[b]Objetivo:[/b] Construir una familia infinita de triangulo rectángulos con ayuda del programa GeoGebra

[b]Indicaciones: [/b][br]a) Trazar un segmento AB con ayuda del siguiente icono 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[/img][img]data:image/png;base64,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[/img][br][br]b) Trazar un linea perpendicular al segmento AB y que pase por el punto A, apoyarse del siguiente 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eK96GxEFz+7XOZGULkMPFEHvMEstFmKp4YaIc0m4XOTmJU2vNMxdXFiPFYo7I1BSRNxs90oRuGYi412IxAkDK4SBk8tLYloxf5XBnD10/4n4KrtQ4F1Tcx67VuI8ldpTvpL7LTiLA7VvqGLNvEmmRzyhnshrfm7ErTDSfVqLRKqSe47s3SfneFgNYAzBV3IVCAbfbDaAMV3ucveybsWv4eMIxRzyeuN7kG9nWfez4CYc1Z9ls41xpr9q+ncn0ow1upny8XX4zCX1hmrhjsRg+n49oNFp9WFxbq1prD5QxrpDi/t0dDq+2Mpxp4z7WEIF1/Ygnh81XG+FMputH3L2Zwvf2LcbFZNUQ+hZ3+SHR6/USDocpFAr4fD4ePXpEJpNpHrM+p8VVs9cnWFk5rKQfZU5zH2s8xt4dVlrk3EY4k0k6Yjx9i9vn8xGLZclml4jFsoyOjrK0tEQikcDRyi6kp9lLAxi/yhQTXGnxiT8b22Jixa1SisVDIjXRczaWw5cqHXsLAq1y7vFl3o4csmgvpTY3HzNRdiYbu4ZvSo2WtLN21/U97qwccFDqQ/lrZuPIuNd/CWnpZra5ucmNGzeaTm7lZmaz2YCfoqbNNeAztDFIq6fLvZfiZiaUGbCbmUZV3B0iey8Fk+k7zIVCIcANhAF36ecOkL2Xgsn0Hbmj0SiTk5MUCgWczij+bsaxPR61NW1tTfZfCoZjSFrSlaAbWV1VmxsWFtQ0vSAYxPk/fcneS8Ekzl/c0NfeS0Fox3CIG85x9lKwKsMjbpD0RDCU4RL3ec1eCpZk+NzMRkchFAKp6ir0ibiZCZZluNISQTAQEbdgWUTcgmURcQuWRcQtWBZxMxMsS/9uZgNC3MyEbpG0RLAsIm7BsgxU3Ol0Gq/Xy+joKOFweJC3Fi4h5lZ5raFczwSigJNYbB27fc3E6q7CZWdg4k6n04AHqG4g3t+PD+r2wiVkYGmJKtBToFr+4VHroj2CYBADE7eqxV1AlYFw43DEWF1dHdTthUvIwNKScDhMNBrF6XSiaRoej2egNbqFy8dAxF1+aOy4YI8gGIDp4k4mk2xvb5PL5XprQNPUpuHPfMbYjgmWx9ScO5/PE4/HydSYPXVENlt1IvZ6e95y1uhTU+tXUz1ujpuYuJidP6ZF7rIVXyqVOntUpFzSYX9f2fqV65iEQqpoD/Sxp7LsR6NKEutHG8y6Z9nI7bF8Tm5i4mI2GEyJ3Jqm4fV6iUajuFqVSNM0Zb4aCKhKr+vrSsTRKORyqsTDwkJV2EYydg1fqcZ2kyPZbrAmwrd3NTv92Ax//IG4mA0DhkXudDrN5uZmZTQkGAzWW/Gl0yr6ZrNKtNPTEAwOvj7g8X1S+Hh7DKhxPtD1XUKLsFUsMmezcbQxgzu0x0l8DqhxNVserzum60fcnV2ErSInczb03SD2rz/h4cMIh198zO1ijNnju/zRQaJ6ztEGf1S671z8hJN4yTZk9iaIi5lhGCLuWCxGOLwO+FFj2WmiS0sqb97fV5Ha41GCjkaNuGUXJFi0N9gvTUXanKusPubGYXz5AeXMoeJ4lqtxPLPvsBubZfb4PqmDALdLmrTNxTmZU58K9XTmYvZAbEMMw5C0ZHt7G7VmJAqkABfJ9XVVZCeVUqlGNKpSjYFTb+ZULOaIsMKdvfqzbLY5YjkfqZKr2cjIDBtHtQ98bRzPAKau0spGqlPExcwcehe3pqlUIxBQD4QN7DscFDwec/LmPjjNbk896JXeBFsTrNy8y1Elt27jeAZw8Jhe3WvExcw8uhd3OKweAn0+JeqlJYKJBMpZIQz4cDgKzM/P4/P58Hq9JJNJtCGp/1dOMRod+2pdzBo5zfGsbOi0U/okqD6kdtYfcTEzj+5z7ulpVc+vJiIvoLKPfD4PTOL3q2l2v99PoVAgmUzidrvxeDzMz8/XPWjGYjH29/eZnp7G7/ebsJiqOecObBVZHreh14Rb21ycrZ0R3PaV8llsFWtdzbbYsbsZWQGYIpKLlY6Nc2tvi5DdzgjlY3vMjR3zwdQKi3b4s4f1dtxlKi5mlNtVTEVyPFjuJ9ERwAA3s27I5/Nsbm6STqdZWFhA0zSSySzqQTSNy0XbmUxxMxPKdOpmNlAluFwuotEoT58+ZXp6mmQyCWSAVSBDPl8oRX9B6J9zC3ML5zJyIlwmzvUzXK0S9ALrgBeXy9l6RlMQemBg67lbUWvz53As9eeKJggNnKu4oU+bP0E4BRlaECyLiFuwLCJuwbKIuAXLMnxuZoJgEOJmJlgWSUsEyyLiFiyLiFuwLCJuwbKIuAXLIuIWLMu5L5wymo8//vi8uyCYwEsvvdT1NZYTdy9/BMGaSFoiWBYRt2BZRNyCZRFxC5ZFxC1YFhG3YFlE3IJl6Wqc++HDh2b1oyNkPbnQDV1P4vRTK7CCpikjpy4czmQHkNAt55OWhMPKMkQQTGTw4i4UVF1vKcYjmMzgxR0On4MvjnAZGay4s9mq+ZMgmMxgxb2+rlwZBGEADE7c2axyN5OoLQyIwa3nDgQgkyGZTLK5uYmmaRX/G03T8Hg8BINBnE7nwLokWJvBRO5kkoLLhdvno1AokEgkyOVyZDIZMpkMuVyOyclJfD5fyUpEEPrH/MitaWjr63g1jVQm09Y5we/3s7CwQCAQqPwsCP1gvrhjMeKFAolThF3G4XCQSCTwer24XC6xEBH6wty0RNMoxONofj+eDh8kHQ4H0WiU9fX1vm6t60dszIyUrK4bvtqYqZ4XVWPW4emTFTBX3OvrxIHp+fmuLvN4PBQKhb5ubbONs/ygZHWdizBVa2/9YFmsqC8B5om7UIB0mrzL1ZMtn8fjIZvNmtCxKipiViN6sORprR9tMDOzwUaw+Rgoi+1g5VMgSHBmho0jvflYTTRu16au7xJyr3BAgkV7iF1db9sGlKy52xwT6jFP3OvrkEicfV4b7Ha7gZ1pRokqhS9XrET3w8VQVSwHK6Su5tSxrQCJt+5WUpm90CKHkdKx25A4qLZbeywXOWQxtFc92KLNY2aJVT5ZYszZbG3b0PVdQotUPoGa2hfqMEfc2ayK3H1M2BSLRQM71IzNNkf85AHL46X0ZOwKE3VnBLh9a0x9O36VqYPHHKEEtpOoOTb7JpEp9a06NoXvmjo2dus2gcROTXRt3WYtZ7dxyJPjUhPLDziJz/X9t7Aq5oi7Zprd5XKRTqe7biKdTnf8ENoPu6U0wW5fpKPPmeMnHE5dZbztCQesuO01bVbF2Dmt27DZ5ojlfKRKx0ZGqumQ0Izx4m6YZp+fn2dzc7PLJrKmC7uc1+5cL9Y8dHbA2BUmWkTcKjUPricnnNR+OnRM+zZs48s8KP2+uDXBys27QzXyM0wYL+5AoG5xlMfjQdO0jqO3pmmEw2FWzV5gdfyEQwJcn6395dlR1mab43ogwVt3Syfu3WHloPUxfTfY9bDjaW300t5lxthJnGQSFhZU5K4hlUrh8/lwOBynRmRN0/B6vQNZY2IbX+btyAzu8oPrVIDA1AGPj+CUnAOA2dgWO3Y3IytAIEJk6rD1MaaI5GKM22ycKsexa/imVli0w1Yx1rYN5uJs7Yzgtq+ULgywVbwlw5ptsOl6cxjY3Nzkxo0bTSc/fPiw/R7K8r7ITAZKC6LqD2v4fD6cTierq6t14i1H9ng8TjAYVFPv2azasfPoERQK7K+ttd0g/OzZs8r3zz032FW8+tEGs+7H3C6NdAjmc+/ePZaWls48z7jIHYvB/HxLYYOaecyUVgWGw2EKhQIOhwMnUMhmmXc4yLhcONbXYXMTXC6YnFR7LV0uGJINwrp+xN1ZdyUVUZF1T4Q9hPQl7nLEdTgceLa3cWQyp1+Qz+N3OPBPTqpIr2nqzbC6qgTscjWlNMNGeeZz+bw7IpxJz+IuFAq43W40TYnR6dTIAZW4XU4rPvxQ/atpSriTk2okJRRqG+UFwQh6Fnc8HkfTPEAKgELBS8ztZs3hUKJ1ueCVV1SqIhuChXOge3Gn05DPU0gmgVDNARe2BZcIWRgauhd3Pg8eD/NAej0GTAIakGR6PmVw9wShd7oX99oaAH6Ph8LmJvvOOABLS9GBTJcLQqf0PlqSzbLmckFKorUwnPQu7nBYhC0MNV2Lu1JtNRZTw3wffmh0nwTBELoSt9THFi4S4qwgWBYRt2BZRNyCZRFxC5ZFxC1YFnEzEyxLf25m5d03qZTp67DFzUzolv7SEodDrQL0+QzqjiAYR/85t8ej1myHwwZ0RxCMw5gHyrU1tRTW5Np+gtANxo2WJBKqZommGdakIPSDceJ2OiX/FoYKY8e5ywV5YjFDmxWEXjDeNiQaVcODHo/aJNyAuJkJg8L4GUqHQ+XfPl9d/l0uBSFuZsKgMMfwyeVSlaLCYUgkKjUAU6mUuJkJA8O8tSWhkIrc6TQ+n49EItGxm1k8Hiefz5vWNeFyYO7CqUQCwmE8TufA3cyg2fOm/DWz0b66dv21g/Wcqfe7McZ1Tbm6Da5IfdlFrtZD6LwwV9wOB+mFBVa7jMJGuJlVqS/kXixuMbFyc+gcCY42ZrDX+N2cnJywNbGCe7a/4vKqtmEvBfAvPqYveY3n82p6vlTvpFPMczMb52q5Djft3ccaOd35LEhwpvX1nbSv67vcWYFIrr4M8mwsR4QV7uyd3tZp7mu1kbvx06jp59Nc2tq8/sbr7LN3eNzl6zeLwaznXluD7e2upudNczM7vk/qYIqrpQLzdc5kW7DYIlKe7XyWgNtFTk7iTaWMO2mfvR0SUz5KHk8VyhVl43O2s9s6xX2tU9q5tJ31+jt1d2v7+k1icJsVUqmupueNczNLsGi3VyKO3b3CxNYey+O2Fs5k1wkcpLjfYB3SifNZvf2IotP2AZi4cqpDwtltne2UdhqnubSd9vrPdnfr8PWbgOnirriZlafnS0N9Z2Gcm1mjeVI1EipfnFrGuXqK61NPzmedtD9+lanDJ6dHtC772jVnurS1ef0N/bLZxrky0fqY4X0+A9PFXedmtrCgJnnOmJ4fhJsZ0CICH/H4oPm0vpzPOmhfOaQ1R7S6kYdO2+qVU1zaTn39Df3S9SOeHLY+Znifz8B0cTe5mUWjyhakzQjKwNzMaOVM1jr3Nc75rF1uPcebEVhxh+oeuPZCblaI8OZsF309jbErTNT0+/h+irLWTnNpO+31d+Pu1lOf+2AgOXcqlSIej6vRj/L0fIv8e5BuZmVmY1tMrLjVx+0ibO01u4Mp57PDSu5uv/mYiZoRl37bB+UGXNyi7vlg8TBCrub8TttqR/VNpO5xEx+1SWJd+ztXqzn3Ga9/NpbDlypd9xYEptq02UOf+8E4N7MzaHIzS6eVU1lper7JzayB/f39oXQzG3Z0fZeQ/S2u5va6GuseZpe2wbuZnUErN7PVfJ5CocCmpjE/P08mk6msFBT652hjBvfKAUxFyJ2RCljRpc04NzOPpyNh+v3+amTWNHC7CWUyQ+9idhEZX37ASYe2a1Z0aTPQzSxMLpfrLvLWLo/N5XrtiiC0pOcEtepmlgNyFApOYr3swCnvnu9yel4QzqJncauFTbVLWE9fznoqPUzPC8JZ9Czu+fl5IAakgSSQ7G/ipcvpeUE4i55zbr/fT6FQYH/fIDez2ul58doRDKCv0ZI1o/PkhQWVnsRiaiePIPTB8M14nDE9Lwid0rubmZnEYlAsglR2FfpA3MwEyzJ8aYkgGISIW7AsIm7Bsoi4Bcsi4hYsi4hbsCwD26wwKD7++OPz7oJgAi+99FLX11hO3L38EQRrImmJYFlE3IJlEXELlkXELVgWEbdgWUTcgmURcQuWpatx7ocPH5rVj46Q9eRCN3Q9idNrrcCOyOfVBuFMRhXsqWEgO4AESzE8M5SapipPpVJNwhaEXhiOnFvTwOtFW10lEI/j9Xrx+XwGOpoJl5GBRe5CoUChUMDpdDbX3g6HYWmJ8P4+yWQeWAU2yee9PH36dFBdFCzGQCJ3MplkdHQUrzfM6Ohofb2T8vehUMn3PQUsAJ8qV0gAAAzLSURBVCkKBUyy6xMuAwMRdzgcBqKUi2aur6+rlCOZVEV4Eso+SFWILaciGqBJvW6hZwYibk3TgLJbggtwUEinVfGdTKZyXjQaBXylLzd+/8KZfvGC0I6B5NzKDTgMBIEsDjRc6+tNQ35+vx+n00k2m8XpnG9pHyIInTIQcUejUcLhMNmsG5fTSaIAjlQKWkRlj8czGJs+wfIMRNwul4tMOf0IBGB6WhWdFwQTGew4dzis/pV0QxgAhoi7UCiwtrZWGsprQzKpptcTHRlLG4pywJ1h40iv+d0RGzP1v+u63aMNZkaCdcao3VzTy/Vm989K9J2WpNNpfD4f4AE2icfj5BrNm/J5iMfrRkYGyt4OBCZI3T9meVm5myv3rgfn058StvFlHpycaxcsTd+ROx6Po8awM0COfL7GChugUFBrRhKJyshIPp8nP6D627p+xN23Drn65nUmUvc5KkWx2sjdGOGaft4NVlx9R8pRV98l5F7hgASL9lDld8GG807tW2MUn9lgIzhSuVdwt/aTpn3bqp3W111mDMq5y9PpDsBZXRNSXgyVSFRGRnw+H263u/Klme2Bc3yfFD6ujc1yfWKFO3vdXa7ru4QWYatY5OTkhFzkkMXQHjbbHLFchCkCbJVcdvdCixxGcnXndcXBCqmr6vriVoDEW3crb8Z2bas3WQpfTvWvmItwuBi6tKlILX2LW02yrKOMn9ZxOPIsLCyog4EABIOVkZFkMkk6nQd+CvyUfN5Rmr00j+P7KfBdY9xmY/Z6gMROl4ID4JAnx+q78eUHnMTnms7Q9V12ElP4rimr3rFbtwkkdroUWYDbt0pWv+NXmTp4zNEZbdtsc8RPHlStr8euMNHDK7Qifefc0WgUu32tYvwUjWbUwqhwWJk41YyMqIi+gIrwAPMUCtv9dqEtun7E/dQBBwduRlaqv9+NzTLbYRsqQj9h1m1HNaFso1v7qB+wUjlPnXv1GObGe38Nnba9GxxhsfKsHuC6Ebe84Bgyzt1k/JRMqly7wZVMrQYMA0sogW8yPT1vRBdac3yfFBFyxVuMlzzMd4Mj7OzFmO1U3ZQf/JRxtL4bxH7zLtf2btFsp15NUYynddu6vkvIvghbRU7iNvSjDWbdj024/8XD+HHubFaNjLQY8vP7/YRCfsANjLKw4CRkomvZ8f0UE7erwgZapyZjV5ioST2O76c4KB3Sd4OMzGxUct922GxzXA8keOvucVfXdcKpbR8/4ZAA1+verNXXcpkxVtzlbWKn7KaJRqPouo6u66RSKdNW/amUZKLhPx2YvU4g8Vbd+LbNNsebEVhx2xkZGeEmPgLlY3NxtiZWcNvVMfsibO2V3jBj1/BNVUdLZmNbTKy4S+cdEnm7/o3VD+3ato0v83bkkMVy/24+ZmLqgMdHhtz2QmPT9ebQsrm5yY0bN5pOfvjwYdMeyvImBJfTiaNhZMRI9vf3224QfvbsWeX7557r7P2qPs7f4mrb/FkYVu7du8fS0tKZ5/UVuaubEHyMjo6S9nhMEbbRHG3MYLcvkpjyca05cRYsQs/i1jSNQCCAmrz5KRpRAqdNvw8R48sPODk54eTBsmFpgzB89CxuNcPoQE27A/jNn5ARhC7oWdwul6v0zBhDbQkLN2/8FYRzpGdxOwoFEg4HTmcc+AxOZ5ZUw7i2IJwnvU3iaBoEAiykUixcgAdI4XLSW+T2etWaERG2MMR0L+5AAObnZTeNMPT0Frkb15IIwhDSdc697/eDVFwVLgBdiVvqYwsXieGo8ioIJiDiFiyLiFuwLCJuwbKIuAXLIuIWLMvwGD4ZxMcff3zeXRBM4KWXXur6GsuJu5c/gmBNJC0RLIuIW7AsIm7Bsoi4Bcsi4hYsi4hbsCwibsGydDXO/fDhQ7P60RGynlzohq4ncRprBQ6Kfdn9I3RJ72mJpsleSmGo6V3cDgcUi8rzRsqoCUNIfw+U0agq8+D1qtrcgjBE9D9a4vermtyBgLILMYJ0WrXn8xnTnnApMWYo0OVSBqqbm73n4YWCMokaHYXtbVXRSmoPCn1g3Di3w6EE/uGHKup2mocnkyqtCQRgchKePjXNnUG4XBg/iZNIwPS0Emw7gRcKKsKPjsKjR+qaTEZKtAmGYs5mhbJIfT710FmOwoUCrK8rx7PVVcjl2hpDCUK/mLcTx+9Xovb5lJA3N9Xvg8GWNn6CYDTmry1xOCAQoFB+6CxbZwvnjn60wczICMFda/rEmyPuQkE9IIbDKi3J5XAkk6z7fAP1zVH/ecEu/dfNRd8NMjIyUv0K7p5bX/burDCxVSQ+p0yvTvt7DePf8iyMF/famkpFpqdVpC7Z9zkyGebTabxud8ks6vKh7waVSWuxyMnJCcVijsjhIjMb5+OIOhc/qQj7LJRFeNwk629zME7c+Ty43er7ViMfLheuRIJEyeKvyS9+wDRGoqaf9V2C5eg6EyQ4M1NxHS5/nJejb/ljXT/aYGYmSHBmhJGGKKfrR9x9K0Fgq+rfbrONc+vtCKTuV2y06+7b1EbrY7p+xMbMDBsb1U+FmY2juk+J2jdQq3Z0fZeQe4UDlCPyOx/Uv5Z3Pjjl7zNS87c5pf+Dxhhxx2IqDUkkVORuNwLi9+Py+8ktLVEsFvF6vRQKBUO6YDR7oUUOIzkVYW9DomQGr0SQwpcrRd9chMPFUPU/8SABt4ucNEa54/ukDho92ksRscYPs/a+ucghi6GqT31dn7ZgcfZujbf8ASuPr1f6xIob+07tz3cqfWx1D5ttjlguwhQBtoox5myNr6XaZ10/4u7sImyV/gZbE6zcVH05vY+DpX9xBwJqrDqT6WzipTRyEl1dZXV1Fa/XSzqd7rsbRqLru+wkAty+VbIXnn2TyJT61mabI37yoGqpPXaFibqrmwVcYeoq42fedwpfydZ47NZtAomdSmSt79N1Agcp7h9XGifyZunGY9fwTdX+fIUJDnlyfPo9mmnzWhreqLa5OCcPlhlj74w+Dpb+xO31qlnFRKLz8WqHQw0HxmJ4PB5yuRzxeJxwOEw2m8Xn8+H1ekmepxvx8RMOzxDiblB99Nrti3Q8sHnwmHJyUJ/aVD/W4YAVt72mbSVKjp9wWNfYOFenunpVtR1pfY9uaPX3MbSP/dO7uAMBWFqCUKj7a/3+yri3w+Egk8lgt9vxer380z+5cDqXWF4On19ePnaFiRoh1lLOKXeuV9OSjv7/xq7hm0qwU8oy1APaCcXiFoG6EwOVB071VfqUaPqEOOLxQU+vrv09uqHV38fQPvZPb+JOp9XUej/T5R5P0zJZl2uBf/NvVnnjDT+/8RtRc3ff1HxUAxzfT1H+f7DZ5rgeSPDW3dLBvTuslA8eP+Gw6eP67Mhns41z63aAxOJsTZQG9nYqkb/xvvpukJGZDY50vUWfdkhM+ShlFx1z2j06puGNWn4Y32PWkD4aRW8zlOGwmjrvh1deqVt74nA4+MlPqg+XP/nJh/21XyHBor0hcQhscRKf483IW7jddlaAqUiEAI8rp8zGttixuxlZAQIRIlPqA9c2vszbkRncdrs6cSpAYOqAx0dwah6Dyk2LuQ1mS/csdYat4l7l4bPuvkwRycUqD5v1xwJsFW8xbrPR7fNau3voY9fwTa2waIc/e3i1/euwjXNrb4uQ3c4I5TbUa9Db9PE8sOl6859mc3OTGzduNJ388OFDpl95RaUkmUx/d15bU9Hb4wFA0zS8Xi8/+Ql8/vMu3n03idPpJJFI4PF42N/fb7tB+NmzZ5Xvn3vO+KF7/WiDWfdjbhdjF2qc16rcu3ePpaWlM8/rPnIXCqYsRy3n3slkEk3T+NM/fQpAIBBge3ubhQFO26uhLnc1FamJTMLFoXtxezwqckej/d15e7vpYdThcBBq+F0mkxn4g6XNNs7ygxOWB3pXwWh6+wz3eNTETa9ks+B0djx8eN6zmcLFpDdxR6NqKO8MgafTaUZHR7HZbPjKi6Y0TT2Qrq72dGtB6JTexF3eUra/ryZystmmUwqFAj6fj0IhCORIpzUCXq9afyLbyIQB0PtmBYdDbeDNZlUUD4eVYCcnweWikM8DLqCcQ6+SznvVHkmn04i+C8Kp9L8Tp2Y4j2xWjaZksziKRaAAlEWex+VyibCFgWHsNrOyyFFy9msayaQXcOJwFIhGpVSDMDhMdTNLJBIEg0E0TcPlcuGQzcDCAOla3L2s97DZbDx69Kjr6wShH7oSt9THFi4S4qwgWBYRt2BZLGGPbcZKQOHiI6oQLEvL9dyCYAUkcguWRcQtWBYRt2BZRNyCZRFxC5ZFxC1YFhG3YFlE3IJlEXELlkXELVgWEbdgWUTcgmURcQuWRcQtWBYRt2BZRNyCZRFxC5bl/wNJukbybLcz2wAAAABJRU5ErkJggg==[/img][img]data:image/png;base64,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[/img][br][br]c) Trazar el segmento BC con ayuda del siguiente icono: [br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOMAAAFQCAYAAABNp8kjAAAgAElEQVR4nO3df2wj533n8fcYuT+8SEkaRuMCsWBKrNUaqiHRAeisgcOKrSjvdeuueMdrrocDVlPHZ2O3Mcn+sTm1wEk6tKd2gYKkE63rS9Lh/tO7pLolF4Fwa2kDUv/UsWKIXDhCUq0pMVkb8PXgZsgt7CsO2Lk/hqRI/SSpITmSvi9AWHGG88xDLT98nnmGM49iGIaBEKLnHul1BYQQJgmjEDYhYRTCJiSMQtiEhFEIm5AwCmETn2vlyT//+c/Z2trqVF2a0t/f3/D4vffe47d+67cAcDqdvaiSEJZoKYxV586ds7oeTVlZWenJfoXoBummCmETEkYhbELCKIRNSBiFsAkJoxA20dZoaqckk0mKxSJut5vJycleV0eIrrJNGFVVJZnMApPALCsrK2ia1utqCdE1tummJpNJIANMA5nKYyFOD9uE0eTa8a8Qp4ctuqnbraAfmADSjI6O9rBGQnRfT8Oo6zqqqgKwtbVFMplkZSXLuXMXiUQivayaEF3XszBms1lUVSUWizExMQHAzMxMr6ojRM91PYy6rjM7O0s+nyeTyeB2u7tdBSFsqasDOPl8Hq/Xy1NPPSVBFGKHrrWMMzMz3Lp1i1QqxcjISLd2K8Sx0fGWsVgs4vV6AcjlchJEIfbR0ZYxHo9z48YNYrGYnKoQ4hCWhLF+UGZkZIRwOEw0GsXlcpHJZHC55CS+EIexJIzBYJBsVgfCZLMJ4vE4qVSqdspCCHE4S8KYzWaBX2B+jW0CeEyCKESLLBzA0Xf8K4RohSVhNL+65gWigFe+yiZEGyzppsZiMYaHhysXBsfkwmAh2mDZqQ0JoBBHY7PrGYU4vWxxPeN+3n//fX7+859z5swZAO7evcvHH3/MP//zP/PEE0/wzDPP9LiGQljH1i2jy+Xi3Xff5eHDhwAMDw/zhS98gZ/+9Kd8/vOf73HthLCWrVvGvr4+vvSlL3HmzBnOnj0LwI9+9CMGBgbo6+vrce2EsJatW0aAQCDAO++8wz/90z/x6aef8oMf/IAXXnih19USwnJttYzdng3q85//PN///vf53Oc+xzPPPCNdVHEitRzGnfMjdkN/fz/z8/MYhsFrr73W9f0L0Q22Pmas97u/+7s8fPiQz33u2FRZiJYcm3e2DNiIk872AzhCnBYttYzvvfdep+ohxKmnGIZhNPvkUqnUybocmdPp7HUVhGhbSy1jOp3uVD0scenSpV5XQYi2tdQyPnjwoJN1ObJf+qVf6nUVhGjbsRlNbYbdPyyEqLp582bt92qP7sSEsfplcoBHHpFBYmF/O+8TJe9aIWxCwiiETbTcTV1bW+tEPZr23HPP9XT/QnRKW8eM586ds7oeTen21SJCdJN0U4WwCQmjEDYhYRTCJo5FGHVdJxgM9roaQnSU7cOYzWbxer1cvHix11URoqNs+w2c+jkfM5kMbrdbRlPFiWaLllHXdbLZLMViEYB8Po/f78fpdNaCKMRJ1/OWMZ1Oo6oquu4G8kxMTFAsFtE0jZGRkV5XT4iu6XkYo9Eouj4NRIA86bSXXC4nQRSnTs+7qWbXtDqD1Qgwgq7LhKvi9OlpGHVdx+VyYU6yqgNxXK6ipa2iUZhnzOHAsesnzFLz11XvU+7RyhCiXs/CWD1lEQ6HGR0tAo/hdifQNK0SUCupLJRKlMvl2k9ubp1Q4DoFCZOwia4fM+51yqIXBs4H8U1tUAA8gGEsEXGG0AAzvHHGFQV2rfPxX9eucu+5KVaBkBMWSnECm9cJeM1lAOpCicS40vXXJY6vrraMdjplsXk7xapvEE/l8XIkxPpcbrvVjCwDYBgFrgdCsGC2rKWFIf74tXt8bW0OXyW0AZaJeFMEc5Xn5OZYD0WkCysOlE6nG27y1rWWcWZmhlu3bvXolIVGyKk1LvLNkVu+jEdRMIwlFjUfwdwAAAOXr6I6F1mKBwhs3ia1qnI1YG6mjCcoj5vHjFWKMk6iPL5d9sDTDLHR6RcljrmddzPseMtYLBbx+/2USiUymUyPTllsHzOWFlTAx9xbZhC3rTLldeJwOHA6Q2isc2+zsqquBT3IUthRt70QrbE0jOl0mv7+fhRFwe/3MzMzg9/vZ3p6mlgs1oGBmdYp4wlyczDl3dmN3DnIc4crnkpYV81jy/0YxhJhh4PFC9vdVF8nX4Q4kSwLo67rqKpKsRgGtshm3SQSCXK5HKOjo1btxhIDl99izqfVjgsVZZwLqsa162ZTaCyFcYzNmyOtA+cJ+jQWzafWndKoK3DzHuuoXAjU76WuZRWiCZYdM+bz+cpX2iKVJTF0PWmL1nAnRfFw+a05Ut4QY4M57lzxEIgvsOj04pgC8DGXi1e6sR4uLy8QcTpxUF23zPjAJh/4pmqjqW/NBfBWpxfwqai+VTaqQ7VCNKHlO4qvra3teQ+cfD6P1+sFcpjfpInjdifY2tqyrLIrKyv73pBK7psqjpObN292ZgAnn8+jqmrlpqxewIvLNUssFrOieCFOhSN3U3eesigWixSL5lfa7NhFFcKu2g5jsVhEVVVGRkbIZDK14Lndbrn+UIg2tBXGZDLJ7OwsmqbZbqRUiOOqrTDeunWLXC4n3VAhLNRWGFOplNX1EOLUk3MAQtiEhFEIm5AwCmETbR0zyv1LhbBey2GU+RGF6AzppgphExJGIWyipW6q9pN/0al6HFn9xSeKIjeCEvakPvP/9l0nLaMQNiFhFMImWh5NHf7s3U7Uo2l3H32+p/sXolPaOs+415X+3SDnN8VJJt1UIWxCwiiETUgYhbAJCaMQNiFhFMImej6NeL1kMkmxWMTtdjM5OXn4BkKcILYJo6qqJJNZzCnFZ1lZWUHTZPoYcXrYppuaTCaBDDANZCqPhTg9bBNGk2vHv0KcHrbopm63gn5gAkjL/VjFqdPTMFankQPY2toimUyyspLl3LmLRCKRQ7ZunmG8zXe/PME7tSUv89oPv8EzNr/Uyrj/BonQBi8eg7qKo+tZGLPZLKqqEovFKhPmmPN2WK0aRGKfknjBfEP/w9+M8mevfIM/+dbX+IK8yYVNdD2Muq4zOztLPp8nk8l0fl6OD/+ej3mZF89uL/rl35/ibGKO9Q+/xhf6dracja1mw7pnX+YsP+aJ6QyjTxbIvvJV+M3fIJ34DgD94fcJu+NEotuPI//+V3eXU7cP4/4bJGZh2PN10mmzfmdjn/KVs0t8N/R1toC/+jK89sNv8Oss7VtPcfx1dQCnOofjU0891Z0gAjz52ww/+x3+6pVv8A+VuwEoyov8u3ez+PvMN/JP/3yCj8Pvk3j3M/4k/GP+6s+XapvXr4v/Abzzfn3h75L+2UvmuoW/gMSzRFbqH8f5SWWfB+2D97/O3acq+4i9zDt//Q3+D+N8ZeEv6K8LXUNdYjS8JnH8dS2MMzMzqKpKKpWy9HjwMIryq/i//RnxP9jgz758hvDzjxJ+fpTMffNNbBhvczf9PMP/0pxi+Jd/f4qz6e/zE8OorHuZF3+/Mv3w2QgTz9aX/jwT/2Hc/PXJ32b42frHv8av8GM+/vDgfZjq9tE3SP/7G3yy43XsrstLnH3/JusfWvanEj3W8W5qsVgkGAxy8eJFcrlcp3e3L+WFb5J495tAdWDEDwsZRp8EeJd06Azp2rOf54kP4df5ez5+dpDftKQG++2jSR/+PR8Dw7UFHp54dv+ni+Ono2GMx+PcuHGDWCzWs1MVxt/9odl1nHqxtkzpe50XJ77O3fvAk7Df8Zdh/Bq/8v73+QT4wpFrss8+7je5+ZO/xq+wUbegwP9+H544cr2EXVjSTdV1nWg0it/vJxqN1lrDu3fvkslkenvO8OxLnE1P8D/+bvvYqtptfKLPPH4cnvgOb//3grnu7/