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Supongamos que quieres construir una rampa de acceso para un muelle de carga que está a 4 pies por encima del nivel del suelo. Quieres que sea posible empujar un carro por la rampa, y que el ángulo de elevación no exceda los 20°. ¿Qué tan larga debe ser la rampa?<img src="data:image/png;base64,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" alt="">En este diagrama, tenemos un triángulo rectángulo del cual conocemos la longitud de un lado y la medida de un ángulo agudo. Queremos encontrar la longitud de la <a>hipotenusa</a>. Probablemente sepas que el Teorema de Pitágoras te permite encontrar la longitud de un lado de un triángulo rectángulo, teniendo las longitudes de los otros dos lados. Ahora aprenderás trigonometría, que es la rama de las matemáticas que estudia la relación entre ángulos y lados de triángulos. De hecho, la trigonometría te permitirá encontrar las longitudes desconocidas y las medidas de los ángulos en triángulos rectángulos en una variedad de casos, como el problema anterior.

Explicación

Ejemplo 1Calcular el valor de x de cada figura utilizando las razones trigonométricas vistas:<img src="data:image/png;base64,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" alt="">Conocemos la hipotenusa y el ángulo. Como queremos calcular el lado opuesto, utilizamos el seno:<img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAALYAAABWCAYAAABitGyGAAAgAElEQVR4Ae1dBVhVWRd9OmMH1vhbY3fM2Dr22GOCgIJBSKggiImBiTJ2UhZ2jI6Fythii93dNSp2C+r6v7Uf9/keglICjvd83+Nezjv3nHPP23fffXasrYFa1BX4Civw6k0Ybv37CPcePMW7d++/wgif71Lz+a/Vb9UViNsK/B10EClydcCvfwzBlRuhceskHlephB2PxVMvjX4FPCashCaLOSo0G4Inz15F3/ArfaMS9lda2Nh2u2P/OYzyXgv3UUsxYeYGbN1zBmHh73TdnDh3E6N81mKsz1qMm/EPTp2/hfsPn2H+yj0Y6x+EwK3H8OZtmLR//+EDFq7ei9E+6zB2WiAWr9mPt2HhuHTtHibN3ih1E2dtwMETV3X9KydXbtzHzCXBGDB6GYZOWo3Vm4/g2YvXytdyfPn6LbbsOQMv33Xo57lE5rv/2BWEv9POt6/XX8hayhGa3B3wv0qu6DJwLvoNX4TAzUfx7r1WLHn9Jgzrth3D0Emr0G/kUkyduxmHTl0zGCc+/6iEHZ/VS4BrX7x6g+FTA5Gvek/UauuFPp6L8esfg5Gncg+4jViMB49fyCgk5Jqmo6DJYCKckByxme1EaLK3gyadsRASHwgSDAl7wqwN0OTrBI2mCco18UDow2e