NW74seMJvI8TLayb7TRv9Ikfw9pey5fGnjEsfmJtCbYz5Ee9HzJ5maVopdl/X9dSX8Ta/r+vw213Pf7m1t38VadcNon2i7jsrmOPW9kJ+yIzwF7fcW80ecVR8IpQ/ZvnKkRhsr+zNP8A+Ec8j/hCf9G/tr7R/ZPkWf8Arv7R8z+0NvmeX/rf9N3bvO/i2ed+7roJLKZ9Vt7tb+4jt4oZYnsVWPyZmZoysjEoXDIEYKFcLiV9ysQhSp/Y15/Z32b+3dQ877b9q+2eXb+b5f2jzfs2PK2eVs/cZ2+Z5fO/zf3tMAtrW3TxVqNwuifZ7uSyto5Nb2Qj7WivOUt9wbzT5JZ3w6hB9p+QsTIFytM0zT4dH8ExReCf7Phs/L+xaf5FmP8AhHMWcqDhJCibUZrb/RjJ/rsDMRdx0EdlMmq3F21/cSW8sMUSWLLH5MLK0haRSEDlnDqGDOVxEm1VJcvUtdGvLez0SF9d1C5k0/b9puJY7cPqeIWjPnhYgq5ZhKfJWL50UDCbkYAytT0zT5tH8bRS+Cf7QhvPM+26f5Fmf+EjzZxIeHkCPuRVtv8ASTH/AKnBxEEc6tza27+KtOuG0T7Rdx2VzHHreyE/ZEZ4C9vuLeaPOKo+EUofs3zlSIwxdaNeXFnrcKa7qFtJqG77NcRR25fTMwrGPIDRFWwymUecsvzuwOU2otuSymfVbe7W/uI7eKGWJ7FVj8mZmaMrIxKFwyBGChXC4lfcrEIUAOf/ALM0/wD4RzyP+EJ/0b+2vtH9k+RZ/wCu/tHzP7Q2+Z5f+t/03du87+LZ537utW2tbdPFWo3C6J9nu5LK2jk1vZCPtaK85S33BvNPklnfDqEH2n5CxMgU/sa8/s77N/buoed9t+1fbPLt/N8v7R5v2bHlbPK2fuM7fM8vnf5v72rcdlMmq3F21/cSW8sMUSWLLH5MLK0haRSEDlnDqGDOVxEm1VJcuAc/pmmafDo/gmKLwT/Z8Nn5f2LT/Isx/wAI5izlQcJIUTajNbf6MZP9dgZiLuNXRrW3t9R154dE/sqSe9WSe72Qr/ab/Z4VFxmNizYVUgzKFf8A0fAGwIzFro15b2eiQvruoXMmn7ftNxLHbh9TxC0Z88LEFXLMJT5KxfOigYTcjW7Kymtbm/llv7i8S5mEsUMyxhbVRGieXHsRSVLI0mXLtukcbgoVVALdFFFABRRRQAUUUUAFFFFABRRRQAUUUUAVNW0mx1/Sr3TNTsrfUdNvYXtrqzu4llhnidSrxujAhlZSQVIIIJBrwD9n/wCFVjpPxa+L19e6vrHiJ9E8WxQ6Smt3K3AsS/h/SgZg20PLP5Mi2/nzNJL5SEb909y85RQB9FUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB//2Q==
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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/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+3zP3nl7f3Nea/G+O+8Z6rpnwvW4t5NN8ZwsupW627LNBo9u3/ABNXaQvh1uFnsrFVj8uWI3jzqz+WRGAcVrOsS/GX4e6FceGfEPjDwh8LjZMth4i0my1S58SaxH9gmPnwFg8kMQiDKs15DNJcSsGhWOUWlxN5V8N9A+HXifxR8aNNh1L44aPJLrTNZahYz+Mobi3jTQNPdpJC4KtchlkMaXKvI48hFR0aFG+yr2y8VP4esIbTWdHg11ISt5ezaRLJbTS/Z3UPHALlWjXzzHJtMrny1ePcGYSp4V8FdF+Ka/EX41eb4y8Hvt8TLHc7PCV0vm3R8PaX5MqZ1M7Il3QbojuZ/LkxJH5i+WAeleCvGrap4/l8K+JoriDx/oemG4nOmLdDSL2xnlVY7xRuaKNpHt3VYZ2M8TRXKxtJFmeboP8AiUf8I5/zMH2P+2v+oj9q+0/2j/3++zed/wBu/wBn/wCnauK+PEd94M1Xw58V7W4t49N8GQ3a6/btbs00+j3DW/2x1k34RbdYEvGVYZJZTZpFGyeY4k9K+za5/Z2z+0dP+3/bfM8/7A/lfZftG7yvL87Pm/Z/3fm79vmfvPL2/uaAC2+x/wDCVajs/tD7f9itvN8z7R9j8vfP5flbv3Hm58zf5f7zb5PmfL5NZWmf2R/Y/gnyP+Eg+zfu/wCzftX9o+f/AMecu37f5n7z/Vb8/bf+W3l7v33l10Ecd8NVuJJLi3bTWhiWC3W3YTJKGk8x2k3kMrKYgqhFKlHJZ94CVLW21xLPRFuNR0+W7h2/2rLFYOiXf7lg3kIZiYMzFHG9psIrJyWEigGVqf8AZH9j+NvP/wCEg+zfvP7S+y/2j5//AB5xbvsHl/vP9Vsx9i/5beZt/feZWrc/Y/8AhKtO3/2h9v8AsVz5Xl/aPsfl74PM83b+483Pl7PM/ebfO8v5fOourbXHs9bW31HT4rubd/ZUstg7pafuVC+egmBnxMHc7GhyjKnBUyNbkjvjqtvJHcW66asMqz27W7GZ5S0flusm8BVVRKGUoxYuhDJsIcA5/wD4lH/COf8AMwfY/wC2v+oj9q+0/wBo/wDf77N53/bv9n/6dq1bb7H/AMJVqOz+0Pt/2K283zPtH2Py98/l+Vu/cebnzN/l/vNvk+Z8vk0fZtc/s7Z/aOn/AG/7b5nn/YH8r7L9o3eV5fnZ837P+783ft8z955e39zVuOO+Gq3EklxbtprQxLBbrbsJklDSeY7SbyGVlMQVQilSjks+8BADn9M/sj+x/BPkf8JB9