[b][size=150][color=#cc0000][center]La gimnasia artística es una disciplina deportiva que conjuga ejercicios de agilidad, fuerza, plasticidad y elegancia. Este deporte además de educar y desarrollar el cuerpo, es un arte expresivo. La gimnasia artística tiene diferentes ejercicios obligatorios que se realizan en diferentes elementos como el salto, las paralelas, la viga y el suelo. En cada elemento se realizan diferentes ejercicios que suman un puntaje para cada elemento.[/center][/color][/size][/b]

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IengEpLNEV8crEAIBwhSur4zkQDLuz+clxOfZLYpAlw2f3YK1zo4KRI93R6J/saE7YKK3ZrARa0hKImKjyuWFnRYTCNwx8KQVxSowR96yFclNT/5Hjw46XCoyfiLcZcEMHjs5/MQzibkJZhP7F582ZWr15NY2Njv+Yz3VrU4cbUYy7K41e+QPxmTxWfMUJurLYQDnf6QhFy23FbXBQb+2Y/GnBiLgpS5Ani8/kJeYsIFJlxBWKlMxY5MS634fRFiEajBD12KgLT0+8ba8046vxUWo3otFoMRU6cmuU4PenO8wuDCWkZpsnDDz/c6zSNjY2sXr2aefPmMXPmzAx7pENvAH2nLqlGo4VQmAjmFPEmdN014Ax6dGhTxHcg5MZaHMLmqcCk7SZNF/y479lAJDdKgTcWEg1BSFOEuaIIl6+YuEYmtR/BV7EcnW13e5jWRFGxlksr/RS7zGj0Vty1YawOCwVaA0U2BzbLKkKaTv53h0aHMeENFHoMJlif0NoUzhZEDPsZpVS/2dYbC1nvDxIt0sVH9qLRCOh1aFPGa9Ab81gfCEFR+40dCqwnz+CClPEn7QUrKbZHsHnsGHvVdTRha26mOH4cxmO9Ao+lgkqLPj5p0739KNEIJBvTJBwhQkyutGY7Hp/9ZGwAl2061sp0mqLJCBMOwXTpI5+dyNKa/uGhhx5SK1asUH//+997nba7pTWtTVtU7Zam9qUiTVWqcFyJiq8Uaa1T5bnTVXnbQrxU8bvXqPyE+FpVMq7DcpYU8a3b16iFheWqbnezam7u8OmwzjFGiqU1MWdVVWHi0ppU9tvqqX1xzW5VVYi6e13yhYC7qxaqyQvXJVmylMy/VlW77O7EZUm7q1QhuWrlFiWchYgY9hNut1u1tLT0Kk1TVaECEj8dRDGZSO5ed7eaPLlQlawsUQunTVN3r9muWvsYXzh5srp7Xad1ez3E15XT1V9QxFUlJjKd45OLYlcxTG2/WdUuy1OT8+5Wy1aWqIXTJqu8ZbXt6yKbqtTCaflqybKVqmThNDWt8Gm1JUGoe/avdXuVWpI7WeUvWaZWlixU0ybnqZI3ulvUKQx2shoaGtTo0aMZMWIE2dnZDB06lCFDhpCVlRX/APG/g5GdO3cyderUgXaj/4iGCPgjaE1G9Ml6cP0dP8BEI0ECgSg6owG9VtM5kmAgQFRnwtgn56NEQkECYQ1Go4HO5oWzBxFDQRAEZGmNIAgCIGIoCIIAiBgKgiAAIoaCIAiAiKEgCAIgYigIggCIGAqCIAAihoIgCICIoSAIAiBiKAiCAIgYCoIgACKGgiAIgIihIAgCIGIoCIIAiBgKgiAAMGzPnj2MGjUKjUbD8OHD4/sZAmfNfoYQ29NQEISzi0zuUzps0qRJyOaugiB82ZFusiAIAiKGgiAIgIihIAgCIGIoCIIAiBgKgiAAIoaCIAiAiKEgCAIgYigIggCIGAqCIAAihoIgCICIoSAIAiBiKAiCAIgYCoIgACKGgiAIgIihIAgCAMMG2gFBEM4+du7cSU1NDQDz588fFPuJSstQ6BXBYHCgXRAGAdXV1TQ3N9Pc3BwXxTMdEUMhLcrKyrBYLFxxxRUD7YowCIhGo/H/lVID6En6iBgKaTFnzhw8Hs9AuyEMEhYtWoRWq0Wr1bJgwYKBdictshoaGpS8A0VIl6ysrG5/6evr61mwYAH/8z//Q0FBwWn2TBho/vd//5d9+/bxL//yLwPtSp+QCRQhI3z88cfccccdzJ49O6kQut1utm7dyk9+8pO0bb7wwgv8/ve/59ixY+Tl5XHvvfcmxG/dupWXXnqJjRs3YjKZyM/Px2w2A+Dz+ZLabIvvTNv5neOffvpp3n33Xc4991zmz5/fJf7gwYM4HA62bt3KjBkzWLFiRbfl6S6PdGzU1NRQU1ODRqMhPz+fO++8MyG+vr6e6upq3nvvPXJycli+fDljx45NOOf9999n7dq1nHPOOSxevJivfvWrCfGvvfYab7/9Nn6/n/nz5zN//nwuvPDChHMaGhoIBoMMGzaMSy+9lCuvvDIe941vfIPXXnuN9957j+uvv77bejhTkZahwFNPPRV/PWxnJk+ezJw5c+LH3bUMly5dyvr166mtrWXy5Mnx8HvvvRe/38+2bdt45JFH0hbD+++/n48//pj58+dz5MgRNmzYwNq1a+Pxb775Jvfeey82m41rrrmGjRs3kpeXFxearKyspMJXW1vbJezJJ5/kwQcf5JFHHsHhcMTDb731Vvbv388999zDvn37KCsro7a2Nm537969zJkzB7PZzO23386qVas455xzqK6uTlqmGTNmEAgEEuovHRslJSVs2rSJgoICfvvb37Jt2zZ++tOfcv/99wMQDofJyclhzpw5HDlyhJqaGmbMmMHbb7/NyJEjgVi39cCBA9x6660MHTqUDRs2cN111/HQQw8BEAgEmDFjBkuXLuWWW26hrKysS32VlJQwc+ZMpkyZQkNDA5988gmzZ8/mmmuuiZ+zb98+XnzxRb75zW/y1ltvAYNnNpmGhgbV2NiompubVUtLizp8+LA6evSoOnbsmDp+/Lg6ceKEOnHihBrM7NixY6BdOC0Aqra2ttfpAoGA+vTTT5N+tm/f3iWPZEyYMEH97Gc/6xL+/PPPq08//VSZzWb1yCOPpOVPaWmpuvbaa7uNb2xsVBMmTFCrV6/u9px06+LAgQPq4osvVqNHj1alpaXx8P3796tFixYlnDtnzhxlNpvjx/fff7+69dZbE/y68MIL1dq1a7vk8+ijj6qHHnqoS/2lsrFly5aEPJubm5XValUTJ05Ura2tSimlbr311oSy1tbWKiBennA4rAC1e/fu+DkvvviiAlQ4HFZKKXXfffept99+u4uNNrud/YhGo+q1115TTz31lDp69GhCmaqrq9XChQvVww8/rB5++GFVXl7epT7ORGQC5UtMY2MjANOnT2fs2LFJPwaDIaWdPXv20NjYyKxZs7rE3XnnnfHuWnetz440NTXxi1/8gsWLF3d7zurVqxk/fnyP56TLf/3Xf7Fs2TKys7MTwi+88EJ+9atfJYSNHz+eL774In5cW1vLP/3TPyXE33fffTzzzDMJ6bZv384vf/nLLt3WdGxEIhFKS0vj8Vqtlttuu429e/eya9cuAJqbmxNawWazGbPZzEcffRSP1+v16PX6+Dk33HBDPA7g5z//OV/72tfi8W3nRiKRpH5kZ2czbdo0vvjiCz777LOEMk2ePJkPPvggfqxkNvnsZcGCBWRlZXHxxRcndKsGCofDEReisrIyZs2alSBMoVCIe+65h4suuojvfe97/PCHP2T27Nn84he/SDuPsrIyLr/8ciDW3WvrRkFs7eFXvvKVhPGjZKQz1FJXV8fBgweZPn06zzzzDF/5ylcwmUzU19fHz3nttdf41re+xcGDB5k6dSrnn39+t9fB5/PxxBNPsHXr1i5xf/rTn3jvvfd44IEH0Gg0Pfrl8/l4++23ufnmm+Nh27ZtS9oV/+STTxKOH3vsMZxOZxfBTcdGm7B1ZMqUKQAMHToUIEGk2pg4cWI8P4PBgE6n45e//GU8/qWXXsJkMnX7Y/ezn/2MnJyceN7J/NBqtUDX65qTk8M3vvENRo0aNahmk2UCpZd8+9vf5t13343/2pWVlVFWVkZpaSlerzetWdSPPvqIH/3oR2nlN3v27JQtoLYvqs/n63JjHD58mFmzZlFaWkppaSn33Xcfs2bNYu3atWzfvj0tH4B4+mRs3749rTGhdFqGjY2NmM1mVq1aRUlJCYFAgEceeYR7772Xd999F4i1RPfs2cPatWvjTzosWLCAnJwc5s+fH7dls9m45JJL+OSTT1ixYgWrV69OELOf/OQn3HPPPQBJhQpiPzQbN27E7/djt9sT6mDevHm8+eabCSJRX19POByOH7/88sts376dtWvX8vTTT3exn46NzlRXV3Pttdcybdo0oOuETFNTE3/4wx8SfP39739PaWkp48aNY+TIkcydO5e6urouttt+RA8cOEB1dXVc8JIRDAbR6XRdWryjRo0iJyeHhQsXMm7cuG7Tn2mIGPaCyspKNm/eHO9aAOTl5eF0OoHYREQ6Yjh+/HgeeOCBtPJM58vU+WboeFxVVcWwYcOwWq1ArFVbVlbGQw89xPjx49PyIRXBYLDLzGRf+fzzz/F6vVRXV5ObmwvAgw8+SG5uLvv27eOSSy5hyJAh7Nq1ixdeeAGIDdDfeuut1NXVJYhhbm4uq1evBuD222/niSeeiIvhM888wxdffBH/oelODNt+aLZu3YrD4eC6665j7ty5QEw4vF5vwvn19fW0trbGjx977DF++MMfAnDeeed1sZ+OjY5s3ryZsrKyeNmT4XA4mDFjRsKP6Msvv8wvf/lLvv/97wOx7+q8efO6fF9LS0v54osveP7551mxYgXPPvts0jzC4TDvvPNOwo9LR0aNGsXBgwcHlRjKBEqatLa2Kr1erx588MGE8H379qlzzz1XKaXUW2+9dcr5nAokmTR4/fXXlUajUZ9//rlSKjY5sXjx4ozmazabEyYf+nqOUkqtWbNGAWrv3r3xsE8//VQB6sUXX1RKKaXX69XSpUsT0j3wwAPqq1/9ard2H3/8cQWoPXv2qAMHDqipU6cm1NU111yT0r+VK1cqvV6votGoUio2qaDVatW8efPUv/3bv6mcnBxVUlKiDAaDUkqp8vLyhEmHN998s8sESiobHamvr1dAjxNHd911l7ruuusSwrZt26YA5Xa742HPPvtsQlmSodfr1RNPPNEl/JNPPlGPP/64CgQC3ab98Y9/rG6++WZVXl4+aCYwZcwwTUKhEKFQiLvuuish/OKLL+bzzz/nnnvuYfbs2QPkXffMmTOHaDTK97//fZ555hnKysoyMvHQkfPPP58DBw5kxNaECRMYN24cl1xySZe4thb5+PHjmTBhQrfxyWgbz9y/fz9/+ctf2LlzJ7NmzYovH/vzn/9MWVkZWVlZ3a5RXLhwIaFQiKqqKgCMRiNut5uvf/3rmEwmqqur2bVrV3xsdcOGDfh8vngeN910ExAbY2vrjqay0bkMa9as6fb6LViwgE8//ZT33nsvIdzn8zFlyhQWLlwYD7vlllsSypKMm266iZ/+9Kddwp977jnmzp3L9OnTu01bUVHBkCFDBtWzydJNTpO2GbOOM38daVvzlQ4+n4+NGzemda5er+fuu+9O23ZnampqsFqtXHnllbz33nt89tlnnHvuuX22l4wLLrggY2JoMpn4+OOPqauri8947tixAyC+fvGmm27qcsPv27cvPoa2b98+hg4dmjAMsG3bNiA2+TBmzJguM5yzZs0iLy8vPhHTNg7ckYaGBoCEyZb8/Hzy8/MBeOutt3jllVd45ZVXgK5rGn0+H7NmzeqSd082AF599VXmzZvH+++/z7XXXpu03mbOnMm1116bdI3j2LFj2bVrF6FQKD5L3FYfbWX58MMPu3y3//a3vyWMGb766qvU19ezaNEidDpdUj8g9lzyJ598Ek/bubxnKiKGadL2S71t2zZycnLi4Y8++igQmxyor69POaMKyWfmMkHbJMqUKVNwOp089dRTjBgxggMHDnDddddx3XXX8ec//5kJEyZkbIwPYrOKbULRmc6trM5PYfzqV7/ivffe47//+78ZOXIk5557LhaLhdLS0vgA/tq1a/nWt77Ft7/9bSC2LKSsrAy3201RURFbtmxhw4YNPPfccwD8x3/8BwcOHGDNmjXo9Xrq6+upqKjg4YcfZsyYMWmX684776SsrIzLLruMzz//HJ/Px6hRo+Jjhk1NTWzevDk+blZWVkZRUVG342jJSGXjmWeeYcmSJaxbt45PP/00Yda87XvUJoTf/va3qampiQsdxMYPZ8+ezbRp06isrIyn71yWf/3Xf+XRRx/l9ttvB2Kt2rq6OpYsWZLgx0cffUQ0GuWdd96J5zFx4kQmTZoUPz548GBcMDUazaCZTZYxw+UzTzYAAB8xSURBVF5QXV2tgPjnnHPOUa+++qoqLS1V999/v3I4HBnJp6+UlpYqQM2fP19VV1crpdrH4Dp/cnNz4+OIp8q6devU6NGjk8aZzeaknzYqKyvV1VdfrQ4dOhQP27Nnj5o3b54aPXq0+upXv6rmzp2r/va3v3Up64QJE5TZbFaA+