4fOM+apmNgiZta2iymmOUd6DBHZDQapp4okDN3nBwD0A1Y09kLmqHrh7zRV5m4+cv38DNczHyVnZFlVbD4TFmOWqbe6FwRRfMXLoDHz58gM/8rShes4+WsCv3gPOQBRjk9RfWbzuO9+8/4N/7T2DTdzZyV3VDmy7ThLAL1OyDUtV7YvKczXgTFm4wr7j8oxJ2XFYtga4Jf/cevgu2ImVOCxSs1QdHz9yQnoO2ncCPhW2hydMRPgu26UYL2nYcP1VyEdm1ehtPTArYCO95W1Codl9ospghTzU3HD1zXdq/ePkG1U08pZ6Ed+feE6mf+/dupCM3LWANcm2lHD19HWUae0CT0QSTZm+SatalLmgjD8+MJcFSt3brMaQqZgfNz52weuMRqTtw/AoyF7OHuZOvEC4rTbpMkwewcsthn4gi3TzmQZPZFBVbDJUHke35UGp+skS6Ip2xde9Z6Tc+f1TCjs/qxfPah49f4HeLMcJxW9lPwdMIWfTN23AUrN1HuHMTq/G6UYL3nUW+33oKAdj2maWrdx+9XMu5c7RD4JajUv/8+WvUsxj9CWH/tS4Emcp2/YSwSeTC/XN3wJ5DF/Hq9Vucu3wH+Wv2hubHFrBw8RPRaHnQAaQt4QBNrvYwd/LBmYt35A1x7spdXL5+X8amCNXcdhI0WduifDPDzSM3knmq9ZSxHAfO1d3DzpDzyFejt7xJ3EcvAx/6+BSVsOOzevG89t97T0RroElvLGLHhw8fO2zcaRw0mdqgptkoXeWW3aeFK2v+1x6Dxq/Q1S9YtQcaIzPhkKs3HZZ6PiR12v75CWEvXrMPGct8StiUdTUZ2iBlYVsRhaq0Ho6KzYcib/WeyFHMHnyQXr0Ow5NnL2HWzRs/FrCG5icL/K9KD9j3D8CFq3d186E8Hx1hhxy7jBwVXeTBmjJns+6ai9fuoWKLYdBka4vuQxYY7C90jWJxohJ2LBYroZveufcY5ZoOFs5M7kX5VCkmjlPldV3L3Eupgj5hk6tRXmVZtGaflrCzmkOfsCmCUEQhgf97/6m0XfHPQWQq2+0Tjj2YWoy0rZG5bFfsO3JJNqZ3Q5+KTE09NDd9etMTMYaye0qKKjktUbyuO4L3nZMxwsLC0cxmonBsEuv12w+lnn/2Hb2EHBVcoMlvjTH+63X1N+48RDWKTlnN4TpsoUrYupX5Bk+o1RA5OKMJmtlOwqMn2o1i2Lt3KN1wIDSZTGVzpdyaPmGTEJUyb8Ue4e6pCtkI8bOeHLsexZxsbVG2iQeu3NTqkkf7rUOaIp2RspANJs3+KGP/6btOHgJN3o6iaVH65vHc5X9BwmO5ePUejp/V7gVevXkrWo00JO6MbdB96EJ5OPmAtrSbAk22dihevz8uRYgoV2+Ggtqd3FV6QJO9LWz0xCnK6YXr9pN75qZWeWj15xGbc5Vjx2a1ErgtZdEJszZCY2SKPFV6YPfBCzLCtr1n8UPhzshQ0hErNhzSjUrCzlvNTWTsTj1nSD05aed+AdCkbIYGHcaCbwEWyulWvWeJLJu6uD2cB8/HGL/1qGPuhQyFbfFDkc6y8VQ633v4IvL+1ksIK2+1nhg2ZTX4wLh6zEfphgOwYNVeacqx0pd0wJEI1dyxMzeQ5VcneetQnKFGhsV5yEIRVX4obAvH/nPQY/gi0cJQVUixhm+HEvX76zaWU+dsBkWs/FXdcPS09sFR5haXo0rYcVm1BLzm0ZOXoBiSrVw32Wh195gnsi1f897ztxiIJyRsqgX56s9cpivau/mjTZepyFy2G+qZeBpqEz4A/wSfQJ6qbqLpoJqwqvEIeIxfod38pW2FSi2HgRtSFoobAct3oUITD2hytING0xSalM2Rs5yTyPOPn76UdotW7xP1YcOO49DLczHqWY5G6mJ2aG43CZev39OtzM4D51GiQX/h5Jo0rUQDojwM3GQad52GLL84ob7FaHl4iv/ujlrNhyJo+wldH/E5SRaEvTzoILiRoJYgNoUcb83mI6AK69lzQyNCbPpJ6rbUPW/Zc1p0zyMmr4bfwm04fvbmJ9MSjk3CztUBf1hPgOe0QHh5B2Lhqr24HiEqRL4oeP85USnOWb4Ld+4/wbVbDzB72U74ztmEibM2gpxav5y6eBvzVuyG77wtoIov5PgVA7GAbwjq1LnmwyevxtjpQVjxzyFQHo9cDh6/At+F2zBr6Q7cuP3A4Gs+0Ou2HhMj0ohJq6S/q7cM2xhcEMt/kpSwKWO6Dl+ElvaTsXrTEVD3GpvCRT5y6jqcPOaL3lThCLHp41tqu33fWeSp7iav7BFT1nxLU0/0ucaYsKnXHDJxJSrX7SdEdD3SExjbmYeHv0d7V3/8ZuKpk9di24fSntzCbfhi1DAdiRNRcDql3bd8pKhA03mKQjayITR2nCoai2/5nr7m3GNM2M9fvEZLu8nQaOrDqJwTTl+8Ha95ec/bLBazXQe0G6Z4dQbg4aPnYpAwd/b5xLchvn0nh+vPXroDGmty/eKEXBVdULSuOxas1G7oksP8ktscYkzYnPjY6f+gdhMP4bSK+icuN0Qf3QrNh6BTrxkGm6O49KV/zey/diBdSQds2nVKv/o/cc43HJkLxTX6l3BPQYOJWqJeAQPCPn/1rgj0i1buEYcVenqxUINz7PQNrN90RPSkismV33GHu2bTEWwIPoHNu0+L/pSLviPknNRd1LNIKVNYuGofjMp1k42fUhfVkYp97uwXr9oLqsDCwt6Jb0FwyDkEbjqCC1c+Wrt4PfWtReu5o8+opUni3B7VPah1SbMCQtjUeS5eG4IKDQegcJ2+MHWYImbV6iYjsSRwv3BVemxR/0nnFaqczl/5V2a8YcdJ5KzkApqFjX5xxvApq2HadZroMGn1oofYwRNXDO7OddgiGP3SDbfvanWuBl8C4idAt8saJp4oUrcfWlhPEFXY9MXbMXNxsDgHpS5sizWbtX4RyvXULtDjjV5n3Jh+rtAgQPfPMb7rxAJGK1iUn2mBsmNX/Dg+16f6XfJZASFsbrhy0H8gezvM+muHzO7oqevQFLQRV0lWvHr1FmZOPkLYlO8UwuZ3gyeuFELOXroLqpmMgMuwhWhhOxEpC1qLaqr3yCUGd0w/AhJs6MPnBvXKP1Qz0Zr106/O4pfM+mlzt8g1BWv2Rsp8neC/aLvS3OBo3Wsm0pZy1Fm7DL7U+2frntPgA+bsMV/cKulaGeXHPUAMG7FVReoNpZ4mwQoIYVNsIHfV5O2Ebh7zdTpJuigq8urr12Gw7j1TCLtYPUPCHusXJISdqoCNcEHeB51icpCTG5mhlf1kg1traj0BJRoMwINHnxL2mYu3xQyryWEBL591uuvo8E6C5sPXddC8aEUNq14zRWtw6sIt3bVf84TiWzvHaWjn7IN23X3VT1KugRN/Az88fPICQth37j9G/fZjxQElRUEbVDMejuFT1uDhE621iYTBTQvNuBRF9Amb8vefPuuE4Ix+cdJx2Ldvw0HncTrB0zqlX/6wmSjEGxVh05chRa72Yk6mX4JSps3bImZYmoRpZIiuCGGnN9b5M0TXLqHqKfIsWL4bC1buUT9JvQYr9ojpn2Z7IWz+yIxq6DtyKbKVdxaOlzK/Naq0HgHKoiwvX739ImHTtLtu23Fpz128EHZ6Y/FhkMqIP+TYdI6JTNh0nrF3nyPyOsdWYuWoRRE3yPTGcBm6yMDLTL9fngth5+skvsSRv9P/f0ngPtRp64Uaxp6i/6YOPMpPsyGw7Ttb1kf/evU8ea+AEDa1GE+fv5JNG8OHugyYixT5rUS8cOivdQZ//SZcSzSZTcV55eI1rUaCHHuM73otxy7nhKBgra3//bsPEhXCTSX9CvQL/XnpaBMaSRQJffQMDfjmyGQKSxd/uSQ8/B1G+61HBkZ9ZDVHzxFLxMGHm7l3EW6bSt98MCxd/ZCzSg8DV0nle/0jPenOX7mL85f//fzn0h15Q+jHH+r3o54nzxUQwh4ycRW4KaNKj4VqMzqYk8Bs+8yWuvCwd+gYIYowJo4GA6WIy2OOdshQwlHHsd+8CdNGX6Q3Rv0OY5WmcuRmM01xB5w8bygHU09L90067JSsPwCbd57EgDHL0aLzJJg7+0o9Y+SGTlwF9zHL8TSSfwjfOnSQ5xtB4fYGAyfCP3wQIxzcEmE0dYjoVkAIm+6JOcs7o7XDFHGA6TZwrniAlWo4