m/d/wBm/av7R8//AI85dv2/zP3n+q35+2/8tvL3fvvLrV0b7H/aOvfZv7Q877av2r7b9o8rzPs8OPs/m/J5Wzy8+R+78zzc/vfNotbbXEs9EW41HT5buHb/AGrLFYOiXf7lg3kIZiYMzFHG9psIrJyWEi27KO+S5v2u7i3nt3mDWaQ27RtDF5aApIxdhI3mCRtwCDayLtJUu4BbooooAqR6tYzarcaZHe276lbQxXM9msqmaKKRpFjkZM5VXaGUKxGCY3AztOOK13WfCdv4a+KU17oWn3Onaf53/CRW8slgE1PGmwSP55klEa5tmiiP2tovkRS2Idjt5r8PP2fvHnhnVfFlld/F7xxAl3qcmqx63a2/h9xqYnZsLMJNNeVZ4EjjhIJMXlJb+UUXNtb+aeOvgd4uk+G37Uaf8Le8QT/aPtn7i6n8PRQX+fDliv8Ap8n2NfsuceWfnt8QpHJ8u/znAPrW9vdJTx/o1pNYW8muy6ZfS2t8zW/nQ26y2gnjUM4mKu725YxoY8xJ5jKxiD8//bPhP/hC/tP9haf/AGP/AMJN9l+x+ZYeV/aP9s+V9pz5vleb9s/f43ef5nGz7R+6ryrWvgr4ub4++DZf+F1eMH2+GdcX7ZInh5byLN1pJ8uKH+zhvibbl38ttjRwjfH5m2Tz/wD4Ud4u/wCFL+V/wt7xB/yU3zfsvn+Hvsv/ACOW/wA/zfsf/Hz/AMtvI8z/AI+P3Pk/8u9AH1rZXukv4/1m0hsLePXYtMsZbq+VrfzprdpbsQRsFczBUdLgqZEEeZX8tmYShOf0LWfCdx4a+Fs1loWn22nah5P/AAjtvFJYFNMzps8ieQY5TG2LZZYh9kaX5HYrmHe6+VaL8FfFy/H3xlL/AMLq8YJu8M6Gv2yNPDzXkuLrVj5csP8AZx2RLuyj+Wu9pJhvk8vbH5/4G+B3i6P4bfsuJ/wt7xBB9n+x/uLWfw9LBYY8OXy/6BJ9jb7VjPlj57jMLySfNs85AD6V13WfCdv4a+KU17oWn3Onaf53/CRW8slgE1PGmwSP55klEa5tmiiP2tovkRS2Idjt0F7e6Snj/RrSawt5Ndl0y+ltb5mt/Oht1ltBPGoZxMVd3tyxjQx5iTzGVjEH+SvHXwO8XSfDb9qNP+FveIJ/tH2z9xdT+HooL/PhyxX/AE+T7Gv2XOPLPz2+IUjk+Xf5z+ga18FfFzfH3wbL/wALq8YPt8M64v2yRPDy3kWbrST5cUP9nDfE23Lv5bbGjhG+PzNsgB6r/bPhP/hC/tP9haf/AGP/AMJN9l+x+ZYeV/aP9s+V9pz5vleb9s/f43ef5nGz7R+6rn9J0mx1D9rvxVqc9lbtqWkeBtItrO8WJUmSK81DUmuI2cAGRS1halVcsIyrlNvmy7/Cv+FHeLv+FL+V/wALe8Qf8lN837L5/h77L/yOW/z/ADfsf/Hz/wAtvI8z/j4/c+T/AMu9droHwn8UP+0l46tF+M/jiO4i8JeHpXvls9C86ZWvNaCxsDphQKhRipVA2ZX3MwCBAD0u/v8AwXqvwx8DKvgbT9d0TVrLy9D8ORf2VIiI2lXLi3gDzi3fdarNbgQO6FJW58jzJF+dfhL4c8AeHfGHxr1PUP2aLfQ9N03U7gyXl3YeGoYdJtP+EcsWnsnf7biNZlaUnYTDi8JldMzbDw58JPEHh34Q/s0ahqfxr1jR9N0qG2ubqU3nhz7FpMSeGr/fJaTtZkXCouU3F5x5LSSnOzzk4nUdR0Lx14T/AGmtC0L9pr+29V1T7ebHTW1fwyia+i+GbLfLI/2RcRDy5YXkheJES2YlldJJCAfcHjnQ/CvjXVf+EQ8Q6Pb6i+u+H9UtHlaaKOb+z3a1iu4FIkW4CyebAWaIFQY03sjeSG4n4W6/p8nwQ0x/Eum6fqc1l4ml0W9m8iztYr/VbfXnszqflOY4o5ZryP7Z5aEuJJNsfmy7N/K618FfFzfH3wbL/wALq8YPt8M64v2yRPDy3kWbrST5cUP9nDfE23Lv5bbGjhG+PzNsnmumfCHxRq3wPdoPi34oRE+KcyG0uV0KCDdH42YNcB5LFSZyyGdYw+15isaxMrLCQD6/sr3SX8f6zaQ2FvHrsWmWMt1fK1v501u0t2II2CuZgqOlwVMiCPMr+WzMJQnP6FrPhO48NfC2ay0LT7bTtQ8n/hHbeKSwKaZnTZ5E8gxymNsWyyxD7I0vyOxXMO918q0X4K+Ll+PvjKX/AIXV4wTd4Z0NftkaeHmvJcXWrHy5Yf7OOyJd2Ufy13tJMN8nl7Y/P/A3wO8XR/Db9lxP+FveIIPs/wBj/cWs/h6WCwx4cvl/0CT7G32rGfLHz3GYXkk+bZ5yAH0rrus+E7fw18Upr3QtPudO0/zv+Eit5ZLAJqeNNgkfzzJKI1zbNFEftbRfIilsQ7HboL290lPH+jWk1hbya7Lpl9La3zNb+dDbrLaCeNQziYq7vbljGhjzEnmMrGIP8leOvgd4uk+G37Uaf8Le8QT/AGj7Z+4up/D0UF/nw5Yr/p8n2NfsuceWfnt8QpHJ8u/zn9A1r4K+Lm+Pvg2X/hdXjB9vhnXF+2SJ4eW8izdaSfLih/s4b4m25d/LbY0cI3x+ZtkAPVf7Z8J/8IX9p/sLT/7H/wCEm+y/Y/MsPK/tH+2fK+0583yvN+2fv8bvP8zjZ9o/dV0Fle6S/j/WbSGwt49di0yxlur5Wt/Omt2luxBGwVzMFR0uCpkQR5lfy2ZhKE+Sv+FHeLv+FL+V/wALe8Qf8lN837L5/h77L/yOW/z/ADfsf/Hz/wAtvI8z/j4/c+T/AMu9egaL8FfFy/H3xlL/AMLq8YJu8M6Gv2yNPDzXkuLrVj5csP8AZx2RLuyj+Wu9pJhvk8vbGAeq6FrPhO48NfC2ay0LT7bTtQ8n/hHbeKSwKaZnTZ5E8gxymNsWyyxD7I0vyOxXMO916Dwze6Tda14si06wt7O8ttTSLUpoWty11cGytnWSTynZwwheCPEwSTbGhCmMxs3yV4G+B3i6P4bfsuJ/wt7xBB9n+x/uLWfw9LBYY8OXy/6BJ9jb7VjPlj57jMLySfNs85PQPhp8FfF0XjT4sN/wurxhbeZ4mgbzbJPD00tx/wASbTB5lwn9nP5MoxsCbY8xpE+w7/MkAPorSdWsdf0qy1PTL231HTb2FLm1vLSVZYZ4nUMkiOpIZWUghgSCCCKK8A+FX7P3jzSdK1e9vvi9448NvrWpzaqmiW9v4flNiJVTcspGmtF58jq80otwsXmzSYMzb7mcoA+iq+fv2mfiDrmlfCb4x22oaFq3hPTNL0G5utG8bWmvwWlvPOttG8Ch450uoJvtTGIJ5bI4RfnPm+XX0DXKan/ZH9j+NvP/AOEg+zfvP7S+y/2j5/8Ax5xbvsHl/vP9Vsx9i/5beZt/feZQXCXLJS7Hgd58Qf7c/aA+Ek2k+PNF8V6Rf6WkcnhjSvEVzDqFs7wmZdTeG3nMV7bsqlW+0RhUxGUZmcivpH7Trn9nb/7O0/7f9t8vyPt7+V9l+0bfN8zyc+b9n/eeVs2+Z+78zb++oufsf/CVadv/ALQ+3/YrnyvL+0fY/L3weZ5u39x5ufL2eZ+82+d5fy+dWV/xKP8AhHP+Zg+x/wBtf9RH7V9p/tH/AL/fZvO/7d/s/wD07VTa6K2r/F3/AK/y0Mkrfcl939f07s6COS+Oq3EclvbrpqwxNBcLcMZnlLSeYjR7AFVVERVg7Fi7gqmwF6lrc649nojXGnafFdzbf7Viiv3dLT9yxbyHMIM+JgiDesOUZn4KiNi2+x/8JVqOz+0Pt/2K283zPtH2Py98/l+Vu/cebnzN/l/vNvk+Z8vk1laZ/ZH9j+CfI/4SD7N+7/s37V/aPn/8ecu37f5n7z/Vb8/bf+W3l7v33l1JRq3VzriWettb6dp8t3Du/sqKW/dEu/3KlfPcQkwZmLodizYRVfksY1tySXw1W3jjt7dtNaGVp7hrhhMkoaPy0WPYQysplLMXUqUQBX3kpz+p/wBkf2P428//AISD7N+8/tL7L/aPn/8AHnFu+weX+8/1WzH2L/lt5m3995latz9j/wCEq07f/aH2/wCxXPleX9o+x+Xvg8zzdv7jzc+Xs8z95t87y/l86gA+065/Z2/+ztP+3/bfL8j7e/lfZftG3zfM8nPm/Z/3nlbNvmfu/M2/vq818fyX2h/tF/CvWpLe3l03UIdS8JwbbhhMJbq3OoyTMmzAWNdDijUBiXN45Pl+QBN2v/Eo/wCEc/5mD7H/AG1/1EftX2n+0f8Av99m87/t3+z/APTtWV8SfAtn8SNO8SaFBfahpWvSWVjdWepyRXE1nYXUFxLPYXUUTMtvLLDcxCV41O51SFZsxtGCAdBe3vipPD1hNaaNo8+uvCWvLKbV5Y7aGX7O7BI5xbM0i+eI49xiQ+WzybSyiJ/CvgrrXxTb4i/GrzfBvg9N3iZZLnZ4tum8q6Hh7S/JiTOmDfE22DdKdrJ5kmI5PLXzOq8G+OvDnj/4J+Gr7U7Hxhos1vZfZdR0K2l1mXWNJuhpkjTWt20SrdtKsLsUkmAaV3tpY90slux8V+B3/Cuv+Fi/F7yv+Fwf8hqT7P53/CZf8e3/AAj1h5vnb/8Al5/13leb/pH/AB7+T/y70AfWvjHxbD4F0rUfEGrm3tPCek6Zd6lqmpNJI01ssKq/ywJGxkXyxOzEMGBjQKj7yU4r4A+H/F/g/wCBPhOz1/RdPtPHE2L3X7T+0y8RvLm6M+oXHmpEV81mmnm8mNfKEjeUjiMLIMn4k/Y/iz8U9N+HcP8AaEulWtlNd+J7y1+0NYiNJ7GWPSJwP9FaW6VkZ0l8yQWgnQRql6JR6B/xKP8AhHP+Zg+x/wBtf9RH7V9p/tH/AL/fZvO/7d/s/wD07UAdBHJfHVbiOS3t101YYmguFuGMzylpPMRo9gCqqiIqwdixdwVTYC9S1udcez0RrjTtPiu5tv8AasUV+7pafuWLeQ5hBnxMEQb1hyjM/BURsW32P/hKtR2f2h9v+xW3m+Z9o+x+Xvn8vyt37jzc+Zv8v95t8nzPl8msrTP7I/sfwT5H/CQfZv3f9m/av7R8/wD485dv2/zP3n+q35+2/wDLby9377y6ANW6udcSz1trfTtPlu4d39lRS37ol3+5Ur57iEmDMxdDsWbCKr8ljGtuSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lOf1P+yP7H8bef8A8JB9m/ef2l9l/tHz/wDjzi3fYPL/AHn+q2Y+xf8ALbzNv77zK1bn7H/wlWnb/wC0Pt/2K58ry/tH2Py98Hmebt/cebny9nmfvNvneX8vnUAH2nXP7O3/ANnaf9v+2+X5H29/K+y/aNvm+Z5OfN+z/vPK2bfM/d+Zt/fVbjkvjqtxHJb266asMTQXC3DGZ5S0nmI0ewBVVREVYOxYu4KpsBfn/wDiUf8ACOf8zB9j/tr/AKiP2r7T/aP/AH++zed/27/Z/wDp2rVtvsf/AAlWo7P7Q+3/AGK283zPtH2Py98/l+Vu/cebnzN/l/vNvk+Z8vk0AfNHiL4lXWlfHXx5oc3j/QfBmpT+B9Ou9VXVPE0l1Y+HbpvtqSXNvBKY1ba32EEYtgySLKxDEI/afs7ajf67+z/qizxXHiCOGW/srLUdH8T3t7Jr8UeU+1W13dy+ZB5zh/LAuHVBtKzY5Hp2mf2R/Y/gnyP+Eg+zfu/7N+1f2j5//HnLt+3+Z+8/1W/P23/lt5e7995daujfY/7R177N/aHnfbV+1fbftHleZ9nhx9n835PK2eXnyP3fmebn975tErS8tLfi/wDP/O+lrlJOSkltb8kvxtf+nf5H+E3hz4q+AvD1xpni34bfE/xnqDTpcRanF8SYX2xPbwnyG36jDl4n3xs4QLIyGQY8zaCvs6iu6ni5U4KCW2m8v/kjglhaUm20vuX+QVk3Vtrj2etrb6jp8V3Nu/sqWWwd0tP3KhfPQTAz4mDudjQ5RlTgqZG1q5TU9M0+bR/G0Uvgn+0IbzzPtun+RZn/AISPNnEh4eQI+5FW2/0kx/6nBxEEc8J2HQSR3x1W3kjuLddNWGVZ7drdjM8paPy3WTeAqqolDKUYsXQhk2EPU+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/IWJkCgHFeLPhh4i1u58P69o/i238L+NrOFLfVdWsdJEltrEKRyMttLbSStiAXLrKP3hmjjNxHFNEbiSWvCvB3wm+Kfjz4i/F23vvirp+l6Vb+JjHqmn+H9AutO/tO6bw9pJtZftMeo/areKFhbsYoZkaXZMrSbJQsf0BrOhaPcfD3QrKb4W/wBq6dBZNHB4V+y6a39mJ9gmjNvskmFuuY2ezxE7J/pG0nyS7r81fA7wL4Oj+Ivxe2fsufZPK1qS3i/4lfhwfYIX8PWHmaf8t4cfaN8nyx7oT9t/eOu6bYAfWvhvwdY+CLbTdI8Mado/h3wnZwzqNF03TVt1WV5FdXi8tlSNcmcuvlku0ituXawe19m1z+ztn9o6f9v+2+Z5/wBgfyvsv2jd5Xl+dnzfs/7vzd+3zP3nl7f3NFza27+KtOuG0T7Rdx2VzHHreyE/ZEZ4C9vuLeaPOKo+EUofs3zlSIw2V/Zmn/8ACOeR/wAIT/o39tfaP7J8iz/139o+Z/aG3zPL/wBb/pu7d538Wzzv3dAHQRx3w1W4kkuLdtNaGJYLdbdhMkoaTzHaTeQyspiCqEUqUcln3gJUtbbXEs9EW41HT5buHb/assVg6Jd/uWDeQhmJgzMUcb2mwisnJYSKW1rbp4q1G4XRPs93JZW0cmt7IR9rRXnKW+4N5p8ks74dQg+0/IWJkC5WmaZp8Oj+CYovBP8AZ8Nn5f2LT/Isx/wjmLOVBwkhRNqM1t/oxk/12BmIu4ANW6ttcez1tbfUdPiu5t39lSy2Dulp+5UL56CYGfEwdzsaHKMqcFTI1uSO+Oq28kdxbrpqwyrPbtbsZnlLR+W6ybwFVVEoZSjFi6EMmwh+f1PTNPm0fxtFL4J/tCG88z7bp/kWZ/4SPNnEh4eQI+5FW2/0kx/6nBxEEc6tza27+KtOuG0T7Rdx2VzHHreyE/ZEZ4C9vuLeaPOKo+EUofs3zlSIwwAfZtc/s7Z/aOn/AG/7b5nn/YH8r7L9o3eV5fnZ837P+783ft8z955e39zVuOO+Gq3EklxbtprQxLBbrbsJklDSeY7SbyGVlMQVQilSjks+8BOf/szT/wDhHPI/4Qn/AEb+2vtH9k+RZ/67+0fM/tDb5nl/63/Td27zv4tnnfu61ba1t08VajcLon2e7ksraOTW9kI+1orzlLfcG80+SWd8OoQfafkLEyBQAtbbXEs9EW41HT5buHb/AGrLFYOiXf7lg3kIZiYMzFHG9psIrJyWEi27KO+S5v2u7i3nt3mDWaQ27RtDF5aApIxdhI3mCRtwCDayLtJUu/P6Zpmnw6P4Jii8E/2fDZ+X9i0/yLMf8I5izlQcJIUTajNbf6MZP9dgZiLuNXRrW3t9R154dE/sqSe9WSe72Qr/AGm/2eFRcZjYs2FVIMyhX/0fAGwIzAGtRRRQAVymp6np8Oj+NpZfG39nw2fmfbdQ8+zH/COYs4nPLxlE2oy3P+kiT/XZOYiiDq6ybq51xLPW2t9O0+W7h3f2VFLfuiXf7lSvnuISYMzF0OxZsIqvyWMagBc3VunirTrdtb+z3cllcyR6JvhH2tFeAPcbSvmnySyJlGCD7T84YmMrlf2np/8Awjnn/wDCbf6N/bX2f+1vPs/9d/aPl/2fu8vy/wDW/wChbdvnfw7/ADv3ldBJJfDVbeOO3t201oZWnuGuGEySho/LRY9hDKymUsxdSpRAFfeSlT7Trn9nb/7O0/7f9t8vyPt7+V9l+0bfN8zyc+b9n/eeVs2+Z+78zb++oALa6t38Vajbrrf2i7jsraSTRN8J+yIzzhLjaF80ecVdMuxQ/ZvkCkSFsrTNT0+bR/BMsXjb+0Ibzy/sWoefZn/hI82crjlIwj7kVrn/AEYR/wCpyMRB0PQRyXx1W4jkt7ddNWGJoLhbhjM8paTzEaPYAqqoiKsHYsXcFU2AvUtbnXHs9Ea407T4rubb/asUV+7pafuWLeQ5hBnxMEQb1hyjM/BURsAZWp6np8Oj+NpZfG39nw2fmfbdQ8+zH/COYs4nPLxlE2oy3P8ApIk/12TmIog1bm6t08Vadbtrf2e7ksrmSPRN8I+1orwB7jaV80+SWRMowQfafnDExlS6udcSz1trfTtPlu4d39lRS37ol3+5Ur57iEmDMxdDsWbCKr8ljGtuSS+Gq28cdvbtprQytPcNcMJklDR+Wix7CGVlMpZi6lSiAK+8lADn/wC09P8A+Ec8/wD4Tb/Rv7a+z/2t59n/AK7+0fL/ALP3eX5f+t/0Lbt87+Hf537ytW2urd/FWo26639ou47K2kk0TfCfsiM84S42hfNHnFXTLsUP2b5ApEhY+065/Z2/+ztP+3/bfL8j7e/lfZftG3zfM8nPm/Z/3nlbNvmfu/M2/vqtxyXx1W4jkt7ddNWGJoLhbhjM8paTzEaPYAqqoiKsHYsXcFU2AuAcVrOu6Pb/AA90K9m+KX9ladPZNJB4q+1aav8AaafYJpDcb5ITbtiNXvMxIqf6PuI8kOjfNXwO8deDpPiL8Xtn7Uf2vzdakuIv+Jp4cP2+FPD1h5mofLZjP2fZJ80e2EfYv3iNtm3/AFre3vipPD1hNaaNo8+uvCWvLKbV5Y7aGX7O7BI5xbM0i+eI49xiQ+WzybSyiJ/CvgrrXxTb4i/GrzfBvg9N3iZZLnZ4tum8q6Hh7S/JiTOmDfE22DdKdrJ5kmI5PLXzAD3+5urdPFWnW7a39nu5LK5kj0TfCPtaK8Ae42lfNPklkTKMEH2n5wxMZXK/tPT/APhHPP8A+E2/0b+2vs/9refZ/wCu/tHy/wCz93l+X/rf9C27fO/h3+d+8roJJL4arbxx29u2mtDK09w1wwmSUNH5aLHsIZWUylmLqVKIAr7yUqfadc/s7f8A2dp/2/7b5fkfb38r7L9o2+b5nk5837P+88rZt8z935m399QAW11bv4q1G3XW/tF3HZW0kmib4T9kRnnCXG0L5o84q6Zdih+zfIFIkLZWmanp82j+CZYvG39oQ3nl/YtQ8+zP/CR5s5XHKRhH3IrXP+jCP/U5GIg6HoI5L46rcRyW9uumrDE0FwtwxmeUtJ5iNHsAVVURFWDsWLuCqbAXqWtzrj2eiNcadp8V3Nt/tWKK/d0tP3LFvIcwgz4mCIN6w5RmfgqI2AMrU9T0+HR/G0svjb+z4bPzPtuoefZj/hHMWcTnl4yibUZbn/SRJ/rsnMRRBq3N1bp4q063bW/s93JZXMkeib4R9rRXgD3G0r5p8ksiZRgg+0/OGJjKl1c64lnrbW+nafLdw7v7Kilv3RLv9ypXz3EJMGZi6HYs2EVX5LGNbckl8NVt447e3bTWhlae4a4YTJKGj8tFj2EMrKZSzF1KlEAV95KAHP8A9p6f/wAI55//AAm3+jf219n/ALW8+z/139o+X/Z+7y/L/wBb/oW3b538O/zv3lattdW7+KtRt11v7Rdx2VtJJom+E/ZEZ5wlxtC+aPOKumXYofs3yBSJCx9p1z+zt/8AZ2n/AG/7b5fkfb38r7L9o2+b5nk5837P+88rZt8z935m399VuOS+Oq3EclvbrpqwxNBcLcMZnlLSeYjR7AFVVERVg7Fi7gqmwFwDn9M1PT5tH8EyxeNv7QhvPL+xah59mf8AhI82crjlIwj7kVrn/RhH/qcjEQdDq6NdW9xqOvJDrf8AaskF6sc9pvhb+zH+zwsLfEahlyrJPiUs/wDpGQdhRVLW51x7PRGuNO0+K7m2/wBqxRX7ulp+5Yt5DmEGfEwRBvWHKMz8FRG1uykvnub9bu3t4LdJgtm8Nw0jTReWhLyKUURt5hkXaC42qjbgWKIAW6KKKACuU1P+yP7H8bef/wAJB9m/ef2l9l/tHz/+POLd9g8v95/qtmPsX/LbzNv77zK6usm6ttcez1tbfUdPiu5t39lSy2Dulp+5UL56CYGfEwdzsaHKMqcFTIwAXP2P/hKtO3/2h9v+xXPleX9o+x+Xvg8zzdv7jzc+Xs8z95t87y/l86sr/iUf8I5/zMH2P+2v+oj9q+0/2j/3++zed/27/Z/+naugkjvjqtvJHcW66asMqz27W7GZ5S0flusm8BVVRKGUoxYuhDJsIep9m1z+ztn9o6f9v+2+Z5/2B/K+y/aN3leX52fN+z/u/N37fM/eeXt/c0AFt9j/AOEq1HZ/aH2/7Fbeb5n2j7H5e+fy/K3fuPNz5m/y/wB5t8nzPl8msrTP7I/sfwT5H/CQfZv3f9m/av7R8/8A485dv2/zP3n+q35+2/8ALby9377y66COO+Gq3EklxbtprQxLBbrbsJklDSeY7SbyGVlMQVQilSjks+8BKlrba4lnoi3Go6fLdw7f7VlisHRLv9ywbyEMxMGZijje02EVk5LCRQDK1P8Asj+x/G3n/wDCQfZv3n9pfZf7R8//AI84t32Dy/3n+q2Y+xf8tvM2/vvMrVufsf8AwlWnb/7Q+3/YrnyvL+0fY/L3weZ5u39x5ufL2eZ+82+d5fy+dRdW2uPZ62tvqOnxXc27+ypZbB3S0/cqF89BMDPiYO52NDlGVOCpka3JHfHVbeSO4t101YZVnt2t2Mzylo/LdZN4CqqiUMpRixdCGTYQ4Bz/APxKP+Ec/wCZg+x/21/1EftX2n+0f+/32bzv+3f7P/07Vq232P8A4SrUdn9ofb/sVt5vmfaPsfl75/L8rd+483Pmb/L/AHm3yfM+XyaPs2uf2ds/tHT/ALf9t8zz/sD+V9l+0bvK8vzs+b9n/d+bv2+Z+88vb+5q3HHfDVbiSS4t201oYlgt1t2EyShpPMdpN5DKymIKoRSpRyWfeAgBxWs/8I5/wr3QvtP/AAmH9j/Ym+y/Yv7Z/tPy/sE2ftHlf6X5vk+Zjz/3nn+Vj/SPKr5q+B3/AArr/hYvxe8r/hcH/Iak+z+d/wAJl/x7f8I9Yeb52/8A5ef9d5Xm/wCkf8e/k/8ALvX1re2Xip/D1hDaazo8GupCVvL2bSJZLaaX7O6h44Bcq0a+eY5Nplc+Wrx7gzCVPCvgrovxTX4i/GrzfGXg99viZY7nZ4Sul826Ph7S/JlTOpnZEu6DdEdzP5cmJI/MXywD3+5+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/c1bjjvhqtxJJcW7aa0MSwW627CZJQ0nmO0m8hlZTEFUIpUo5LPvAQA5/TP7I/sfwT5H/CQfZv3f9m/av7R8/8A485dv2/zP3