6Q8Fff4B8MY9c63omTfn+vnRzsoH20WwbvfJ93nv3XDD3Zen2EPVnSMgaDQbJZHQiTzSaIx+OkUqnaKYteUpQX+coP03z3y2cI15Y+z8RCpjaA8+v/Kc3dLz9LOFFd943aKY+GdRN/wcSzP26rHvvt48A4PvnbDD/79e3R1IYyXua1H8qpmZNEMYzmP57fWP2/DH/27q574Jj3Kf0F5tfYdOAxWii2aSsrK/vekKob902Vk/DiqKr3Tb158yaXLl1qWGfhMaPOdhhPBsP4gOwrz9Z1Tc0WVYIoOsGSMEYiEeJxL+blT8munrropOppEX+vKyJOBUvCGIvFGB4erlwYHJMLg4Vog2XdVAmgEEdjs+sZhTi9JIxC2ISEUQibkDAKYRMSRiFsoq3RVJkNSgjrtRxGmR9RiM6QbqoQNiFhFMImWuqmVr9xbkcPHz6s/f7II/IZI44fedcKYRMSRiFsouXR1LW1tU7Uo2nPPfdcT/cvRKe0dZ5x55X+3SLnN8VJJt1UIWxCwiiETUgYhbAJCaMQNtHRMN6/f59PPtk5a4QQYi8dub3/xsYGb775Jp9++ikAZ86c4Y/+6I/o6+s7cLtkMlm5qZVb7qkjTp2OhPH+/fsMDg7WbtL6p3/6p+Tz+QPDqKoq2WSSSWAW8zSGpmmdqJ4QttSRMJ49e5ZPPvmEN998E4DPPvvs0G2SySRbgBu4BPQnkxJGcap05JjxzTff5J133uHs2bO89NJLPProo01t59rxrxCnSUfCuLGxwdmzZ3nhhRd49NFHDx/ESSYZBfyYXVQ/9HbmKiF6oCNh/J3f+R1+8IMf8Jd/+Ze8+eabnDlzhn/8x3/c/URdh2AQbt0itbXFxelpsqOjXJyeJpVKWVYfw1gi7HDgqP2EWToG028bhXnGjlhXwygwP+YgvNR8GVbst9ny291Xs6+rndd/lO2OoiPHjC+99BIvvPACn3zyCY8//jiPP/747idls6CqEIvBxAQuzKnGrWYYS0ScIVgoUR43J6wpzI/hDVwnt3wZj0xi03WK5wp3yubv9v9I7J6OnWd8/PHHGRwc3B1EXYdoFGZnIZOBTs/huHmPdVQuBLYXDVy+irqa4vam+bix5Wz8lG5YNxYmPDbGfMGofHKOMT8frrW4Y/MFjKXGx3uWU7cPozDP2Ng88+Htlju8ZJgfIt4pVtEIOSNmK3JAPevVP88ZeKNhvuNmy9ivvGbqfujfrtIavv2w8TW+/UFjK7mz1TzodTX9+gvzjDkOr28r21mlu9/AyefB64WnnjKD6HZ3fp8D5wn6NEKB6xQq/6mKMk6ifIcrHrNVXI6EWJ/LUS6Xyc2tE4os1zavX1e6CtpqfeGrTG1cMNfl5mDKi3Ox/vEbtTfSQftgdYrUYGUfCyratetsEiCem8OHykIpzriiNNZlgYbXVO+gOh9Yj30cuN896l7Y4zXv/tuBoux8jS3UY4/yDnue+QGXIpgr1f6P1kORPf+PWtnOKt0L48yM2S1NpaCLU8Ypiocrd8qUrm7gdTorn2zmJzSYf+hFzUfw/ABQaTW1xVpLtKipXL1sriPwOnO++tJ9zL1eaXIHzhP01T9+miHWubd58D5MdfvwDOJb3aBAo911udDQuu//vO06H16P3Q7f7951P/xv15pmyzvoeTs/hM3/o6NtZ6XOh7FYNFtDgFwORkY6vsu9KOMJyuVy5ZMtSMobqAUSVpnymkF1OkNolRCxeY913yAeS2qwzz6atXmP9YYFHgb3enPveJ6ieHi64Z3TYj2a3e9e21n2t9tdj92vq/nnLVW61ebrP+J2FupsGONxc7Q0FjNbxh4wlsI4wksNyxTPFa6qq2zUmh+VhVKpFtZy9VNw4GmG9mil2rPPPpq169O4wMZe3bQdzzOMAvca0tRiPZrd717bWfa3212P3a/r8OdVjwkXL2x3N31H3c5CloRR13Wi0Sh+v59oNIpeLJohvHvXPDbs5TnDwAVULbTrQH1R8zHoMbsgF1SNa9fN5sFYCuMYm6dgGLvWsfwGU828EXc4aB/tlsHyIpovSKXHecDztuvcTj2a3e/h2zXxt6vr2gNs3k5R3aTZ8g583h6DeVT21+52VrIkjMFgkHg8SzZ7iXg8S7C/Hy5dAk0DV2+/T6Mo48RLCxBy1kbCnM5rDOaWay1CIL7A0JTXXBdaZ+6t7VMeDesWB9s+7jloH/uqDj5VRlMby4CFfU7NBOI5gqnK866B6qtf13o9mt3vgdvt97ere43LBHh9jlo3+lWCqE2+rmZev+K5wltz64QqYwfOVzcY8m33kNrdziqKYTT/8fzgwQPW1tZ23QNHURTgF5hfZNOBx2ih2KatrKzse0Oqbtw31SjME/BucLUyuimaJ3+7Rjdv3qxdSFFl4btW3/Hv8Vf9FkatRfWmCObkzdQM+du1zpJv4EQiEeJxLzAJJIl08dRFJ1VPi1zpdUWOIfnbtc6SMMZiMYaHhysXBsfkwmAh2mDZd1MlgEIcjdyQSgibkDAKYRMSRiFsQsIohE1IGIWwibZGU2U2KCGs13IYZX5EITpDuqlC2ISEUQibkDAKYRMSRiFsQsIohE1IGIWwiY7cUbzXPvroo15XQYhdvvjFLx64/kSG8bAXLYQdSTdVCJuQMAphExJGIWxCwiiETUgYhbAJCaMQNiFhFMImWj7PuLa21ol6NE2upxQnVVsn/XfOtdEtcocBcZJJN1UIm5AwCmETEkYhbOJYhFHXdYLBYK+rIURH2T6M2WwWr9fLxYsXe10VITrKtpdQ6brO7Ows+XyeTCaD2+2W0VRxotmiZdR1nWw2S7FYBCCfz+P3+3E6nbUgCnHS9bxlTKfTqKqKrruBPBMTExSLRTRNY2RkpNfVE6Jreh7GaDSKrk8DESBPOu0ll8tJEMWp0/Nuqtk1rc56PAKMoOt6D2skRG/0NIy6ruNyuYAooANxXK6i5a2iYSwRdjhw1H7CLBmGtfsozDPWgXK7Vb7ovZ6FsXrKIhwOMzpaBB7D7U6gaVoloNYwjCUizhAslCiXy5TLZXJz64QC1ylY+MZWPFe4U04wriiWlSlOl66HUdd1otEos7OzZDIZZmZmyGQyGIbB1tYWExMT1u5w8x7rqFwIbC8auHwVdTXF7U3zcWPLud36GEaB+bEx5ufDtVZ1bL6AsdT4GBpbLqMwz9hYmPCYWd7bHzQ+XjKMffe5uz5jfPODJSLeKVbRCDkj2/uoa+3DS9JiHnddDWNPTlkMnCfo0xpaQkUZJ1G+wxWP2YotR0Ksz+W2W83Icl0Bq0xtXKBcLlPKzcGUF+di/eM39u46rmpwtUS5nGBc2flY2XefhlHgemC7JS8tDPHHr93ja2tz+FBZKMUJsEzEmyKYK9XqsR6KSBf2mOtaGGdmZlBVFU3TmJmZ6dZuURQPV+6UKV3dwOt01lqb+UK19VtiUfMRPD8AVFpNbbHuje1j7vVKszpwnqCv/vHTDLHOvc299tzYGtc/PnCfm7dJrW4/VxlPUL5zBU9d73fnh4lZD3HcdTyMxWIRv99PqVQik8n07JSFMp6oHTOWckFS3kAtkLDKlNcMqtMZQts3YFY6YJ++QTxNlLAUdtRtL467joYxmUzi9/uZnp4mFotZOjDTLGMpjCO81LBM8VzhqrrKRqG6RGWhtD3AU65vdTrmgH2ublA4YMvqMeXihe1uqq/DtRWdZ0kYq4Myfr+faDRKsVgkGAxy69Ytcrkco6OjVuymPYELqFqoYYCj2k0c9JhdvguqxrXrZrNkLIVxjM1bOtK604H7rBzjLlYOW7cHhuoK2GNQiq605qKTLPkGTjAYJJvVgTDZbIJ4PI6maUxOTh66bacpyjjx0gIRpxNHbamPudxyrSUKxBdYdHpxTFXXxfEoCp0cD9lvn+Dh8nJ9fc26jg9s8oFvipATFkpx3poL4HU6Ky9HRfVVWvpm+rfClhTDaP4t9+DBA9bW1nbdA0dRFOAXgAvz5P1jtFBs01ZWVva9IdXDhw9rvz/ySM+/WCTEgW7evMmlS5calln4rtV3/CuEaIUlYYxEIoAX82tt3spjIUQrLDlmjMViDA8PUywWcbtjtjhWFOK4sewSKgmgEEcjIx1C2ISEUQibkDAKYRMSRiFsQsIohE20NZoq9y8Vwnoth1HmRxSiM6SbKoRNSBiFsAkJoxA2IWEUwiYkjELYRMujqWtra52oR9NkNFecVG2dZ9x5pX+3yPlNcZLZrpsajUZ57LHH6O/vJ5lM9ro6QnRNz6eEqzczM0M8ngY0dF1HVaO43e7e3l1OiC6xVctodkOngQnMaeImyWazva2UEF1iacuo6zr5fB6Xy3X4ncOLRcjnzZ+VFdB13LoO3MIMog6kcbnCVlZRCNuyLIzVSW103QUUmZycRNMqN53XdTN02SzcvWv+PjICw8MwOgqRCLhcTBeLpL1edN0L6IyMuOR2HuLUsCyMs7Oz6PokEAOKJJNewrrOSLEILpcZvnPnYHIS9ph9qlwq43a72draIp/PA8ixojhVLG0ZodqldAMj6BcvmuE7RLlUZnzsRf725vfo6+uTEIpTybIBHDNAs0ARiANZ3E2EqlwqE/o3/5aZ/zJNX1+fVdUR4tixLIyxWAwze/24XLMkR0dxNzESev/+fb76ysuc/1fnraqKEMeSZd1Ul8tFJpNpXKiq5r8HdFWHfmOIod+QqT6F6Ox5Rk0zT1vs8U2ab/23b3P//v2O7h6qU6o5KjMWb/+MzR80A2L9tmGWDKPh927r5b5F93T+pL+mQSLREMjvffd7vH377S4eIzZOTFoqLTA09WrdzMWHUzxXuFNOMK50ehJVcVp15xs4mUwtkOs/Xufb3/oOf619pyu73puHQd/2zMXVmYDNVnPvFmhn69SwzViY8NhYLdz7lWcU5hkbm2c+vN1CN0ziuqMVDy9JS3iadCeMLlctkEPv/YiF//m3OJyOw7frlM3bpFbNmYsBliMh1udyZqu5AKHA9UNnLm7Y5