Calcula las funciones trigonométricas restantes para los ángulos agudos en cada triángulo rectángulo, del cual se indica una de sus funciones.[br][img]data:image/png;base64,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[/img][br][*][b]Identificación de lados: Co=11, H=[math]\sqrt{346}[/math][/b][br][/*][*][b]Encontrar el Cateto Adyacente (Ca):[/b][br][/*][*][b][math]Ca=\sqrt{\left(\sqrt{346}\right)^2-11^2}=\sqrt{346-121}=\sqrt{225}=15[/math][br][/b][/*][*][b][b]Funciones restantes para A:[/b][br][list][*]cos(A) = [math]\frac{15}{\sqrt{346}}[/math][br][/*][*]tan(A) = [math]\frac{11}{15}[/math][br][/*][*]csc(A) =[math]\frac{\sqrt{346}}{11}[/math][br][/*][*]sec(A) = [math]\frac{\sqrt{346}}{15}[/math][br][/*][*]cot(A) = [math]\frac{15}{11}[/math][/*][/list][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAATkAAABbCAYAAAAIqvIUAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AACxASURBVHhe7Z33c1RHuobvv3Zrq25tbd21d69tMCabnIPICCSCyEGInDOIKBA5CREEQiIHIaJB5Aw2tnft3e37Pe+ZHg3jEZLAIyS5f3hrZs6c0KdP99tfPv917/tHLiAgIL24/8PjCG+fNGo80GesrYZU99LUEEguICDNgCwgj6aE5kJwIJBcQEC68CaG700qst9Vbx64u6/uuztNBg9c1WvDm4e/vbcmhEByAQFpAsT23Yt77uqDG6786llXdKrY7TmyT9h7FOxvVNhjbdpdvMftP37QHTt/0l24fdndfPqdiC7V/TUVBJILCEgDvIpa+fCmKy4/5lbkr3ITpk5ww0cNdyNGj3CjxmQ2OozMGuGGjRzqxk4Y4xatWuIOnChyl+9edXeN5Jqy+hpILiAgDYDgHv74zJ27edGt2bLOZeVku4whGcKQ4YNFJkMbGWjXwMEDXeaYkW7+8gWS6DzJcT+p7rMpIJBcQMDvDKSehz8+FcmduFTmchfMciNMSspbMNtt2rnFFezbLmzdu61xYc82t3nXVrf9QKFU63M3LrgbT27LJhckuYCAgDg8yT14+9QdPVvipuZNc+MmjXM7Du12t57dFWlg2P/u5b1Gh9svos87r+7JSRIcDwEBTRiQUW1IdVxt4LhIvXvsjp876WYvnuNmzs11h0qLFYv29J8v3aOfn7uHPz1zjzx+Bs9jqN7OPu9D9bFJiP2X6phk+H2jY+369v3Bj80njCSQXMAfEkzixzahn/zjhXscx/MYXsS2xya8EVN9JrwnubuvH7oTF0+5ZeuWu8Wrlkqq439/zgcm7dGGp7+8dM9+fRXH019euSf/fCHCiSTC6PqJYBvnYb9ntn907OsI/viEtqfEW5M4f3qqe+WaHMcn98912Sf53poiAskFBMRQ9f1Dg/9OXNuHqWmeRFBJSy+Xu3UF693aLevte5nCSrykJKIzcAzGfR+fxnd/nppIKn7sD3ZNaydq5d1XEfjOdR7E9kt1fCIS25y8vTkgkFzAHwpMXsiL0I7yynPu+PmT7ti5E+/CJK4jp4+bqnnCnbl+XvtCPnWd/H4/bFtlFWdcwb5tcjScuX7OSOexSA4pDQKquHfNFZcfdQX7t7uNOzYLO4t2qx14NjmHzgehxc7vievao1siUbyghQd2uC27C1zB3u1uz5G97sSFUlf54Hp8f3+sB8dDpldtn1NXyhXmctjacexciTt97Zyd+6b+Z7/kY5saAskF/GHAhEUNg7BOXiwzCWuDm798oamSi93StcvcsrXLhSVrlroFyxe5FetXup2Hd2vS33p+V2SRSBginxji14n9hkgJpIXkdhfvdXuP