n+q35+2/8ALby9377y61dG+x/2jr32b+0PO+2r9q+2/aPK8z7PDj7P5vyeVs8vPkfu/M83P73zaLW21xLPRFuNR0+W7h2/2rLFYOiXf7lg3kIZiYMzFHG9psIrJyWEi27KO+S5v2u7i3nt3mDWaQ27RtDF5aApIxdhI3mCRtwCDayLtJUu4BbooooAK5TU9M0+bR/G0Uvgn+0IbzzPtun+RZn/AISPNnEh4eQI+5FW2/0kx/6nBxEEc9XWTdaNeXFnrcKa7qFtJqG77NcRR25fTMwrGPIDRFWwymUecsvzuwOU2ooAXNrbv4q064bRPtF3HZXMcet7IT9kRngL2+4t5o84qj4RSh+zfOVIjDZX9maf/wAI55H/AAhP+jf219o/snyLP/Xf2j5n9obfM8v/AFv+m7t3nfxbPO/d10EllM+q292t/cR28UMsT2KrH5MzM0ZWRiULhkCMFCuFxK+5WIQpU/sa8/s77N/buoed9t+1fbPLt/N8v7R5v2bHlbPK2fuM7fM8vnf5v72gAtrW3TxVqNwuifZ7uSyto5Nb2Qj7WivOUt9wbzT5JZ3w6hB9p+QsTIFytM0zT4dH8ExReCf7Phs/L+xaf5FmP+EcxZyoOEkKJtRmtv8ARjJ/rsDMRdx0EdlMmq3F21/cSW8sMUSWLLH5MLK0haRSEDlnDqGDOVxEm1VJcvUtdGvLez0SF9d1C5k0/b9puJY7cPqeIWjPnhYgq5ZhKfJWL50UDCbkYAytT0zT5tH8bRS+Cf7QhvPM+26f5Fmf+EjzZxIeHkCPuRVtv9JMf+pwcRBHOrc2tu/irTrhtE+0Xcdlcxx63shP2RGeAvb7i3mjziqPhFKH7N85UiMMXWjXlxZ63Cmu6hbSahu+zXEUduX0zMKxjyA0RVsMplHnLL87sDlNqLbkspn1W3u1v7iO3ihliexVY/JmZmjKyMShcMgRgoVwuJX3KxCFADn/AOzNP/4RzyP+EI/0b+2ftH9k+RZ/67+0fM/tDb5nl/63/Td27zv4tnnfu68k8S/FFtV+KXgDUvC1nr+gwajr0Ph/WLrV/Df9nLrEH2PUbhIP9MgW6It5It6smyL/AEtwrSMZAnuH9jXn9nfZv7d1Dzvtv2r7Z5dv5vl/aPN+zY8rZ5Wz9xnb5nl87/N/e1leI/hj4b8Z+ILLVvEmkaf4jfTvKk0y31bTra4TTZ1dma4t3aIyJI+Ywx3kfuI9oU7i1wajJNq6KTSvfs/yf66ng/gZtan1/XPCnjv4dTavaW+nLf6F4Hsl0S503R9Lktbu3igUMkBjnaNJLORPNmhJuMI/kGVo+N+B3gXwdH8Rfi9s/Zc+yeVrUlvF/wASvw4PsEL+HrDzNP8AlvDj7Rvk+WPdCftv7x13TbPpTw78FNF8E+Hzp3hKUeD7y4BfUdX0LStNtrrU5zbyRfaLhRa+U0geQT5WNR5kajBjLxt5X8Ffhp4ji+Ivxq3fFjxhN5HiZbWTfaaN/pEj+HtL2XL408Ylj8xNoTbGfIj3o+ZPMzStFLsv6/rqS/ibX9f1+G2u57/c2tu/irTrhtE+0Xcdlcxx63shP2RGeAvb7i3mjziqPhFKH7N85UiMNlf2Zp//AAjnkf8ACE/6N/bX2j+yfIs/9d/aPmf2ht8zy/8AW/6bu3ed/Fs8793XQSWUz6rb3a39xHbxQyxPYqsfkzMzRlZGJQuGQIwUK4XEr7lYhClT+xrz+zvs39u6h53237V9s8u383y/tHm/ZseVs8rZ+4zt8zy+d/m/vaYBbWtunirUbhdE+z3cllbRya3shH2tFecpb7g3mnySzvh1CD7T8hYmQLlaZpmnw6P4Jii8E/2fDZ+X9i0/yLMf8I5izlQcJIUTajNbf6MZP9dgZiLuOgjspk1W4u2v7iS3lhiiSxZY/JhZWkLSKQgcs4dQwZyuIk2qpLl6lro15b2eiQvruoXMmn7ftNxLHbh9TxC0Z88LEFXLMJT5KxfOigYTcjAGVqemafNo/jaKXwT/AGhDeeZ9t0/yLM/8JHmziQ8PIEfcirbf6SY/9Tg4iCOdW5tbd/FWnXDaJ9ou47K5jj1vZCfsiM8Be33FvNHnFUfCKUP2b5ypEYYutGvLiz1uFNd1C2k1Dd9muIo7cvpmYVjHkBoirYZTKPOWX53YHKbUW3JZTPqtvdrf3EdvFDLE9iqx+TMzNGVkYlC4ZAjBQrhcSvuViEKAHP8A9maf/wAI55H/AAhP+jf219o/snyLP/Xf2j5n9obfM8v/AFv+m7t3nfxbPO/d1q21rbp4q1G4XRPs93JZW0cmt7IR9rRXnKW+4N5p8ks74dQg+0/IWJkCn9jXn9nfZv7d1Dzvtv2r7Z5dv5vl/aPN+zY8rZ5Wz9xnb5nl87/N/e1bjspk1W4u2v7iS3lhiiSxZY/JhZWkLSKQgcs4dQwZyuIk2qpLlwDn9M0zT4dH8ExReCf7Phs/L+xaf5FmP+EcxZyoOEkKJtRmtv8ARjJ/rsDMRdxq6Na29vqOvPDon9lST3qyT3eyFf7Tf7PCouMxsWbCqkGZQr/6PgDYEZi10a8t7PRIX13ULmTT9v2m4ljtw+p4haM+eFiCrlmEp8lYvnRQMJuRrdlZTWtzfyy39xeJczCWKGZYwtqojRPLj2IpKlkaTLl23SONwUKqgFuiiigAooooAKKKKACiiigAooooAKKKKAKmraTY6/pV7pmp2VvqOm3sL211Z3cSywzxOpV43RgQyspIKkEEEg14B+z/APCqx0n4tfF6+vdX1jxE+ieLYodJTW7lbgWJfw/pQMwbaHln8mRbfz5mkl8pCN+6e5ecooA+iqKKKACiiigAooooAKKKKACiiigAooooA//Z
