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Solve the following math problem step by step. The last line of your response should be of the form Answer: \boxed{$Answer} where $Answer is the answer to the problem.
<image>Find x.
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3
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[
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NTW1Jv0Id1+PxjtbzzLXm7YmjYjs3ZKlE8sqMil0etXceJJ15CBZY0tGy3XPbCL2yTsuYv9lFniha6yHmyu80IGLvV5s3rwZGzZsoKm7z9KjRw/8/c8/0NdvWsPsBv8wLN5zmY41jXQR/sU4ma4lL3N79KD4TIz5yZ+JXFUF/8waKtciJ6iqqGDfzEF4s387elyYXQCXNd4IS86R9qnJPCdPnsS3335LRU5i/t369sXAgQOhLxTduHXrFn7YuLHJz+tT946Y68lyD0pzCjH0+5N4UiSUDZdBZGpGT8opQuevjlDjFWH9lL5YOqITFAXySU/dGYC/L94XzQS3lnuhs41sxALIIgP696exBaQox4EDB9BHKJ+VnJyMXq6uKC8vpxl9Dx4+lMr3OW7LORy/HkmP+3RsjoDFHjJZmkpVpqLeNvmJRP6ee2eFEjmBxOHvfXcApg7qIJoJnNd6425ijT5vHBG3b98WBRANGzZMJHIC8UQ4OzvTMcnyS0lhpbmb+vvc/8EgdGvNvCJXwxIwc08gZBGZEfrbuwJETRMGdLHH9ql9oIiQH8fuGf0xbQgTe3kuE3twYpa0T03mIDXzqvh47tznHv/s88/xv9WraRShiYkJpIEWyWKcPxyW5syT8sfZMPx4/gFkDZlYupMab7T8kxAQE/LVOIVvg0Q+9ff2XMauM0LghYEObi/1hLO9mbRPTWaYN28eDuzfT9N2H8XGQqUpUxMbyJ3HWXD+3zHW3ktdDRdWjKGBNrKCqixUh1n271V2oKuFUwtGKLzICeQ3u3NaP7pFoeQVwWW9D+0DzmHcDw+nf+3s7EQiDwsLo2WvyR5dluhuZ4p/PhjMvtjyp/D60Q/JObUzEJVW6OSD8PrlDGuPpKKCgx8OUTr/8m9vu2HmcCH9Mb8IPdb70N5wHCAtLU1URsvPzw9du3SB+7BheP/99+Hi7AwXFxdcvsxcXLLAmz0csGA0s8TnZRdg7JaztJmnUgud+JZf33qOupoIi7ycMb67UJVTySD2iFkju7KD/CK4rvfB9VgudpK2S0hNTcXs2bNpvfuaJCcl4a3Jk3FCaGohC2yY0AN9O7FIOdLZVVay3aS2R68Z3kpyfp0dLNHC3AAtLQzgZGmA1hYGaGVpiBametQPrQzM+ec6tpwMZge62riy1ENhapY1BidHRxQJBThI9NuCBQswfMQImhewZ88eHDlyRDTjX79xg7rgZIH0vBK0+ewgsp/k01gQn8We8Ohoq3xCvxiVhkFrjrGgGHVVUWfTOlFXQzNTfbQw10dLMwM4WhrC0dwArawM0cbCQOYTXBrK3H3X8TPpAkrQ1ULgEk+4OSqn2MnevCoajmT3zV+woNbj70ybBn9/fzreum0bxo4dC5mqTLzem/7GSaHJuLUTYGmgrTxCJy2JW684SHO1yb58XO9WyMgvRmx6HhKy8oHS58Mc/xMtddibGsDBwgAO5vpwtDCkiS9OFoZoY2Uol10z5++/gc0nBNeSjhZNkSTZU8qGY8uWKC4upjP1vdDQ51xoFy9exOQ336TjOXPmYOVnn0GWWHH0DtYdZqtWUlfwzIIRUjsXyZdLfYYP9lxhIgcwe2RX/DK5l+gxcskh0XERabmITme3mLQ8WpIpLj0Padn5z8/+JeWIT35CbwF1vaGuFlqZ6cOBbgsM0dJcn24JWluR7YFhk1SMbSibJrrS7coP3kFAUQn6f+tLI676y5C7pikghTeI0I2MjOv0k3fuLHgsSG+6eNmr1rp6bDecDn1M2z6Rykg/X3iIjwe1lcq5NOmvnJTO/ffyA1Gjwh8m9qz1ONmKk4IS5FZXfDuxYMZl5tMiDpFpefRCEJuRR1cD0Rl5yMstFHXcEFFYgihyq+rgUusNAVV9XbQ3JysCdjEgiQnkQsBWBQa0Hpw0ID3C1FRVaEUTIvYB3/rg/KceGCTncf8NQVubLXVfZKKpmchSV8KLtFFVUcGBj4bAacVB+h3O/fsKPDrbSqUyUpMJnQT8z9gVICrP/O+HgxssIhJDTMRHbiNYYNlzYbTRmeQiQFYDeYgmq4H0PMRl5CGchNbmF7H3r6ISqMgrRBi5VbXTrYmqCoyN9NhqQDAUOloYoDUxFjaBofC78T2gpqKCb47eooEYgzf44uyiUVIvhtlUWDVrRv3lLyq2kZlR7Zlo4cBKbssajmb6+GVKH8z57QL9Dt/+/SK1uyis0Of8dY36FgkrxrhIJAKMhCOS1M8XpX+SXudkJUBuUem5eJTBLgR0RUCKOBYxd46IikpqOQ0mt8g6AjTU1WBlosfsA8RQaGEouhAR+4A4WjStf92F7lHpXq+4lGZJnVk4CkPbKb7YXV1daX37srIyxMbGwuEZMV+5KgRaAc89JkvMHtAW+2/E0K4+V0ITaK0Fcp/CGePOPEiB+7rjdBNO+lqF/W88LaQoa2QWlFD7AFkRxKTnIyYtF48yyYogH4+z8qg9oEFoqcOOGAqJx8CCrAoMBdehIV0VmOnVv7/658eDsfrgdXagrQm/BSPg3t4GigyxqBPLOmHGjBk0pr0K8rOdMH48rl69Sl1vFwMC4OjIym3LIvFZBWix/ACbTPS0kfLNJFgZaiuO0ElzgzYrDyIu6QldCl/98nWZr8ZRF1WGQnIRIKsBYh94lJ5PVwWxLzIUvgwdLbQyZ7YBsiqgbkPBPkAuBM929PzS+y5WHbjGDrTUcXrhKAxXYLETQ9yggQNp8Uyyqpk3fz6mTZuGnJwcbNu6VVQ1d8yYMdj266+Qdb73D8OnQrGK8W5tcHDWYMUR+lcn7uLr/ezHSeK6ScinIkIi/WKzChCZSi4ExD7AtgaxGexikJNT8Lyh8L8QDIXtiMfAoto+cOtROv659IDZGrTU4Tt/JEZJORhDkty/fx+enp7Pda6pwszMDN4nTsj00r3mb6Tr18cQGpNKv9+zK5qu+YhEhZ6YXYTmS/bRvSUJGkj5dqJSJKzUBTEUxhBDIbkQZOQhJr3aPvAgMx8V+YW1DYX1RVUFvdvZoo+TJZyqVgNWhnBQoIhCksSyYsUKUex7FR07dqR96qxt5GdVcz02A72/Okwv+mQb+2D1+Cb5niQq9EnbL4jqpP06cwg+6M/KH3P+21BI4wcyqj0GURl1GApfhroqLI2F1QD1GOjTIKJW1D7ADIXydB0gBrmbN2/i0aNH1O3Ws2dP2NvLZ27E2zsvYe8Flpn347sDMXcQKzEml0In6ZY9vjhEr1ydHK0Q8uU4ufphyaKhkF4IiH2AuA0zcnHhQTLiie2jMdQwFFKPgSUzFJIVQRtLwwYZCjkNIy2vGFaL99EYD7LSTd8w6Tl7jNwIfcB3vrh07zHdi5xbOU7uCzzKKt/5hWIJKdpBvkV1Vcxx7wJDHU3EkGCiTLY1SH3SOEOhUw37AFkVsNVA3YZCTsP42ucuvvqX2a6Wvd6DtvyWO6GffZCCYWuP0fGw7g7wl2KMb0P57bffsGvXLjreu3cvWrZsCVln49lwLCItfslXqaGGgx8Pr5XyS4xAccRQSF2H1fYBZizMQ3YjDIXQ10EHM4NaGYckfoBsC5zMDGhMA+fFFJeVw2bxfjwhblsdLaRvnAxzCa6iJCL0nmu8cethEjUUBa+ZKDMdT18GaQzQu3dvmgZJOHf+PNq1k/z+SWz9vP+sFvv+Oe54w7lFvV2gJJKQGApJKDEZM/tAPu5n5DXcUKiqAgNDXTgJbkMWWiysBqwMYW+iJ5OVUpsaEvs+d+cFOv5kdHdsnugqP0KnwTHCbE56jx2dPQTywvz587H/339Fx/IkdAIpSjjvDxJmXEmj9vbNcaetf8VhKCSegsjUPERRt2E+Hgl5BlEkorCw8YZCBzN9ONLVAIkqNKT2AXkzFDYWkrthv+RfJKfl0CCojB/ekphtROxC7/etLwJDH9Oreui6SehoLR+loUJDQzFyxAhUVFTIrdBFs8QfF9lSXF0Vf892x+QekvUxZxWWIoKsBtJZDAG1D2TkU/tAfGMiCjXV0dxUsA+YsaxDJ0t9ui0gN0kucZuarQERmP3beTr+dKwLzW+QeaHfistEzy8O0mXeqB5O8P1kGOSFsWPGUPcN6WhaKYhdHoUu6lu3s1rse2cNxRRXR6nWBoxIz0NUKnMbVoUWM0NhAWtY2AhDIS1GYmFIA4no1sCCXQwMtOXHUFhWUQmbRf8ggyRd6esgf9NbEkmdFusrrvUNEe3lvvDqBnnh2LFjVOSkzc/UqVNpeKU8QxImSNbbLNKksrwCU7eeBbl0vS0lsZMqQORWV/njmoZCFlFYHT8Q8yJDYVEJohPIre7UY+jpsNRjIf3YSahIJIuGQpLzsWhkFywnnpP8Ivx6KQILh9aRmikrQidx4EduRtNxj7Y2chPPXlpaiv+tWkXHc+fOpckSisCH/dvQiKsPyLLwaQWmEbFXVuKdXk6QJcg5tjQjZcL0Mbx93YbCmIx8diGgyUaCtyA9Hw8z81Ce94yhkIzzi3Cf3GJrR9JRVFRgYMQMhSKPAbUP6FP7QAsz/SY3FJJiFMuP3AYKi7HZLxQLhnQQu41CbEL/6Xy4aAm2cER15Q9Z58fNm5GUlESjrGbNmoWtcj6b12Rmv9ZUSO/vOEfFPp2I/WklZri1grxAahaQfvIv6ilfUFpOg4iiUklBEnYhiM3IpduCyLoMhZWVNF06mNyi6mjjpK4Ki6qIQnIBIh4DElpM7QP6sDXSE7sISUzCrAFtse3UXVop6VR4otjzF8QidDJTbL/IQl1NTA3q7daRNqRf17Zt2+j4y6++goaG/Ozt6st7fVsRuyje3cFm9ne3n6MrYXK/IqCnqY5utqb09iJDYaSwGogmqccZJOsw78WGwvIKpGfk0tvN/zAU0tWAOatB4EgMhUKNwsYaChcO64BtfiF0m/LzufuyKfQjwY9FzRHfH9BWbnykX3/1FQoLC2nzvlGjRkFRITO4qpoKpm9jMzuZ4cnFmcz4ig4pDtrLwZze/stQSLINSfwAMRTGZuZT12EKKVb6rKGwtBwJKdn0Vmc7RW1NOJrXrFHIUo9fZigkj/Xt0Jx6rHzvxNLzEmeFY7EIfQtZthPUVDF3sHxYqYOCgnDc25sWLVi9ejUUHbI3J8v4advO0lmL7N2JH/ejAW2gzFi/xFAY/4SlHkfSi0CVfYAVLH1CahA8aygsLkVMQha91Yk+MxQyj4EBtRVQj4GVIWYObMtc0+VPsTXgIVaJ0aCtLo5U1HMkpp2UtO1iDzsTPcgDK5Yvp260SW+9hfbt67ACKSDE6q6mAkzZysQ+e+cF+mOeM1A6lUllHVUVFTgQf76pPtz/w1BIbAN0a5DG6g+Q1cCDjDoMhXi5oZDusyoq8XvAA9kS+vZLEawRA7H0DpSP2ZxEv4WEhMDAwEDmaoFLmrd6OkJVRRWTt5Ced0/x8c6LVOxNkSqpaGjWw1AYlZ4vFCOpqlFYZSgsoFb2WhCPj3BhSErNoU0gxFWY4pUDZlouO4DYpCxoGumiYPNUudifu/XpQ4sNNrezw2vjxtV67HZQEK4Est3XlClT4NCyJW0OoGjsvx2HSb/4sz2oigo2TR+AeXKy7VIUnhTViChMY4bCsIQnLE8EwOQB7fH3+wOkL3TS9dP180N0/MGILvh1Sh/IA507dUJmZv3aE5NaZQmJiVBEDgbF441f/IAyJvaN0/phgQSCNTgNo8tXR3GPlJvS1ULxT9PEEuDzSq+wMzBKNH63r/xYcC0sLGBubl7nTU+v2sagq6tLn6uoTHC2x6G5w2m2G1k2Ltx9mRYw5EiXKX0E12dhCQ7fjZfujE7+lfnCv6lbzc7aBPHfTIQi8OOPP2L9unVyHeveUI4GP8ZrP50WZnbg2yl9sXh4J2mfltKSmluMZvP2UNuXp6sTTnw8THoz+uXoNJHvfGJP2a2nzXk547rZ4dgnI2gwCDEGkYo1607d4x+dlCD13vu0YwUvfUIeo6ihjUfFKfS/b8SIxlP7cKHLO2O62sF7frXYV/xzBWtOcrFLi4k9hcpGxaU4GpIgPaEfC4qlf22tjF8YfsiRL0Z3ag6fBSNp4Ugi9s/2XcH/SEYip8mZ3MOR+dSJ0fTWI+kIPTQpm1XFIDOBnMS1NwZNTeWrQe/R0ZY2hagS+xf7rtJChpymX753c2I+9MMhj2msQ5ML/WBQnGg8wVn2O2Q0hE8++QRJycn0Jsu9vCQJSagg7Z5I3DaBVCv9wjtY2qeldIzpJkyi+UW4GFlHJJ2khe4rhLySZnEDWvMyzooI6enmX0Ps/ztwHZ8dvyPt01IqXnO2E42PBVdPrk0idFIo8KaQx+vRwVYuIuE4jWNYu2a0RXOV2NccvIEVR7nYmwpi+yJp3wT/0MSmFfqZ+ynM3wpgZOfmr/TmHNmH9GE/96mHSOykT/uSw7elfVpKg3sH5mYLj0+n3XqaTOinw6uvLJ5c6EoB6bJzYYknLcpI+O7oLXx68Ja0T0spGN5RmEwrKuF3P7nphB7wgL2ZpbkhHM30G/3GHPmC5GsHLPYQif3747ex4ECdNVg4YmQkqTQj7I7P3mfJLhIXOtmfhz/OoOMBba0b/aYc+aR/K0tcXupJky0Im7yDMG//DWmflkJja6wDW0vW6ehyRB017iQh9ICoNFHu+YAmauDOkS36OlogcEm12H88cQdz912X9mkpNH0Fz9bDhEw62Upc6Jdr+PIGteFCV1bcHC1wdeloQFebHv/sG4zZ/7DOoBzx07e1oLWnFQiMTpe80K+THFmCjhY6WctH40SOZCB1+68t86SxFIStJ+9i1l9c7JLaMlURGJ0meaHfjmPFGlwdzJWiCR7nvyGVVW8uG00LHhJ+PX0XH+y9yj82MdO1uYnIvXnrEbORSUzoaXnFyHmST8fOLeSjCwtH8vRoYYZbZGYXxL7DLwTv7b7CP3oxF6nsKiSOBcdLWOg34qrfwKWFWaPejKOYuNibIWj5aMCAiX3nmXuY8edlWpyEIx66tmBCT07PbZRBrt5CD46vrlPtbMfTUjm16W5nijsrRkPVQJce/3E2DNP/vMTFLia62gmTa2UlghOeSE7oYYnCi6upopOtSYPfiKMcsdlBK7ygbsjEvvtcOKbt4mIXB1VLd8JdSQo9IoXln9uYG9B61hxO3T9IY9xZ4QVtI1Zkc++FcEz5PYDP7K9IlxqT6/3k7Ab/+3orNjwtl/5tbWXU4DfhKBedbIxxa4UXdI2Z2P8JuI/Jv7FGEZzGYWGgJXJlkoYQEhE66ThRnFtAx6240Dn1oKO1EW6u8IKBIPZ/Lz3Amzu42F+FDhasI0yMUN1J7EInbWWqWsU4WrD8WA7npT/MZka4sXIMjExY8tOByw8x8VfW743TcEjPdkIU6fsuCaGTftJVkDawHE59IX3Jrq/wgrEg9kNXIjBhGxd7Y7CvyhYtLEFucZn4hR73hC3bCS1M5aNbKkd2aGtliBsrvUTVUo5cjcDrW1nbZk79sauhvUekSaO4hZ5YQ+j2psx1wuE0hNaWTOzmZkzsx65F4vWt57jYG0Bzk2rtJdTQpNiEnppbyAYqKmgm+Eg5nIbSysIA11Z4wcKcGZW8r0dh7C9nUcZn9nphI7gsCck5gibFKfSMPKFWla4WLwbJeSWcLAxwfaUXrVBE8L0ZjTE/n+FirwfNDJl7rSr3ROxCzxKK0lnrsWIDHM6r0NJMH9c/80IzSxaTcepWDEb/xMX+MiwNqoWemV8ifqHnFpbSv8ZCVREO51VxMNWn1nhrQex+t2PgsdkPpUIFI87zmJCJVkgPzylimhSr0POEbBl9HY0GvTiH81/Ym+rRZbyNEIR15k4sRnGxvxAN0kNBQ52O8yQh9PwS1rZVT1OtQS/O4bwMOxMm9ubNWMWic8FxGLnZDyVlfGavE00NUbSq2IX+pIy9qI4Gn9E54qe5sR6urRgDO2uWuHE+OA4jNp/mYq8DIw022Ta0Z3r9klqEfZOmOs9a40iurDFxvdkLYr8YEg/3TadQLEwyHIaWkDla1kBbRv2UK/g5eZ81jiSxMWJid7BhudeX7j3GsB/8Gjx7KTLqaswa19CowgZN0Sq8IiRHwlgLYm8pFFoIDH2MoT+c5mIXUBHM7g3NC+JrcU6TcPDgQSxauBAeHh4YOGAApr/zDg4dOlTnc60MtanYnZqz8klXwxIweOOpBhugONUwWz2HIyFyc3PxwcyZCAgIqHV/ZGQk/Pz8cNLXF9t37ICqqupzwSFXl3vBbb03oh5n4np4IgZ/fwrnF42Enib/2TaUBs3oPI+Y01DWrVsnErmRkRHc3d3Rr18/qKszsfr6+uLff/99YVWVqyu80Mbegh7fvJ+IQd+dbHRbIkWgSoPPXBdfSv2erto4Sx9HuSkqKsJff/1Fx7p6ejh3/jz+3L0b+w8cwJZffhE9b8/u3S98DXM9LVxZ7om2LZjYbz1MwsDvTiKvgfnYikKVBtUbqPR6PVtTgz2tpJwLnVN/Hj58iPIyJkgXZ2dYW1d34B3l6QkdHVYHPj4+/j9fx4yKfTTaO7DWREERyRjw3ckGF19QBPIFDWo10NVdr2cbCWF3RaXK98FyGk92VnUvgFatWtV6TE1NDY6OjnScm1ddwehFmOpq4vIyT3RsyTqLBkcmY8A3vkon9uJGBq/VS+j6WkzoBcXc6smpP1Y1ZvCIiIjnHn/8+DH929LBoV6vR8R+aZkHOjkysd+NTkH/b3wbnOAh1wiTrb62uviFbig0eFOqD5TzypBZ3MyMucjuBAejsLC6WMKdO3eoRZ7QuXPner+miY4mLi/1QBcn1ko4JDoF/b7xxRMl+G0WEPeisHQ31GGaFO/SXY+9qDJ8mBzxoaGhgYWLFtFAq8KCAmpx3/TDD1i/fj3enjqVPsfaxgYrP/usQa9rpKOJS0s90K0VE3toTCr6r/dFlpBOrahkCXUhCCYNTBmvl9DNhMLxNd+Iw6kPM2bMwC9btlDX2qOYGHz77bf4cfNmZGVlwd7eHgcOHKhlpKsvhtoaCFjigW6t2b8Ne5SKfut9FFrsqbnVVWXMSUMHcQvdoqqETXEpj07iNIiUlBTs2LEDOTnPNx0g1valS5YgP7/hdcoJBkTsi0fBuQ0T+/3YNLitO4FMBZ2QUvKKRGOrGtVmxCZ0a6PqgpBJ2Q0rSsdRXsrKyjB+/HjcCQqCmro6Fi1aBP8zZ3Dw0CG6jCcEBgZi+vTpjX4PIvaLi0ehR1sbevwwLh1u63yQoYBiT3pSLXQboQOOWIVua1wt9LgsLnRO/dixfTtdrhNWrliBRZ9+io4dO8LNzQ1//PknXF1d6WNXAgMRFBTU6I9VX0sDFxaPgmt7W3ocEZ+OPmu9kV5V1FRBeFyjxLNdjdLPYhO6g1n11SM28+U+Tw6HcPnyZfpXW1sb02fMqPWhEANdzfuejYVvKHqa6ji3aCR6dWBiJ/HxfdZ5N7haqiwTnyVoT1WFluESu9CdLFlpXsKjjMbtpzjKR1R0NP1rampKxf4sbdq0EY2Tk5Nf+f30NNVxfuFI9OnYnB5HJ2Si91rvWkYseSZO0J6BoW6DW5fX69n2JnokuJaOo4X2yRzOSxESMEgUXF0UF1cL0MiwejJ5FXTIzL5wBPp2sqPHjxKzqNiTc6