UFwp+UP9s/0E8lZyhSZ1SyF4OrpTTUgCp5eYBIimagkLVz/xK9bGsFlA80NzZCpmh5V67pe7Dp5HriquEnUdeWLTFwcjDc3G6YyFQzOC5NDJq5gcsCkiSsQM+aq6iQpOcZFU+mC/FKUY8ZxYhQ8wN99rNhyC34KtGOMfhHsPPq9qTKy5fc/jCGGHhYeL9oORz3yVd3T1FygAxaGcr3i6K9q5+qPLwHlw7Bcgnl3ksPQhtu09S8SXLu4BEuJ07VaohOY79pyBLoPmwb67L3z1glLfvXsnDvTVjEfg+QtDxyda0/wWbYdj39nwmLBCxAX+QEQVGjR+pajodh8y9EhTfkA+bHmru31RvlbaJ8Tx2fNXcP9zmURk8w2Xu2oPnPyCRoaMgvYB/1kbPtHFJ8Sc1D7wcfOY2Itx6MRVMfTQ9TIhys6Qc/i5Ri9MmbtZ5+yeEP3GpA+6YIoIlcVcDFxf8qNhdEi2X53F7+aXpoNjMkS823DzP/uvnRg0YrGEfsW7w2TegXDspJojwV5KNxooIklkeTk2c6I/MLE4aEqnH0ViF+JgcMNNjk3L7ZcIm/OTgIEUf4BvrcQo90KfifVWo2mE8TOCEmPIJB0jSQmbd77jwHlY9vBHvz+X4X4sZVOKUDS9U8VHsBaa1JOiUG/aue9s0fGTsM9FuBtENxdybAbMbttxUvzJlXaR9wxKfUyP0YE/EspgxuJgZGMIV05LTAnYJAYuto9qoxtdPxRJY1Oiah9VXVR90tf+S3GP0c2T/SU5YXMS90Kfiomem9HYFBLCzX8f4WY00SOx6Ss+bfUJm8YrRrow/q9E3X6o1GIoZi3dCWpLlGLXLwA1/hiMms2GwHnwAqmmutVl6EKUrd0HZRoMgG3fWaJm7DVyifTDSPMlgSE6iDClLxqIRkxZLQhP1VsMQ20zLwmqPXzyI1wYbQt5SnWBhircAtYoVKsPfmsxVCzCinaLMGbTF21Hg/ZjUK3lMPG+7DliMQiao5TFgftQoflQlKnTF7XbeoGwbIz2IShOuaYeEnamuB7cDX0ioWi8lzJV3SQah/0QjKdck0EoU7sPmnQar9tD8TsaAekq0dhqPKq2HCbXM+B38+5TErXO35vBwJNnbxSbCnFTfm08SPABCd2mz9iSBWErC/etHnWEncVcNq/EBCnJeL+frUSTQ2LXD8Havv8cMpZ0hCZFM3HY4n2TO+0/chlFiOqUwUTiCvkmKsz/ieGRvR0ylnLExp0fXXLpOkziSFvMDr1HLQXdEYibx0BdEi/jDlm4yfeesxlpittL9M2wSaskPpHBImQmfKgc+s9B6twdBDOExOw0eIG0rdhymM4v6OHj51DwTlIVsUNHt+niF56GyFDZ2yFlrg4SdsYx+ZYYOyNIsE54n3zQWU5fuC33pknXWpznlMBdth88fgXS5LcWsfLwiatYv+2YqJ15LwxH4/0WZST7T5YSGEzPUmKQ0B0kVb5OILSEUlTCVlYiHkd9wk5X0lFAHckB+3pptSUpCtt+4rRF91oar8iJ9QvRlQhlQLQlbvbIhYhnR29GGqjoJ0Ni5Ct94LgVQjhUyyqc99bdx1oUKSMzITylb0a7C4JTTkvhsko9j9zraP5nKUG5iibs4rX7oHsF4RjGz/hH17w/Uad+tsIPBawlOv7u/aeYv2I30pawl/kxkunNG+2blw8IYdoImzbSe62uDyv6HP1kIRiBSmwnIdgIeca2pt28xdLNC+jRSYwSuj/TTkELdKMOY3W+QnyYc1V2levobKe8GVXC1i133E90hJ1Zu3lUfNAZZEtgyJRFOhsQNolSOE+UhO0tBJ+tQnfdRphE+0tTDyFi2hpodaUltEEHokWZoonVBChR5LwL+uaQ69PRTClL14boCHuanp6fnJLgl/QBYtQ4jWczl+zAuOn/gI5ojJgy6+qtdKNVbebpKDBpO0K0b4RTF25r55fVXJzAiBbFQvtD1IQ94xPCfvbyNcydvOWhTlXYVjBH2H90cbA0IhLOjaiwdOXQZDNH75FLVcLW/VIJcBKZsBXuOe/v3ULYFA3IeZRCsSM6wqa7ATl59grd8fS5lkAIOFOjzUgRa4wdp4joQBgxgTDLYIIObtOVruVIyDEC0pSMAWGT+1PO59vgp4ouMHacJvIruWr3oQvg0m+22DCUAbjJJ7ES/4/BxSzkmpUIT5bFHJYufgKDxnrCFCuEPUrPU5ORU5E5NttTBWzazQeafFZioMtQwkEelEN6/vx7D18SV+PfLcfCuvcsNLOegLQlHEUU6jPqL5Ww5RdJoD9fi7AVzkfCrhlB2G26TpOYThJkDcIKZzaVzRbhfZUi4kwWM5RpPEipEoOQyNg5LTF90UcEVzqr0ehGzl+krrvOZVl3YaQTfcJmVBML5Wbi/EUm7APHr4o/PkUrBqAopbP77CgJm9/TQEdLuCnRWvN2lPtr3nkSHj19gZPnboJiF9GtuJegce/azVDkofuHkamoe1VRRFnlBDiSyLj5IpExgEIBaFy4UiuK/FC0MxiPqV+4oRSXXgtDl16FY+eo2F0QT3kNX7uC8ZfOWORqqrn4ocaA/u4E1zl3SRvR9OLVW4E0Y32HHh85OaON6FZMTsm5vnz1BvS3JxgkMV24AUuZzwr9xyzXcVzKv16+67ErYhPKuQwY87eOYyuiCMemZoSE3aGHP5690GYwIEpUmqJ2Us+HjW8ZajX4JiFxajeF2qDwMxduw2HAHOHaHIeen02tx8u1hEkm8itdJeQNUMhW4DrYjtqQ1BGbaz507yOA5VUZm6sTz0LRQziWkRnohcjoHOphR0xdI5oFagycBs/XIf6fvnhHXvsUOagF4Y5fKULYGduIBoOiDDePnlMD8WNOC5Ss00/3w7M9AWlyVuiOH/Nbw3PqGtC8T301N7Al6rmLjKv0e+LcLa02Ios5Uhe1Q4XGHuIspgDCVyLHzdoWPxbpLO0o+hSu3lPUlUciVH70sWcwBdulKGQLv4XbRZuzeddprSXVyAy/tfHUgcQzZlU2hDksZGNaqfkQ/G45Gr/x7ZOrPXJWdInwRfogfvx8o9CCy1jbm3ceoKnVBHlwibVN+I+lgfuRgWrLnBb4+bdeEjpIojcq3UU4NoMMFPxDlbCVXz6ORxLwuOlByF7SAUZluyFLmS6CG02EKlpDuehGJRxQ7Hd3KByOMnG24vYwKtsV2Yt2ls2bMrwQtpGZwPmWrN9f9Lk0+pg7TsX+Y5c/iepnAHUbx6koUrcvKjcbIjpie/cAgweAfXOTSGzsso0GIkNROyGKA8cuK8Pi2Nkb6O4xHzkruSLlz1bIVLoLOvbwN0jnQWMYCcqolCOylHRAfcsxIK51536zkaUE77+rONMx8IQiDt8qBEIq23gQMha0QdVWwyVdB1V0Wco5IXtJR7ToPFnUiSRchiW2cpgi8nr5xoPEPbrrgLk6Sy6JllyZhiZ6h5p29ZZNOeNcjYraIW9FF3GO402phK37aeN+Qj3w/dCnePD4uaTEoNGEMi8NT3yl8sNgCf54LPw+9AHbv5DrGMqklLbOPlqtSHlnyRlz/dYDkXv1jQ9KW+VIuZSgQUpbikbRFbrzPnj4XKdx0W9HTQvn8uDRM+F8FB30C1WYunt6+Ezug/ek3DePvE9qaPSNlNoxn+k0HNR0cE24Bpy3/jgcg0Y36qzZ5q2eYYtzIVIB143fKffJa/j/3ftPdJgyKmHr/3JJfE41YGviYlMrUrE7Xr/RPghJPK1vcniVsJPRz7Y0MATpCtpKagyq3waO+zsZze7bmopK2Mno96KPtkufWeg5cgncBs0D/ePVErcVUAk7buumXpXMV0Al7GT+A6nTi9sKqIQdt3VTr0rmK6ASdjL/gdTpxW0FVMKO27qpVyXzFVAJO5n/QMr0CC5ERIBdBy/ofDlo4j548ir2HrmExxGuokr77/2oEvY3QAF0gmrUfow4MNG/e+S0tWJhGzhWm2r6p0quBv4m38AtffUpqoT91Zc4fgPQXE40rOoth4FORPTOY/QNIY8JE9et1wzMXBqMN2/D4jfQf+xqlbCT+Q9KHxHGLtJ/wmfBVvzIgNy8nZDvt14GAQDJ/DYSfXoqYSf6ksd9wK17ziA3M/PmtIR+yum49/jfvVIl7G/otyWIZ4nf+2ujtH0+Bsd+Q7eQaFNVCTvRljp+A9EdlDF+hCfQ5O6IpjYTJKCXENCfc2mN36jf7tUqYSfj344AMXfuPUbIoYtoZTdZ0HCZ65Eydvbyzpg8c4NEtBzUA8dJxreTqFNTCTtRlzt2g/0b+kQbv5jeBHXbjZb4ROYfT08Q/LStBOGVEekqKP2n65osCJth92u3HNNFP3w6za9XQzUZQ7ZCjhmm7Pt6I8a8Z4ofdu6zRbV3ISIfD1FTGYpm7eov6fsiZ4WIee//7ZZJSthhYeGCm82MBVPmbMJjvWROibXsEiS6LkRe6cMmrxbMjsQaWx3n661AjAmb8WUBy3ahSw9/UTUxVi2+xWP8CpRqOACE39IvzApGIEfXYQvR3sUP9v3nCNQwQ/ejKtdus/0OdPOYBwsnH1j1nC65GY+c+gioyOsYF8dMCxbOPmL0IHadUmiuJsghIcTUZKXKqny7xxgTNoENW9pNFsgrRhjHBAP6c8uyeuNh5K/RC4vX7DdoRhy48vUHCBjhSO9AjJoWiNxV3QTGgCDpShYz5aIdB84JAihRjAjlO2/5LtlopShkg+L1+oPprVn4Cu8xYpHkswn4ayfs3APQpstUgwRP7Ju4IONnbEh08HjlftRjwqxAjAmbDjeEwsr6s5XknCHQSlzLi5evUbfdn/KgMExfvxDBU6NpCMeBc6CgMU+YtVEgrIhW1MtzCd6GaSF5CVlLmF5NmtYyJ1rnWBi1TLwJTepWAoFAUHlidxDaQEnIymjruu28sH3fOf3hBdaLVr2rN0MN6tV/vq0VMCBsQgbcuP0Q5y/fAV/T5HJKIWTA8dPXceDoZTBFtaI75WubogPzolM1RSwJYtNx48O6qEAFA7ccQ/by3XUYEMoYPBION08hWx0uHOsInavJ0U7AU5w85uvC7omLLYigmUzRuNN4g0xhxHHWpDcRbn/lRqggEFl098OeiPw1nHejjmMFy1p/fOaGz1GhO+Ys36VfrZ5/YysghE3QF7o+mthNRvHf3VGj9XDhdO1dp4ubJAmVsmmeck7IVrqrYDozHyQLAVHyVnVD+oI2KFi7r0B5UXbO+osT0hWzkxTAkbkfYbIylukaJVckxgTht/RxKbznbxX4MMJlrY9IkMqxiddMUBoii5ZvNkQHpcsHVCDEMrYB9b7cH7CO4oeFix827zolEeDEeiZ8rX4hVC1BzNv38Nc9QPrf65+zLfHrtu09E3HkeRSf3acRcuyy4FTrX6+ef70VEMKmKqkMTbXZ24I5G1lWBB0UnDQmFGXhq7tJp3FCRMRcoyslCxObdh+6UDDWcv7qjBpmI9Go0zgUJ0B3ng7Q5LcGtQ36hVC4BWv1EXAZ/fqozsmVa7YahpTZ2wmunAKSorQN3n8WlVsNF3D0VvZTsGDlXtlwEoKrQcexBkhGN24/ADOLNbQYLSLH6Qta3DilL+XItNbEl/vSJpIPSMMOY9Gw/RjtkedRfcy8QHSmS/EQ35S5qceYrYAQ9vb9Z6HJ1AYpfrbCiKmBAofFy0f5rIX3vC3SE8G8rQnYHSmXOr8c6xckjjk/5uskiJfktvuPXkYW5jzJag5zZx+D2TDBaIkGn6acNmhEWK7wd3AePF8rggxZYIABrbQl6pD9gDnQ5LdB+T8GC7xYkVp9oClgA4eBc0UTorSN6bGW2SjB4EssHTE34qMmrJQUhKO81ybcceJKLF6j3TzH9N7/K+2EsC9dv4di5NgZTARTjdqFv4M+pj3gzVJW7hSRmZev+fMRCYRIxMRqI/Ai0TzpgcZC+Tx/zd6CakQgcv3yh83EKHOp67fhue/8rTAq1w0Dxq0wkJ+VdkweasOHLXs7/NpsiA7llKo7STeXxVyMG5T7Y1OYNJUQtgmh0ozJuMwX4+IeIDlomIcmwT7uAfCer2VMMZnHf6mNEDZviDJ2a6Z7ZmqFDCbIXGUW6YMAAAYnSURBVLoLLF39cSVCO0BC/RJhE1meiXxY3oW/R4GafYSwG0RKOR0Tjh20/bjIyWP810e73gQBJzoo4Xg79wswaNeIaP9GZshfo3esRQBybOZ7+RLHDt5/TtJKEMuZ6SWi/dhNBhMVRd5rGExY/SdBV0BH2Ow19PELrN9+HI07jtPC3/7PUuRafsdIDqsIjs