vnPf54Q/8gjj6ixY8cqs9mszj333C5jjMn87Dxm+POf/1xddNFFymg0KkDNmTNH/fWvf03wIScnR+Xk5Kjx48erZcuW9ZhHbW1tQtnTsdFd/ZnN5viYZ0/ntPH666+ryy67LH79O5dl//79Ki8vT5133nnx85588skuflRVVXX5dL42f/nLX3oc1zxTETE8y8nJyUmYKDhw4IB6++23FaB+/etfZywfs9ms3nnnnYzZU0qphoYGtW3btm7jP//8c1VbW6v279/f7Tm1tbVq3759p+THjh07evRj27ZtqqWl5ZTyyISNVLS0tKgPPvigx7JEo9GUdZqKt99+W7300kt9Tj9QSDf5S8DWrVvj3dILLriAnTt3ZjyPefPm8fjjj7N+/fqM2UzVlR89enTK4YZMDEekWkOZztBIKjJhIxUjRozodsy7jezs7FOqs7///e/U1dVxxx139NnGQCEbNZzl1NTU8Nhjj/HJJ58wceJEDh48yLFjx7jtttt4/PHHM5pXVlYWv//97/nmN7+ZUbvC4OGll17iggsuIC8vb6Bd6TXSMjzLaduK6dChQ9TX16PT6Zg4cWK/5NU2uaQGyeyhkFnef/99hg0bNiiFEKRlKAiCAMhGDYIgCICIoSAIAiBiKAiCAIgYCoIgACKGgiAIgIihIAgCIGIoCIIAiBgKgiAAIoaCIAiAiKEgCAIgYigIggCIGAqCIAAihoIgCICIoSAIAiBiKAiCAIgYCoIgACKGgiAIgIihIAgCIGIoCIIAiBgKgiAA8na8M4qQ14Un2CnQYMFWoI8fhn0VOFxughE9FqcLm0nbs9FIELfDTkUggr7Ahr3YgqFLkggBt4OAwYXV2B7mr6zEH0liU2vCajXRZiYa9OByuvCGAL0Fp8tGm1uRoBuHvYJAhF7m34loAHeFj6jJirVjmVOVLxLEU+HE5Q2hNRbjdBZh0HQy3YP/3eefTv34cWbdwHKA8jqU3dRN4YQzAWkZnkGEA0up9Ie7jQ+5izBVaCiu9OL12NA4Ddh80R4sBnAVWPGZnXg8HuwGL0UFLgId4ivMJvR6I5Y7VhHuydRJogEPzg4KEPU7MVu96G0evD4vno5iE3BhsYWwuDx43BVYIi7MBU788XzSzz9Q4aTCsxRPqONJKcoX9eMssOI3OvB6vVQU+CmyVBLqWJ6e/E+Zf8/143fegL+qCaXqKF/uxN39pRXOBBoaGlRjY6Nqbm5WLS0t6vDhw+ro0aPq2LFj6vjx4+rEiRPqxIkTajCzY8eOgXYhLerKUYVVTckjW2vVsnF5as3ujkHL1Lj8NWp38hSqtbZEcfc61RwPaVbr7h6nltW2tp/TqpRSdaocVHldCgdb61R5XomKJ2+tVSXjClVVNw7ULstP8Fep3WpNPiq/Q2Ba+e+uUoX5a9SaTvWTqny71+QrSmpVe2l3qzX5Hcqfwv9U+XehU/20X886VU6h6impMPBIy3CwEPRT+XEBhvYeMxqDEdMGL4FuWhxBv5vCAiPtPT4txgITlf72vrgmSSsoOVF89iLCDifmk2nCHherLMUU6KOEAz58/iAde40mq4sOPXxAj8EMG8LtDqfOP4LXacdgL8LQq/KFCXg3UGgy0J6FHoP543j5U/mfKv9EutaPyVoFd4wnK+sG/FUVFOlSlVUYSEQMzzQCXpxWM2azFacnSLxTFoWPO5+r02MgSCipGIYJBT4GEtVGA3wcCie56Xsm6ndhCzqwtd3pRAn615OrDVJhteHyeam0mzEUuePdUI3BQOL9HyUahnxd+qoQ9Tmwhp0d8m0jdfmiSXq0On3hyfjU/vecfyc/u9QPoCvCoxRKKTyihGc8Iob9xG9+8xtaW1t7nW69L4jR4cHjtoLTjNV98tbUG1iIP1H4ggH8fJD0pofkYgBAOEIaw4MdCOF2uCiwF9He0IsQDsEmbxhzRQVOm5NKnx9n5A4cnuRSGw24sPvLcRTpk8YnSYDL7sfuKCKZlPRcPh0G0zj8oQRpI+hbfzI+Df9T5N9OsvoRBhsihv3E5s2bWb16NY2NjWmnMVhq2e51UqDXotWZsTmL+I3NjR9AV0BxiR+bzU0wGiUa8eNyuokyrnPjKPMEPLgCVgpMXTOabi2iPViPuSiPX/kCXcU25MZqC+Fw20liJikhtx23xUVxdzPMKTAWOTEut+H0RYhGowQ9dioC0xP65j35n3b+PdSPMHiQpTVp8vDDD/c6TWNjI6tXr2bevHnMnDkz5