r3t/JKVQ9Ep0b0P6yX0EllGWuhb1ZkasNbtnKUEzs7Jra0tDSa4PIsJFW1iubN2SwsDrQ11HFmwXD078zePzaJiT1JjsVOstbiM9gk61hjhV1f6j3/t27GSvKGN6IJO0c5cRBCW0tKSkRZbDXZs2ePaNy1WzexvjcRu//8kRjYxZ4exyc/oWJPzJZPsceQZXvZUzpuK1TMlYjQ21mzFy/OLVDooASO+Hjv/fdFBSVWrVqF7du3IzkpCQkJCfjkk08QdPs2fay7szO6du0q9o9eS0MVp+eNwOBuLejx4+Qn6LXmOBKyG9agUBYIfvxENO5owyZdiQi9s1DDC5XAnfjqrCQO50V06NABEydOpGOSrvrVl1/CxcUFrj174uCBA/R+bR0drFixQmIfIhH7qXnDMbQ7W10kpmaj1xrvWq4qeSAksVpz3exY/oBEhO5sLwidJP/HZTT4jTjKyfcbN+Kzzz6DltbzIZs2NjY4fPgw+vbtK9Fz0FRThe8n7nB3ZmJPSs2hYo/Pkh+x362aXDXV0b5Zw/foKpWV9asnSfJgdT7YRWu8T+rfDvtmDmzwm3GUF7JPDw8PR1hYGHW1kWAZEuvelJRVVMLrpzM4fZsF8VhZGOLaSi/aB07WabF0P7UzkOIb4atek9yMTowbLQUjQFBseoPfiKPckBm9e/fumDp1KiZMmNDkIq/qXeY9dxhG9XCix6npuei12huPMmU7NoSUzYpPzabj7i0avmwnNMjr7uLA6nZFJj/hdbY5comGqgqOfTwUnq5M7GkZuXQZHy34qGWRq4/SRU1UXB1ZOS2JCr1PK+FNyitwJYbv0znyK/ajs4fCqxcrb5WekUtdb1EyKvbLUWmicX8nNtlKVOgDW7MSPoQLESmNekMORxZQV1XB4Y+GYGzv1vQ4IzMPrmu8ESmDkZ+XIwWt6Wihm121UVxiQu9O3kSHWU8DIl49NpnDkb7YB+O1Pizm/kkWE/tDGQoKI6by85GpdOzmZAHVRrZFa5DQyZsMEGb1gMjUBjd643BkDVUVFRycNQjj3ZjYs5/ko9dab9xPkY1Q76DHmaQqKx0PbMNy7htDg3uvDW4nvFlRCa4RIwGHowBi3//hILzRry09zhHEHi4DYj8Zmigau3doQqGP6sTyfQm+96pPgsORd7HvmzmQxogQ8rIL0HOtN8KSpSt2/3BBY9qa6FdlDG8Kobu2MAcMWIeN06GsLjeHoyhi/+f9gXhrYHt6XJhdAOe1xxGaxHzYTU1JWQUCBKP34HbW1FvQZEIntoAxHVhKYVBMKi8BzVEoVFSAve8OwNRBHehxaU4huq/1xt3Ephe7/8MkWpCVMKrTq6XxNqo/ulc3O5E//dhdPqtzFE/su2f0x7QhTOzluYVwXuuN4BqJJU3BkaDqnnSvd2cZeE0q9Ne62QNCKZsjt+Ne6QQ4HFkV+x/v9Mf0oR3pcUUemdlPICg+s8nOwTuYacvBxhROFg2vKvPKQifdLXsIXTKO34tHKW+nzFFQse96px/ecxdaRuUVwWW9D243gdhvxWXSiD3CGOdXm80bLXTC6y5CY7zCEm595yg0v73thpnDu7CD/CL0WO9DhShJ/rrBMuwIb/ZsKT2hT3F1ZJc8AH/fYNU+ORxFZfvUPvhwhFAFJ78IPdefwPVYyeV7HLzJhG5uZoA+LRsX3y4WoZO60t2cWJTcgaBY6grgcBSZbVN6Y/YoobZdQTF6r/fBtUfiF/vNuAwkpDAr/xtkQhUDjRY64c1eTqLl++G71RZCDkdR+WVyL3zsIYi9sBh9vjmBKzHijRDdGRglGr/Th2XYSVXo08lJCNb3XZcfiuWEOBxZ56c3e+GT0d3ZQWEJ+n7jg0AxiZ2Udf7rGhO6nbUJejmYS1/oVobaGCh0xfAPeaxwva44nBexeaIrFng5s4OiEvT7xgeXauSNNxbvewk0/JbwthtLoZW60AnvDWCJACh/ih2BEWI4JQ5HPtj4Rk8sGuPCDopKMOA7X1yIYCmljWX7RWFlrKqCmf1lSOgTSRldfRb7/tvFB+I4Jw5HbtgwoQeWjuvBDopKMHiDL843UuykIaRvcCwd9+3QXKxFK1XFUTd7prDEIH2uGvuf5HDklfWvu2D566wFNIlNH7LBF2cfNLwC09aAh6JuLB8OYll0MiN0wryhHQAhsebnc+HieEkOR65YO647Vk6oFvuwjSdxpgFiJ5Vkfj1/n441jXTxZo9XD5IRu9A7Whuhh1D94vCtGGQUcKMcR/lYPaY7vnijNzsoLoX79z7wu59Ur3/rG5aI5DSW+/5hv7avlJIqMaET5pBZnVBajp/O8b06Rzn52qsrvprUm61wS8oxYuNJnAx7eYGWH/xD2UBVBfOGsHx4mRT6Wz1bQtdYj45/PBNKu2JwOMrIl55dsWpSH5HYPTadgk+NklDPQopRnr3LMtWGdLF/5Uw1iQqd9LeaN6SjqMDeH1eqo3s4HGXjc48uWP2mm0jsozedwonQhDqfu/bkXVGDhiUjheQZWRU6YaF7B1rbirDOJ5gaGDgcZWXlqM5Y91ZfJvbScnhtOo3jzxRqScopwu7LLP6kXQsLjHiFApBNJnRzPS28LwTQEFfbvtvMJ8jhKCvLRnTCt1OqxT72x9M4Glwt9tW+d+n9hOWjxd8jXiJCJ3zh2RXQUGPjI7f4rM5RehYP74QNU/uxtO6yp3jtp9M4dCceyTlF2HoujH4+9tYmmCqmTLUmEbqdiR6mD2DO/qjHmdjNc9U5HCxy74iN06rFPuFnP0z9/SLdvxO+HOvc6C4sYu2P3hASs4vQfPHf9D9hY2WE2G8mid0vyOHII5vPP8D8PwJYhIxAS1tTRK2dIFGhi31GJ9ga6+DjoZ3oOCk1B5vOsOUJh6PszBvcDj/NGAios+0t4Zs3XCUqcokJnbBqbHdRssuSo0HIKmT1qTkcZadrcxNAKKjq3MYab4ih+KPUhG6io4lvxwn5uvlFWHzwlqTeisORGyorgY/2XGEDFRX8PKVPk7yvxIROWDCsI61JTdh5PqxJyuRyOLLMTxceIOwRy/Cc2LeNWAo/Sl3opP/0tmmCD/FpBd7bdZm72zhKS1peMeYduMEOdLWwaVKvJntviQqdQCJ9xvZi+ep3o1OwiaexcpSUj/66SrexhO/G94S1EbNhKYTQCVvJPkRXm44X7r+B+CxWE4vDURaO332Mw1dZqGsnRyssHCZkeyqS0MmV6+fJQp5uUQne3hnQFG/L4cgEOUWlmL7rEkBc5+qq+PPd/hJ3p0lF6IQ5A9vCTWj9GhASj58v8PLQHOXgw71X8SQrj44XeXSHs71Zk59DkwmdsPe9gYCOFh3P/fsKotLZf57DUVT2347Dv5dZIZbWdmZY+5rgclZkobc008eWKW7soLgUE7acQzkvUMFRUBKzizBp50W2ZNdQw74PB9O6DdKgyd/1owFtMLKHo8gKv/Tw7aY+BQ5H4pB4mDd+PUdbLRNWjXeVypK9CqlcXva8NwDGJqxm9cYTQfWqqcXhyBNfeAfjahirKENsU5+NkkzlGJkWOilQceCjobQQHimhM27bObrM4XAUgTMPUrD6yE06VjfUxYEPh1R1GJca0tkwABjWrhlWvNaTjktzCjHmZ39eUJIj9yRmF8HrlzMsaUVVBUdnDYFNEwbGyJzQq+pg9+9sR8dBEcmY8/c1aZ4Oh/NKlD6twOif/FGcwwLClo5xgWcnW8gCUhU6Wc4cnj0UFuaG9HiHfwh2XI6U5ilxOI1m5p5ABEcm0/HALvZY95rQgFHZhV61X/eZ5w5oqVM3xAe7LuJy9Ku3n+VwmpIfzoZjt5DH0czSiE5g0t6Xy5TQCT1bmGPXe4NYllvZU7hv8kNsVr60T4vDqRfEa7Twr0B2oK2JUwtGwlSXlT2XFWRC6ITpvZ0wfzSLGiJ7HPfvTyGvuEzap8Xh/CehSdnw+OkMUM6Mb/tnDUFXW2PIGjIjdMLGCT1FwTSkguzon8/wyDmOzJKcU4ShG04ChcX0+Os3ejdJWSi5FzrZ0xycNRgdW1qJkl+m7bwk7dPicJ4jv6QMw74/hbSMXHo8ZWB7fOEp3aAYuRE6QU9THf4LR8BSsMT/E3Afn/J6cxwZoqyiEh4/+iM8lhmNiYv4jxn9IcvInNCr8tfPL/EQVZH9/vhtbPDnJaM5shHDPunXC7h0j7VVau9gCZ+57rRsmiwjk0IndGhmhEuLRoqaNi7+KxC/B/IOrRzp8v6eKzgiVIqxtjTC+U9HwUBbQ+a/FpkVOqGfkyWOzRnGit1XVOL9387T/F4ORxosOHATO8/co2NdYz0ELPWElSErkSbryLTQCWO62uHPDwezBJinFZi0xR8Hg+KlfVocJWPJ4dvY5B3EDvR1ELjUA60sDCAvyLzQCdN6OeGXdweKGtS98bMf/rnFWzJzmm4m/+6o0IBERwuBn45CN1vWr0BekEiTRUkWv/9kl9CgTk0V298bhJn9WClpDkfcVFYCM/dewe/+90QiD1jsgf6tLOXuw5YroRN+vRSBWb9foHt2MsOvmdwHK0Z2lvZpcRTQhTbx1/M4elVIstLTRuBiD7g5Nk1nFSi70Al/3YjBVFKmp+wpPZ41siu2TO4tU0kEHPkuzzzqR39RhRhtIz1cWeKB7nbytVyXe6ETfMMS4bnZjxaZJIxwccShjwbTgBsOp7E8yszHsO9PIiYhix7bWBnh4hJPuTK8KZTQCTfjMjDo+1MozGaJ/u1aWMBv4QjYmehJ+9Q4csjFqDQM23Qa5bmF9LizoxXOLBoJSwP5cKEprNAJJJ2VZLqRJJiqZdbJue4Y1IbFy3M49YE0FJm755JoO+jR0wkHPxwEHQVZIcq90AkknfX1redw5o7gclNXw4bJfbDIvaO0T40j45SUVdDKMHsusKIRpCbCIi8XfDe+h0LZfBRC6ATyv1h86Ba+J0ENwn9pXJ/W2PNuf+hryX6IIqfpicnMh9fm6uQUEm699/2BmOLKUqUVCYURehUkRHbS9vO0mSPBztoExz4eJtcWU474+fd2HN7ccUGUS06Mbj7zh8tdIIzSCp3wIDUXXj/6ifbt0FTHhkm9+VKeg+Kycsz+5xp2nQ1jrZIAWuxk38yBMNKRrfJP4kQhhV71hc7ccxV7q/ZeAIZ0a4G/3x8kN4kIHPESFJ+JCVvP4VEic52RfmjrJ/bG0hGdFP6jVlihV7HnRgymkX7shSWizhn/vDsQE5ztpX1qnCaiorISq33v4cvDN0RWdVsrYxyaMxS9HMyV4ntQeKFXBUG8sfU8bkcksTtUgIl922Lb224wUeDlGodt46Zsv4Agod46+e7fGtAev07to1RGWqUQetVV/esTIVhFemKVPxXlFO942w1v9VQ8K6uyQ2LVV/uEYNXxW0BJOb1P1YCs5gZgootsFnCUJEoj9Jr7tMnbLyIiPl10H+mq8evbfdHWitWp48g3/veT8OHuwOq9OFiI9J8z+iutfUbphF51tV914i5WH78NlJaLDDMfu3fGmnHOMJSD0kCcuv3in/xzDT43o0UWdRIp+dvbbgrpG28ISin0Kh6m5uKDPYG0rHQVxFi3bqwz5g3tAA0ZL/jHYWQVluLzY3ewhZR5EoxtpCLRjCEd8P0brtwOo+xCr+JAUBzm/X0VyWk5ovtI4b//vdYDM9ycoKpIsZAKREFpOdafCsVq37uiwBdCj7Y21NDqYm8m1fOTJbjQa7S8JSWlVx6/A+QXiT4gBxtTfPWaM6a5OilU7LO8C3zjmXCs8r0ryjQjNG9mTAOjJimhse1lcKE/w5OiUnztHYzNZ8JEue6EFjYmWDm6O2a4tZL5Gt6KSm5xGb7zC8Pa0/dQkVctcANjPawa54w5g9rz7dYL4EL/j75aX50IxnYSWSe4Zwikl/uiEZ3x8eB2vMhFE5GUU4T1p+7hp/PhosAngqaRLr707IaFQ9tDW0Mx0kklBRd6PX5k//O5i20X7tea4UnJ3/mD22PJ8E60swxH/NxNzMZan2Dsvx5VbWQTZvDlHl0xf0h7hckXlzRc6PUko6AE35y6hw1nw2vt4YlbbnxPJywe2VlpwiklCTENHw6Oxw/+oQgkNdtq2IpJhtlSj274sF8baGnIRaVymYELvRGGoC0XHmCjXyhSaljpq0pZTe/XBu+6tYaFgZY4vyelcHX+GvAQe65EIiMzr9Zj3Vo1wxKPrtTIxj0gjYML/RVCaklO87cnQxBcFUddhboa+rW3waSeTnizpwPM9bjo6yIqPQ97r8fgwI0YhMeliYJcKKoqGOXsiOUeXeSyjrqswYUupiKVP5+/j91Xo0UFL0SoqcLFqRm8uttjfPcW6GRjDGW+OAZEpuFIcBx8guMRnZhZW9wATM0M8F7/tvh4UDvYm/Iin+KCC12MFJWW42BwPP66Go3T9+Krw2trQKz2Q9vbYGSX5vDs1FzhZ/vo9DycCE3E6XsJOPkgqbZ9owp9HUxxccA0t1YY1s6aL88lABe6BAtWHrkbj8O343As5HGtyC0RqipoZWuKAW1tMLR9M7i3s5X7vT1Zjp8OT8L5+0m4FJGCtIzcOp9HZu6x3e0xwaUl3NvbcP+3hOFCb6IkmosRqfAOiacz28P4jFrW5OpvQwX2zYzRy8kSLi3M4drSAj1bmMps3nR6XgmuxabjZmwGbj3KwJXoVOQ8ya/7yRpqcG3VDKM622FsVztew6+J4UKXAml5xTgZnogzYWzmS0zLfm6vKkJFBUbGenCyMICTpSGcLA3Q2tIIbZsZoZ2VIcwkuPQn16LEnAI8SMnDw9QcRKbmICY9DzFpeQhLz617GV6Fqgo62FtgcAcbDG9PVizWPMBIinChywCJ2UU48zAJFx4kIzAiBZEkj5o0kawP2prQ1tKAqbY6DLQ16eyvL4wNtDVgoKMBAy0NGOpowlBHHU+fViK3uBy5xaV0e5FXRP6WI79E+Cvcn15cjoriklqBKv+JpjqcW1igX9tmGNLOGoNaWyl0sUV5gwtdRo16JCrsbkIWQhKeIDwpC+GJ2Ugj/mVpJxuqq8HB0gjtbUzQ0dYYXexM0b25Kdo1M+I5ADIMF7qcVbaNzihAVHoutWaTZXTikwJk5hcjK78UmQXFSMkvJleKhl8Q1FQBXS0019OCmZ42TA20YK6vDXtTfThaGsDJ3IA2Gmxhps8FLYdwoSsgROPkolBY9hTFZRUoKitHER2XQwUqND5cR1MN2upq9K+uujoPKVVwuNA5HCWAZwZwOEoAFzqHowRwoXM4SgAXOoejBHChczhKABc6h6MEcKFzOEoAFzqHowRwoXM4SgAXOoejBHChczhKABc6hwPF5/+3jOvK2d0HJgAAAABJRU5ErkJggg=="
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Solve the following math problem step by step. The last line of your response should be of the form Answer: \boxed{$Answer} where $Answer is the answer to the problem.
<image>If $\overline{B E} \cong \overline{E D}$ and $m \widehat{E D}=120,$ find $m \widehat{B E}$
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120
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[
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"
] |
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Solve the following math problem step by step. The last line of your response should be of the form Answer: \boxed{$Answer} where $Answer is the answer to the problem.
<image>Find x.
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2 \sqrt { 221 }
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[
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"
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Solve the following math problem step by step. The last line of your response should be of the form Answer: \boxed{$Answer} where $Answer is the answer to the problem.
<image>Find $x$ so that $m || n$.
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27
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[
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"
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Solve the following math problem step by step. The last line of your response should be of the form Answer: \boxed{$Answer} where $Answer is the answer to the problem.
<image>GRID IN In the figure, the radius of circle $A$ is twice the radius of circle $B$ and four times the radius of circle $C .$ If the sum of the circumferences of the three circles is $42 \pi,$ find the measure of $\overline{A C}$
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27
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[
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"
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Solve the following math problem step by step. The last line of your response should be of the form Answer: \boxed{$Answer} where $Answer is the answer to the problem.
<image>Find $m \angle 2$.
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34
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[
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"
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Solve the following math problem step by step. The last line of your response should be of the form Answer: \boxed{$Answer} where $Answer is the answer to the problem.
<image>Find the area of a regular hexagon with a perimeter of 72 feet.