0NpoIBTY492lfLsUnY67efkAlSjRcdYVPG5nehD59HeTOUfbkpZIIf/fRpc//eLYDf1NCwrNp0BBrmSclgIoYV/c4EOzqHhWTKPXziYwYt/TbRndc29xLD0ZdkbMLdMmPxolV7tUeeR/VZsQf08VAgbqMbV61PuBUQwiagNsWDO3cfS89MsZCHRhEjyse+UkeUS0mKk9lU0kxcvHZXN4sxfutFHMhUpiuCgrWEzdd/Acq66Y3RsOM4XVueMMUbMZyVt4H+l0xHTcByOtMXqNFb0rIR2JyfTEXtJOEnLY0sVDNKItA0rdHaYaouLyD12GzPsau0Gi4IovpjfO6cXLVUg4HCfSnqqOXbXAEh7HEz/kHK/FaSWuz0hVsi22Yo3QVZynbTydrHz9xA+aaDwTRmmlwdxMeDxEt9tTERQjO1kXQP1DpQx71q42H8yExXqVsif7We0M87yKQ42co7w3fhx5QRyvLNXrZLm0Yus6mIEiRO3SdVSzF7MzOWlA8fMGnWRmQtbi8y9bgZQaJrZxqHVEXtkK+qm2BCK33H5EgRiDp2ug+o5dtdASFsviJ95m9FW2df1DQdKQksqe9legcW6rGZzqFyo0Go3GIYKjUdLAk2iXtMg0aVlsNQucVQqWe+EGbNIoJ/5YYDJYVD5XruBio/6qnrWfwpiPqRXS5pRq9Yp6/2Ovar/2k4UPrh9fqFeROpTqtl7oUarUegfvsxotaLi9mfCYUIbs63QVIUillMI8csAcH7zoLp6UIfRy2y6c+PTIZ5D5nwiBkW+Jt9z8VAxk7MhViz6YgksFywam9iDvvZsWiVpH594qyNie4rQiYRsGwnGncYJ3scovTTFsD0Fa2sJmBrRCKjqG5g14ELcB22CCaOUyVjLpmUkmQoqvbfQ12SETYXd8jElbJJ+2vdAQNLY1Is/LZ9WkMPEw8x3CqxCzU86Us6SPo8vgVZaAsQlWna1qhl5iUuC5HntWjNftln/GbiiSVrQ1S324gFSlLCphgyfUmwbFxH+63HoyTwx2YqOyb3ZJq5oRNXSYq1yMSTGP/TPO+7YKukrVPEM+5VKB4yG1fpRgNx9IyhG+7KDYeQuZg9qpt4JprOPTHWIiHGSFLCVm7gyKlr4gNCbUZiF5roidtx8PjVxB76i+NRQyPanQwmEgihvz6Up7kXyFjMXqKPvtjZd9YgWRD2d7bmn71d2gWY4YsW3LZOPmBWXwZPnI/wzVEuHuMfJKhQxBkZNG6FOHfVMfEUf3O6QShcX2n/vR1Vwk5mvzg5MdO8FaneEykLWON/lV0xY0mwLjEnp0uNh0Sr52ovgb20C1CdOt4/CGmLOyBdQRsMnbRKck0ms9tLtOmohJ1oSx2zgRhEwYAJ+r4PGvc30jMfZAl74cqKZyM1HoXr9AFTOdMApW8hpZqW9dTFX74e92CQmM02+bZSCTv5/jbi+EWLKtNB56riBvqmsJCwf67RS4xlkf1wBk9cBU2eTqImVLQryfgWv9rUVML+akubMB170Q8nRzukK+GAlRsOS6f0wynZQOuNyQBk/TKcaa7zWamErb8o6nnSrQBjSCcHbMKOEMMYTOr66dOeu2oPHcfmBtPS1U9cDhg5pA9bwSh7Boxk+cVJ56iWdHeVdCOrHDvp1t5gZEbra7K1Rb5qPbHvyCX57uip6+JwRpm5Y88ZBsYXqigzlXRAqkK2kk+cFxCegipAjZEp+o1eZtD/9/aPStjJ5Bdftu4AUtK3PGMbFKrdBy07T0KZxoNQtF4/IdKowsoYb1rHbJS0adphrMRqlmo4EEOnrIkyMCOZ3GqiTEMl7ERZ5i8PQjAfmtV3hZwXx7LVmw5j486TOH/lri5UL6pebt19hF0HzmPNxsPYvPu0xKLq+7BHdc33UKcS9vfwK3+H9/h/8wkF33PSNXAAAAAASUVORK5CYII=" alt="">Despejamos la incógnita:<img src="data:image/png;base64,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" alt="">El lado mide, aproximadamente, 