flag5mOKzo0ehOFH7sJhcGk02B2+nDaiikuqIgtI7EX4/uVD2PS5ogWXXfNFIM+RUsnkVDAwwdFjk4ipkNvAH2nLq9Go4WT3dR4TMiNtTiEzVPRdclKt/hx37OBSG6UAm8sJBqCkKYIc0URLp81dfn0Vty1YawOCwVaA0U2BzbLKkIaPbqU/qfKv5g2jUxeP8JgQ8Swn1FK9T1xJIQfHcVtN5nGgLXCh7Ut2mNl/d0WKpMKjAa9MY/1gRAdR+5DgfXkGVy9cCJMwLuRQou+SwNUbyxkvT9ItEgXj4tGI6DXdViDWEmxPYLNY8fYK7EwYWtupriDHx7rFXgsFVRa9GjREEqjfFqzHY/PfvIogMs2HWulMQ3/U+Wfun6EQYYsrekfHnroIbVixQr197//Pb0Eu9eou8vrOiwTaVV1y6arcUve6BDWgdY6VZ6bq8q3dFgm07RF1W5pal9KsnuNyh/XeSlM5+UuSvW8tGWLKh+HWpYsrqlKFSbYr1PludNVeV0soHX7GrWwsFzV7W5Wzc0dPq2dDaWztKdJVRV2WtqSdvlOnl61UE1euE7FLaTwP2X+Sqke60cYVIgY9hNut1u1tLT0IkWzqivPV5OnLVQlK5epJfmT1eTCp1W71rWquvJcNW1hiVq5bInKn5anSt5IvOubqgoVhVWq4+26e93davLkQlWyskQVTp6s7l7XMU1MhOj0SRSlnoWqo/2F06apu9dsj4txXXlX24Aibiyd/OOlSypGPZavqUotnJavlixbqUoWTlPTEuoztf/p5J/2Gk3hjCeroaFBjR49mhEjRpCdnc3QoUMZMmQIWVlZ8Q8Q/zsY2blzJ1OnTh1oN9IjGiYYCBLVmTDqu3a8oqEA/rAGo9GANt1+WTREwB9BazKSxGTq5JEIaLXddwNP0f4p01P+0QjBQKDb+kyZPp3sU9WPMCgQMRQEQUCW1giCIAAihoIgCICIoSAIAiBiKAiCAIgYCoIgACKGgiAIgIihIAgCIGIoCIIAiBgKgiAAIoaCIAiAiKEgCAIgYigIggCIGAqCIAAihoIgCICIoSAIAgDD9uzZw6hRo9BoNAwfPjy+nyFw1uxnCLE9DQVBOLvI5D6lwyZNmoRs7ioIwpcd6SYLgiAgYigIggCIGAqCIAAihoIgCICIoSAIAiBiKAiCAIgYCoIgACKGgiAIgIihIAgCIGIoCIIAiBgKgiAAIoaCIAiAiKEgCAIgYigIggDAsIF24IwmGiES1aDVavovj0gQfyBMFECrx2TU04+5nbmcjroeYKKRCFGNlp6KmPKc/qqnaIRIFDRabfffv2iEw1kjGJqdfVYKh7QMeyDssTJmjAt/v1gP4bWZ0RltVHoDBAIBPM4C9DoL7tDJ/L02zOYKAv2S/6kQoMJsxuYNZ8heBE/xGMaMseGNZMBc2I0ly4K71+6F8drMmCv6p8bDXitj9EXx69uFkJsiQzE9VWt/fSdjdsdQ7OnuAoRxF41h1arX+euh1PZ27tyJ0+nE6XR2u7Hyod1/oKoqwP6+u51R+l3ga2pg82bYtAm2bo2FXX015ObCzJlw++397cGZSBhPkYliXPhDRejj4TZcoSAhXexIozVisejQDpCX3aNFb7GgyVTrJOLDEyqhpHAVbp+TAkuaJY5GiNC1FeWvvAOqmijSpUoegYSWkAat0YJF1z81ri9yUeUxYbO7Mbk7XneAEJXFNjQuP0X6bgz0N4WFRCo8hCxWurgQ8lJJIUvSNFVdXU0kEhPWmpoa7HZ7l3OGZY/j8stHkX1KTmeOfhPDL76AuXPh/PNhyJCYAM6dG4vbuxc++gi2b4ef/hTeeANGjuwvT848Il4Hxb4i3KHONwSgN8TDtCYrNtNpdi4t9BTYbBmzFvJUELA48WiDXFrhwZHsZkxC2GNlfMiOsneopLAb5/Jy7CqFEuLHNcaJvsnTQTS1mKw2+q/K9RQ5XXhMNuxuE+4OqhdwFWHXuvAPmBICJgsWXyW+kBVrJzcCHhc6q4PxH6m0TEWj0fj/SiVPkz3hKmZO6LO3Gadfusl/+APodLGW39y5UFAAV10F550X+1x1VSzs29+GGTNg7FjYuLE/PDk9REMBfD4/wUg09cmE8VasRme3Yk7ZsIoS6Wjz5LhOLDySEBeNRIhEInT2IBoPO5kmiYvRSBC/z0cglDSSoN+Hzxcg1Cm/Lnn1qh7aCOFzR7FZjOgLrBRucOPr0o3sUA8n6yDaVpaT5Y7H64rwKHuCoMX88uEPhhPrgiT1Fk1WR1FCgZN10Cmux7pLhr4IV4UZ3x229u5ywEWxU0+FK8mPYx/p27UwUGDV4vJ0HiYI4Ks0YjEn/4E59tl+9uxp5NPDx+JhixYtQqvVotVq+U5hIYfb4o4dbv+fYx3+P+l3b+szg2RcDL1esNth5Uq44orU5195JTz5JPzgB+DzZdqb/iaE22LA4nQTCHhwWgwUdTsg1J4mtB7MRkNq834XY6wewvHDMVgdTorNxdjtRZgMeorcQfwuC8V2O0UmAyNMTgLx71EYj3UMNqcLi6UYW5EJwwgTzvgJUfxOA8biCvyBAJU2Ayanv10YAhWYjVYq/AECgUocBQW4Au12XfGBq77UQ1seHlxYMesBXQHWuzd0vRn9LsZYK/FWWtHrTdh9H+JzWCh2+sHtwGKxYHH4YvXkd5KV5Tw5phbBW2ygwOGOjcm6rBiLvUQClVgsDtz4cRZbsFgsVAY61LGnw6BdyINVb6C4wkvAW0GxUX8yPkXd9YDOUkHlEj932NyECOAqdmKsrMCSqjGbFqdwLQBdgRWj042v42+wz43TbKWgy+jBZ2xf9yzrNm1n//6/sunlZ/nd9s+A2Iualj/0b3zrsgv5cN8B3n69kmefXcvaN99mq/+vsXHCxvdZ9fpfiQ1BHqPR/2yf6jNjNDQ0qMbGRtXc3KxaWlrU4cOH1dGjR9WxY8fU8ePH1YkTJ9SJEydUOnz+uVIjRyq1enXfPsOHK9XSklZWvWLHjh19StdUVaigXNV1e0aram3tcLh7jcpniXqjuQejzevU3aDKuzfaTl25orBKNcUPUeSvUbvbcn9jiYLpalldmxNb1MrpHW03qapC1LiSWtV2xvan8xQdjhP8b61Vy8ZNVyu3nLRWPk4VVu1WXYnZbc+nD/XQ5vHK6Sp/TXsezevuVkxfqbZ0rgdQucveiNeFUievT+eKrCtvv2ZN69RClnVz/epUOYWqqqlTaDmqMB64Ra3MHadKEgrSqppPHvZUdylprVUl41C5ubkJ1ycV/fKdVB3rslXVloxTy2rbjDSrN5a0HdepusdfVvX/aEt1VB092sFIZKuqfnyD2hVtO6xWL2755GTkP1T9y2vU//dxh/P/Xqcef7letZlLsNXb+swAGW0Zzp0Lixf3PX1xMcyZkzl/+h8Nmo5dXb0BM+GkXdE4Wh0GIBzteFJsdtZ88tPTLO30AmO8K6XR6oECLKY2J3TokvSzLAXG+CSBVquFUJi2OcME/zUGjKYPaHNNb7Tgdzmo8KTqtvShHgCiPtxOHRaj9mRXNwIGMws/cOL2dUo8bhlORwG9ajzp9JhyK3HY3Xj9wdT+dCbgxRm1Y01oEmnQnjzsqe5SojHjrFzCpk1GKp3mDC6n6uO16JDeZLFSWemNfUciPtx+O0VJx3SGMazjrMN5Y5nIIaLHYrPJ/+dHS3CtdJ2cTR7FeeP3c/DQ4W5zTrDV2/rMABmbQKmpiY39tXWNI5FGjh5NLMl5540H4LPPmhLCzzlHg1Y7gZwc2L0bXn4ZvvOdTHnWz4T9uN2VuD1BwtEQYYw4e0xgwLgErP4ALnPbyJYRq8dDEWE81ivodnUDoNd1loPUM596bQ/nREJ4PS7clQFC0TChEBS3WS5w4Yu6cLrsODduIppXjsdrx5Tsvuh1PUDU76VSE8Fgs+DuGDENfF4/DnMHkTAZMfRaMYzYvB40didOq42NDRruXuej0pLeyFw0HOJjvbl7Ae6h7tIh9mNGj+sO+0QfrkWCX+Yi7DYXvogFk7eSgNWBsbuTDzWyfftfCP71U/5x7DMOMY48YrPJ54z4KsH3PuDZmhrKl/4Lf/2rkctn9DB3fPgzvFWlfa7PUyVjYrh5Mwwd2n784Ye/48CBXQnnfP3rsYn5P/1pdUL4hRdO4RvfiBV7yJCYrUEhhgEXpuIgtgonbpsWDX6cWam+dlrM1nJ0NzhxF3niyyhii12jp3fBdcRLsdGFvrKCCp8eDWHclvG0jzBpMFjsVFrsQBhPsRGHuwivtZOXfaqHCN7Kx7FUNFPRaTAq6rOjn1WJ124m3VU23aI1UVzhoRiIBFwUFVTgK3CmMXkFGp2B6f4QIegqiCnrboDo07XojBGzNYDD6yNSGcVW0Y0U7n+ftRsOMjM/j3kzsxlGI/7/uwmIzSYfP36YCaMa2fCLnzH54n/ClH8Tl3anhYd38+aa9wkYbANWnxnrJm/aBJdccup2Jk2CurpTt3M6