Tomo 2 Ej 155
Resolució
Solució
Dibujar la perspectiva isométrica a escala 1:1 de la figura representada en el Sistema Europeo por sus vistas.
Nota: Las vistas dadas están dibujadas a escala 1:2.![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQoAAADxCAYAAAAz6fmnAAAYVklEQVR4Ae2dCWwU1R/HAVFQ8O994AUCIogiQsArJAbjEQ2JCQlKAI2JIWo0RmOIYjQeATEalGhUyrHdFigFLEKpUA6laMEK1AKtFCnHIlCgFGhpa6/t95+325Wddmd3Zndm982b7yaT7rx58977fX6zn76d3Z3pAj5IgARIIAaBLjG2c7MTCPir8XdRIQoLtcvWEh/q2pwQAMcoOwGKQvYMGRlfayWK83ORm9u+rF4Gb9o8/LC9Cq0R9m9qasKff/4ZYUtyiyKPw4/qv4s6Sa9wawl8tF5yExTWG0URBkONp204v3ctvJmbcKAh8nSiuroaaWlpKQ+3qqoK8+fP7zCOVlQW51+QXu5qLPOmYd4P21EVyXod9uaqPQQoCnu4pq7VluPYmr0QK4ur4dcZhdyi0A667fxerPVmYtOBBkTWnrY+1+whQFHYwzVFrfpRW5YHz+LNONyoPwTniKIFx7dmY+HKYlTrWU8/TG6xkABFYSHMlDfVfBS/ZnmwatdZ3dmEGKNTROGvLUOeZzE2R7NeyqG7YwAUhTJ59uPc7lx4lmzBkaboQTlDFM04+msWPKt24SxnE9ETmoStFEUSICeliyYfChZ7sKa0JupsQozFCaLwn9uNXM8SbIllvaTAZScUhRLHgB9nSlZhgTcPOw/54PMFlyP/VKE+whlA+UXRBF/BYnjWlKKGswkpjlCKQoo0JDiIFh8KFqVh7ty52mXhBlS0dG5bdlH4z5Rg1QIv8nYe+k96viP/oCqS9TqHxxIbCFAUNkCVvUm5RdECX8EipHWU3tyF2BDJerLDVmR8FIUiiTQThtyiMBMJ6yaLAEWRLNIS9XPu3LkI34hM/gDPnj2LhQsXJr9j9miaAEVhGpkaO9TU1EgRiCzjkAKGxIOgKCRODodGArIQoChkyQTHQQISE6AoJE4Oh0YCshCgKGTJBMdBAhITkF4UjY2NmDx5MqZPny798sILL+Dll1+WfpzTpk3D1KlTU35YihOZsuf2zTffxLPPPpuUnL777ruYNGlSyvMSaQDSi+LgwYPo0qVLAOCUKVMg89KvXz8MGzZM6jEKfuPGjUO3bt0iHQ9JLdu+fTsuuugiqXmNHTsWvXv3TsoYJ0yYEDjWxQV9ZHs4RhTismmyPyZOnIgPPvhA9mFiz5496N69e8rHKS7H17Nnz5SPI9oA8vLy0L9//2hVLNt2+vRpiiJemqEZBUURL8HO+1EUnZnolVAUQTKcUegdIXGUc0ZhDhpnFFpenFFoeZha44zCFC5DlTmjMIQpUIkziiArziiMHzMxa3JGERORpgJnFBoc4IxCy8PUGmcUpnAZqswZhSFMgUqcUQRZcUZh/JiJWZMzipiINBU4o9Dg4IxCi8PcGmcU5ngZqc0ZhRFKwTqcUQQ5cEZh/JiJWZMzipiINBU4o9Dg4IxCi8PcGmcU5ngZqc0ZhRFKwTqcUQQ5cEZh/JiJWZMzipiINBU4o9Dg4IxCi8PcGmcU5ngZqc0ZhRFKwTqcUQQ5cEZh/JiJWZMzipiINBU4o9Dg4IxCi8PcGmcU5ngZqc0ZhRFKwTqcUQQ5cEZh/JiJWZMzipiINBU4o9Dg4IxCi8PcGmcU5ngZqc0ZhRFKwTqcUQQ5cEZh/JiJWZMzipiINBU4o9Dg4IxCi8PcGmcU5ngZqc0ZhRFKwTqcUQQ5OGZGcfLkSYg7S8m8jB8/HuJ6lDKPUYytsLAwcAk64y8Xe2ome0Yhrr9qNjfZ2dno27ev6f3M9iPqHzhwgFe4ivdQ27dvXwCeuG4mF2sZxJsTq/ZLtiguueQS6Y+hrl27ora21irElrXjmBnFkSNHcOLECamXyspKqccX4vfLL7+4ckYhRLFp0ybTOUpmXmW9xaJjROGEa2Zapm+bG3LrOYoePXqgpKTEZrpqNk9RqJnXqFFRFFHxcGMEAhRFBCiqF1EUqmfY+vgoCuuZSt8iRSF9iqQbIEUhXUrsHxBFYT9j1XqgKFTLqIF4KAoDkFhFQ4Ci0OBwxwpF4Y48WxklRWElTYe0RVE4JFESDZOikCgZyRoKRZEs0ur0Q1Gok0vDkVAUhlGxYjsBisKFhwJF4cKkJxgyRZEgQCfuTlE4MWupHTNFkVr+KemdokgJdkd3SlE4On3xDZ6iiI+bm/eiKFyYfYrChUlPMGSKIkGATtydonBi1lI7ZooitfxT0jtFkRLsju6UonB0+uIbPEURHzc370VRuDD7FIULk55gyBRFggCduDtF4cSspXbMFEVq+aekd4oiJdgd3SlF4ej0xTd4iiI+bm7ei6JwYfYpChcmPcGQKYoEATpxd4rCiVlL7ZgpitTyT0nvFEVKsDu6U+lFEbql4JAhQzB06FAuFjAYMGAAxK3rUv1I9i0Fu3fvDhG7ysfR4MGDIW50VF9fb2l6pRdF6G7mWVlZWLFiBRcLGMyePduVtxRcsmQJli1bpvQx9NVXXwXur1pRUeFOUfCWgtbl3a1vPawjKG9Lf/31F0Uhb3qcNTKKwln5MjNaiqKpyQwv1o1CgKKIAsfhmygKisKyQ5iisAyldA1RFBSFZQclRWEZSukacpYo2hpwdPc2bK84C384yuaT2FtUhPJTLeGlUZ+HPvXgycyomExtpChM4XJUZTOiOFRchLLKxrD4WlBVXoSi8qqwsuBTmz4ebUPdvnxkePNRfr6tvVM/qotXwrO0EMeaO41Dt4Ci0EUT9waKIm500u9oRhRndq1G+rJtON7+emw9XYyVnmXYFioIi9YmUQDwn8Wu1R5kbTkCcRqy7Xw51nkzsamiHiF1hI1D9ylFoYsm7g0URdzopN/RjCjQcgJFyz1YufM0Wv01KM3zYsnmw/g3QpT2iQJAy4kiLPf8gO2nGuAryEL6mlLUaN6LRBhRhyKKogMQC1YpCgsgStqEKVEAaPQVICs9F9v/XI/MzA3YXx/537itogAa4StYgvQVOVgaEEarabwUhWlkMXegKGIicmwFs6JAWx3+Xp+BuXM9yCut0Z5TDKNgsyiAtrq9WOuZh8UFvsBbkLC+DT2lKAxhMlWJojCFy1GVTYsCzajcmo15aYux2Rd+YlMbtu2iQGslti6dj1Ul+rbSDkm7RlFoeVixRlFYQVHONsyKorVqJ3I82cjPXwHPsm2o1PmggaKQM9+2joqisBVvShs3JQr/WezOTUfWFh8am47it6XtJzYjREBRRICiehFFoW6GzYjifPk6ZGRuREXgBGYb6is2ITM9D6URPnGgKNQ9ZnQjoyh00Th+gxlRbFrkxdq/ai+cwPTXoCwvHZkb9nfiYL8oOnVproDnKMzxMlKbojBCyZl1zIjCTIQUhRlaitSlKBRJZIQwKAr+KCzCYRFfEUURHzcn7OUYUYhr9YnrXJpdTp48GTEPobceCxYsgNfr5WIBgxkzZqBbt24ReSezsLi4GBdffDFzakFOQ6+NmTNnRr3C1dGjRw29NquqtD8Ms/yth3hh5+TkmF527NgR8Ritra1Fnz59MGrUKIwePZqLBQxGjhyJQYMGReSdzEJx0IrcMq/WHdcjRoxAr169dC+uu379ekOvzZKSEs2hYLkoNK1zhQRIQAkCFIUSaWQQJGAvAYrCXr5snQSUIEBRKJFGBkEC9hKgKOzly9ZJQAkCFIUSaWQQJGAvAYrCXr5snQSUIEBRKJFGBkEC9hKgKOzly9ZJQAkCFIUSaWQQJGAvAYrCXr5snQSUIEBRKJFGBkEC9hKgKOzly9ZJQAkCFIUSaWQQJGAvAYrCXr5snQSUIEBRKJFGBkEC9hKgKOzly9ZJQAkCFIUSaWQQJGAvAYrCXr5snQSUIEBRKJFGBkEC9hKgKOzly9ZJQAkCFIUSaWQQJGAvAYrCXr5snQSUIEBRKJFGBkEC9hKgKOzly9ZJQAkCFIUSaWQQJGAvAYrCXr5snQSUIEBRKJFGBkEC9hKgKOzly9ZJQAkCFIUSaWQQJGAvAYrCXr5snQSUIEBRKJFGBkEC9hKwXBT19fXYt2+f6eXUqVO6kc6ZMwcZGRlcLGLg8Xjw/fff6/LmBhLoSMByURw4cAA5OTmmlx07dnQcW2C9rKwM3333HUaNGsXFIgZjxozB119/HZE3C0kgEgHLRRGpk0TKhCjmzp2LhoaGRJrhvmEEfv/9d3z77bdhJXxKAtEJUBTR+Si5laJQMq22BkVR2IpXzsYpCjnzIvOoKAqZs2PT2CgKm8Aq3CxFoXBy9UKjKPTIsFyPAEWhR0bhcopC4eTaFBpFYRNYmZulKGTOjpxjs1QUbQ1HsXvbdlSc9WuibT65F0VF5TjVoik2tMKPRw1hMlWJojCFi5UBWCoKtNVhX34GvPnlON/WztdfjeKVHiwtPIbmOJBTFHFAi7ELRREDEDd3ImCtKAD4z+7Cak8WthxpAtCG8+Xr4M3chIr6kDk6jSFqAUURFU9cGymKuLC5eifLRQG04ETRcnh+2I5TDT4UZKVjTWkNtG9GjDOnKIyzMlqTojBKivVCBGwQBYBGHwqWpGNFztKgMFpD3Zn/S1GYZxZrD4oiFiFu70jAHlGgDXV718IzbzEKfOItSPwPiiJ+dnp7UhR6ZFiuR8AmUQCtlVuxdP4qlNTE+6YjOGSKQi918ZdTFPGzc+ueFIULM09RuDDpCYZMUSQI0Im7UxROzFpqx0xRpJZ/SnqnKFKC3dGd2iYKq6jwHIVVJC+0Q1FcYMFnxghQFMY4KVWLolAqnUkJhqJICma5OqEo5MqHE0ZDUTghSxaPkaKwGKgLmqMoXJDkjiFSFB2JcD0WAYoiFiEFt1MUCibV5pAoCpsBy9g8RSFjVuQeE0Uhd35sGR1FYQtWpRt1jCjE9ynEXciMLJWVlaaSdu7cOUPthvo+ePAg/H7jv2FpaWkx1b7o599//zUVw7Fjxwz38eOPP/IGQKbosrL0oigtLcXHH3+Mrl27okuXLoaWa665BuLFafTx8MMPG2o3vP9169YZbR7i3qnh+xp5PmvWLMPtHzlyBN27dzfcx0033URRGKbLioKA9KIQ/73FC6uurg7Nzc2GFjP/7QWEtrY2Q+2G+jcjodBhFtrX6N/Qfkb/tra2Go7ht99+oyiMgmW9AAHHiKKpKbHrWjDfFwjwHMUFFnxmjABFYYyTUrUoCqXSmZRgKIqkYJarE4pCrnw4YTQUhROyZPEYKQqLgbqgOYrCBUnuGCJF0ZEI12MRoChiEVJwO0WhYFJtDomisBmwjM1TFDJmRe4xURRy58eW0VEUtmBVulGKQun0Rg6OoojMhaX6BCgKfTbKbqEolE2tbYFRFLahlbdhikLe3Mg6MulFIX5JKX7rIX74xIc1BHJycvhbD2tQuqYV6UWxb9++gCiuuuoqpKenuyYxdgQqfsw2c+ZMXHrppRC/mOWDBIwSkF4UoV+Per1eXHvttXj88cdx6NAho/GxXjuBnTt3Yvjw4RgwYADmz58f+Fk64ZCAUQKOEYX49WhVVRUmTZqEXr164csvvzR18RijQFSr19DQgGnTpqFHjx54++23Idb37NlDUaiWaJvjcZQoQix++ukn3Hbbbbj//vsDB32onH+1BH7++WcMHDgQ9957L3bs2PHfRoriPxR8YpCAI0UhYjt//jxee+21wH/K999/H7xexYWMi0v7vfTSS+jZsydmzJjR6WpfFMUFVnxmjIBjRREKr7CwEEOGDMFdd92FrVu3hopd+1d8otGnTx+MGTMG5eXlETlQFBGxsDAKAceLQsTW2NgIMasQ78Nff/31wGwjSsxKbjpx4gTGjx+P//3vf4GPPsXl/fQeFIUeGZbrEVBCFKHgxAtg9OjRgfMX4jyGWx4LFiyA+Ph43Lhx+Oeff2KGTVHERMQKHQgoJQoRm7iw7uzZswOfjIhPSMQnJao+xJfRHn30UVx//fVYunSp4TApCsOoWLGdgHKiCGVWfP/isccew3XXXYfFixeHipX4K664/cUXX+Cyyy7DlClTcPr0aVNxURSmcLGyky7XH++nGh6PB1dffTWefvppJb4GvmvXLowaNQp9+/aFmXuLhB/tFEU4DT43QkDZGUV48OJE34QJE3D55Zfjm2++CdzHI3y7E56LE7bvvfde4ITtG2+8EbjPSbzjpijiJefe/VwhilB6V61ahZtvvjnwO4e9e/eGiqX/++uvv2Lw4MEYOnQotm3blvB4KYqEEbquAVeJQmRXfBlp6tSpgS8jffLJJ4G7a8ma9draWrz66quBsX744YeWfamMopA14/KOy3WiCKVi8+bNuOOOOzBs2DD88ccfoWJp/q5Zswa33norHnjgAYj7r1r5oCispOmOtlwrCpFeccfwd955J/C+/6233kJ9fX3Ks37q1ClMnDgRvXv3Dtzc2Ox9VI0EQFEYocQ64QRcLYoQiOLiYowYMQL9+/fHxo0bQ8VJ/5uZmQlxJ/YnnngChw8ftq1/isI2tMo2TFG0p1Zc1OWzzz4LXNTlxRdfxJkzZ5KWdJ/PhyeffDIgiYyMDNv7pShsR6xcBxRFh5Tu378fjzzyCG688UYsX768w1ZrV8Xbijlz5gTeZjz33HM4efKktR3otEZR6IBhsS4BiiICGvGDqrS0NFxxxRV45plncOzYsQi1EisqKyvDgw8+iFtuuQW5ubmJNWZyb4rCJDBWB0UR5SAQghCiEMIQ4oj2i8wozWg2NTc346OPPgp85PnKK6+gpqZGsz0ZKxRFMiir1QdFYSCf4i3IDTfcEHhLIt6axPsQl8m/++67ceedd2LLli3xNpPwfhRFwghd1wBFYTDl4uSmOMkprmA9a