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374.1
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[
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+1KnRaBYkznab2d/0vUl6Q2yDYYFZRex/9xOsabEsL+Pn64viWH0gvCgUGGKRvx0ZAOuKTYUjJ4Gw3X7vxaJYCKGpfwZptOQvBeZohE3aiqx5fD3/OzpazA8l3UcidlnxNqzvwdcXfrp+pIYRq8gAVgSgiUOJu5BXkm2ri9J9sguGNbfbMC6OEmBgxLBlBBmGKb7rTZURFm9/0t+CvUtGP525kcUlxWIdbB/EGz6SpptDMN0jX5qWp9pFxNxMv0wP4W3QFZO69eqKrD9yAaxtrK0QlhgiK4viWlBxZVrOLD9BLKT83ApvxSuXi4ICPfG2DuGwrGfNAHByAcySSu8VISGhgZsOLgSMYHDYG4qzTEzzenTKCPNn5W7P8YBhRn80AGD2QxeZpw5lIyv/rkBVZVVrb5m1dcKDzx/F4aOZ4dCuZGckYqUjFSxnhu7CDNHLND1JckS2RyTcy9l4lDiXrF2cnDiQCgzMhJy8OmrP7QZCInqG9X432urkXI6s9evjbk1oQHBsLayFusdxzerZPAYmQbDNXFfiTlkIiaCdxdyorGhEd/+exMa6qX70x43G25ixTubxWdGPkie4pEqgeSNh1bo+pJkiSyC4fG0g0jPSxJrHw9vODs66/qSGDVot1d08XKnnpPLBaVIPC7ZMjDygQopZJ5GHE05gMwi6djMyCgY1jXUYuPBlWJtZmqGKMU7GCMfstO6JgeVnZqvtWthuk+M0iKgsRFr9n0lrAIYGQXDX05sRulVadcR6BcAaytpjIiRDx0dj1t/P4sDyBFqwnZz6S/WZKoWnyzl6BmZBEMzNfN3GRW2GTXcvbs2AeTuIzm2MfJDfTdobsrCJ7IKhrcPmYP+jpIGW2ZOFm5UsX+D3IiJDYeNfd9Ofa+1rTUGj+NUhxwpKy9DcYlkNh/sFYHhoeN0fUmyQufB0MzEHHePXybWDTcbcD5VKqQw8sHCyhx3/X5ap7533gNTYGnNTb1y5GzKeZVi/KIJD+n6cmSHzoMhMThwFCJ8Y8Q6v6gApVdKdX1JTAvGzxqOSfNjb/m80BTKpPmj+bmTIbn5F8XOkIiNmgjf/pLmISOzYEgsHL8cpiamqncwzh/KjyF3hGLkPRFw8XWAqbn0p2NiZgIXH3uMuDscYbd56/oSmXYKWolpyWJtbdEX88Ys4edJzrPJXv38MG7A7dh39hdUXK1ATl4uC7rKiKqaaqRnZqBfoAN8Iz2EZl7JpStwdXOBjXVfFFwqRFFJMYouF7N7ocxIyUxDdU21WM8ceRfsrSVpL0amO0Ni7ujFsLGSDJ+S0lNQV1en60tiFCSlJaO+QRLbjQqLEMHQoq8Z+pj0aea7kZCSqJokYnTP9arryMi+INZujh6YPHiOri9JtsgqGFIgvHPUPWJdU1uDlAtpur4kBkB5RTkuFkiN1y5qslBKSGaN5NaIyuuVuJCVxc+bTDifkoSbN6U3p3smLIOZIhXFyDwYEhMHzoSni49YZ+ZmobKyUteXZPQoc7g0vUBTDG0RHhgqZNeIVHEsqzH6503XXL5SgoLiQrGO8huEgQEjdX1JskZ2wZDK/gsnLBdrekdLSE3U9SUZNXkF+bhSdqWVlHxLTM2axADq6uuQlC4l7BndQG9e55Kl1w4VJheMf4Bvhb4FQyLSdxAGBg4Ta0rIKxtFmd6FBEHPpyU1mQyFRNzy+308m0Q2qJWDjteMbsjOy8HVaxViPT5mGjxdfPlW6GMwJBZMWA4zxbgQJ+V1Q1pWBqqqJf3C0IAQWFladvgzAyOiVWIAZ5OlJl+md6HCY1JailjbWdljzuhFfAv0ORj2d/DApMEzxPpa5TVk5rK7V29SVV2N9KwMsbaxtkGIokDSEXSMpuM0caX8iqrwwvSusnVtXa1Yzx69EDaWtvz063MwJGaPuBcONlKOKiU9FbW10g1mtE9iapI4JhOUCzQx7fyfCh2nzc2kXT2NV7KKTe9BG4csxcbBq58vJsRM78Xfrt/IOhhaWVhjzujFakl5aevPaBexoyuUdnSuzv3g6e7RpZ+n43SowsyLmn2p6ZfpHdRTSlSIpIIk0zlk/0yNjZoCv/5BqqQwTacw2uVcSmIr792uEuwXCFsb6Xh2ITtTNP8y2kW92DgoaAQifAbyU25IwZBekPQO1wdSUp7e+RjtcTE/TzXQ7+ftCwd7h249Dh2rlYFUqBElsxqRNqHdoPK1QYVHbqUxwGBIhHhFYmhYbFMjaZHUSMpoFsrtKVtpKOcX1UErTUe4u7rBrZ+krEyzy5dKO+ejwnSdCzlZYvqHmDJkJlwdJI1QxsCCIXHP2GWwMJNaO6gRmx3YNE9qVrpqoJ9yfhYWPdcljAmPbja3zGpEmocKi6kZUl7W0dYJM4ezL7JBB0NnO1dMHXanWJMadrpi+JzRDDeqb6gG+m1sbETOTxPY2toi0DdArK9eu4qsi9wipWkS05NFgZGYO+Y+UXhkDDgYEjOG3gUXe8lfIy0zXchKMZohMSVZ1UozIDSqS600HRERFAZLC2lXn5yeirpaViPSFEq5O8LfLRixEZM09tjGhl4FQwtzS8wf8zuxJjkpkpViek5JWSnyiiR7z/4urvBw02y+yczcDJGh4WJNzcBJGdwipXERDfTBvRMfFJ8ZIwiGxIiw8cLMhqDpBmXlk+ke6hX6nrTSdISfly8c7aUGejoq05GZ6Rn5hU0WGcPDxyDIQ3rDYYwkGBL3KppJxfyrwuSG6R7qggr+3n6wt7PXylMpAm1ElJqiCt+3nkAFRKV5mqW5lSgwMkYYDP36B2N05ESxpp0h9cYxXae+vl411UOtNJEh2t1Z9FMThqUWKTL/YrovokFFL2LasLlwtO2atzVjIMGQmD9mCawsJC9f6o3j+deuk5rZ1EoTFhyqkVaajogOi4KpqaS2TDsbbpHqmYgGFRSnD5un4btknMjGEKqr2Pd1FOY2Gw98p5p/jQrtWZOwkhN7ErD5m11w9XTGU2/ff8vvTTyWjoO/nMTlgiuovlEDd+9+CBsUiPGzh3fLPzg9IQfbv9+LS/mlqK9rwCOvLEJgpKQCoy1vDBqbC/KT2l+0jbWVlZADS85IES1StMMJDw7t8eP+64kvUFF2DQv/MBMxo8Pa/b7rV6vw26bDSDubjatllbCwNEdQtC+GTohGaIx/l39vQ10DNn75K9LP5qCs9CqCo/zwyKv3QtsiGko/mrvHLYW5KftUG3UwJKYMno2DCbtRXF4o5l/9fXyF3FRPOX04GcV5Jbf8nsaGRqz8zxYc+Pl4s38vungZZ+KTsXfbUTzxjyVw95VagTrDxYxCvPPMF2iobzJUqqlqUupZ8/F2lBaVIXiAP6YtHIuettIovTGoaNKbA/2hAcHIyc9VBMN0MfZHQbK7XCkuR1qC5LtSVdl+u1Vm0kX89+UfUF7avHiTnZaHPVviMXPxRMx98PYu/e7PX1uLkweb8p9lJU2z8xcSc/HL6jixvu+pO+HYz16jIhoh3pEYFtKzvwPGAI7JhJmJOe4Zv0w1/0ov8J5SkFWMM4c7fpxDv55SBcI+JibwC/HCoNERcHCW3P0u5ZXgf6+t6dLvPvrbWVUgHDl5EB56cQG8A91UX086no7Th5Jw4XwOeoLI1xVL+Toal6Oxud6EehiVFgFCTbuH1g6bv97V4ffQcfyLN9aqAqGtfV8MHB2BoCg/4fDXeLMRP32/F6cPdv5vqK6mHmePSjlX5/6OWPDoHZj7wBTV18uKK8T9oo/q65rxhFFK+dOb16IJD2rkMRkD2BkSAwNHItJvIJJyzooXOL3QSXaqs1Bls7L8OspKruFcfAr2bDmCmqqO/3C3rdwjPtML6fE3lqiOZrSTe/fZr8Qu5OKFQpw9lIKBYzpXmLhySdpVWNtY4fd/W6D1Vhp6QQ0I004rTUd4uXuK+0T3K68wHwG+/qLA0tkgVFF6FflZlxC3/RjOxnfct3hoxylcLpS8XCjt8MKHD6say0/GJeKzV1eJ52bbit8weGzn0i1Xy66hvk46rt42ZySmLhir9cp/WYXUSjYm6jb4uGpmSogxgJ2hkoXjlwvTG+U7Z1fmXy/lleLp+W/itf/7CFu+2SX+wDuirOQqSoulP8qYkeHNclSUJ5y3fKrqv9PPd378rL62XhUMtQVNKyhl0Px9/GBnJ+1kdUGMwiKASOjCffviH+vwwn3v4KO/rexUICTSzjXZly59Zn6zCZuh46MQGCl5hORlFnW6qENBWYmNvVTM02blP1ExZGBtaYN5Y5Zo9fcZI3q/MyTI7Gb8gKnYe3aHMMEh3cMAn64nwztLUU6T+krowNaFB/8Ib9X6ckHHTeE7Vu0Xyfy8rCLx3zcqq7H2k+1iPWnuaBz65SRqqmtRUS6pkuRlF6u+PnXhODh1MhdFuxhlK42FuQUig3XbpEs9jRSQSZm5/Gq5yCNSr6M2uFQg7Qpt7KzhHdQ6LeAT6I4LiTkij1pSeAX9vds/XeSmFyJ+5ylRjFFyfF8CCnMuob+nC4Jj/HH4l5MozpMaoomfV+2Hjb01vPzdMXbm0B5V/meNvBt21t2TVmMMPBgSc2IX41jqQVyvvibmX73dvWBuLknP3wr6431v81+b/du/n/4SBdnF7f5MlVr+x1GRI1THTNE6QtRWd2xVcODnE6J6rKT6RjV2bTgk1jGjwrF36xFcv9b0wqN85K4NUoFn5JRBnQ6GVHGvqZWuPSI4DOYWHT8/2iYqOEJMUogxvbQUeLt5ifG9W/HgX+7GkmfmqP77/NE0fPXP9bf8mWpF6sPWoe0Cm4lZ0z2rvlHbYV5ZeX+UJJ/MEB+Ug6yrq2/19cM7T4nPUcNDuhwMr99oqvy7O3li0qDZXfp5xsiCIZnekPnNmr1fihd88oVUIR/VEX1M+8DOsfkLxKKDIOEV0B+zl0oD8X5hnq2+TjsEJc79O34HHzAqHOWXryIr9aKojBJDxw8Qn+1d7DB4bJQIwEkn01F1vVocoyOHhqgKAZ2h8kYlLuRkirWdrZ3I0ckBCsgRIWE4m5Sgum8djQRSKkK9bcnWoePnYNKcUaJ44ujc9hvHZcWbER3bXTwku9P26OfhJO4PvdElHEsV/+bu4wqvAHd4+rvCw6+/+HpZSbnIHRPB0X5wcLaHfxt/Lx1xPiVJVfm/Z/wDMFOkhBjNYjDBkLgtZgYOJOxEfkmuOHoFePuJF76mcfPphzlqVcOWUBFGSUBExz2Cix6bKT5T9ZmCIVUmH/17k73j/X+eLz6/vOx9EQzphaX+9a6+oCjYKHN1coBSGlkXyef3KjJzs8R9I+kvTTLhzhHtfu1y/hWknJHeKFz6O8LG7tY52+ABfuKjpLAMLyz+t/g3Kp6MnzVc9T0DRoaKftXPklaL/178xJ3wDemalwxBgrgkjEtE+Q9CTIDkJ85oHoMooCih6qhS7pxe+BQAepsDP53AwR0nVLu2kZN170NBL6jCS0Wt1KflgrpABN233rR2qK2qxYcvrlTJiqkHNF2jXvk3NTHDQm6l0SoGFQyJSN9BGBQk/UEXlRQLk5zeIvnEBfzw4VaxJnXnJc/MhbmlbjffzVppTHTXStMRJB3m2d+jV+8bTY988vIPKMyV0hoB4T64XcvtMV0hW7FbJiYOmgYPp6bCHKN5DC4YEgvGLxemOC2tE7VJwpFUfPDXlWKEjlj0+Gwx4iWnFxTlCTV9/NQk0eGRzSwCtDm3XFdbj/f/sgKJJ9JVOb+n/vUAzC3kkTmqq2uyxrW1tseckdod8WMMNBiSGc7kwXeINZnkkFmONjkVl4RPXv4e9Yqj1p33T8Ztc0dCDi+o5IxUVSsNKU7LGZu+Ngj2D1LdtwxFwUfT1FbX4b1nvxHVX8LZzRF/end5h7nC3oTuG1XYiTmj74W1pXzfxAwFgwyGxKwRC+Fg4yTWZJZDpjna4Njuc/jf66vEjpCmURY+OhN3LpsMOZByoamVhuS5OtNqpGvCA0NhZWmlsnaortHMGJuSqhs1+PczX6pmmT19++PFjx+Bk6t8+vauXbsmCoCEdz9/jB8wTdeXZBQYbDAkU5y5YxaLNZnlkGmONgLhl2+tE/PEZmamePD5e3D7gjGQA5WVlaIyq97crA+Ympmq5pbpviVp8L5RseTdZ75CVvLFprG8jx/RiICCJhHuj4rUzr0THuhVEQ1jxqCf5TGRk+HnFtRqDE0T5KYV4Ou314vqp4WVOR57YylGTR0EWb2gZNpK0xE+nt5wdnRupcTdU2iMLztVUnwZMCIMz733e/SV0dGYKLxchOISqaAzOHgkwnxidH1JRoNBB0Myx1k08SHxWb2qqgnWf/4L6uvpaGyCh19ahOiRUhO0HKAXk7Ia69HfXVRq9Y2BirllYe2gAYuAzOQ8oR5DBEX64rF/LJFNsUQJFYyUf6PmZhaqNjGmdzDoYEiQSc6w8DEalZqnSiSJsBKxtw/CwNhenvFt7HwrDVVo9RFHB0f4evk0afgV9Mza4fQBhemVSR88+vfFMDXr5T/9TohQUKHv+vXrYj1lyEz0s+9daTVjR15vjVri7jHLcO7CCdTUVQupeQ9X9x75Aqefy1ZVjmlYf/+Px9r9XitrS4y8XTON1zQ6SBTnlyA7JR/mVuZCWVv9hU3Oc9cqJeWdIL9A2PbV3ypkZEgECooKRe6Q7hv1IVJOsTuknpUq0yYmfXD28K2VbsIGBXRJlLc9+qjdl/PH0mBqYQYbW6s2c5RUKErNTBNrR1tnzByuHQk3xsiDobNdP0wdOgfbjqzViNT8leKm3COpWtNHezi62GksGDq62CM/q1iIOrzx6Cfi39787hmVwopopUmXWmnItJ0qs/qMlaUlwgJDcT4tscfWDhWlkuIPFbu+e2/LLb/3d0/N0UgwpNE+JZu+2ik+aGa5rVFK6imkoE/MG7NYON4xvYvBH5OVzBg+X5jnEGSmQ6Y67UFHKaK9XciN600KMh1hatb59xtlw3F7v3f6wvGwd2o+a62u8KLem0atNB2pv+gD5M1CHi0EKbeQgkt7zxthZtH2c0dKQJ3FrJP3jHaZSszbeK79w70weExks527mXnr66MCUW5+rlgHuIdgdIQkAsL0Ln0au6KEquccTzuIz39+V6x9PLwxbOAQGAp0NN5zaL9oyXCwd8Bto8f3qIJMyfxbpRL2HzkocnmU26PfpU2oGBR/8qhY01F55BD5zA9rgrijh1BaViru1wsL30Kgu7yb4w0V/d86dIHhoWOx5+zPyMhPFqY6gX7+qhYOfUd97LC7rTQkN7VtxR5cvFCAirLrMDXtA/8wb8xeMglRI3RXLSdxCfd+bmJmmRRcSHhCHyvkbUGWBxQIiZHh4zgQ6hCjOSYrWTThIVUT67leVEfR9s5J2Zvm6ebRJQ8YJXs2xePNP34q9PnKS6+h8eZNMVWTcT4HH730vUqXT1cIBz+1uWVDONBIZlhSuw/lCO8aI5mbGTJ1dXV49513cMeMGZgyZQoefeQRnDx5EnLA6IKhb/9AxEZNFOuy8jLR1KvP0G6QGqxVrTSK6Y2uQJaWa/67XSVYMP/BqVj6zDzh9kdQ5fyUojVFV5DARKCvZLFAwhPKcTV9hgp5VdVS/nnGsHmiimzoPLh8Od59912cOXMGSYmJ2Lp1Kxbccw/iDx/W9aUZXzAkyEzH2kJSRyaTHTLb0Vcyc7PF6B1BIgckdtBV9mw+InKErh5OeOWLx3HH7yZi/Ozh+OM/fgdLa0vxPdcrbkDXkNAEVcmVxSKlBqE+QgU8KuQR/RzcMHXYXBg6Z8+exe7du8X6kUcfxSf//S8io6JQVVUl1rrGKIOhvbUjZo66W6ypZYPMdvQREp9IUajSWFlYISywe3m9hKPSY8xYPLGZ/iLlHZ0VAgZ9etCXqSmoOh4ZKjW4U9U8MUPz8+a9BXlF0zGZuGvsEpibNtkYGHIwJHx8fPDyyy9j3rx5eOWVV8S/nT51GrrGqAoo6kwedCcOJOxGcVmBaNnw9/bt1q5KlyRlpIgcDEFBorMtIS15Z93zaGhshJWarwhBhupFeZLxlFeAPKYh/Lx8kZWbI9z0SKuRLAKoeq5PXCm7IgonRKhPFIaF6F7cIykpCV9/9RXS09Nx5coV+AcEYPKkSViydClM1QzO1KHv++CDD3A+IQElJSXw8vLCiJEj8fDDD8Pa2rrV9/fvLyms37hxQ/zdkopSTo40yWVlJe34dYnRBkMy1Vkw/n58tPVNlUWAPrVsUN6MggHhaN80utYdLKwtUFJwBbvXH0JuegEuFZSitKgM1VVNsmc+wV3379CaRUBEFA4cPaQaPRw7Ihb6gpi1TpFmrU1MTHHv+Ad1fUkioL3zzjtoUEsXXbhwAb/t3o1NmzZh1erVrUSBMzMzMWP6dCE3poQC6b59+7Bq1Srs2bOn1c+MHTtWBMDS0lKMiY1FSEgIDh2SXARjY3V/D3V/9tEhMQHDEeUnKc1Qy8blUmkXpA+oV1QpOHS3p7C+tgEfv/gd/vK7d7H1291CzICmXNQDIT22XIIh0c/JBd4eXhqdN+8t1FV4xkZNgo9ra9/t3mTHjh3417/+JQKhmbk5YseMwYQJE2BrJzX3nzhxAu/95z+tfu65555TBUJ3d3dMnToVDg7SDj3v4kX87W9/a/UzFBw//fRTERDz8vKwd+9ekeoJDg7G3197DbrGqIMhsWDicpgqrBfPpZzXi5aNwuIi0WtHkD80BYfu8vFL34lxwkbFMZkqyHPun4In3lyG2++R/EAcXOxh3Vf3xxh1osOiYGYqHWyoPUWbFgGaggp15A1NWFvaYG7s73R9SXjrzTdFG5WJiQnWrlmDDRs2YPWaNdi/f78q7fLDDz80+5n169apqr9Lly3DiZMn8e2KFYg7cAB+fn6q7zl48GCr33fHzJk4dPgw3v7Xv/DkU0/hs//9D7/t2QNnZ91X0o32mKzE08kHE2KmYc+Zn1VHT7l4Crcr85SmdEwzRVRY92Z1lQZWJCBA3DZ3NBY+ekezcbb92yQBCg8NzOlqGmsrK4QEBCM5I0Uj8+a9pTxeXVuNmw2NGOI5DmdPnsOlS5dQcvkyLl++LPJul0tKcKW0VHQIkHiDmamp2EnZ2NiID3t7e9jZ24vgERYWhoiICISHh8PCousFGOrvy8iQKtpTpkzBaLWjqoeHB4YMGYJjx47h6tWrKCoqEjtAgo7BBO0EX3zxRVX/p6urKx57/HE89+yz4s1156+/iqNxS7y9vbFkyRLIDaMPhsSdoxfheMpBXKu+Kgbm6QgmV4l8dZmn4IAg9LXunIl8WxzZLVXwaN558WOzVKo4RPX1GiSfypBV8aQloQHByMnPVQTDdPh5+4ogKTeulV9HwrEU7NsVjyt519BQcxPl4Sbo3/80XPv3h5ubG8LCwzHB3V0EIfro27f5faWARAUL5UdhYaEoXGzcsEEUIWgXR0UPCpADBw7EmDFj0K/frZvvT59uquA+9vjjrb7+t5deEhVgCnZOTpKFBpGSIu1ux44bJ4KzOgsWLMA/3ngD5eXlSEhIgD7BwZCMiCxtcWfsQvyw5wvRskE9bDERune2awnlV5QyT+QTEhbQsxG58itSzsfWzrpZIKR39a/f3ojaGqlS7R0o7QjkBs1Ok/Xp0TPHFdMciRg+cCjkQG56IU7FnUfCkTRUV9fA3qMv7N36ImCEO/685DUM8O/adVLQoQ9//7ZPLVShTU5ORmJiIvbt3SumPCiIUVCcNn262KGpC1oQymBFu8qhQ1tfz7Bhw8SHOhcvXkRFhaTaFBnR+lRCmwhfX18RDOl69AkOhgrGD5iO/ed2Iq8kR0w3BPj4wc62uUKMriEfF6XME0lZdVfbT4mtnbT7KLlUhhN7z2Pw2AhkpuRh0xe/Ij2hacLDwdlWBEg5Wgd4ukvjh1RIoXYVSnH0JIfaU4+V/duO48DPJ2BlY4EhY6PwxzfuQ71ZHQ4djxffM8B/SJcDYWegnSQFNPpYunSp+Dc6eu/cuRNffvEFysrKMGfOnGY/k5yUpOr766O4txRMc7KzMXjIELFDbasFR4mvIj/YEjpOnzt3Tuxm6U2qvdYcucHBUAHNKy+Y8AD+s/FVacQtJRGxw0ZBLpB/C/m4EE6OTj1qpVHi4u6oss787LVVKpl9IijKDxcSpdadD/6yAk++tQwDRslTTYV28XsO7xfXfi75fI8Ve7oKCfz+uu4Aju0+i4FjI/HkP5fCxV06VtI10bURpiZmWDih96T8KYd33333iY+2oHwlQf2BO3fuFLk+CqBKPDw9RduNet5POe1EtDzKK3FUO1LTdImcvbrVMfpqsjoRPgMxKGhEKx8RubXSxIRHaeQx71w2BeGDJMMsgh7f3MIc0xaMwwsf/B8cnJt2xjSzLFfI/S/Ax7/Vm4a2uX6tGus/24HX/+9j4Y746ldPYNFjM1WBUKk8ToU5YuKg6XBz8oZcqFHYsBYXF+MPf/hDs0BIFBYUYPGiRfjpxx+bHceVWLSTV1d/G6q+hW6o3OCdYQvIhCcx5wzq6mtFAOrfz1XnVo0kfU/HQKUOo6Zkx6hy/NTb9yP59AVczi8VZuohA/xhYy9ND7z+7dPISc2Hi7sDXL103/pwKyKDw8UxmXK+VATzcvfUWhGMPHB2rjuIAz8dR+yMIXjtmydF43qr71NTHre3dsCcka0VrnWJ0ks8NTVVHGWfffZZTJ02DZXXruG7777D5s2bRTsQ9QDeMWuWyDmqB7f2mtDUd+XKCSl9gINhC1wd3DFl8EzsOL4ZldcrRfU2xL9p96SLVhqlzBP9wUZ1Q5Wmo4A4YGTbLSlkoxkxTHf/712BdrQRIWE4m5SAmtoa0cZCsl+a5lRcEjZ88Quih4fipS8eh80trEYpKCuVx++MvRfWlt2v/GuDWrVA9ac//QlPPf206r9HjR4tjsS7du1Cfn4+tm3bJnKO6iOfJu2kIm6q9erKtSujLfiY3AYzRyyAo6101EnNSFO9g+qCdJK6r5JaaaivTo6tI3KBjsp0ZCYyc7NUxliaoKL0Gj56cSV+23QYT/xjCRY/MeuWgVDIjF2UilA+rv4YHz0NcsNcEdhox7fs/vtbfX35g02jgtTGQ1ip/f2ZtFMYqVN7vbSXV5QjHAzbgIQ2546Rks5UvSWZL11ATbfUP0dYW1mLvjqmg7llxW6Q5s015ZN9Mi4Rbz32GQbFRuK59x/qlFmUMsdLnt0LJyyXZSVeKabg4ODYrI9QyYABA1TrnFwpD2tp2TSJpD7LrE6NWjBUD55yh4NhO8RGTIK/mxR8qLGXEvO9TVJ6k9aiaKXRkxYFXUJ2AOSTookiWGNDI1Z/vB2/rIrDc+89hHGzmvfcdWZccnDwSIR5NwUVOaEMVO3FaVu1KrAy8HkoplAIElxoC5qoUT5+y95GOaM/V9rL0Dv6vbc9qGo3OZssKY30FpJjmqTCTQUTH0/5VCHlTnREpGreXHjDdGNuua6mHh++uBLVlVV44eOHm1WIOzsuaWFmgXvG914rTVdxUwQ2deUZdUpLmoRL/BTN3gNiYtBHEeDaC4ZKWa7AIP3INyvhYHgLgtzDMTJc6rEi0578wt5TRyF/FmWjc0yE5gsBhoyNtY1Q/SaoCJaRIxnId6Va/P7z38I31BMPvHB3M6vPjqDfpRyXnDJkNvrZSxp+cmTEiBGqim92dmsbhcPxUqM4oZx8od2ip6IZmxRtWkLtOZcUO8PoaPlNcd0KDoYdcNeYpSpD795SR6Ggq3RMox2hk0PndiVME6T6TSOLRFpmusi/dlbS7MO/rERIjD/mPXh713O8CtV0J1sX3DH8HlnfEhrVU/LF5583+xq9Ea9SqNVQeka98TomJkZ83rlrl+hFVIfkwEgFh6AZaX2Cg2EHONr2wzSFP8WNakkdReutNGlSKw1JVEWGdl+VxpihUUWlORYVwSj/2pnn/pOXvodfmCfmLp/S5d+ZpDYuOX/sfbA0l5fsWUvGjRsn5oiJFStW4N///rdowE5LS8OfnnkG8Yqd4cyZMxEYGKj6uQeWL1flER955BEh3FBQUIC3334ba9euFV+jUb6FCxdCnzAqE/nuUtdQi5dXPI6Sq5fEu+Tt4yZrrcUlJSNNyFIREcHhspWl6k0T+Z6w/+hBIbNP6YYJo8a2u8uml8Hnr6+FjX1f/O6pO7uV49135IB4nED3ULxw7z9F3lnukJgCBbvqKsmlryUuLi7Y9tNPrQQifv/732P7Tz+1+TP0XP+wahUmTpRcKPUFbrruBGTWc9e4Jfjf9nfF4HliahKGDRyi8ZtRVdPkmEbSXPrQSmNeWg+XVW0n0rtL+SxHNNhrpnI+MDxaFaTOJSeKgNgW6z7dgcabwH1Pzu7W7yEpf2WOd+HEB/UiEBKkh/jxRx8JXULlrLKSqKgorFy5Uswot+Sjjz4SPYQkBqs8FivbdUi0Vd8CIcHBsJMMCxmLvd47kJaXhIuFeQj089fYWJySJLItbZBaGKJDI4VEldwxK6xH/+80W1iqHG2rsWBIO1cStaB5ZdrJXszPg49X88r8vq1HkZ2Sh2fflboHukpeQb7YfRKjwseJnaE+QerTt0+diuPHjyMrK0u0xAwfPlx1hG4L+h4ScaARvrOnT6OktBTePj5CNaetnkV9gINhF7h3woN4Y9VzQtWGWm00eTwsqyjDxYI8sXZxcoGXR+t3YzlS62eO/Dc0owzu+kkhLAo7V+joCpEhEWK+m/J5lI/1dPNQyZ+lnMrE7o2H8ZdPHoWpedcDsNBRVOR4rSyscdeY1pMc+oA5+Z/ExnbZmInkv+jDEOBg2AV8XAMxJnqSsBhV9gFqQkqLoCOcqpVGCzO12qLBzhRXR2tG97Hv0UpYbNN8MLSytERYYCjOpyUKn+yUzDTRxF52uQIr3tmIx95cdsvRuluRlpmBqmop3zZj2Dw4KMY4Gf1D/ucwmTEv9nfCzIegMT3lhEhPoB0hHeEICq50tGM0S1BAAGxtpIkK8smmRuNPX12F+Q9Nh5d/93oBqbsgPVvK8bo6uOH2oc3FUxn9goNhF7GzdsCskXeLNe0yUi9IfWXdRRRkFLPPpAhCRzpG85AMm/rc8or3N8I7wB3DJ3V/VC4xJVncP+KucUtFoY3RXzgYdoNJg2bD3UnK6WXkXMD1G9LEQU+PWaEB1Cgs7940fcbd1Q3u/dxQnl+JC+fyMOW+0d1+rJKyUuQV5Yt1uE80hgbr3gSd6RkcDLuBmYmpsAhQ7jLOpzT5QnSFqupq1TGLRsh0qZtoLJAIbMKvmYiZEYjkzJRu+WTTzyQkS/PHJiamWDihSeqK0V84GHaTAf7DEO0/WKwLLhWqVEq6AvUrKo9ZNC2hD600+gaN16kHvH2bjyMgygeOnraS5mBu65ncjqDCWfnVcrEeFz0Z3v3k67PNdB5+9fWABROWC5Oflh4lnUH0vBVKrTTk7kYub4zmyc8uxr4tR6XnvLgcR3adxgNP3w1LCykdkZSR0iXxXiqYKXO8fS1tMTe2bbMlRv/gYNgDPJy8MXHQtFbKxp1tpWkpSMponvKSq9j01U7xef3/fsGMxRNha28jWmuUii0UEDsL2QmQrQAxa9Q9sLVqbqLO6C8cDHvInJH3wtZaekGQ+U9nDHDomEVN1oSfty8c7B16ehlMO1RcuYaq69X48s0NyM8sxrgZw8QO3t3ZTdXClH0xp1PivZU3yBNHkgPzcPbG5IEz+Xk3IDgY9hBrOiqNllzPyPwnOUNyQ2uPhvqmVhpzM3NEcSuNViHvEiLldAbKSirw2Oy/49GpLyPupxNibllVEOmERcD55CRRMCOogEbFE8Zw4GCoAcYPmKZKolNCvj3lYCJVaOtJdos0FWFhwb1p2qSirMn0nHaIpGH+6N/vw+0LxsDZyVlYrxJkxZpf1P6MNVkIFF4uEuuYgKGI9tO8UAejWzgYagDK+9074QGhVEJzywmpbe8yblTdENMPhI2NDYL8AjTx65lbcK20KRg6uTrghY8exsDYcNW/kfUq6UbeSrxXfedoZmouCmeM4cHBUEOE+cRgcPCIpl1EsbSLUCcxNRkNN6VWmgGhUdxK0wtcrZCCoV+IF/722R/gE9RkaESQLiVZsCrfrNoS7xW7fYXt6G2DpsPNUT9ENJiuwcFQg5D5j7mZdOwlUyD1XYb6xAI5uHm4NX9RMtrhalklho6NFqZODs5tC0qQbiTpRxJkzUrN8ErqautUeWA7GwfMHnEv3yoDhYOhBuln74YpQ6QKI5kCKY2I1CcWuJWmd5k4eyQeeW0RzC3aF2iiZvcBYVFNklxqxRTRh1gn9SHOHbUI1pb6Y4rOdA0Ohhpm5vAFcLR1bmZEpD6xEODjD3s77k3rLahQ0hnBVmp6px07QTt42smr9476uAZgXPRUrV8vozs4GGoYctKbN0aaSiAx0YTk80hKS1EJaEYEh2n6VzIagprflYHzXPJ58SE0JslDe2L3VLAZ/YGDoRYYHXEbAtxDVLuM6lopBxUeHMatNDKGduy0cyeoCZvabYghIaMQ6sVTQoYOu+NpicyiVLy15oVm/0biooayu1BWVwk7WzuNmUuZVtxErY85bprr5nmiCSJlH6hSB/HN5Z/CxU6+ZvCMZmDZfy0R6B6GURHjcSQ5TvVvldebet4MCfXA2CNIO4FiDhm+a179v1vMGDGPA6GRwMFQi9w1ZhnKK6+g/mYDTEw4I6EvSHlCwNLMCjOG3aPry2F6CT4mMwzDcAGFYRhGgs9uDMMwHAwZhmEkeGfIMAzDwZBhGEaCd4YMwzDcZ8j05mTHN19/jfj4eGRnZ4s57ZEjR2LR4sWIjIzs8uMdO3IE73/wgXismtpafP755xg6dKhWrp0xDrjPkNE6xcXFmD9vHrKyslp9zdLSEu/+5z+YP39+px8vMTERM6ZPF7adStauW4dx48bhxIkT+OTjj8W/vfXPf8LdnXUjmc7Bx2RGq5CB0tIlS1SB0MfHB7fddhsGDBgg/rumpgYvPP88ysokt8DOsGnjRlUgnDdvHj786CNEREjWn/n5+fj111/Fx628aBimJTyOx2iVH3/8EQkJCWI9fvx4fPfddzBXmGA98/TTWLNmDSorK7F61Sr84Y9/7NRjFhRIxk22dnb45L//1eLVM8YE7wwZrfLD99+Lz6TW88qrr6oCIXH3PU1zv8kpnTdyp90kYWenGbUchiF4Z8holRRFkBsdG6s6yioZNWoU3vjHP4QwQlQniigffvghSkpKVI957epVvPzyy6pdZ1xcHDIzJasF4qOPPoKjoyPCwsJw332S4C7DtAcXUBitcenSJQwaOFCsn3zqKTz//PM9erzY0aNF9bgtlixdiu9WrmzzaxMmTMDqNWt69LsZw4d3hozWOHPmjGodGhoqPlNR4+DBg3B1dcXAmJhmx+aOmDx5MgqLinDm9GlV3vCOmZIBF+0saV1YWIjTp06Jfxs2bBj6u7khJiZGw/9njCHCO0NGa3zzzTf464svivXWH3/ERx9+iL379qFBUQmmXsNZs2bhvfff75IdwiMPPywKMx6enjh58mSzr23duhWPPvKIWO/ctQvR0dEa/X9iDBcuoDBao7qqSrV+/bXXsHv3blUgVDZib968GXPuvFOsGUaXcDBktEa1mhk7NUNTb+E3336LA3FxeP/99+HkLFmqnj17FqtXr+Y7wegUzhkyWoM8o5W4uLhg/YYNsLeXPKODQkIQFR2NqVOnovHmTXz5xRdYunQp3w1GZ/DOUIusXbsW+/btg7FiYW6uWk+fMUMVCJVERUVh0KBBYp2VnY2GhgbIBeplpIbwI/Hxur4UppfgYKhFaMKCet2MFVtbW9U6JDi4ze8JU1SZKZd48eJFyIXy8nJx/77+5htdXwrTS3Aw1DaNjTBWrPv2Va37tOMOaKa2e2yQYRHFMFyumc7AwVCb9OkjpiuMFV9fX9W6PSGGG9evi8+mpqbw9feHXDDm+2ascDDUIsa+qyC9QjMzqUaXkZHR5vecVjRm9+/fX/Qdyi0Y0kw1YxxwMNQyxrzDsLa2Vs0j79q5E1euXGn2dSpOZClmiUeMGKEV+bCewsHQeOBgqEXohWTMwZBQCiRQdXbunDk4fvw4Kioq8NOPP+Lhhx9WHZGffe45jfw+M1NT1XrPnj1ITU1FUVFR1x/IyO+bMcJ9htqEj1hYumwZjhw5gi1btoijMk2btGT5gw8iKChII0+5l7e3av2vt98WHzSz/OWXX3bpcZShkHeGxgPvDLWMse8Mif+8955orm5ZUaYc4SuvvIK///3vXXo82km27GNUQn2L06ZNU+UqCcsuzD23hIOh8cA7Qy1CqXcOhoCVlRW+XbECubm5OJ+QgJLSUgQGBmL48OHCA6WrkLr1rRSuaeRPDvlGRr/gYKhN+JjcqtVGvd1GznA12fjgY7KW4Z2hfsPHZOOBg6G2j8na/AWM1uA3MeODg6ER7SpI+HTMmDFYvGhRh9+7b88eIaI6fdo0jBs7FsuWLsX/PvtMONl1BzJ9p99L0v1k9t5SlFW2wVBm95DRHpwzNKI+w52//qpqcr5V4eC5Z59tpS944cIF7Nq1CytXrsTKFSuEBFdXTN/JCU/d9P3GjRvis9xN3+X2hsZoD94Zahm5BENylNu5c2enZMeUgdDExEQIst5+++1iXI4gM/j/U8jqG7Lpu1zuG9N78M7QQHcV9GIuLS0V0xe0I/z2229xXSGKcCv+8+674jP1BFKLCgVCgo7HCxcuFGZLyUlJInhRP5+hmr5zNdn44GCoTSgY6miHQf7BlOvrCuQsRzs1YvKkSapAqNQmfOGFF7BwwQLx38eOHu10MNRn03c+JhsPHAy1jD4dt9SVZUaPHt3q60pVaiInN9egTd/16b4xmoGDocwnUEgKXzl+1hUCAgJwPjGx2b/NnzcPaWlp7f4MBSsl5DfcEnWJrSpFAeRWrFm9upnpOx21yetEuVtsafq+Yf16lel7T4MhPe/0QXnP7v48weUT44GDoUyPWPGHD6vGyj7//PMu/zwFAWeF+5wSSyurW/5MWHg4nnr6abEe1Ibxunog9fTykrXpOwVbauNZsHAh7r///m5XqfmYbDxwMNQyXdkX0pFx7Zo1wiA9JydH/NuUKVPQW5ByzJ///Od2v/7N11+r1kOGDOnw8V5/441Wpu/q6jGkaKNu+v7mW29p1PSdikcffvABPvnkEyE0e9ddd2HOnDnoq2ZH0C48m2x0cDDUcQGF9PZI3urXX34R65bHarlkrr7//nvRdkM4OTmLFhl9gcymDh86JD7++uKLGB0bi1mzZuGOO+6Ag4NDmz+jlGngnaHxwMFQi/Rpo6H5/Pnz4gh87NgxnDp1CsXFxbd8jJzs7GYOe8ocWB+1F+u8+fO12qxMhQ4KIgTlL9/+51tCiUYXHDhwQCjfKN80GttRmqmtrW3X2H7vnj3ig3bBoSEhGDpsGEaNGiWmc9xa5Eo5GBoPHAy1DL1oqZmYGo/JRD3h3DnUdcEFjiq8b7355i2/Z/DgwVoLhrt378bvH3pIdc2vvf46ZrUh0Npb/Lh1K3744QeN7RiTk5PFx/fffQcnJydRvFl8331wdXXVyO9g9AcOhr0wjkf9dcvuv1981NXW4tjx42KHc/TIEZw9dw7VVVXtPgYVE6ioodoJKY/RasfpcMU0h6b5eft2PProo6pA+Mwzz+CBBx6ALrn/gQdw2223Nf2DokilvoOjNRVQlLnI9qBiDWkqxsbGilYfdbVtSlm0fFzGsOFgqE3aeCGZW1iI4xh9KI9zu3ftEoWEvfv2obLFSFo/V1dMnz4dvc2mTZvw1JNPijE6mkZ5+aWX8HAXx/C0QVRUlPjoCOXsc1stR/R8zr/rrk49Dgs1GA8cDLVMRwUQCwsL0WJCHxQYf/75Z6xftw4HDh5EfV2dTpp/KRA++cQToseRTN5pRI+EFvQVFxcXzJ49G/feey9iBg7s1M9w07XxwcFQRk3XFBjnzp0rPmhyg9RhWtpraptz587hqaeeEoGQrD6/+OILTJo8GfpI7JgxuH/pUsyYObPLjes8m2x8cDDUIj3JN/Xr1w/P/OlP6G3eeP11sSOlqvWnn32mt4GQegk3bNjQ48fhnKHxwBJe2kaPZlyp6EC+xsRdd98tHO16EzmZMPEx2fjgnaERibt2BPkbKxVmysvKxDG9PWxsbcVEh6ZN38ktjxqhdS3yysdk44ODoRbRtyNWXl6eak2q1vRxq7YUTQRDTZm+awt9u4dM9+FjspaR087QVDG9Yq5msN6eak1HtPcYujZ9N8T7xvQOfRr5rmsNUmahSYZ9+/dr75cwWquqkxkWKd6QgARj+PDOUKvwEUvf4WOy8cDBUMvwxltP4WOy0cHBUJsIBS/OPekzvDM0HjgYahE+JOsv/BZmfHAwZJg24D5D44ODoRbRt6ZrpjV8TDYeOBhqEX4h6S/8JmZ8cDDUMvyi0vP7xhMoRgMHQ20fk7X5Cxitw7t744GDoRbhF5L+wjt644OFGrQImajrykWO6RlkDkX2AAM06OPMQNb8P7tdwegC+aLgAAAAAElFTkSuQmCC"
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Solve the following math problem step by step. The last line of your response should be of the form Answer: \boxed{$Answer} where $Answer is the answer to the problem.
<image>Find the area of the parallelogram. Round to the nearest tenth if necessary.
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420
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[
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"
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Solve the following math problem step by step. The last line of your response should be of the form Answer: \boxed{$Answer} where $Answer is the answer to the problem.
<image>Find the area of the shaded region. Round to the nearest tenth if necessary.
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108.5
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[
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"
] |
|
[{"src":"https://datasets-server.huggingface.co/assets/chenhegu/geo3k_imgurl/--/{dataset_git_revisio(...TRUNCATED)
| "Solve the following math problem step by step. The last line of your response should be of the form(...TRUNCATED)
|
12 \pi
| ["data:image/None;base64,iVBORw0KGgoAAAANSUhEUgAAAgkAAAG+CAYAAAAZRZeoAACkjUlEQVR4nOydBXjb59XFj1iyZGZ(...TRUNCATED)
|
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