[br][br]Dado o triângulo retângulo ABC, a seguir, com medidas dos lados [img width=68,height=22]data:image/png;base64,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[/img],[br][br][img 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CPNuRAQsjuXvMzqLRPy+efHUWXZpdi1aw+FyqaqyrKPPFLfrPvvvejxxx8D/0hzbgSE7M4tv/v2PjIyEsOGDVXberaRT506XWnU27dvq9MRy7AehICQ/UEIOfHfvby8VE479qFPTl5K8fGLVdqrLl26oEQJiY93YtFa1HUhu0WwOddNXH2GV/rk5GR89NF6VXeOFXfly5d3roFIb4uEgJC9SPA5z80cHx8ePkZp6bdu3abMaexXL3XnnEeGRe2pkL2oCDrR/Vx+iv3q/f0DsHHjRvKrn6609c2aNZX68U4kR0u7KmS3FDknvY/P8QMG9KegltJUd24F5syZR1lwTlLduU50ti/ppKOSbpuDgJDdHJR0eE2TJk3UOZ4TW65bt16Z5zg+Pjo6WoejlSExAkJ2A8+DKlWqYPTokbS6z8XevftUyqsBA560ml+9gaF1yKEL2R1SLPbrFNePHz16lLLFb9nyMQW6TEanTp3QvHlTqjtX3H4dkTfZHAEhu80hdvwXsF99nz69VckpzlU/b948ZZ7r0aMbud5KnjvHl6B5PRSym4eTIa5iv/qSJYNoWz9HxcenpV2kbf0Ai/3qDQGaEw1SyO5EwrJHV6tXr6rqzrFf/d69e1W4LDvg2CPPnT3GZ+R3CNmNLP37jL1UqShKQzUcq1ZFksfdOkyaNJlcbDvjiSeeoDx3MmWcdcqI5JxVcjbuN9eP50g5zmnH8fGcr57zz/Eqz7Z6ac6HgJDd+WRmtx67uBRDixbNwZ53vK3nbLYmwveiPHel7dYPeZF1ELAp2bOzs/G//32mEiHGxMRIvXHryMzuT6lVqyaioqLU6r5jx+dITT2L3r17iV+93SVRtBfajOycEmnixEmk0b1Evtj+Srv700+HaZL0FD/soslMk7tDQ0MwePBAFS67fv165VfPMm7d+glN+iMvLTwCNiP7p59+RokJf8HcubPA5z+223KkFadOkuacCPj6sj2+F8LCQqkE1VosWJBE2/rz5FffmeLjSzjnoAzUa5uR/eDBg6haNV4RnRs7bPCPNOdGgMs/PfFEK1X+acGChaSxX6PKSffuzX715Zx7cDrvvU3Inp+fj7y8PHK3LFoaY51j79TD43z1XCVmwYIF2L37C1VZlgtUcB04aY6JgE3Izlt1XtGPHTt+16hzcnJUYUBp+kCA89UPHz6MtvVhpIjdiilTppKLbQ/S4DelAcpxzdGkbDPmtW3bGm+99TaWLl2GypUrY8+ePRRVdVlFWXl7ezsaDtIfCxFg5euTT/ZX1hb2q58xYyZOnDiObt26KsWsNMdBwGZkr127Nv71r39i1qw5qjBgREQEBg0aKA4ZjiN7q/WE675xqumCfPWc5y419ZxKksHeeNIcAwGbkZ2HFx8fjwkT3nWMkUovbI4A15cbM2a0ynP39df7qSbcBHWO5zz20rRHwKZk13540gN7I8AVZLnQJNviuVTUhAnv05a+G1q1ain+FfYWxj3vE7JrLAA9vt7Hx1vViudw2UWLFqnSUWfOnCE320T4+Ei+eq1kLmTXCnkDvJez3QQG+hPhk1UWHK4Ay+mr2fVWmv0RELLbH3NDvbFOnTqkpCtNgTRLyK8+RXlRsl99nTq1DYWDIwxWyO4IUtB5H8LDw8ivfpBKVb1u3Uf44IOpKj6e/epZky/NPggI2e2Ds+Hfwr4VnOeOc9pxckuOkWevOya91J2zz/QQstsHZ3kLIcCreLt2bVWNOTbPrV27luzxrLjrSUUrygpGNkZAyG5jgOXxf0QgPj4OI0c+g6