ipoq/us21ne6hSpweo6Fe2auc4wloh4UwRz21ODr4ci0jU9Rbr23dSy8kgtkI7UzW7ttkIj5HTWWhynd4qhBXPmYnNKcZWrlwfMpwYuoK6muH3AlNy7t3mdOd9+63aWV7fOM4hvdYMC5gzLifKd2mzKDDyNDGudLl0JY/Vc4vqHHzV0Wbun8ZixXC6TGK+86Tfvsd7wXA+DvkOK27zHum9w7xm72ymvzlKlC+t0htCa30ycAF0J4x+oL/PVV142T2HUdVm7G8h97GqBCmys7vPc+m0qLZol5bF9nLl4Ybub2kKGxQnQ8TDev3+fF8+/yO995fe2F9ookIoyzgVV49r1Sj9yeRHNF+T8QCvbvMHUavvlAZUWVeVCoH7hOvcO6C6Lk6XjYezr6+OV//jV3StsFMhAfIGhKa/ZPQzBwvJlPIecwmjYZnGwdszYbnmK5wpvza3Xjm2dr24wVDfiK04+xTCaH6578OABa2trTd0D53vf/R5DQ018u0bXwe+HcPjQL5WvrKzse0Oqhw8f1n5/5JHuXjNtFOYJeDe4WorLeUjRlJs3b3Lp0qWGZR15197+X7f59re+09xJ/UoLqScSePv7URQFRVGIRqOdqJolDKPA/JijbnQ2RTAnQRRHY/k9cO7fv8/Mf55l6c7bzZ9LdLmIjoyQT+pADigSj/u5ePGiLS+nUhQPV+6UudLriogTxZIwVu9TMzIyQl9fX/NBrN4BIJ9nK5sFNMAFjAAjZLNZW4ZRiE44Uhh1Xcfv95PP64ALl6tILpfDvfNK/mx2O3h375q/67rZRT13Dlwu+kdGWCkmMINYBPKMjk4fpXpCHCtHCmMymawEMQe40PUgs6qK5nabN5yqBm5kBJxO8343+9x2IzY5Sb7oJ59/DIBIJCKtojhVjtwymrdVdFWWXKSoJ8yR0cPuDreDy+Uil8tRLBZ3t6xCnAJHGk01W65k5ScNzHLu4sWWg1hPgihOqyOHUdNiuN2zuFwqkcgEMzMzVtVNiFPlyKOpk5OTcm9TISzQVhhlNighrNdyGGV+RCE6w1YT3whxmkkYhbAJCaMQNiFhFMImJIxC2ISEUQibsPx6Rjv46KOPel0FIXb54he/eOD6ExnGw160EHYk3VQhbELCKIRNSBiFsAkJoxA2IWEUwiYkjELYhIRRCJto+Tzj2tpaJ+rRNLmeUpxUbZ30b2aujU6QOwyIk0y6qULYhIRRCJuQMAphExJGIWzCdmHMZrMkk8nK1AFCnB62CaOu63i9Xvx+FVVN0N/fTz6f73W1hOga24Rxe0arLSCHrk8wOzvb62oJ0TW2CaPZLa2fAu6cdFXFqWKLK/3z+XzlhH4WOIc5xVyUc+fCva2YEF3UszDquk4ymeTGjRvk83lGRkbQNI0bN24AcO5cWGa0EqdK18OYTqe5desWyWSytszlcpHJZHC5XJbOaGUYBa4HvGxcLZEYV7aXF+YJvApvLV/GoygHlLBHmYV5At4NrpbijLe4rRAH6UoYdV1ndnaWdDpNsVhsWFcfRKspiofzQR+pe5sw7qkt37ydguBbLQdRiE7qygCOy+Uim83uCiJAKpVi5AgzHR9m4HwQUrcpGAZgtpa3UxA8P1B5vETY4cDhcOBwhFmqPG/3ujG++cESEe8Uq2iEnBGWDGPf7Y3CPGNjYcJju8sVYi9dG03VNG3PZeZU5B00cJ4gKW5vVh5v3iZFkEoWWY6EWJ/LUS6Xyc2tE4osA9UubggWSpTLZUoLQ/zxa/f42tocPlQWKt3U+u1LCxAKXK8Fn1UNrpYolxPSpRWH6koYs9ksqqoyMTFRWxaJRLoy47HZVYVUJY1mF/U8HkXBMJZY1Hy1VnLg8lVUbdFsxTZvk1pVuRColDOeoHznCp66TJnbq1y9XEl24ALqal3w2d5eiMN0/JgxGo2SzWZJpVK43W6CwSAul4tYLNbpXdcMnA/Cq7cpXD5vdlHfGqhbu8qU18lU7bGPwU0IAPgG8ewsrN7mPdaBC7UFHgZ91tZdnB4daxnz+Txerxen00kul8PtdgNm13SvLnyAbXkAAAbCSURBVGtHDZwnyAaFHV1Uk8pCyeyKmj93uFJt/lY3KBxY7tMMNSwosLFqcd3FqWFJGJPJJH6/n2AwSDabJR6PEwwG0TRt17nCToyaHsbsqq6z+MZGrYtqLh/ngqpx7brZrzSWwjjG5s1jvoHzBH0ai+YhpDkg4wizZNSX27g9y4tovp1hF6I5R+6mJpNJVDUKxIC7pNN+JicnyeVyPQnefgbOB1mfShHMNSYlEF9g0enFMQXgYy4Xr4TVw+XlBSJOJw6q65YZH9jkA98UIScslOI7tldZKJnnLmXsVLTqyGE0vzETA6qDMTpPPfWUrYIIoHiucKd8ZfdyZZxEuUxir232XOfhyp0y2yXtvb25PwsqLk6NI3dTzdD9rG5J0XZBFOI4OHLLGA6HSaf9QBEziHkmJ1NHr5kQp8yRwzg6OsrW1hbJZBKXa5jJyZS0jEK0wZLzjG63W66wEOKIbHNxsRCnnYRRCJuQMAphExJGIWxCwiiETbQ1miqzQQlhvZbDKPMjCtEZ0k0VwiYkjELYhIRRCJuQMAphExJGIWyi5dHUtbW1TtSjaTKaK06qts4znjt3zup6NEXOb4qTTLqpQtiErcKYz+dRVZVgMEg6ne51dYToKlvMzwhQLBbx+/1M6jpuQE2nIZVquAu5ECeZbVrGZDLJqK4TA6Yx7zeXSOx1zzYhTibbhNHlclE/afjP6M0Nj4Xold53U4tFSCaZvHGDWcAPjABxIBOWacTF6dGbMOo6pNNw4wZkswC4JifJTU/XZjTOjI52fro4IWyku2HM5yGRMIOo13VKJyZA03CD3GVOnFrdCaOug9drdkl3GhmBbs9KJYQNdWcAx+UyW7+d3G7IZMz1Qpxy3RtN3fkVOpcLUqmOB9Gcys2BY9fPGPOF9ueK2p4i7viXIeyhO93UaNQcqEmlIBg0l6VSZhe1K1QWSnHGFeXwpzZJZpkSVutsy5jPm8eKTifkcmZXdXraPEa00UipYSwRrraY4Xnmx8xWc2erU/+44XdjibAjzPz82J6tbkP5B7Ri+z3PKMwzNjbPfHi7ZQ8vmfuNeKdYRSPkjNTV5fB9CfvpXBjjcVBVM3j1I6QzMzA5uf92XWYYBa4HQqzP5SiXy+QGU0y1NRW4xlQqSK5UorQwxJQ3UgvCcmS7/NIChALXzdmRd6h/Xm5unVBkeXvl6hSpwWoZKtq162wSIJ6bw1fX8h9YhrC1I4dR13X8fj+KoqAoCtFoFPx++NnPzMGZJrqi+XyeaDRKsNqFtZxGyOlsPGasThdOgY1VlauXzRmNBy5fRW1zL+pVc9ZiAq8z51vn3qbZ2i1q2+UTuIC6muL2ZuO25vN8BM/X1UNbrGvZ6srwDOJb3aBAq2UIOzvyMWM8Hieb1YEtoEg8HuRibJrRSOTA7XRdJ51Ok0gkyOfzjIyMkMlkjlqdfex/zGgU7rHuG+T12hIPg7529uFj0GP+pigenh5aZbEAcI914EJT5a8y5XUyVV/mJgRaqsfeZYx7WipE9MCRw2he8DsNuCs/k2R1nf2OCLPZLDdu3Kh90wbM76BmMpnefBd14GmGVhcpAOb7tcDGKgweoUjDKHBv3cfg65Xy2ahbe1D5e39oGDubwANZP1gluuPI3VS32w3cqDzSgXRl2TZd15mZmaG/vx+/32+fIAKKMs4FVePadbPfuHn9GrWvIAw8zRBmdxNg83aK/Q8nV5l6o3J8tvwGUwQ5P7C7fJYX0XzmuoPqYSyF67rS7b2WdsoQvXPkMMZiMUZGisBjwGNMTo4yuWOAxuVycevWLYp7fANH0zRGOn6KY49jxsqIJEAgvsDQlBeHw4F3Y6h2zKgo47w+B1Nec9tXCR5wPOlD5RoOhwNnaJ25tyrHjzvKd4ZgYXl7Xb3G5zWWsa+B8wR926OpbZUhbEExjOY/Nh88eMDa2tqe98DJZrO43e5drWL9er/f37BM07RdwT3IysrKvjekevjwYe33Rx5p/zPGMJaIOK8xmFvmiqe5N3E724jT7ebNm1y6dKlhmWWnNkZHRw8MYjQabbhqPxKJtBREIU66jn8DZ2Zmhlu3btW6o36/H7fbTSwW6/Su26Io4yTK4x3fRoidOhbG6s2lLl68SC6Xqy1PpVKd2qUQx1pHwhiPx7lx4waxWGzXBcJyKw0h9mZpGHVdJxgM1k7gS/CEaJ5lYczn8wSDQWKxmNxeUYg2WBZGt9tNLpeT1lCINlkWRgmhEEdjm/umCnHatdUyymxQQliv5TDK/IhCdIZ0U4WwCQmjEDbR+7k2LHKUKzWEsIOWLqESQnTO/wdjLcW9hbsxaQAAAABJRU5ErkJggg==[/img] 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[/img][br][br]d) Construir el triangulo rectángulo con el 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[/img] 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[/img][br][br][br]e) Seleccionar la recta perpendicular al segmento AB y que pasa por el punto A, usar el siguiente menú y desactivar el "Objeto