iISDbDIUYDaeXKsWCqa1GFZjslFRHsZmdeLPxCLjvhIK4teaKTCffOolEiTQ4dsXCQYIxxv3OvR6XWIXrO28vtRDxIfHu4wic1e105iLsE//FR5fGpUTjsYG2ZPMbkOIYKDdhlanR/dxx+5t5GQ3LEokWVbGIhxmF86KYLvtSBCvP5yy7gaKvn4nO2O02IjarTg0Vgq6aUgfPnSQpvMvZdJFJ59I+ewgbX2+RYsWkXX8MBdfU8Dzr7zJPQtuwnhRD22vzz6lUTNxQOszYy3DrVvb1xGeChMnwosvnrqdzLGcG7KWdworp07ZMZmtlDtuwGjIw6AD9Po0F0hrMNm9eLVWLAYD+oICLNoInoCfYCgfm+00tQ+NFuwGEzP0HvL0GtDo0WmJd4kiwQqKCzyE9AZ00RBBTTEerx5IHNPU9qEeQp4KvDYHlUmLasRsnc7SFGsOdcYCcu8owujXgtaG21Oc2J2LhPE6CzD7tRj0GsLBEKZ1vpPLbgwYlwSZYzZRoYlgdPqo6DKdq8NS6SVcVMAIp448XZiNYSPllRUUmHquu/6lP76TndBbcDgiBA3dj9NmT7yKb7z9PJXPTmTsKOC88+I9m6lTp+Jc+VPWujfz6quvxtOce/n/wy1zZzKhcwvxosvJHfs8V+ptA1CfMbIaGhrU6NGjGTFiBNnZ2QwdOpQhQ4aQlZUV/wDxv91xwQWwbFlsHSHA//5vRZ+6yZ99Bo8/Dp98konixdi5cydTp07NnMEEYmvgenyms8fkEcKhIMGIFoNBj24Ans1N9TxsbE1hqudhT7Ee+ko3T6F0Oqkb33rhczfPBKfzvPHp53Rei2McPny86/PKh3fz5rMBJvzrrVx1Xtuph9n/l9ep3G+k5KZLkz55MpD1mbGW4dVXx54saRPD886LLS0/cqQ1YcJk+PARXHjhFCD5JMuePTB9eqa8Oh2c4kPzGi06g6l3s6QZJtVNk95NNUCbLGi0abR8uvOtFz53c4OedvFPi9N5LYaRnd1VRnY2NOBwPoWxuYEf3DE/1hgZls3Ysecyas8xjkFSMRzI+syYGObmxh6xu+qq2PH06bcA8P77v+Gzz5oYOXIMF10Ua5194xvFHDnSitcbG9i94IL2VtvevWA6Ix9BEwQhXapf28I/3dCMd+V/s+mPG1n9f+0c3P1X9nApc2+6nFED7WASMiaGM2fGnjXuyKFDB/nb3zYDcMUV30qI27HjbY4ebeWcczRcdtk/x8OPH4frrsuUV4IgDATRaJTzLv0m8+89xogRo7n6ahNc/bWkrcgzhYzNJt9+O0QiUF/fHrZ9+1sAjBw5Br1+Zjz8yJFWdux4G4DLLvs6w4ePAGKTMC0tYLFkyitBEAaC9meTL+Cuu+4iOzv7jBZCyOAECsSEbOzY2LPGAPv3x/YxGzVqDKNGjY2fd+RIK5FIIwBa7YS4GH7ve3DoEAwfnski9vcEiiAIZwMZfRxv5EjYsAFWn5wsvuiiqVx00dQEIYTYJEpbXJsQVlTAH/+YeSEUusfvzOqwqYEgfLnJeLs1Lw+eeALy82PPGufk9Hz+1q3tQvj1r2fam1MkyXZOGZ3tGrCt7mOr+91FTaiU+/5lnq6bqgrCwNMvnXizOTZ+OGcO7NoVe0xv0qTYgmqILZ/Zuzc2WdLS0j9d40wQ9lgZf0eA3Lz295JEQ0EiJjuVFTZMp/ioWMy+KbZY9pS97Q06ijyKotOaZxthPNbxhOwKu6waEM4g+m1Ec8SI2P6EL78ce9a4rq79yZLp02PLZ667bjBMlhTj8nUUqwhBtx2roQib3z1wW7SfCn4nWTcsh/K6xF2iBeFLTL9P73znO4Nk04W00WIoqsAdLeDS4kpM3vS2qD+T8PuWU15ezvLlPvx202lulQrCmYm8Ha+P6IvslGyw4+40+xDbbr3jBgenTmwr9ORbuLdtk+4LhNLbs+7kO0LMditVhcvxdZk9ad9iv7tXCbTHddiKP+H1AtGu56bc2zD2egF/MEl+3bx6QBAyiYhhX9EYMBV+jDfYtrVGCG+xCYOtkoC3AqvRjCtwqjduBJ/djLHIhSfgwVVkxGz3xTdmDVSYMVpj26QHKh0UFLhSvlY07HOzvtyMCR3mokKWd1ZDv4sxVgfOYjPFNhsFxjHoizwdtmYI4S02Yyx24LQVYDCYMFnsOCsrY+8uCXuwJrzKMvaKgISt9DuX0mfHbCzC5QngcRVhNNvxtReym1cPCEKGyeS2/2cq/bXtf1058W3nm6oKE7dv312lCjts2d8X+zGbb6j2Hdub1Rsl405uS79FlY8rVEl35e8+x8Tt+puqVGHnre/ryhXkqzXt7xZQS8iLH7fWLlPjlrwRL2dd+Ti1pOOe8k1VqjChTLE827fST+LDuJKEbemb3yhR407WXfevHhCEzCItwz4TJuSHPJ0OCONzr6fAQKzL6vPhC2kwRPwE+9w4DOGtWI+tqKDDRgRaCoqsrK/wEkKP0eLH5ajAk+Stbcld9uFeX058g22dmaLC9bh9nVpt0wswtr9bAD0bCZ88JRIO8rG+fVmMXm/CH+z7xnMhbwXrbUUJLxvSFhRhXV+BN9SbVw8IwqkhYthXokH868dRYIjt7xfy55G4I7+WAoeVNN6B1w1hwhsL0XfZYs9I4cYwYbQUuHzYDX5cdguXjtBhTvE2sbDPzXqWc0P86aLx3LEe1rt9iTsU6nXd7qKjM1nI9/hObkobwusOYzX3fde5cHgjhV0LibEwJsDaAhc+uwG/y47l0hHozE78oolCPyBi2EdCbier8p0UmQD0GC0biWpN8Zc6xT5GdH1eWaxDl7cef6fWUDTkZ33eSbHSGLDYK/H5Q6imCgwuB92/FdJP5R3rKa9TKNXh01RF4Xo3nRuH3RKJoDWGqSjQozMUEyh2YzuFHTh1ujzW+0OJIh4N4V/f9uNy8tUDPj8h1USFwYWjF6++FIR0ETHsNWF8zgJMDh3rKtqW1WgxF5fjt7sStvEPe30E+5yPHot9Ce6ONiN+XHY3S+wW9EQIBsLtIqLTo9dpun+qw+9jOR26yPF03XSVuyESDhIxWnF5AwT9bpxJ94QPt7/VLBLA38PzfnqLnSVuO672QuJ32XEvsWPRp//qAUE4VUQMU9KxW5lFlt5CJcX4ApV0fMmaxmjH7QhjNxowm82Y9Hqs3mgaG492sp/V/rywtsCFzxbGbtBjMhvQGeyEbT5cBVogQrDCikHXll8B3iI73b34ze9bDuXmJGsKY7PK6++oTOsZZa3BBP/vDMaMGcOYMWMYkZWFzmzD3TY4qjNgzl2F9WTr2OKIYOhpYb22AJfPRthuQG8yY9AZsIdt+FyxsdJIsAKrQYfBbMZs0lPgLcKe5tvtBKE3ZHTXmjOV07trTX9sud6TzZPr+k7LVulBKkxFhJw+nPEXOUUJee1Y7HoqA7aT76zoWx30tOV7eq8eEIS+c2ZvMDYo6Y8btiebp1MgokRCOgz6xJeq6w1GdOFwQlhffOpJPM/M7fWFswkRQ6EXGLF5LVgLDFSYCigy6gkF3Hj9emzeytP6JjNByDTSTRb6RDT++J10XYWzA2kZCn1Cuq3C2YbMJguCICBiKAiCAIgYCoIgADBsz549jBo1Co1Gw/Dhw+MTKMBZM4ECsUkUQRDOLjI5MTps0qRJyGyyIAhfdqSbLAiCgIihIAgCkGSdYTQaJRgMEolEErrGme4mjxkzhpycHDSyBYkgCGcA/z9MnsHj8KzeMAAAAABJRU5ErkJggg==[/img][b][color=#0000ff]Solución usando herramientas de geogebra[/color][/b]

[b][color=#980000] [size=100][size=200] Respuesta[br][/size][/size][/color][/b][br][b][color=#0000ff]Con herramientas de geogebra podemos encontrar la pendiente de la recta ([/color][color=#ff0000]e[/color][color=#0000ff]). Sabemos que la pendiente de la recta es igual a la tangente y con ese dato podemos hacer el arco tangente para hallar el ángulo α.[br][br][/color]tg α[color=#ff0000]=[/color]1.660021428915[br]arctan tg α[color=#ff0000]=[/color]arctan 1.660021428915[br]α[color=#ff0000]=[/color]59.017621409647º[br][br][color=#980000]La gimnasta hizo una elevación de piernas de 59.017621409647º por lo tanto obtuvo 1.00 de puntaje.[br][/color][/b]