16.900Ejemplo 2<img src="data:image/png;base64,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" alt="" style="">En esta figura conocemos el lado contiguo y el ángulo. Para calcular la hipotenusa, utilizamos el coseno:<img src="data:image/png;base64,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" alt="">Despejamos la incógnita:<img src="data:image/png;base64,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" alt="">La hipotenusa mide, aproximadamente, 11.289.Ejemplo 3<img src="data:image/png;base64,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" alt="">Conocemos el lado contiguo y la hipotenusa, así que utilizamos el coseno:<img src="data:image/png;base64,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" alt="">Despejamos la incógnita:<img src="data:image/png;base64,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" alt="">Por tanto, el ángulo mide, aproximadamente, 48.164°.Para entender mejor lo invito a ver los siguientes videos.<iframe width="500" height="281" src="//www.youtube.com/embed/CRg5jQRj1Hg" frameborder="0" allowfullscreen=""></iframe><iframe width="500" height="281" src="//www.youtube.com/embed/ZRLaVT8E3Zs" frameborder="0" allowfullscreen=""></iframe><iframe width="500" height="281" src="//www.youtube.com/embed/yVTQ0oJBGag" frameborder="0" allowfullscreen=""></iframe>

Ejercicios

Ejercicio 1Encontrar el valor de x.<img src="data:image/png;base64,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" alt="">Ejercicio 2 Calcular la altura del árbol.<img src="data:image/png;base64,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" alt="">Ejercicio 3Calcular la medida del ángulo X.<img src="data:image/png;base64,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" alt="">Ejercicio 4Una escalera de 6 m esta recostada a una pared, formando un ángulo de 50 grados con el piso. ¿Cuál sera la distancia en el piso desde la pared al pie de la escalera? Sugerencia realizar el dibujo formar el triángulo.Ejercicio 5 Escriba un ejercicio inventado y resuélvalo.

Evidencia

Evaluación

Bibliografía

Foro

calificable?

Activo