SkJKSk7MT58xdU6DOf76XZDgEhu+2wlSf/BQIREeEYOnQoAgIC8NlnW1X9+MTERKo710TO8TaaOUJ2GwErj30wAn5+JTBw4FOoUKGCqjs3a9YsssefpiIVHcWv/sHwFfoKIXuhIZMbrImAi4srmjRJUHnu5s9foJR3p0+fUUky5BxvTaSl1pt10ZSnWYwA148fNeoZRfivv/5apbx66qkB4N9Lsw4CsrJbB0d5ihUQYL96rju3fv0Gqh+/SQXS8Dm+adMmlAfB1QpvMPYjhOzGlr/Djd7Pz0/50HOCy+TkpZg5c5bKX9itWxfw36RZjoCQ3XLs5E6bIVCMtPLNSFMfSM43CykfwiacPXsWTz/9FNgbT5plCAjZLcNN7rIDAuw/HxoaipUrV2Lnzl14553/qPrxco63DHwhu2W4yV12QoArz7BffXBwMNWdW6/O8d27d0PLli3JHi957gojBiF7YdCSazVBgOvH9+yZqLb1K1asUPnqeVvP0XMeHpLB2FyhCNnNRUqu0xQBzkrcrl0bVSueCc+r/Pnz5ynZZT/Kbhuuad+c5eVCdmeRlPRTIcB14sPDw5XibvfuParQZJ8+fVCzpuS5e9AUEbI/CCH5u8MhwPnqhw0bQuGyJfHJJ59QvvoPVOrqli1bOFxfHalDQnZHkob0xWwE/Pz8Varq0qVLqVDZ2bPn0Dn+nFLeeXmZSo5JuxsBIbvMCKdFwN3dXdWd45XeVHduFaW9OqcUd/w7aUJ2mQM6Q4Dz1Rf41e/evZsUd+fQr19f8O+l3UZAVnaZDbpAgP3qudAk56r/5JNPVb76Xr16kSdeUykTflPCQnZdTHUZBCPA+e369++nUlUvWbJU1Z1LTU2l+vGd4Osr+eqF7MITXSHAFYSbN29GmWwDKVw2CWvWrFUFKiRfvcSz62qiy2BuI8CFRTl19bJlK/Dll1+qfPVPPcV+9dUMC5Os7IYVvf4HHh0dTYktR1AgzSoVIz9hwkRyu+1BmXGaGLLunJBd/3Pe0CPkfPVsimMHnGXLlpM9fp5Ke8Xx8UarOydkNzQVjDF4zlfftm1rynMXTH71K1WF2dTUs8oph11vjdKE7HdKOicH9NkHIiJA4VRGmQOGGWe9eg8rjzsuULFz525VaJLrxxvlHC9kL5jqV68Cb78NUt+CnKyB114D5TM2DBGMMtDIyEgMGTJY5avnyrKTJ09B165d0KJFc4JA3/HxQvaCWU7ZTCl3MchAC+zaBdrnCdl1+gXgXHZsj+csOKy4mzNn3i2/ek9P/frV65/sx44B48cD6elcbMw0fUlpg1deASpWvD2dy5UDHeCAf/8beOstUJ3hu6c6b/HnzwelPaUFgFYAynOOv/8dtC8sOiWWLgVlVyRDKInj6adBDt+mZ+bng0qeAtu2gdTHwEsvgWI5Tb+nc6fqDxVYUL+XXUih5MBJLzp0aK9y0y9evJg09qtvlpPuSTHz+vSr1z/ZKd4ZX3wB/O1vQK1apgnBq/e4caBPOhAUZPrdlSugCgUmYs2YYSJ9Qfv9d5DzNcD///LLAAVgKLJ16wb85z9Ao0aFmmh3Xbx8OWgvaXoubS3Vu/mj1ILCNSdNAhU1Nx0ptm8H/vlPkDrZ1I/Nm4H33wcdQE196d3b8j4Y+E6Og2fPO85+w3XnOD6+N2FZo4b+7PH6JzsThwldg5IbVL1ZcIBXz0GDQJ/y22T/7DPQXs70UWAi8d/CbmYypS8/eIdACRNo72eiRlwccPkyKM+x5VTJzjYRtUMHoFUr03O+/x5UC8nU308/BUV0gDRIQGwssH8/qMA5qM4xyG4EsiWZ+iUFES2XAd1ZtmwZDB8+TCW23LZtO31jJ6nKspyvXk9N/2RnaeXlmVbuGzdMsuMzOROkYAvO22Je0StVMq2QTMCdO0FO1aZ79uwBRVTcJjo/gz8ivNL+2RmPdw6U/viuxtvwgQOBBg1u/5pXaD4eVKly+3f8MWH9wY8/AsWLm0jPjbf4bCXYuxdkMzJ9rCiOm3xDQV4iepqTmowlKKgkpbjqr7b1bJ6bPv1DleeO686xrV4PTf9kZ5KQiQUvvmjaJnNjIvG5uEQJ03+zue3oUdOqzmdx3pbzlr5TJ9OWmVf8hg3/KO/7KXPq1r29Kyi4iz8OMTF3P4NXZy8vYOtWUII1099++AG4dAnIzDR9UPgjUdB4J5CVZfov1jfwUUSa1RDgczxnuwkODlLbei42yYE0HD3Hue+cvemf7Lxyko+0OveSv7RqKSmm/+ZtMq/YvG1nklGNMRw5YlpZ+ZzPHwAKnVSramEak/peYv/Z/UxmPvezgo2ViOTeqYjPCsCCdue/C9MHudZiBNivnk1zyclLaBrsVZp6rjsXF0dHKSduhZzFTjpSXh2Z8PzDrW1b0KcbOHjQRHZWfsXHg7IemFZx1mxzqSHe2vN2mbWzfDa+t331FXDgACik6m4nHLbVsw7gzsbE5iMCr/p3Nrbpk4JI2ff53fzf3B/uK3+oCo4efA8rBnk3IM3mCMTQx3rEiOGkIvmI1oItpIf9rzLXNW78uM3fbasXGIPsvDry+begFZyVy5cHTpwAfv7ZpBEvWPn5OiYgn72ZyKwZf/ddUBSF6VzPjZ/BuwM+Y/fvf7d8eIV+9NG7f8d9KFDu3fkX1uZTAYRb2v9hwwDuF5vYmOysjeczPb/vl19ub/dtNSPkubcQYC09+9VzgQr2q+dz/KlTp0k/2olOX3T8crKmf7Kzco7P5Kx0+/VXk3godZHStLNy69VXTatyAYkLBMhkfe890wrdvj0oThJ49lnQfs60wvIRgHcMbDK7d5vPSrUCxdqDJgR/ANiWzpOH4q7Vx4e39LyC8xZ/5kzTToOPGLw7aN36QU+Uv1sRAc5X36ZNazLoBKmEGGvWrKPpdJrcIQaoj4AzNcchO09kJo21NZ/sHEN5xXH8+G2ys6KOHWf4XZUrm5RvBcq6Aulx/jJWgBUo4V5/3bTSb9liuoKf++aboBQoRZM37wp4F7Fhg+mjw7b1gvM+7yr4I0DpktX/s+1fnGeKhreFd9evX4/WhzC1wn9B+hyOjx88+GnadN1hSbHw2fa6zTHInkemL9ZAMyGnTiMC0arG5rDCNL6e7elss75zy87mKt5u36/xmfzPGpNr7Ni7/0K1wqlgeGF6Zd61vHPgnz9rXbuCnLfNe45cZVMEoqPLYejQwUpbv2nTZjrZTbgVH2/TF1vp4Y5B9t/IzMTKKf45QI4jvMIVhux8HmaTFO8MKP/Yn5rJrASYPMbYCPjTzqofOTox4XlLP2vWHDrHn6F89V1pE+jYfvWOQfa8XFJGkQ05MMC05eZzLJ+1zW1McnaU4Z9r18y9S64TBCxCwN3djTaQHchIY0psuWoV+9WfvRVcY9FD7XCTY5CdQwt51+5CCq9KdAaKpuizwjZWbLH2uiDYpbD3y/WCQCERqFu3Dp3jQ5GUtFD51aelXVKJLePjyZXaAZuDkP0OZHiFt6Tl0u5AHFAsQU7uKQICnK9+GJlLWVu/des2TJw4CT16dHdIv3rHI3sRgJdbBQEtEOC01QMGPEkGmlIqdfWHH85QZajYr96R7PFCdi1mh7xTdwgUJwtQ27ZtKFYpgoIjFykTHdePT0zs4TB57oTsupt2MiAtEeD68ayx5zx3n3+eoiLn+pK/hCOc44XsWs4MebcuEahQgf3qh1Hg5FpywPwM//3vuyp89rHHGmlad07IrsvpJoPSGgF2pWWCR0SEq/j4qeQsxqt8u3ZtNYuPF7JrPSvk/bpFgO3xfI7nMlQcLsvx8exX36dPb5Xs0t5NyG5vxOV9hkOgQYNHyOMuhMi+nPy+dquKNOx2W/HOhKd2QMUhyF6Cgkm8yUXWlbzm+N/SBAG9IVCpUgXKczdU1Z3jfPXvvPNfUtz1pqRI9jvHa072vNwcLF21HFsO7EVeTi4qr1iGXkOGwN3jjvhzvUlexmNIBDg+vl+/vmpbz371XD/+zJmz6Na1M779Zj8++XgLMq9mIDKqDNpRYFRUaQs8Sf8CWU3JfiXjMl565V9YuScVadEUfVbMBeOS9