visible"[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAVQAAAEfCAYAAAAeDT4aAAAgAElEQVR4nO3df3Qb5Zkv8O/YTiC0lfKDhF/hxrFqAxEUtAkKWSgJPZLwxe09KKt7tuVsm1VpCdcGS+1uTbXc7T17t7sqbnfXNpWLT7ur9J4eSrsiZm/xXiO5BAqHpiqpSIkC2MibkEBNYAGpJE0c23P/GP0YSTPSyBrbUvL9nOOTSDPzvu+MpMfPOyPPI9x9993iD37wAxARUXUalnoARETnCgZUIiKdMKASEemEAZWISCcMqEREOmFAJSLSScOqVauWegxEROeEhuXLly/1GIiIzgmc8hMR6YQBlYhIJwyoREQ6YUAlItIJAyoRkU4YUImIdMKASkSkE2HPnj3iUg+CiKhe7Nq1S3VZEwDs3Llz0QZDRFSv9u7dW3I5p/xERDppWuwO5+bmsv9vaGA8J6JzByMaEZFOGFCJiHTCgEpEpBMGVCIinTCgEhHphAGViEgnDKhERDphQCUi0gkDKhGRThhQiYh0woBKRKSTmgmoYiIAm8EAQ96PDZ5Aouq2E+EAPIGwDqMs7VzYB5JkX0tbAAnx3LjDZdhjgMHgQVgUIYY9MBgM8ITnv296tFGpcMCW/VwFErX3utRMQM2w+mNIpVJIpVIIuYGgb3dVB04Uwxhw+RAc13GQZZwL+3C+mxwdRhQAosMYnVzq0ehPcPQjlUqh3yEs9VA0E8UwRnxRwOpHLBlBl6n2xl5zAVXO3mEGEMV4OsETEwF4bOnMz+bJC1J5y9JZoSgmMGh3IQgAQVc220gEPLJMUj2DTGR+G9o8sNnm99t96fchs54NHk9u3Jl9sKW3k2cv5caZHW+mDU9uLDbZOEqNsWiZ7Fhq2bdyfauNXxTD8BgMMNhs6e08CBfsmygmMDocBdxuuBGFbyCieGz1HMNT/6d7fm2lM2mbx5NeXnicc+/hEYWxZ4670nsvbx9V3idyaq+blmNe7jXP+xxEfbAYvYpjWGo1HVAjI0EAVrSZpBfcbvEh7owhmYwhZA7CZ5EOqiiG4bX4EDSHEEsmEQuZEfRZ4I20oDMSghsA3CGkxrrQMjmI3b44nLFkOoOMIugbKHpxxEQAu31RWP0xJCMdMEfrdR+CiLpDSCaH0CG9HcsqNU4l0XgbhpJJxPxWRH0WKWAnAqpjzIwL7lBumcsrW1Z+30r2XXgsnXH4LPb8XwpRM3qSSaRS/XAUZjqToxiOAta2bnS4AQRHSn541fa/7DGUj+FSoaq2ovE2dEdi8FsLj3PuPaz28qu99yqZymt63VSOuZZtBcGU+xxY/Ygl++AQmKGWFfVZsucfXXEr/KEhdJmE9BTMCmd7CwTBBLv0TsdIBEBkBEEA7g47TIIAU4npjGDqQiQ5hNbRQXhsNriCABDHRMG0Lr8/h/TByrRRZrpUW/sgtZnrr7yS41RgdbbDJAhoaXfCCiA+MalpjNFgL2yeMEzd6Q+ZIGjet1J9Tw72Iggr/N122bIohuVzd3eH6gdSvv/l9l11DFqOocIY5tuWtJ0JrWbl/Sh8D+ep4L2nRtPrpnLMK33Na1nNBVSrP4ZkMv2bKGpGq71FtjQKn8UIg8EAo3TUpTfcRFxz+2IiALvRAtfwONp6hhDSFmNgarPW6T5I2XHllMepxNya3r+WVpgBRMcTJccomLrQ47cCiCIadMFiMcLmkU5lVPr6KPVdpNSyAtnpvtWJ9hYA9g5ISap6RFUfg/ZjuBBtFVJ7D1fy3lMz389VtdvWmpoLqAAgCA70haTfwi6v/I1shT89Lcj8jHWZ0CL/tVxG5re2f6gPXY5MpDGjtaXkZkiMVzbnr4V9qKTNYsrjVJL9YE9OIA7A2mYqO0ZH1xiSyRhiIT/cViAa9GEgUvnro9R3kVLLitaVpvvSeTojjMbM+Wv1ab/6GLQfw4Voq5Dae7i694lkvp+raretNTUZUAEA9m74rQCCvQgkxKJpm3SyPf3VCVkWkclybAUn9fNJF4nERBgjKtMLeX+imFlPovmi1BLvA0xtsKYvqohiAoO9wYJl6f0p2L+S41QayfAoEqKYN8UsNcbM8bMPAiZHF7qdhSmJhn0r0Xdm/L6BiMq41GVPk4RywSsmvYiq0/5SY9B6DBeirVLv4Tyl3nsl3icKo9f8uum7be2o2YAqCCZ09riB9AdDMHUhEnID6fOTFh/gDklfnRAEB/pifrjjLimrkBZirMsEQXCg22+VrpAbPHj9fzwC6aERRksv4JamnoWzQcHUhaH0hQGjfQSYxzSkJvYh5IY16ILRuBvjZnfesh638v6VGqcSq3kcA3ajtJ5fOl/c0jmkOkbB0Y9YXvtxuP0x9DtKb6e1b8HUhYjsWFqGzfDHyn/NJjvdhxsd9tzzmfOZatN+1TFUcAwXoi2t7+GS770S7xO5Sl83vbatNcKePXvExSwjXS9F+sSwB0ZXEFZ/DJFOYNBrgS/uRyzSCVMNXl3UIrNP7lBSl+8fyo9RpdPPeu57IcZQC/tD5e3duxe7du1SXb7oVU/rheDoR8gdh8tngdEHwOqGf6h+gykRLTxmqEREGpXLUBnRiIh0woBKRKQTBlQiIp0woBIR6YQBlYhIJwyoREQ6YUAlItIJAyoRkU4YUImIdMKASkSkEwZUIiKdMKBqlLlH5GKWzCWi+lIzAVW5pv3i19+WxlFc1TEy4INZp9ve1Yuwh79AiCpRY7fvcyO0xNUMBVMXxlLFzzv6U3As/nCIqI7UTIaqRba+tyxzLcwolR/nMl55xqWpvbx1Ctq1BRDwKLedIc/yMtsk5llPvNS+yPvLlE1JBGwweMIljqVyffU8I96S/RFRTt0EVFFMYNDuAtK1fpIhM3y7B1HqbIBUb3w4W+87GfMjnqn/rrG9iNeFuD+WXgdw2QdzATHqw3BbZpkbwd7BomBp73DnCq8lxoF0meDsGNP1lQp/CoNXqX3J668vBLNvAGExjAGfGaE+O6oRjLchlkyq9kdEOTUWUINwGY35wSWT0U2OYjiaq/UjOPqRGutCqbI6guBAf2osV3snXZoXgKb2pKJkbvR0pou72Tvgjg4jV95dtszUBmt0HEVlcOwdMKcLr0VG4kWF4oR0DfTCn8JztSX3pWC9bn8cLqMLcX930emTTACXqnnmjrdaMUB3j1SlQKotVLo+PdH5rsYCqhuhZH6pXCnIpYOCtQ3zqbYTTk/LsyWBM8q1ly7lm2OCSmnzEkxowzBGJyMYiadrvVdBdV9kpKJyylU+MwE8mQzBLTveynWMrNBSeZmIJDUWUMtQygBLyJz/HOnITZPz4mG59oqywARUSpurEgQT2p3A+MAI4gXTfaCyKX/JfZGJDPhgdpvhG6g2ncxVnhTFBCbipdcmOt/VT0BtaYfTmptyZi8ebWyFWVbDO1NXXXowgXhBSeBsvW+19mRxTBAc6HAH0TuYbjwygqC18iyzpd2JeLB4ug9on/KX3BcZMRFAb9yP7r5u+OO9ql85k04h9Jf9RkW2dHLBKRIiKlZjAVXhHGo6WxMEEzojIcAlLTdahuGM9eH2Bge6/YDPIj2/G85s6XCpLnk826Zx9zjM1nRteJX2CuOYdJFHqodudAGh+ZSRbmmH02pGaxXT/VL7kiGKCQzu9sHc0wmTYEJnT+ZC2/wvJLkxUnB8zp/v4RJVilVPF4GYCMA+0Iqxfn6TlaieserpEksEbFJ21825MtG5rsb+UurcY+oaQ6prqUdBRIuBGSoRkU4YUImIdMKASkSkEwZUIiKdMKASEemEAZWISCcMqEREOmFAJSLSCQMqEZFOGFDrHKuxEtWOmgmoalVP1e4kT5LCaqxqVVvLLSOi6tXY3/IvfdXTelNJNVa1iq5EpI+ayVDLKV191AOPTXr+qbnXEbDZEAh48rJc+Z3x5VmvlkqimQqhgYAtr0JquTYKxxYWRfV1xURl41Y4HlIhPx+iCMJl9OKp1wuOzeulKrrm9knLMSGiYnUTUEtXHw0CPUmksnegj8I33pEtFQKfBcYR+eMBWQAqX0lUEoRv2ClVAA2Z4bN4tbUhG5sdkTL9aRt34fGI+eNweSMQBAf6Yn5Ys5l+4bHJ7Y1a1dfX5yo5JkQkV2MBteCO/ema8lqqj+aX5rDCn7n/aEs7nFb541zJFK2VRLO9pCuAwt4Nv1VrG7LKqmXX1TZu6XjkivC1dPbAHRxRCXoqZUtUqr5+vKGyY0JEOTUWUAuqnmbucK9L9VF1WiqJyiuACoIJreb88iPa2qh8XXXRbNkXqZ3i+lJllaj6qs8Yic4vNRZQVehQfVRJJZVE87dLYCIuBdhK2phvf8oKS27LskqtFKq+6jtGovNLXQRUvaqPFtFYSVQSzZVljgzAh3T/lbRRUX/qCo+HGPbAYAtUVoxPreprQp8xEp2PauxrU+rsfSGMGC0w+AApO5POZ1ZzqUSqJGqDxWiUnrC64c5UEi2aC1vhRi8MBhcAK/yxPul8agVtlOyvwl8O+ccjNx6xpR1Oqw8uI/Cvv2lT3/d01Vev0QgDMm1EcLtJwMc1HxMikmPVUw1EMQyvsRdtsUjl02oiOmew6ikR0SKpmyn/UpK+7qT175GI6HzFDJWISCcMqEREOmFAJSLSCQMqEZFOGFCJiHTCgEpEpBMGVCIinTCgEhHphAGViEgnDKgasbooEZVTMwFVreppYf2mxRlHcWXQwuqitSzsqd/An1fnqtJbEhItsRr7W/6lr3qqVhm0kuqiND95da4cAhIBGyze1lzlBqIaVzMZqhZKVToLM0rlx8oVPDW1V7LaagABT/nqoFqqiIY9uaqmiYAtW09L+RgUZ9BFRrxl+8uvzqqcDWrpT616auUSGJfVuWppd8KqWiuLqPbUTUBVq9JZ6rNbqiKp1vZKV1v1Ybgts8yNYO9gUVDSWlnV3heC2TeAsBjGgM+MUJ9SZT3tgvE2qUKrWn8dbsQzt+FPjAPOdumG2RVSP46yX1yyUtiGUr9YJicQl9e5khUmJKoHNRZQC6qeys+jqVTpLHW/55JVRjW0p6XaanaZqQ1WhRpNWiurCoID3f44XEYX4v7uotMemaAkFc3LHadMVlsoU6FVMHWhx50rdZJl74B5eBQJUURkJJ6toFpxf6rHMTd+wdEvq32V+yk6H50Yhw6lwoiWTI0F1MLCc6n8D2eJKp2lqFbwLNeejtVWtVQRbWl3wgprUXADckEpmQzBLTtOY11Ke5Cr0KrOhDYMY3QygpF4cX2uivqb5+tSPKQ2FgSkulZjAbUMhQywlLIVPMu1p0O11UqqiEYGfDC7zbligPOWK3EtVWgtXkMQTGh3AuMDI4jPc7qf6670cdQ85W9phVne1uQE4jCjtdpijESLpH4CqlqVzo3559kmR4dz08ZSVUbV2pN9xnWptqqx0qmYCKA37kd3Xzf88V7VCzvSKYT+st+ECGZ2rGBKLtfS7kQ8WDzdr6g/1eOYG7/mKT9MaLPmjvfk6DCi7o4l/dYHUSVqLKAqnENNZzKZKp1wScuNlmE4Y324vcGBbj/gs0jP74YT7nRrUpXReLZN4+5xmNMVPNXaK/yMSxeLLNI6LiAU6awomys1hgxRTGBwtw/mnk6YBBM6e4ov7FTKjZGC/VIYc0s7nNbqMkD141h5EMy0lTnelmEnYlVenCNaTKx6eh4TEwHYB1oxxu95EmnCqqekKBGwSdlkNzNAIr3U2F9K0WIxdY0h1bXUoyA6tzBDJSLSCQMqEZFOGFCJiHTCgEpEpBMGVCIinTCgEhHphAGViEgnS/o91DfffHMpuyciKuuKK67QvO6SBtRKBkpEVOs45Sci0gkDKhGRThhQiYh0woBKRKSTvItSX9534YJ08seXzmb/L8rv5M47sRNRHXBfc1bTesxQiYh0woBKRKQT1e+hPvbfllXV8Gf/r7YUmYjoXMEMlYhIJ5r+Uurt1Lt4+/0UGhsacenqj2HNR1Yv9LiIiOpO2Qx1KvUufnv0P7B+lREXXnAS/3bgN3jr3fcXY2xERHWlbEA98X4KWze2YvkKEUeT7+A/3p3DM+O/W7ABnXh0BzxbV2R/Hnshvzb9K/7i5wBAFF/Hvi/twL5jpWvZi8cG0Lf1PrxSRc37StopXE91/DqNi4iWTtkpf2NDI945+RaO/u4dvDQpYP/h93DVxZcuyGBOPLoDf/f0Tjy4fx/WCQJE8Sn85KaL0Od5Gd67Pl5yW0H4OG77wTMLMi7F/q7shvdX+q1HRPWvbIZ66aqP4dmJt/D0oTP4f79+C5fNJeHYpP9dokTxKTzdfy3u/f79WJf+wr8g3I4/DT0E9PflZ27P3l+UwRZmqKL4FB7LZrpS5ieKT+EnrgfwH/hnPHLT/dnnCtfLG9exAfR9aQAnxPx+nv5VfkYpvnCfLLOWPa+UeSqMX+l4lBoXEdWesgF1zUdX479+Ygs2XbYeX7h1E/6h679j3cVr9B/JL3+GX17XhqKW19+B66/7Zxz8pWzVRBse3H8KfaGHMPWV+xWDzavfuhNTnpfR/6s/4EHPITzyrXA2QG/E3bh3/8O4RhDy1uv7J+CRLz+cDZ7Z/rEX8ePpx8f/HQexE+bLcquI4lP4yVeAe/efyutPdVfnOX4iqm2avjZ1mWEl7rppEz5/6yewdk3uCv8HH5zAb3/7In772xfxwQcnqh+N6apsdpohCB/Hpab81bZ9UcpihSu7cfud+cEWkALcwSe24vpPShuu/ZwP2574WXH2KT6Fg0/cjds/l+5g22ew7WVZ8Ez3b/4UcPC5BADgnef2Ap+6A+uK/mr2EKbS26276xn0+25X3U29xk9EtWXeN5h+//0TOHDgBVx9dSsA4MUXX8CWLTdj5cq1ug0OkKbYUwkA2zPPbMUlV2rZ8ld4wnURnsg+3opLjgNXy1c5/hqmAFyffcKES64rbmntJ3cCf/PvOPG5OxB/Grj+f+VHeCnzfQ392f624s7QPtx2pdK9Cqob/zWatiWipTDvgHrs2FFcfXUr1q83AwDm5uYwPv4arNZ5BtRtn8G2r/wMr3zdgWvkWerxf8fBl+/G7dsyT/wKbx8DcKVSsJXLTevlxGOyB+uvwqUYlz2RwNsvA5cUNrX+DlyPLyH+S+AgduKu9QCO568iXXzqlvp44T54/+ZhmL9/P4qPRnXjJ6LapdtfSomimHcnqUoJwu34lOdQ9mKR1KZ0EQkeb15g+eWz6fOJ6WB7/bbitq6/85/x1I+labr4wn3wyC4sqa0nncfdCfP6wvakaf8TX3kgPd0vCNIq7avRa/xEVFvmnaFeeeUGHDjwAmZn5yCKc3jppZexfbujqsGsu+sZ9DXfB+9NF2Wf2/ZPp+D94/wAtg0/g2frnchMra8RBBTGmqu//gQO3nQdPP1Ir/ew9FWs9Xfg+usewCM3Affuf7hgvbtx7/77iwImIE37N/Yje15TTvjj7+LeZ1fg7256IP1Mrh2lEKg4/oJ11MZPRLVL2LNnj7hz504A+fdD1XJzlA8+eAfj469BFEW0tV2FVavWZZfJb46yGPdDlb6z6sclqucuiYjmJ3M/1L1792LXrl2q61VV9XTlyrXzP2eqoxOP7sDf9f8KuO4hPLi+/PpERAthSctI62XdXc+g/66lHgURne9UAyrvZ0pEVBneD5WISCcMqEREOsmb8suvxutJXjFwbm4u+/+GBsZzIjp3MKIREemEAZWISCeqV/m7rReqLdJkIHq6qu2JiOoNM1QiIp0woBIR6YQBlYhIJ5oC6nvvvYf+/n6cOnWqaNn09DQOHTqE6enpqgYiJgKwGQwwFP3YEEiI6eUehMX8/y8EvdrX2k7hemGPAZ6wQmXUBd5vIqqOpr/l//73v49vfOMbWLFiBe655568ZePj49i/fz8A4Nprr61yOG6Ekn1wKNyFSkzk/i+YujCWqrKrRaB1nPWyP0RUWtkMdW5uDkNDQ3j44Yfx3e9+t2j54cOHccsttyAejy/IAAFAFMPwWnyIIgiX0YunXs/P1EQxDE8mo/UEELAVZ7VAcYaXt10m+y3oK5cR57LmwuxRTARgswWQyLabQMBmw3f3FfQX9sgyb/VxAQBGvKr9yY9L4fiJaOmUDahPPvkkmpubcc8992Bubg779u3LLjt+/DguuOACXH311Vi2bBmOHTtWoqX5EwQH+mJ+WLMZbG6ZKCYwaHch7o8hlUoh1jYMX1RbuxGvbDt/HC5vpKgvOyLwWobhjCWRSqWQjPkRd3nzg1dLO5wYxuhk+vHkKIbhRLus/pMohuF1AaFkMq8/NcF4G2LJpHJ/JcZPREunbEAdHBzEjTfeiGeeeQY333xzXpZ6+PBhrF27Fr/73e9wySWX6JClBuEyGvPPocoyP2UJjEfd6OlsAQC0dPbAraEnUQxjJGiFs122XXCkKHAJggP9qTF0mdJRvKUV5oK2BMGEdicwnI6ok6PDgLMdpqIzF3FMpIOuqWsMqX71Cgfunk6YBAGCqQs97iBGCmKl1vET0eIpGVDHx8dx8OBBnDhxAj/84Q8xPT2N559/Hm+88QZ+//vfY2pqCtPT03jttddw9uxZvPPOO0gmk1UMx53N4LI/Y10wlbqz/+QE4tY25AqTmNBm1dpfFD6LFMCNRheCsoBXKOwxyNYr1iJFVCTEBKR42pK3XMp8nRi2GPMutimzoq240kpV4yeihVfyotTg4CDuu+8+PPjgg9nnHnjgAXzve9/DnXfeiU2bNmHLli3ZZQcOHMDhw4exbds2peYWRksrzNERJIB0UE1gPAq0adpY+SKY/AKYKIbhNbqAUBKpfgFiIgC7ZRxFWtrhxG6MRoBhODHUAqAguEkXn7qkdsMeGHcPoj3SiZaixqIYT++QKCYwEQfQoX38RLQ0Smao119/fdFV/fvvvx+bNm3C6tWrsWnTprxl11xzDVavXq3/KEsQBAc63EH0Dqan24O9uQyypRVmWdY2OTqMqMp2YtijfHphcgJxuNFhlz9ZnAlmpv0+ly893S8I0mrtqwhm5viToxiOFvZfwfiJaNGUzFDd7uKzkevXr8fnP/95xfUvuugiXHXVVVUMJwiXsXhC7Q4l0Wdvh9Pqg8sI/Otv8vNPe18II0YLDD4AbjfckM7lCoID3f5eWCxG+ABY/X64Ma68Hazwx/pgEgSILbm+Qsk+DPntsBiN0kZWN9zWXAYp19LuhNVXPN0HAMHRj9CIARajL7NXCCWl86RKIdCNERgMrvS4InAorKc2fiJaGnlVT4Ov5Cqd6nlzlMW8H6o0Re9FWyySu5BERKSDclVP+aenREQ6OSeqnspJX3NS/zoSEdFCUQ2ovJ8pEVFlOOUnItIJAyoRkU7ypvzyq/FERFQZZqhERDphQCUi0gkDKhGRThhQiYh0UnVA/ao3itUrB7B65UVYvXIAv3jmF3qMi4io7sw7oK5e+V+wetVx7NmzH8DX089+HV7vS/qMjIiozswroG669n8DeBcQ25ALppIjR76uuE056lVPF6/6KBFRNSoKqJmsdOr4D2TP/s+8df78z/uqGE7xHftj/jhc9kHe55OIap7mgJqfld4rW2ID8C0AUjC9886rdR1gS7sT1ug4MjfRL1WBVKmqqGLFVJsHHlv+OqweSkTV0hxQ87PSbwK4GBDGccOWZqy7/BG898Ep/GPfPbh1x626DnBydBjRdM0oKTgqVyBVqyqqWDE1GgR6kkil+uEQhLzqockQmBET0bxoDqh33vmlgmfexWf/9O/x9Ng6vHr4sE7DKa56ahl2IhZJVwAtW4FUa1XRXEkRqXpormoq7B1wR2UloYmINCobUDPnTZ/4ty8il5UewbrLmzH4yKDOw8mdQ02G3ACs8A91FpX1UKpAWllVUZnJCeQXv66kaioRUU7JgJp33lRsw8JkpcoERz9ifsBn8WbPaWbOdY505Kb88tgnVRVNpQOyGb7dGqbuRVmuVDWViKhSJQNq/nlTyWOPPblggynU0jkEvzUIlzdTAVS9Aul8q34WVg9FZARBqxMKdfaIiEoqGVCLz5sCn/3spxdsMIUEwYTOIT+sQRdsgQQEUxeG/PHseVbj7nGY0xVIBUc/QmYfLJllLiCUPveKlnY4rdJV/rBCvLX3hWD2WYq3IyKqQF7VUyVXb9qEE78L44bNy/HWWzuqnuovdNVTIqKFUq7qadkiffkBdGHPmxIR1TOmiEREOmFAJSLSCQMqEZFOGFCJiHTCgEpEpBMGVCIinTCgEhHphAGViEgnZb/Yv5DefPPNpeyeiKisK664QvO6SxpQKxkoEVGt45SfiEgnDKhERDphQCUi0gkDKhGRThhQiYh0woBKRKQTBlQiIp2ofg81fvgQnv3Fvnk1esvNt+IT110/70EREdUj1YD67C/24YGv/dW8Gn3o23/PgEpE552yfyl1/PhxPP/885iYmMDjjz8OAHjyySfR2NiYt97s7CwA4PLLL1+AYRIR1T5N51BvvvlmfO5zn0MwGMxt2NCAxsZGNDQ0sHopERE0BtRYLAaXy4VHH30UANDY2Ig5cQ6zs7OYnZvFzMwsBFRXx15MBGAzGGAo+vEgLIpVta2nsMcAT7h2xkNEtUNTQP3GN76BH/3oR+jo6AAgBdTGhkY0NTaisbEJTY0NaGhsgNAgYG5urorhuBFKJpFKpbI/MX8cLvsgEjUUVImIlJQNqIIgZZ5/9md/Bq/Xi4d6H8IXv/hFOBwONDQ1oqmhEQ1NTekgq//Uv6XdCWt0HIn0Y1EMw6OQvYqJAGy2AAKeXHYrzyRVtxMTCNhsCAQ82e1sgQTEcP7jPCPeoj6k/j3w2HLtF2bdpdYlovpXNgI2NDTg5z//OZ5++mns27cPW61bMTMzg9nZWTQ1NqGxKZOpNqChoSl7cUovk6PDiFrbYEo/jnhdiPtjuezVG8mtHPVhuE1algy5EezNZbby7ZIhFGS9UfjGO6RlMT/gs8A4In88kBf0gvE2xJJJJGN+xF3e3LJoEOhJIlm2qUkAAAzGSURBVJXqhx0ReC3DcMaS2XbU1nUI1Z0uIaLaoCmgCoKQvfiUefzhhx/CZrNh1apVWLNmDXp6HsCKFRdWOeUPwmU05p1DtQw7EYt0wiQIEMUwRoJWONtbAAAtnT1wB0dkwc6Nnk5pGUxt2cxW2k62zN4Bd3QYo5OZfq3wd9ul/7a0w2mVP26FGXFMZNcF3D3SeARTF3rcQYxkY7obHenNBMGB/tQYukyCrB253LpEdG4oH1DTwVQeVAHgyJEj+NSnPoVUKoUvf/nL+Jd/+Rfs27cPZ86cqWI4uXOoyZAbgBX+ISl45UThs0hB12h0IVgQ7BRNTiCe94QJbdb5jtGKNlP5tTLC6VMQ0liJ6FxW/qRng5ANpvJ/ly1bhr/+67/GBRdcgK997WsAgF//+te6DUxw9EOafXsLzjEWXriSZYFqirLDBMaj8x1ZFOPpU6qimMBEXHmtzDnbkY7clH/eMZyI6kL5i1KQAqr8B5AuVs3NzaGhoQGnT58GAExPT+s6uJbOIfitwex5UkFwoMMdRO+glJKKYQ8MtkDZbwAUbofICIJWJ9JnDioWzMzxJ0cxHFWZuk9OIF40rdeQTRNR3SobUEUgG0gz2akgCJiensa3vvUtzMzM4Dvf+Q4AYOvWrboOThBM6Bzywxp0Za+02/tCMPss0jTaFVc4JaAsfzsgFNG2nRI3RqR2LMNwxvoULyoJpi4M+ePZc8LG3eMwW3PZLRGde4Q9e/aIO3fuLFow+MjDeOBrf4V333kHF1x4Yd5FqS984Qt49dVX8eGHH+KNN97AzMwMPvOZz+CnP/0pTp8+jaHvD6Lz3vsVO5RftOJfWBFRPdm7dy927dqlurzs3/KvWr266LlHH300LzDOzMwAAER+n5KIzmOqAXX7rbfhoW///bwa3X7rbfMeEBFRvVINqOZN18K86drFHAsRUV3jSUwiIp0woBIR6YQBlYhIJwyoREQ6YUAlItIJAyoRkU7KfrFf7sCBAzhy5BnFZc3Nzdi8+U90GRQRUT2qKKAeOfIMduzYgebmHXnPHTlyBM8+exSbN+s+PiKiuqF5yn/gwAE0NzfnBVMiIsrRHFCPHHkGzc3NRc8dOXIER44cwYYNG6oaiFrVU1YYJaJ6oSmglstOjx4VioLt/OTfPFqqw2RHIMGgSkS1T1NA1ZKdbl6IE6gt7XDKbnNfuuJproroU6+zAikRLb6yF6Uy2akUPPfkLTty5AiOHhWwfbse2amCyVEMw4mh9J31s5VLu0wQwx4Y7YOIRTrRAkhVRENJpBwCxEQA35Y/FsPZCqRjJmm53eJFONkHe8G2RETzVTagZq7sy55JPy8F1ObmHTpmp0G4jAWl7Kx+ALLKpUlZ5VJXL0YnO9EJoLiKaGEFUkduUUsrzBhXXJeIaL5KTvkz2WlOfjAVhI06nTvNKDiHmozBDx8GItClcikrkBLRQioZUJXOneaWLeC50zRBMKE1U660isqlrEBKRItBNaAufnZaTJrmW9FmqrJyKSuQEtEiUA2ouT8xPYJMMM0tW6jsNJitEpqZmiMUQZdJulg038qlrEBKRItBterp44//g8JXpaTAKl3Z3z6vgMqqp0RUr+Zd9TT3Van87FQQNmaz0wMHDmSfzwXbowCAr371q1UNnIio3qgG1M2b/6TszU7kGepCXpwiIqoHnHMTEemEAZWISCcMqEREOmFAJSLSCQMqEZFOGFCJiHTCgEpEpJOKivTp7c0331zK7omIyrriiis0r7ukAbWSgRIR1TpO+YmIdMKASkSkEwZUIiKdMKASEemEAZWISCcMqEREOmFAJSLSScXfQ00mk3j//fcxNzcHg8GAiy++eCHGRURUdzRlqGfPns3WgpqamsKaNWtw8cUX49ChQxBFEbOzszh58uSCDpSIqNaVzVDfffddfPDBBwCADRs2YGZmBmfOnIEoili+fDmmp6exf/9+nDx5EpdffjluuOGGBR80EVEtKpmhZqb2GzZswMc+9jG88sor+MMf/oDTp09n/33++edx6aWXYvv27Th58iR+85vfLNbYiYhqSsmAOjs7i6mpKbz//vs4c+YM1q5diyuvvDK7/JprroHJZAIgVTt97rnnkEql5jUQMRGAzWCAoeDHFkjMq73S/XgQFsXKthMTCNgM8IQXZzu925/vfoc9ym1L/doQSCxMv0T1qOSU/+KLL8bs7CxOnz6N06dP4+TJk0gmk3jjjTewbNkybNy4EU1NTTh79ixOnTqF2267DVu3bq1iOG6Ekn1wCAIAQBTD8Bp3I9AeQZdJqKLdHMHUhbH5xXySEQQTusbGlnoYRDVFNUOdnJzEK6+8gqmpKTQ1NUEQBPz+97/H0aNHceONN+KP/uiPcOzYMczOzkIQBKxbtw6vvvoqfvjDH+LRRx/VaXgmtFmjGE+kMx2bBx6bAYZ0xiOKYXiy2WwuC5Ke9yAQsKWX5TKpwoxJrY3CZUb7AMZlIyvMqOVZXMntSvUX9siyc/Wsbr7tqym7zYi3aD8LM1SlNkQxDK/FhyiCcBm9JV8zonOBakD98MMP0dzcjDVr1iCZTEIQBLz99tvYtm0bNm7ciA0bNuDGG2/E22+/jYaGBvznf/4nNm/ejDvuuAOHDh3SZ3SToxiOWtFmSj+OBoGeJFKpfjgEARGvC3F/DKlUCskQ4LIPIpH9gAbhG3YilkwiGTLDZ/EqfnjlbcT8cbi8EcVlyR4gGJWelwLFMJyxpLQs5kfclWtfbbtS/YliGF4XEEomFceiNmat7ZdS+jgCwXibdBwL9rPccRQEB/piflhlM49yfRHVM9WAmrmaPzMzg9nZWYiiiI9+9KNoasqdJRBFETMzM5ibm8Ps7Cymp6dx8uRJnDp1ap7DCcJlNGazIaPFB3NIPt13o8Oe6TuMkaAbPZ0t0hP2DrijwxidzLXm7umESRAAezf81jgmJvM6S7dhhbNdaqOlswfu4Eg2k8pvvxt+q/RfQXCgPzWWG1dLK8x5bSpvV6o/SW6Mpq4xpPodRUeouvaLVXIcBVMXetxBjESU2ijfr5a+iOqZakBNpVIYHR3Fyy+/jBUrVuDMmTO44oor8Nprr2FqagpvvfUWXnzxRVx22WWYnp5GQ0MDHn/8cXzve9/DypUr5zkcdzZDy/z0O1TOnU5OIJ73hAltVvnjXGYrCCa0mqVTB8Wi8FmkIG40uhDMBLWC9qU28rcMewyy7ZTHVbydcn9SNufEsMVYdJqi1H5rbV9VBcexNA39lu2LqL6pXpTasWMHAOD111/HqVOnMDMzA1EUsW7dOrz00kuYnZ3F+vXrMTs7izNnzuDkyZO49dZbcfvtty/OyFtaYc47e5jAeBRoU1hVFBOYiFvR1q3UUP6FsNw2+e1LbQDoyFwscwGhJFL9AsREAHbLuOK45NuV6g/IXDDrkrYLe2DcPYj2SDrLVtlvre2Lal+WKHsc07+ITEp9yWnot4LXjKgelfzaVCKRwKuvvoqVK1eiqakJy5cvx0UXXYQNGzagubkZH/nIR3DBBRfgwgsvxMaNG/H8888jEil/zk4PguBAhzuI3sF0GhQZQdDqRHrWCSAK30B6LJEB+CBfptyGGPbAYAsgIYoK7Q/AlzlXOTmBuOz0gySXaaptV6o/+f8r229t7c//OALBzBx/chTD0cL91t6vlr6I6lnJr03Nzs5i3bp1WLFiBQ4ePIijR49ibm4O27dvx9zcHH784x9j2bJl2Lx5M9auXYtVq1bh9OnTizV22PtCGDFaYPABUoYkZXPS59gKN3phMLgAWOGP9UnLSraRW09aFsOEPb3M6oY7cw7V1IUhvw0Wo1F6wuqG25rL5NS2K9mfox+hEQMsRl96zdz+FO935e2XCtNqxzHDjRHZcYzAkT3GGvptaYfT6oPLCISSfWX7ApDN+HuSfbBPDir+XynDJ1pqwp49e8SdO3eqrhCJRPDcc8+hoaEBf/mXf4nHHnsMn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[/img][br][br][br]f) Listo, hemos construido una infinita cantidad de triángulos rectángulos con solo mover los vértices del triangulo rectángulo, experimenta esta experiencia con en siguiente applet.