7XcXv7si9ZA2fPfyvjt/65IR2i43d+k8N2biGDcyO9NlGiZOm+gWrlzsdhzaZdc+L2eFvx6ftB9yLDp1xK3auNpNnz1Djo3MsaPcqHGjXc7UHLunJW7f8QNxovRSqW+v+sG2nzTpcv32fJe3IM9NnzPDzV402+UXbrTt5Qpkbg5qayC5gD8MmKxIUUxesg4mTp+k+LDxk8e7aXnT3Yw5Mw0z7Ps0N2nGJJvwc9yWPdtM4jvzDslxHj4hrEj1TCAC++T7HSMxiKjEJEWyCZCSKu5fl53vnqnFSGqLVy9x46eMF6bkTnEz5+W63Lm5du3JbrSRFZ9IdmeMZG/Hro96inS5efdWN8uIaYIR4vjJObqXSTMnG1mOdYNHDHZD7L6mzZ4ekyAvVEuEwKRJbIFsO1x+xM1ZPMcNGpbhevXt6foO6OOmzpomgrz57I7uL35vTRSB5AL+EPATnMkNYWzdU+CGZQ5z/Qf1F7EtW7dCWQkr8lfKUYA0t64g3x08edhdulsRkYSRgyc5JCPUueQQC/5jn5tP77jyq2fc/pKDbpdJcqjFqJeQRuXDG265Xa9r9y6uS/fORjJzbb9DpjaedmUGVM6cKTluwKABypLYZqosUp+kKmtD8eljIuDsnCxJcas2rnGFB3e5AyeLRGr8N2TEENe7fx+XYyRI6Aoqd7wfYiRH+09cihwjw0cPd117dHUdO7V3o8aMcttN/b1hkihqte87f49NDYHkAv4Q8BOVSYsamb99o0kvg2xyj9D3I2dK3LGz3h53zIjkqCu5UBrP35R9CpIzouE7hIX6yf9XTUKDBLkOBMc+kAoBtUhcqJ2orRCfVOVLZSKvL774u+veq5sCcbkGJPbIpMOzNy64VZvWuBFZI12/jH4i4aKyYjt/pGaeqjjtNuzY5FZsWCkyOn7hpLWlwl1/fNtdvFMh6WyBqeF9TCoDi42wkf68NCcp1M6DowXpkvStOUvmuYFDBrpvO3Vww0cNk33vxpPvRIaB5AICmgD8RCUu7PqT25LSkHZQ93AyQADYqMB3L6r0G0haMzLgHBAU5HXaCOOwkWCBkRNkc+DEISOLa9UEYte4XHVVUtVSk5K27S9Uehfnvf74lqS2UWNHua9btXCZYzIVZkLsnEI57PO27XfkzHGXt3CO69G7h9KtIDPagiSIGomtDUKjPajS8qrG7pO2QtTjJo9zPfv0dDPmznRH7Xzct2+j+sVUX8iOc2w/uNP2H2/X664c1kByAQFNDH6iQkBIYeSTDhqaIVsWEhteT8Iu7mviP4mCYn9+JhLgGIih4h5SzyG3ftsGt2j1Ejdmwhg32Aho3tJ5kq64DqEhHAeprdywSna2LaYaX6mqNLUWCfCm23v8gJwErVp/LYcDNrNX//lBBEesGmRVZudbuGKRSXrdpbaiwnK8SEdqM/cS2QT5JLuCa0OUr9wPkjBnzc9z/Qb2d1NnTVW78aQmkhzfia9D3Uaam5w7xfXq19NlZo8MJJdu+E5tyh0b0LjgxxOkcN1IDgJCahk4ZICRVr7UVGxdh0oPu0OmZmJDO3frkuxSqJ8ch3qKfQxPLOpdhpFk67bfyJ61+8g+d82kNK715B/PZY/LWzjbZY/PlrQHsUIuSF2Q6vQ5M13nbp2V08qxV+/fsHbddjdM5YT0Cg/tdLlGkMNMdYSkDp08bOd+qHYkzo93EcXgPf/1tTt346JyZTOGDhLRcl/YAtkvkeSe/PJSEuveYwfcxJmT5HwIJJdm+A5ltUruWP1uwp0d8OngxxWSzk2bvDgY2nVs575q+aWIBk/lTFPrCMXAszkld6okNoVSGAkg3V0zta7kwknZ2ggJyVs0x/Xu19uIMsMtX79SRnxUzScmkWF3y5k6QXautQXrZY+DgFARr9y75vILN7nhWSNd/8H95TwgMR5pCnBdwjnGWltmGVEWmip54dZlu4+Hkiz9vXgk3iP/k0FRdvWsvKQ4VghRoT23TM29TwHP2DF8khlBm/cc3e8mzggk1zCIea1w899+XiU7COI04jkrEGjKHd7oYJPOD+KakPK4JgZ/L0xaJjvVQAYMHuA6du7ghmUOdZNnTpHqSq03Jnq3nl1FduuMcM5cOy97msblyyp5VPmN3Yw4O+LbcqZMcJt2bZEhH1UXSRAbFySXv32DiIRrE0JS9fqhO1x21M2Ym2vqYS+7Xi+RKzXcFFYyNcf1HdjHDRk5RGRMwU3azDyo6XmwHYLDOYEDYufhPS5