9asTleNitZMXV0dxNeuxfUypk+fHrh+RrT6dm+jKOwmrF77FIXJnG7YsAG333477rvvPoiPVWM98vPz0a9fP4wcORIlJSWxqidlO0WRFMxKdUJRxJFO8cUs8QUtMUMQX9gSX9zq+Kiursbzzz8f+Cn4559/DvHTcFkeFIUsmXDOOCiKBHIlvvp9zz33YNCgQSgoKPivpezs7MDFZMaOHYuKior/ymV5QlHIkgnnjIOiSDBX4lMM8eMyccXryZMn46mnnsKVV14ZuMlOgk3btjtFYRtaZRumKCxKrfjZuvgp+EMPPYTjx49b1Ko9zVAU9nBVuVWKQuXs6sRGUeiAYbEuAYpCF426GygKdXNrV2QUhV1kJW6XopA4OZIOjaKQNDF2DouisJOumm1TFGrmNWpUFEVUPNwYgQBFEQGK6kUUheoZtj4+isJ6ptK3SFFInyLpBkhRSJcS+wdEUdjPWLUeKArVMmogHorCACRW0RCgKDQ43LFCUbgjz1ZGSVFYSdMhbVEUDkmURMOkKCRKRrKGQlEki7Q6/VAU6uTScCQUhWFUrNhOgKJw4aFAUbgw6QmGTFEkCNCJu1MUTsxaasfsGFGkp6dj0aJFXCxg8Omnn6Jbt26pPfLYu6MISC8Kcd8Lcal8cW9QcYFaLokzGD58OAYOHOioA5WDTS0B6UWRWjzsnQRIQBCgKHgckAAJxCRAUcRExAokQAIUBY8BEiCBmAQoipiIWIEESICi4DFAAiQQkwBFERORmhVkusWhmoTVioqiUCufhqIR303xer2G6rISCQgCFIULjwNxA+W0tDQXRs6Q4yVAUcRLzsH7URQOTl6Khk5RpAh8KrulKFJJ35l9UxTOzFtCo6YoEsLnyp0pChemnaJwYdITDJmiSBCgE3enKJyYtdSOmaJILf+U9E5RpAS7ozulKBydvuDg/TWHUFxUhsrGsGBaqlBeVITyqpawwuBTiqITEhbEIEBRxADkiM3+M9i1Oh3Lth1Hc2DArThdvBKeZdtwPFigCYOi0ODgigECFIUBSE6o0nKiCMs9K7HzdCv8NaXI8y7B5sP/Rhw6RRERCwujEKAoosBx1qZG+AqykJ67HX+uz0Tmhv2ob4scAUURmQtL9QlQFPpsHLelre5vrM+Yi7mePJTW+HXHT1HoouEGHQIUhQ4YRxY3V2Jr9jykLd4MX/iJzQ7BUBQdgHA1JgGKIiYip1RoRdXOHHiy85G/woNl2yrbT2x2Hv+ZM2cwb968zhtYQgI6BCgKHTBOK/af3Y3c9Cxs8TWi6ehvWNp+YlMvjmPHjultYjkJdCJAUXRC4sCCtvMoX5eBzI0VwROYbfWo2JSJ9LxSRDlV4cBAOeRUEaAoUkXewn4bDmzCIu9a/FV74QSmv6YMeemZ2LC/3sKe2JRbCVAUbs084yYBEwQoChOwWJUE3EqAonBr5hk3CZggQFGYgMWqJOBWAhSFWzPPuEnABAGKwgQsViUBtxKgKNyaecZNAiYIUBQmYLEqCbiVwP8BDLqMZZpNWX4AAAAASUVORK5CYII=)
Dibujar la perspectiva isométrica a escala 1:1 de la figura representada en el Sistema Europeo por sus vistas.
Nota: Las vistas dadas están dibujadas a escala 1:2.
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