mDHdz/h/954DUEh9j/XGHIWyqDthgDnuevcuSPZ3sNIcbeKIpvXUwTdRuw/cQ0Hr1DdAhcfeOR+gyUbtuPNv49Cw0cfs1rfNCN7PgW/vPHmW5j7xQ14xA9GSR9KA0U+8jeuN8Kib1bD6423MHniBPMHyhFH7Bd/Z3ir+XfLlYKAHREoRkmGG1C+lMp44dnRmPvpz/B9dCxCYsugmKsbxYRlYfexvRj3r4lYPDUU0RWtEzOvGdkP//QD1u34AS4VR8DD0wv5N35TYLu7eyAvtiNWb3sbTWfPQMVyMeBw979snJ+Rc8FxRtaffqIEDwH0iwfdZEfZyqsEgXsQcKGgr1yKA7l8LQfu8V3hHVoe+VmZyM/JhyvtcP0qPo6vdx7EFkpcMrQiJVixQh067ch++CiuFo+CG8eu51G0WkHLp8EX98BVtwi89/eXERsagewHhbsWBMBwmqjVVERhN2WGfeAXQuafIKAdApzuKv3iWez+KR0+NaiEWA6nCL+5QOXnoVhuFtyCKuDHX1KRT3qtYq6UCq2ITTOy+1EaKLec3yhHxR8rZ+bR71yzMxFbozriS5VFjjmJLBgn/nDEULJGVu6Zc08RwZPbBQFLEXClhenK5TB8fzIFJ7Kuw4PDuylw09RoMru4I49Wej+f4uR1R8dTKzTNyF6jVk2U856EvWm/wKNMTRTLNm3j4eaDrNQfERd4DePnz0NIWCGL7PG5XYhuhakhj7AtArzI5SPr97/h/z7dB8/weFI5ER05kYubJ7KzrsEz/Rs0qjfQlOfBCk0zsgcEBuOV50dgyD8m4+yNDLhFUNFF+oLlntqFoLOb8eprQxAacU8lVXMHLHHt5iIl12mKQDEMHjoMXx56Gdv3J8G9fDO4egUg+wKlDD+yFqM7PoRGjZvd6uHyL85hz+EMtZY9VL4E+jxauCo1mpGdR9CseUvMo633hOkLsHPvenViqRdXCmPfHokmzW8WOtRUGPJyQcC2CJQpG43Zk/6NCZOmYtXWyci8loXyof4YOLgZpbl6El7ePkqJ9/rKXyhTWz4ej6NMxESUjd9cxC4i/uvdYhBcwrzzvM3JfvTcNfz2ey6qlfGFy5+suI0eT6AiKXWReSVdbb99/ALgpcxw0gQBYyDAzjPvvP0m/nHpvNLQe3h6wy+Qag6qjT4VL9p+BqfTsjB9YCwCfU2UrRldAi8uOor9x66gebWbZccfAJdNyX6DzAgvL/0ZB45dxewhcWhYOeBPu+Pp7Qv+kSYIGBUBF7KvB4b8UT91+bds7DmSgW71Q28RnTEqF+KFKU9VRlAJUkqb2WxK9u0/poNTw9WJ9sNHX1+8L9nN7KtcVkgEMjIyMHv2HCQkNEatWqQTkeZ0CKRdzUHmjVxElbzbfZzVeyF+5hOdB25Tsn/y7UVUjvRG3ZgSmLstFWcv30B4QOE66HTScaAOX79+HR9//DFiY527+qgDQWr3ruTR0TY3N98qLmI2I/u5jBv48fQ1PNOyNOpV8MeM/53G57TSd3+EaqxJswsCLmSG5KynJyjN9rx5C6iGhitatWrpdDXK7AKWg74k0McNvp6uyCAl3b3tu1OZuJ6VR4upeToum5H942/T4F3cVXUkgDpcN8YfGw9cRMe6IfBws46TgIPKx2G6xV5aly9nYO3adWorz3HUO3akUC3Ll6lwDlXOkebwCJT0dUflCB+s/+oiWtYIJiW3qctXr+cqBd3DFfy0JfuN7Dxs+yEdh05nYuyCw8glk8GFK9m4lJmNk2m/IyaMCipKszkC+WoLmEsl31tQ2boxZOzIp+qjg1SapNGjR9n8/fKCoiPgSuwe2CQKzyYdxttrfr21M573+RlaNE1/M7fZZGU/ev46zlzKwn96V0L1sr7qvJGVnY9xCw/jk28vIaa5kN1cARXluuzsbEp/FEKreoJ6TDEyfTZq1BCHDlGwkDSnQaBMsCc+HBSL9zeewCvLflZ8iovywayhcRQtap6NnQdrE7J/9NUF+Hm5oXF8SfX1KWj1acuxjv7Wo0E4+CwizfYIMMH57F7Qrl27Dv4ISHMuBIJoOz++e0yROm11xl25noPdhy+jUZXAu4jOvXwsNpDO7Wk4eCKT/h1QpI7LzQ9GgEl+jQpdpqamonr1auqGw4cPIyCAvLCkGQ4Bq5OdlXLTB8bB3/uPzvt1SFmXPKoafOgaabZHgMl+5kyqSn/EGVJOnjxBVUouqFJF0oyHgNXJ7kYKhfvZ0tldNsxf7Oz2mmZM8MGDB1HyHk/SyK8l05s73njjdcTEFG07aK/+y3usi4DVyW7d7snTioKAn5+fqhnOLTGxe1EeJffqAAEhuw6EKEMQBMxBQMhuDkpyjSCgAwSE7DoQogxBEDAHASG7OSjJNYKADhAQsutAiDIEQcAcBITs5qAk1wgCOkBAyK4DIcoQBAFzEBCym4OSXCMI6AABIbsOhChDEATMQUDIbg5Kco0goAMEhOw6EKIMQRAwBwFF9tAB4825Vq4RBAQBJ0bg/wGW76uQz22B7gAAAABJRU5ErkJggg==[/img][br]        [br][list][*]O maior lado, representado por [b]a[/b], oposto ao ângulo reto[img width=80,height=23]data:image/png;base64,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[/img], é chamado de [b][i]Hipotenusa[/i][/b].    [/*][*]Os lados representados por [img width=10,height=22]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAoAAAAWCAMAAADO+P1vAAAAAXNSR0IArs4c6QAAAD9QTFRFAAAAAAAAAABmADo6ADpmADqQAGaQAGa2Oma2ZgAAZrb/kGYAkGY6kLbbtmYAtmY6ttv/25A62////9u2///bNK0u1AAAAAF0Uk5TAEDm2GYAAAAJcEhZcwAADsQAAA7EAZUrDhsAAAAZdEVYdFNvZnR3YXJlAE1pY3Jvc29mdCBPZmZpY2V/7TVxAAAAR0lEQVQYV2NgIAxEhKBqBBkZ2aFMEW44k4EPB5ONn5GRA6Sej5FJQJiTkQvMBJoA0QAmBRFMmCirEEwtCw8jIzMvYQeSpAIAFtkCDjT17+QAAAAASUVORK5CYII=[/img] e [img width=8,height=22]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAgAAAAWCAMAAADKDS1SAAAAAXNSR0IArs4c6QAAAEVQTFRFAAAAAAAAAAA6AABmADo6AGa2OgAAOpDbZgAAZrbbZrb/kDoAkGY6kGZmkNv/tmYAtv//25A625Bm2////9uQ//+2///bSM7pKQAAAAF0Uk5TAEDm2GYAAAAJcEhZcwAADsQAAA7EAZUrDhsAAAAZdEVYdFNvZnR3YXJlAE1pY3Jvc29mdCBPZmZpY2V/7TVxAAAAOklEQVQYV2NgoBoQYmNkZORiYOBnZGcQBDJEOZj4wIaLsDELQBlQETFuRlZhMV6gtBgPIyMLJ6VuAACHoAF51xWAQAAAAABJRU5ErkJggg==[/img], que são adjacentes ao ângulo reto [img width=77,height=23]data:image/png;base64,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[/img][b], [/b]isto é, não são opostos e que formam o ângulo de [img width=25,height=22]data:image/png;base64,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[/img], são chamados de[b] [/b][b][i]Catetos[/i][/b][b].[/b][/*][/list][br]