rXJakzZUbV7uLdyui4wPJfVrwEBg8iNWI22cNGEXvvr4fpa4Y9Jni2IAPgx/AAr89Erb7/ZKPbYrAbiXD/unjprKuFrFs3LnZ7S7eJ7URJ8GCFYvcoOGDpM5CVNv275D3Uurgz1G+KGR189ldqbbEs/Ub2E82sDJTU1mYIUDi1LDb4TRAGvQkRzuOnTsplbffwL4K3Rg8YoikR46BNHtgizMSxi5Hkr8yEF5FGQjJz4LfLP7knEJMSIOoyjhWxk/JkeqL2q2X1SQcz2cguQYEncjguHKv0gbIMbfRxHk6mtghHjC1rUqvlMsugl0DogtS3ceD/vM2GkrrxIFX0RYU/pPxPaYmJR/f5GBExThD4jp7/YIM9BAAyfRVsfcxEMKxfP0KI4nBCsGggkixkSLHM+l9n0AQFQ+uu0UrF8uLOXrsaKVkEa5x6NRhSWXzl82XPc17RrnG5buVbuve7fLsIkWSoYBKidRG6MiCFQuV9YAHNmfKeGU1YMdDs+EZJD4HJDP/fDh36aVyN2/pAjlEaA8OFuYN9wzBJx7PZyC5BgIdyMChs8srz8omkTU+SzYNVlc8VbuK9+iBMYhIdcGNLtHbEL0sJKC+8GYBCiNeqbrmzt+67M7fvKTAU0AQbOWjW3ouUeJ3JE1Lok5xvqYC2u+T2fkNQaBiYq/DuwkhlFw4ZQS1QOQ1aNhgSXPcP5KYJzkM/OwLIYzMGqlqv8Sn7TDJafeRvXJobLDFGnsY4/TRjwQC31SAMc4AVEkIjvAN4ujIbIB4se2RkYHXFg8wYSbE0qGGxl8bCPEw/u2T4py046zNE9RwyC3D1OR5S+eLHCFx7pPjEvuBYwPJNRCiB/VUnc3DJgK7Z+8eSjHZtGurpDcix7F/5M6f5VZvXquyNXjJGHgiuhTnDagBsf5GhSo1SXnzri2mti02aWK+Jgb9zASfbxIFcV5UjD1+vlQeQI5p6iQHosDeBMIAhGVYv7CN3FIyBVBDyUxYX5BvRPJAJMe+7AMp0hc4I5asWRK9K2Fspvpu+8EdynQ4WFosVffh20jaOl15TuMX4iL1iv5lMYEwnxrh4LRA4mMRJw6vb/8+7tsu35pUuNRdrqrUs1ObaWvsnEhwEBxBzWRKjBg93NTVPMXjSRiIkVsyUfE7kFwDgQ70kw4JYt3WfBEcnquNOzbZ9iojtJuajNkTxigSnLQbER2r2w/vrlABNUMD1gY9k5VBzMTALtSi5VeudZtvXIdv22tSdezc0bXr2FYeSMIQFq5cokoVRPcjATblgU+7IQpCQ6pJrno7Y5Exte/YATkOuvXoaiS34R2SA9F+jyUJE6JBqAcOg+ycbGkjFMlE67jx5I57/FMkAZJVMXvxXCOSTDdt9gy30zQUjhfJ/RIFBCNNcp2DJ4rcwEEDXNv2bdzcJfPceVOtZaaJkTMkhxMEEsXuhzeWmDpycA+XHVHgse4p1s5U/RBIrgEgkVurapQug3sdyQGbAiktm3ZutpXtqXv1n++lyiJxkI6DoRabB9uwo0RIfY0GQ2ww+KDS9w2Od/6zfb2XM3m/VNCx+jTQf/W4dx0bm8jnTD0lVOGzz/7X/fnP/+O69+wmj97QzKH6xPCNukZAaob1ORIeXkPZd2LkkOoajRm0m4nL5FZxSAXSRvfi/4M8ICacEIy1AYP7K6AXu10iyXmwjWBf8l9ZnHFYTJs1TZLgpTsVOg7y4vxFRnyQIWEr85bNl5cVzyn/80zYB2nu+b9e2yJ+3A2267dp29rNWTRHcXs43mgj6jVSJEIB4Sc4Pyg2QKl1Yt5QxSmgmRjUTFsT+4LfgeTSCHUcE5RPe7DvIznCR14ayfFQ8V5RTrpbr25KsCaG6OrDG1plP9XD8Nf1sX0QUOJ2kViq/fkvaXvyvon/vQO/3ZNcbHvycclgEvFJ+R6M6Xj/WrT4MprIu7cqDxIJmTSgQ2XFyruMAlc7ifSoe8ak8BOyLtdsTGAMQdJoDbLL2ZhLVL+5n2sPb0lqXbhykcYYtuF9JQft/ygEJfGe+U41XZL+ITXCNtq2a+16G1mQhH/h9hXtI5KzPsPrOmv+LC0iOB4Y66RoEYfHPGBfJDXIjFi8QUMy3LedTV1duVj78b8cGEacRB9AcFyzj6m1k43oyGwg8Bg7NdIo9wbuvonuM/leE0luwvSJtqj1CGldHws9RHuYcsX/bKupgdXmoYEHgNcrIrlBUqMgOR446Sesbqy8xAANGzVcdjtijQ6URA/