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]]>
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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/8.2.5 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
]]>
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
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
]]>
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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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Omf2rd+GL06lpUc9xL9ngutu1bgwBhFJKgJ8t5FZoySUKkk0fDf4W+GPhFoVxonhDTP7F0Wa9nv106K4le3t5Jm3yLBG7FYIixLCGILGpZiFBY5ANXwt4W0vwXoVro+j2v2Swt9xVWkaV3d2LySySOS8sruzu8jlnd3ZmZmYkla1FAH/2Q==
1.0000000
0.3333333
0
true
true
abc
+ = 1]]>
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Correct
+ = 1]]>
/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAApACADASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6jnMqwSGFEeYKSiyMVUtjgEgHAz3wfoakr5l8GR+KLD4kGN/wDhNm8E6pc3Vx4UutVOoXB0++CeXImpxFlnNqxDyQLO4jAZgxRjbhJvrb+v6fTz0Hsub+v67+Wp6V4G8SePLb4mal4V8XTaDrVr/ZMeqwaloFhNZfZGaZ4/s88cs828sFLJIGTd5Uo2DaDXqFeW/CT4d+PPA1/eSeJfF/hzxLBel57uex8NXFjfXNwcBZJJnv51Kqo2iNY1CgKF2quK9Sq3ay/r+rbee71uJ/E7bf8AA/V6+V7LSx4tqc/xV0TVdL0zUfi18MLDUtVd4tPs7rwZdxzXjou51hRtaBkKryQoOByaSSf4qw+JIfD0nxb+GCa/NbNeR6U3g27F08CttaVYv7a3FAxALAYBOM1hftNeLPBXg34k/BW61zWdA0PV5PFSM0+oXUFvcPapp9+gJZyGMSyzqv8AdDSgdWGYPiP428DeEf2u/h7Bc6xomna7caDrRurRJYxfXEkh05bcGJf3kkjrC6xqAWfyiFB24q4wUknffm/BXsbciva/S/4v/Il8KfEjxZ4812bRfDPx/wDgz4i1mBWeXTtJ8Ny3VxGqkBi0ceuFgASASRwTXefDnWvE9z4z1jR/EHxF8DeKbjTIF+16L4c0SWxv7KRyDG8+/UbkqhUPhTGpbIIbCkHwTUPiD4ks/B/iOL4UfFf/AIW3a2vhC+Mws4LKZdEvY441tfJksoQ6O26UiCfzpD5WQfkbd6L+y746bVZbvwzpGveDvGfhDTtOgubbW/BUEqQW1zJJIZbW4kaedZrg/LM0gZJCXZpI13qWlK/R7f5/JL5v1vZPGWjdtk/8v8/Jre1tT6DoooqQCiiigD//2Q==/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCAApACADASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6jnMqwSGFEeYKSiyMVUtjgEgHAz3wfoakr5x0v4Y+IF+InjLwi+u+Kjp8uoweLtL1yfX9Rkjt0ZHRdPYLcqxiE6OxgBRHibH3lDLDlbT+umn3XfbT0H0v8A1/V7L5nfeBvEnjy2+JmpeFfF02g61a/2THqsGpaBYTWX2RmmeP7PPHLPNvLBSySBk3eVKNg2g16hXlvwk+HfjzwNf3kniXxf4c8SwXpee7nsfDVxY31zcHAWSSZ7+dSqqNojWNQoChdqrivUq0drL+v6tt57vW4n8Ttt/wAD9Xr5XstLHg2t+J/iB4a8TaZ4c1f42/CTSvEOqY+waTe+FLiG7u8ttHlRNrYeTJBHyg88VTfSvin8NJGufEnxz+HiXGt3629tceIPB81uXkYnybSADV41OMkKoBduSxY5NJ+0N8UPhXLqNz8M/Efi7wl4e1DVPs13rM2sava2UlrbxyI8bDzHDNcNsHlY+5gSEgBFk8t8efFLxZ4d+K/xLvdK1vwpd+MDcW+m+HPB17DLJrmqaXJBbnOmuJkESNIZ5GkEU0ZeEmR40hykX05kr77dk1p630+920aLcHzJbXt+PV+XXW3TXVHr/hzxR8QPGGtaro+g/G34Sa3q+kts1Cw07wpcXE9m2SuJo01stGcgj5gOQa7D4Tan4r8Rl9Xv/iD4I8ceG3SSCGTwloctri4SQK2ZzqNyjBdsisgUHdj5htIPi/wr1fwF4+1r4UWPh+TSL6Lwt4OvbHxJYkIzaVC8VtE1neof9S5kjfMUvJ8qQ4+Umu0/Y58Z+F/FfgvxhF4Z13SNYitvGGuSFNJvIp1iil1G4eBiIydqumGQ9GXkZFb+zs5L+X8dbXXl+unrC1pqb0ba06q6b181Y99ooorIAooooA//2Q==