WT7xU100XuB/apPLZ2FPsvqjIKknL2sJ/Pi1IEqu/d1v9GayJg4f/UpGHjrF9mSiA71xD/9nnIzsmvlrHjqkJnIt+xsNH5QpsQ1TCyFs0W6E7b9xP7vm/30h9or/Zf+u+7dqnY6cObu3W9e7W0zv1Jjn2+xjURP51hW8vdi2qdWAzI9SCWnGYPOgTiB9vK/1C3ByOARxg67bly+Pqn4PaEzsv33n2kE55xVnVcetkqn4bU/3JOMCRI/MAY9zagDSGMwJJjtCRMRPGqt4cfU95Jj8HDp86Ikmvvy30Q41oN++KSIc20E6KZRKAPHTkMCPBjnrVIR5htkOGtLfc7o10M2rGkW9bXQizuu2e5LAfjpsyXvbHYUbAm3ZsDiT3ofCdRWcjpuNtQnq7FHsw1NnClY7YL8dDjOSwVwAmM8GRS9Yul72k74C+MvTilarvxPtY+IfPwGSgXLV74T68dxKQRI0di3v1UgOSBPaSd/a1ycAEq7hXaYPrthLF2Vf3Yoj6664mg46zfZkwRMJfunNFeYkKGLX9UrUVcC76iHOh5mP7ZNXOGDpQFS2ohPHavZWaQx4lJMekxqPdt39vBcgS2Er0Pv1c1772/SRJpR5IvEZdrvM+MFm5Fyb9krXLXI5JLRA7khB2Mjz4JMpDfsSqdbHJDglRaw2SIH7Ttyf53PQp7aNfeAs9ntZupvqj3iu+zo5hH8A44Xx4V9t3aOc6d+3k5i6ZK/sb45r40AMlRfLSZmaPciNNdVxoxEmsHA4GpDPGCnXmBg8fYlL4VyI5VGDIGBUb7YbiAFv2Fmi/9fbMIDHukZhT5enGnsc76urMya53v15yoARJ7gNAJ/kBy2Q9VXFGQYqrN61xS42wUA0YUNgUho4Y4tq0/cZE8N4m1RXESY5BimQUBWEesVU2W0nOSCOoWP5hNMQD4RqPYxIVdpc9plosM3KmNhgeykV2PxiL+Y43jVQgVmjyG5lMBKAykPlf8VTLF2j/1RtXS+XgnJCcJsbzKsVeQTZ4njFcs8oTTwXBE2qwcuMqd9jUSwhS8VA1tJk+hGTJ1STQlLI6WTlZbrMNaiayJzmA1Ih3DsmDwc/zQKWlPQ9jE77Wvjapgf247oeCa0klt/6gTz4kGNyfC4LgfqYakeVMy1GBTPqQisBU44V8KDw5wshlpqmVePVZPJCWa7pftvEf6ijPibg5gnBJ3br64EacsD3RcT5Co5AWsX9StJPgXTyoSGfEuaHKTpg2yS2z36i4qNAcW/X6kcYP+2LOadehrcwIVPaFvP2YYiwxFjHtQLYU/zxrbaMPpRpbm2kX9kTGA9egJBOqOW2hpDrxqGhZ2re259yI0XAkZ6sHn0hu1O4i6HHijIkS20lwJvCSPLsefXq4du3bur//7XN5V1mROA6S00CKDSZiuhiQ37RpZQ+7r61eOySOMwlqGoy/F/xDZ+IhpUE+U2wl7WNSJUZn1Bzc+EiaDERUHmL8iJfCcM/A5b6RVDFsE/RJNVfuf0xOtqmE6xQEzeDjOqhUGwo3unGTxsv20rNvT5cxLEPJ2ximISD6kLgsSv4wmVPdP9uQhLFHUfmVarRE9k+2FRyVCbsSnj0fNMqzgpyJ5O9tBJc5NlOSCpIgE059kOI6ieAeCPWh9BChQMLtuuKyJFXULxLX9R7QDyQ5P3aQkJGcuY+l65aJ5IhVI60qZ+pEW2Sni0B2Fu1RojwTnXvkfv05UoH/IQQkdPqWeDWIgwWB8cr/HuyPlMR4oN4chETwLxV+ITdsoBAuAcOMA7Uhdg3siAgIEDWSKGWUKJKJQ46IAzI4IFmEBhZBFtB1W9e7g6aiV1Rds0XZzhNzttAuJDVKSaFFEHLCYoc5iDHHc+ae/D3qWX+k2eBTIO0k5ycCE4eHhR0k1yYNE5TcQFQDPQx7ODxsfmNnwKPEhJYkZ+eB5Py58D4xSFZsWCW1gMKDC1ctciUXSyV6MxiiB/L7Ex3n9SRy5W6l220DgonCakqi9qTpk7SaLrUBt8CkMxK/WVFR83zyNWk72FrYl9WX9KJIkp2rgcog8/XHsDWiQtFX3CseNDyi9BnVMLgWEgH9xoIAMRF0qvtParfabiTHc+DlKqhVkDCG8H22ckNESAxcG9tO4YGdWki4JmoTUiTR81EYA3mS7/ZNIvzER5I5aJLpmi1rrb1LdX9LjET0WQuYrAuWLVSYy0mTXiBhzv0hJAdo0+OY7fKa9dPx8yfkWKFKCPXlNphqh6qHyQQ7XaSyv5G0Q795aVDfE6Ftz91jU/2wd7HQQBosutF4iR1vgFSQkJGUIRtshISaoB5yn4Dnfbj8mFRdSL3aVBNJVZgseD5UTcFBFFVPKVaQcRw21hhvLFJIfpfx8r68L+3Dq+5qs90b7YD80TRwlNAm+pp+it+77RufVyn6tjEj7SQXrRgEV96TZ5S8wF4moaH6IEbjQmd1ZzKjopXa6rbK1Lt+Gf3fcTy8Q3I2SDjftgM7FDOH5w8SYOKykno7QrpIjuvTpiIbTNONXJDAIAFVorhQqsGChMdgR2pgkBG3tMvIi4oT2HooMc0gvGVEhi2HY5BYmBzYKCEiCAsvHyoH6UVDM4eIJLFdcm4G+xUjJs5fZOfHpiPJgbjBpHv3fceARQXlPEieeO6QYpCstx0oFFFCuhAu8V69+/ZS1D3PjQklzx3nsueaeP5kMCGYSAS6ouJCwuMmjZU3F4w1lbA2jB6XpXgyikcSh4aZQ881xfVqA1IJExeJMLIDV6qvseXy1i5slHwivflnUGkEzb4QNTbP2mH72XMhnMSD9zwwFpL303n1/Co1RigCELWDNpyXpnLpzlWdj3b4NvDcvVRMOyElPjnHOVPFk8F2EZeNrdRticB5aQsOKcD9+301nu36zC3GJXXtUvVxY0XaSS7yLj4VgbFaEcwLwU0wFYEXfDDhWC1e/NtWTJsUSGjbTYIgGtyHkPjVzE9USIZtB23g8/KO9t+2k5TD6k9hQyS9uHidok0fA85JZDpSVr4RBcGfxJJh3yIVSPFJpvJp9f31ZWTzsBUUYtphUkJ2zhjXrkM764dsZXfgzXzl3kpiIBQhUZVgsBN7BYFC4uQwMgnw1nINgOGYa1L1FbKsKQNEfffWSM7aQx+jPnfu2tl99tlfFfg7aOgg2aHwWmMmaNu+rfu6VUsZxonBQp1lwNPvItBa+tZLckgzSBqoZWsL1kkV59prTIWqDas3rZW0DvHSV0jpqa71PniPNuMMFQyJByP8jqJdWnSwjZFCheGdT35H/++WVEfKVd2wQwG5HIP5gjRE3sTFWGa7/o9jp/YrNCkStZi+1fUF2rBXbeA8pIjxukF/LGYZpE/Oz3G1gfNwn5wLG7jaovNVt5nvnFPtju3LbyR5/pczw74jFUKoCBh+LqZjjv3eSDvJeXEeWxRvIsJehVGW4EpWI7/io0YgHbF6KIRkxJD3khy2AfLyMMITpd/a1NtZC2ZrFYIs0kVyXBdigShQFYlGHzB4oGKafAI19wRJIcHyneBSVm4StXkrFIRMHOBaU5FKTAoj3omVksFDu+kziAwpTtJUTOqVpGYT3Z9XZFjH+1TfMeHtOFZmXtrSqcu37vPPPxPJ4aVG5R6AXbR3dxExRIcEicrN5EMawMamc9bRNiOvsK3+SAGRRBJJBnUGEoX1HQTOtUWyKa5TE3xfIfWSYgVxYpgnPRBgZE8G9xsh2qc+4Jjq4/NS7uMR329h3m/bYNtqOse7x0Wf74Xf/z33U71PNfx/ZFDkzpul8CG0BiRijacYUvV7Y0JaSY4OQHUkgRhvTWZWpqN2FqoQdg8Gf2QfwCD7ROEPDGokvkEJwcDJJId0hLqEVEMoCe7+Vq1bKWYOiTGtJGfg+pAWD/7Lr75QAveJi6WSIL0kpmsb+M4kY7JjRMc2h2RGm7k/PHmQJSsneY23TSXjGK5D+R+KKnYyaQoPNJOe/5i4fh/1SUxa8c6dVFBcnRETREGqEdfElondk5xVDNlIptimkLRQvVExWWywn2IzRCLzdqa69C3PTfg+9ml9wPXri+9e3TNyr37nQqpr1QRPcpArhnXuC0fKlFnTFHYxbfY03Wc1+G3Ia0D4aya3I9W+iYgfVwtSHVsPYPOlr9AkMMegxdR1DDQGNAjJUX8eMXigSTxMrCVrlmmiSSph0saA9wy7QF1JDgmIEBS8jW3atZGRXCSXRnUVYIStMKkEB8Dfv/ibpDLeQu7jylJdV/dnE7T0cplbnr9CxAHREXs23FREqrgiXZEvedb6BpsRlSdQ7Tt06iCvGbYYzq17SyK02u6VY/hEUsYWOH3OdEnVBKxSRZb4K7JGIJOIXB7Ijkg+JLmseG956fD5mxfjbUi+RiLYB6AmYveiftuhk8W6NsDbVxsI38BTiTf+gkn9jBfGQqrr1QTaCQitOXGxTGooDoa1W/MlmUDqAe8Hix59hYqMUwrzi3++qfq8sSH9JGeEBMkhqUQFArvIK4iNijI/fhCCupKc9zJxDtQPqqu2addaNfEjSa4BSM7IghX3b//3ucJA6kJygIBbPJSo60hTSJ9TbKWE6FAXIZW1W/IlNeH1Q11EHSdEgCBgzq17MyRfoyZwDNIMwaRIizgdeJMToS2U5kaVfO1+jFXCeOle/Pt7/cZojdrCM8MbjM2TYFp/vvf1L21E7caAvfPQbsWizTS1B8cLiF7k/H4gPWAPZFHE6YHkX5stMBm0EUDcSN/cE7Y5iB07HyaAgPeDfsJpeP72Jdl+ycVN1deNFQ1CcqhwGHTx0iG9UCAQ3Z6gXiYLgAi9upqcu5qK5NgGWRCO0NWkIexH2DKwG6Wb5Ly6SowSkhzxcNgHuS7hG/Frx9rr1UkP1De8fKyKJedLRQK0fYCdB9V0pKn1BJIiOeG57dAxIjnujfNF9r7qOLVEpGov27HxQXLY+VDXIFXi5Fh8kHJwYkDQtO/JP166l//hjU9X3DwjJ2yCA42AibkibkvnqwfJ7Ti4SwHLeKKxSYLpdYAvSU7cGiSHJFcfcv8NTF2Pt7mONsXfH1zfnlU90CgKUMT6y5sefvN/I0baHQ+yudlgp0w0HsXuvbvb6jzJ1Ne9mgBxI7oBL6GX5Kh60dckP9JSkkkOkmFl5iW6rPiktXTp1llEgISVbnU1cjzcdqTjtPy6hSQwYpNY4bhm/Nqx69N+PzjYjv2RKH7+Q/SnThskSZAwRv+OnTqalLdI0t7wUSPkIMBYrncN4NmyYxNJLn6NBPi2+n14BqjLmA0oqsgCArEWmUqKhIQzBwcJkwqipg+RdiByArRRr1FZCLGIHBi1q6v0A+oqx/Ae0LgqKnU1IaarBpCTjC2XbBZCUXjm9ZXkPHx7tKjaoguhB9QPfsyl6t/GjLSTnDrIJhgiL7FWVLtA9SHwlxw+JguvRcNZQPgDKigxWxjEQSqSg2SY7LjECazt8G0HBayyL3FcTNh0khxtxfi6csNKhVhgE0RtJuQDooYgcEJAxrS98lGU00qQJRIgzgWCRjkPEhPqIW0mh5L7oK4bsWHYpOYsniePJ3FjvCiF2CekXvpDkqP1LX2BygnxYgJIzF/1fcZ+SEJE4kNwFDdgUUAa5hhJZkgL1l5+a7ExiZpqGSTnI1XtLymSF7guJOeRSLjV2+oGX/GZc0DQqc7V1MCzYGz6xZ0Fz0vmINr2LtI5lv8ISDvJ6UHZysnkIP4HWxBVGkjjIkiUBHbKM996XqUIbyY2XstOXTrJEwtxUSaGCa3BYYAQOGbN5rUKVqVyAuEjxeVH4x7bdA0KzktbmHDEQZGSRQ0u3tZEUU+VZud+jMh49R2J9KT37D9xSKoiEhsqH4Z0wiI4J6REhD1GdoKEOd/StctlB9l77KDUSuyZWTnZrmBfoQiI/EdIi1xYvMxE72NvI7QlkQz8pOIZQIL0GTa2Tl06aqHBucDCQt/j/cVmRXYBsVmolTiKIFlInDZD4pyzPv3rr58oFaA+14b4vjaG0vU8GxI8Fw95jV9W6RnGYb9ZsPyb/JHy6W8Wf39cqvMGvB9pJzlNCBvkCqGwCY+3hlr4qGVEs2N4xwBPWhd2G4z5GPIJzUAF3bB9Y5zktKrFVkAcDOTste/Yzgign1RcJj8DIZ2TgvN6xweSG/mivAWdiqzYuWg/RnakVtK6eCMTNkheZgxBbSjcrJANPMGEZSC1rsxf5ebZfuQtZhrJ8eIUvKwQGOo30lfkjY1eRpw3P099hiRGYj8qO2E5BHFGkla1lEU7tThYv/EfqVmt27Zyf/nLn7WIkDPJ+0ZJ7WJxmTkvMvhTRjtr3GgFL/NseLsUk45z6ZnWs3/9MR+KVOdsStA9mGTKwkZ8KHmrLH4szDiZUOePnD2uxYpy6oRqYLdGA2J/1P74eZLOHfB+pJ3kPJgcrF7YebDtUM4Fr+FXLb5037RuJe8otjUkFtRU3kxOAjvkha0LFdCv6gyUwzY4eF0c5blHj89yR8+U6DoNMSn8RIdQUR8pZYPa3N7uhyyBli2/ci1btdB37GkQE8ZzXoaCp7CfSUYt7b827VtLqupmaNs2un+IDicNL5bBjsf1Si9H5YEI+WjXvo2KXGIL/PqblrG+ayNHDXmPEJknYY7lU+01FRPCpCIKUtyf/vTf7q//+xdrawvX6puvdR7Ad0JWovCSPEXmK1H9WVVkCE9z3zZX6BlY/2F/JSQGU8DqzWuU0bFq02p959mQ48tvMl1Ir2O/o+dKFMzsn2Wq8wfUjIYjuZgERvzVGVOPUEPJfFCUvSFjSPRWIqQSjOwYvClXxGqHuE6NfIgOVRSVkKBOvJq9lA2wQFKit8Wluv7vDQacd3DQnnUFG1zOtAkiB9RNQIwb0iplkTD48zIYSIOYONpOoC+hMtjhBg3LiNvdkEiJW6PPIHZIHTUXqW+c7cNCgBTGNfiOBDl74RwZ6tkXVS+R5PT9h0dSiSnjBHkhGVLBZPCwwSJIwHs6h44cpjAWHB+k3XnSpLhp5OlL3R8B70ec5Kw/caQQA8nzJGaSMlnEovEb6RzzxPDRI1z2+Gz7f6UKT2ACCST3YWgwkvOTDSDRIVUgikNiSGWI7Ijn1LzCLsQnIRaobBwPQUJwqEw7D++WGkUMGWWCIJB3EvOTrp0uMOAAqjhBtpTA4V6wrVFnH0Ihs4N3xuIQwU7HIMeGRulx7HTsy354iqksQb9wPlRO319cC5sNjgvi8YrKiqNrGAlR4YOCivQZNjflrtbQB/LkmkRAnBgqEW2jrtzRs3yeUOrdyUvlUsNxlGDf4zj6Pkyuj4N/JowB1E8WLSIOGAN4nKk6Qu4q1X2zTTMh9hP7LHUHiULwY6GmZxtQMxqM5Dx4SEwaPKR4F/mMJAWT1H55WZ3cbmAbkwvJhO8EC+ORxXbXP6O/JD/lwN7BIH5f5011zXSC+6Ftvt1IXj6miLaTk8s9UiIbDyceV0mk9sk+ED6khmFeXtkU0mh0nqh/pLbbebgG6jLX55jnv1pf2jlrmwRIhzqXnSd6BV70Gjz/PF7864176fD4vtG2T9GnzRk8a3KcWfSICUVqjyrK3BTxocWg2VDnjywX/+KgROk8oH5ocJIDPCyprzaxBZtIQuL3GPy+SCgq2b0tXx5avJpkTrBN+7z9dKscUldimyElkXPSNh8U7LclSmvabvfPvSbfR/x/jov1UeL51JexbYnHpQLnis7jvZixcwqJ3s/YNZLaEvA7gBAZPKYG/8yQ8CmCQGVeytHjSELaRvLj/7o824DU+CQk58EESkb8f/vuJxnhEqeNzEhzmpw7xY2fmqP3QJTYKke8GlJRYxgEyffiSew3+5oUVr1Pwv6p9k1C4r51PSYZqc7hkWr/gN8X9DPjlcWEGEnGSdGpI0qhQzshPRFzBCYKNIBAcB+HT0pytcGTHIUhsT8RlkGIxoqNq9yJS6cUSxQmZ0BTBGPbj29spLnKEe4qBxBhU8Qu3omZMcL4/jg0fpL7/rEMtRQ0JLGcuvc4KHzQb1jlApoaIC3ZVe07rwokZIQXeH/+2V/lNV+zeZ0rvXJaTjdseGSh6FjILhBevdGoSU4r2BvsFdcVPIlhFg/jh0TdBwQ0FniSI7uhqCxSU4kJJXOHIhZoK4SO+BfKqEglxzLew5ivNxo1yQE8iEhtGGZ56xPbggQX0GQR87xji2VcU2yVjBYyYshGIYZx1NjRev8GJe837dqs6jOk/ukFPoHk6o0mQXJAydqGIMEFNGnESI4xTSgJYSS8tIZYOEKhyN0m1ZGSZGTL8NpOSusTasIxYXGvPxo9yQFIjYcrG10guIBmAAiL+DcqvkQ5wbZ42/gmfo4AYSo2kwVDPUHq/5HbijSHRzbMgfqhSZBcQEBzQrI24n9Taol3t6LGkrjPS2S69+wuj+v2A4VyQmCqCSRXPwSSCwj4RPDk5uMpIbmnv76y/x6rkAV5rD1691CpKzJ7kPw8yQWiqzsCyQUEfApAapBbQjA41aJJ3SN6gFdVqvR8v94qXEoFG0jOV5gJJFd3BJILCGgIxHKNo7zVm8pVpUYcYSSooYqH+z5yLFCkgbeKTZo5RTa5nKk5bt/xg6qrGGxy9UcguYCABgD5xXxSf3B38R5XsG+7UrnIbCA8CsKjkg7VZHi7P9V1SNTnjWrka1POi+gC5TwHkqsXAskFBKQbJsV5CYyyWFR1hsR4xWPhoV0qz0WZraNnj7ttBwpd7vxcU1N7KVaOqswUocALG4qWfhgCyQUEpBtGcl4C4z0cVHDOW5hnZJbnZi+eq/L4lMynzNKsBbNMTZ2sAqpUIkHaky0OkgxFSz8IgeQCAhoAXgJDIrt4t0IFM6kGTCXs7Alj3AhVAs6y3zNUCp2iqxRX5YVNOv5tCAL+UASSCwhoQCCR4SGFvI5fKNXLjVZvWqOXpK/auNpt21+oAhT8H+1LgdQgwX0MAskFBDQgkOh8ahaeVUrMk+XAi2rwukJuvoQYzgq/b8CHI5BcQMAnAOSlMvS/vHLP//Va5eb55LcKUKSoEB3wYQgkFxDwCQCBealO+DEqfc93/1+q4wLqj0ByAQEBzRqB5AICApo1AskFBAQ0awSSCwgIaNYIJBcQENCsEUguICCgWSOQXEBAQLNGILmAgIBmjUByAQEBzRqB5AICApo1AskFBAQ0awSSCwgIaNYIJBcQENCsEUguICCgWSOQXEBAQLNGILmAgIBmjUByAQEBzRqB5AICApo1AskFBAQ0awSSCwgIaNYIJBcQENCsEUguICCgWSOQXEBAQDPGI/f/fORXtoLWFPEAAAAASUVORK5CYII=[/img][br][/b][/*][*][b][/b][/*][*][b][b]Identificación de lados:[/b] La cosecante es =La cosecante es [math]\frac{H}{Co}[/math] por lo que H=[math]5\sqrt{821}[/math] y Co= 3.[br][/b][/*][*][b][b]Encontrar el Cateto Adyacente (Ca):[/b][br][/b][/*][b][br][/b][math]Ca=\sqrt{\left(5\sqrt{821}\right)^2-3^2}=\sqrt{25\cdot821-9}=\sqrt{20516}=143.23[/math][br][b]Funciones restantes para B:[/b][br][list][*]sen(B) = [math]\frac{3}{5\sqrt{821}}[/math][br][/*][*]cos(B) = [math]\frac{\sqrt{20516}}{5\sqrt{821}}[/math][br][/*][*]tan(B) = [math]\frac{3}{\sqrt{20516}}[/math][br][/*][*]sec(B) = [math]\frac{5\sqrt{821}}{\sqrt{20516}}[/math][br][/*][*]cot(B) = [math]\frac{\sqrt{20516}}{3}[/math][br][br][img]data:image/png;base64,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[/img][br][/*][/list][*][b]Identificación de lados:[/b] Ca=21, H=[math]\sqrt{1402}[/math][br][/*][*][b]Encontrar el Cateto Opuesto (Co):[/b][br][/*][*][b][math]Co=\sqrt{\left(\sqrt{1402}\right)^2-21^2}=\sqrt{1402-441}=\sqrt{961}=31[/math][br][/b][/*][*][b][b]Funciones restantes para B:[/b][br][list][*]sen(B) = [math]\frac{31}{\sqrt{1402}}[/math][br][/*][*]tan(B) =[math]\frac{31}{21}[/math] [br][/*][*]csc(B) = [math]\frac{\sqrt{1402}}{31}[/math][/*][*]sec(B) = [math]\frac{\sqrt{1402}}{21}[/math][br][/*][*]cot(B) = [math]\frac{21}{31}[/math][/*][/list][br][/b][/*][img]data:image/png;base64,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[/img][br][*][b]Identificación de lados:[/b] Ca = 11, Co = 14.[br][/*][*][b]Encontrar la Hipotenusa (H):[/b][br][/*][*][b][math]H=\sqrt{14^2+11^2}=\sqrt{196+121}=\sqrt{317}=17.80[/math][br][/b][/*][*][b][b]Funciones restantes para A:[/b][br][list][*]sen(A) = [math]\frac{14}{\sqrt{317}}[/math][/*][*]cos(A) = [math]\frac{11}{\sqrt{317}}[/math][br][/*][*]tan(A) = [math]\frac{14}{11}[/math][br][/*][*]csc(A) = [math]\frac{\sqrt{317}}{14}[/math][br][/*][*]sec(A) = [math]\frac{\sqrt{317}}{11}[/math][br][/*][/list][br][/b][/*]