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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+9Gmad4r1j4h+IRo2pSBtlzPaeXqPm3UVud4yBFHM6eXHMBulT3/AOJHwt8MfF3QrfRPF+mf21osN7Bftp0txKlvcSQtvjWeNGCzxBgGMMoaNiqkqSoweD/hb4Y8Aa74p1fw9pn9lXfie9GparHBcS/Z57rbta4EBYxRyuAPMeNVaQgFyxANAB8Kvhvpfwf+HHhzwVotxqF3pWhWUdjbTapdtc3DogwC7t+iqFRBhUVEVVBXV0UAFFFFABRRRQB5Vov+h/tT+MvtH7j+0fBmh/YvM+X7V9mvtW+0+Vn7/lfa7Tftzs+0w7seYufVa8q+KH/FJfFP4deO7j59Ki+1eEb3t9m/tSey+zXHGWfN3Z2ltsVf+X3zGZUhbPqtABRRRQAV5V+zT/yTrV/+xz8Wf+pDqNeq15V+zT/yTrV/+xz8Wf8AqQ6jQB6rRRRQAV5V+1d+9/Zl+Ktonz3eoeGdQ02zgXl7m6uLd4Le3jXq8ss0kcaIMs7uqqCSBXqteVfG3/iq9Y8C+ALX/j/1TWrTxDPL/wA+thpN5bXss2DgPuuFsbXaGDD7b5oDrC4oA9VooooAKKKKACiiigAooooAKKKKAOK+NHgq++IPwv8AEGi6RLb23iFoVu9Eu7tmENrqlu63FhO+FbKx3MUEhUqysEIZXBKnV8B+NbH4g+GYNasIri2Rpri0ntLtVE1rdW8729zA+1mQtHNFLGWRmRihKM6lWPQV5VpH/Fufjjd6KP8AQvC3jGyN/pdunFvHrMUk0morlsBJbmGWCdYYyQ5s9QmKq3mvKAeq0UUUAFeVfs0/8k61f/sc/Fn/AKkOo16rXlX7NP8AyTrV/wDsc/Fn/qQ6jQB6rRRRQAV5V4J/4uF8YNd8cx/vvD+jWUvhTRJZPkcXSXso1l1QcmJprWxhBk+bfYSlFWOQST6vx08U6p4a+HGo2/hu6+y+M9bxovhxhGspXUrgFIZjGwbfFB81zNhX2wW8z7GCEV1XhbwtpfgvQrXR9Htfslhb7iqtI0ru7sXklkkcl5ZXdnd5HLO7uzMzMxJANaiiigAooooAKKKKACiiigAooooAK5T4peBf+FkeBNT0KO+/sq/k8q607U/K877BfwSpPZ3XlblEvk3EUMvlsdr7NrZViD1dFAHFfDLxrfeI7bUNH8RRW9j4y0SZoNSs4FaNZYjJIttfRIzMRBcxx+aoDyCNvNgaRpIJcdrXFfEb4czeNLnQ9W0nXLjwx4n0GaSew1O2gjmWRXjKyWl1GwzLaSN5TyQo8bM0ELLJG8aOvKeG/wBoqxsfEOm+EPidYW/wx8d6nNPHpmm3uoLcWOsIlwsMb2F9sRJmkMkRFu4juV3/ADQhSrsAewV5V+zT/wAk61f/ALHPxZ/6kOo16rXlX7NP/JOtX/7HPxZ/6kOo0Aeq1U1bVrHQNKvdT1O9t9O02yhe5ury7lWKGCJFLPI7sQFVVBJYkAAEmuV+Jvxo8FfB220+Txd4gt9LuNTmW207T0R7i+1GVpI4xHa2sStNcNvmiBWJGI3gnA5rlND8N+Lfi9quj+IfHum3HgjSNF1OS707wQl3bXpvWjaRbe61ORFdCykxTxW8DlYZY0kaWZwiwAFv4b6JrnjHxtcfErxLH/Z8bWU+leGtClsnt7jTrB7ndLcTszhnlvFt7CYxSRRtbCJYiu/zmf1WiigAooooAKKKKACiiigAooooAKKKKACiiigAqpq2k2Ov6Ve6Zqdlb6jpt7C9tdWd3EssM8TqVeN0YEMrKSCpBBBINW6KAPH5P2bLHSdVt73wZ468cfD5IoZbb+zdH1dbzTfKZoykcVlqEd1b2yxeWFjW3jiCKzIPlwo81+B/wO1fxb8OtSt9Q+L3xAj0oeM/EP2jT9Mn07T/ALT5PiG9Lbrm2s47qPzmjLSeTNH/AKx1TYhCj6U8U+KdL8FaFda1rV19h0q12m5u2jZkt0LBTLIVB2RLu3PI2EjQM7sqKzDyr9mnxTpZ0TV/Da3Xma0PE3izUJLaONn8mA+JdRjR5WAKx72DhA5Bk8qbYGEUm0A9A8C/C3wx8N/t0mhaZ5N/qGz7fqt5cS3mo3+zd5X2m8nZ55/LDsqeY7bFwq4UADq6KKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK5T4b/AAq8IfB/QrjRfBXhzT/DOlXF7PqEtpp0IiR55m3O5A/BVHREREUKiKoKKAOrooooAKKKKACiiigAooooAKKKKAP/2Q==
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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JLLNLJxWk/sp+A9A0qy0zTLvxxp2m2UKW1rZ2nxC8QRQwRIoVI0Rb4BVVQAFAAAAAq3/AMM0+Ef+gv8AED/w4/iH/wCTqAD9rH/k1j4yf9iZrP8A6QzV6rXj+rfsp+A9f0q90zU7vxxqOm3sL211Z3fxC8QSwzxOpV43Rr4hlZSQVIIIJBr2CgAooooAKKKKACiiigAooooAKKKKACiiigAooooAyfFP9uDQrpvDf9ntrSbZLeLVN4t5trAtE7plo96hkEoV/LLB/LlC+W3kH7LL+NZNA1ddd8K3HgzR18QeIrlLHW1Q6ldS3Ot3dzHIBFK8ccCRSBd2XMzOWTZFHHJclFAHutFFFABRRRQAUUUUAFFFFABRRRQB/9k=
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