Actualizar Secuencia Didactica: 2884

Año

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Propósito

Comparar la filosofía política de Hobbes con la de Rousseau y Maquiavelo, sacar sus propias conclusiones y exponer cual es la mejor propuesta política que le serviría más al hombre y porque.<img src="data:image/jpeg;base64,/9j/4AAQSkZJRgABAQAAAQABAAD/2wCEAAkGBxITEhUSEhIVFRUVFxUVFRUVFRUVFRUXFRUXFhUXFRUYHSggGBolHRUVITEhJSkrLi4uFx8zODMtNygtLisBCgoKDg0OGhAQFy0dHR0tLS0tLS0tLS0tLS0tLS0tLS0tLS0tLS0tLS0tLS0tLS0tLS0tLS0tLS0tLS0tLSstLf/AABEIAOcA2wMBIgACEQEDEQH/xAAbAAACAwEBAQAAAAAAAAAAAAAABQECBAMGB//EADUQAAIBAwMCAwYFAwUBAAAAAAABAgMEEQUhMRJBUWFxBhMigZHBMkKhsfDR4fEHFCNScmL/xAAYAQADAQEAAAAAAAAAAAAAAAAAAQIDBP/EACARAQEBAQACAgMBAQAAAAAAAAABAhEhMQMSE0FRImH/2gAMAwEAAhEDEQA/APjhAEkrAAGQNAEogCSkWwEUbaFLYVvFyMypE+7GcLfbdHRWbfCI+yvqVOiUdJj6Oms6Q0zyD7n9OvOe6ZDps9dQ0fP5TvL2dTXBP5Yr8NeKVMsoHsJezSwZ6vs9jgPzZH4dPKOBCQ9uNGkhdWs5LsXNyouLGNlTvOngr0FJcsEYL4IwMuKkFsEDSEDABAACAAAJIAAAJABEpEI6RBS1OG40o03hdkcbK3zv2GVKks/sZ600zlpoUsrj6mqnRXlt6GihQWN2dqVLMsLgytayKUbZvhDK003HY22tDGNhlTp+RhrTeZY6Nn6GiNHy4NEUX6cdierY52/kZ3brwGkkzjOGBAiurJPssCe/sF4Hqq8RRcrkuVGo8ZfWSFNWn0s9bfU0Iryimb42595KWVLTjh4K4OhgEVkixVjJUAACAAQBLEEkIACSCQOJijvTgmcUbbSnlitVIZ2kMRGNjSyzLRj2HdnSwkc9reR2UexutaePmcujjBrt1ukZ6a59mNCBvp0zNbxGNCnsY1pXL3e6OzpnaFLg7OnsBdLpxMtQZ1aRgrQ3HDLLieBdcIZ3FIw1YlJpFeRzkSXcMHo7yHmJL2Jeaz1HnrmBnNtyYpHVm+HPqIK4LkMtCjIZZlQKgAJAIACQIAgSO1GnkSuClTbG9jS6UcKVMY2tIz1WuYYWdHv4ju1p+Jis6Y5tqeUY1rFOjlne2iRXWNjvZx23I16aZ9mNrHA1oIV22Nvl3G9uzNValDJLIjUXGSHLcEOVen/PAT3C3HU91yKrtYBcKqs9zBczGNWAtu6QzpJfXAkuq2R3d27Ylu6D8DTLLRPWZkma60MGSZ1Zc2nPJKIYYLQllSxVgEAAAkASQBrwRspIyUzZTJq8ttBZG9rT3SFdih9aRxuZaa5MLWKzgd0aeEJLXkeQntt/gyrRlrPc2UFsY58m+gjPTXDXRYxtpiyk+xojcxXxZJVYcQl9i8ZbcP6oQVdcijlH2hj4pfMfEcP680lnH8Qqu6q7ErV4yjs0LZXCk3+oVeYvOexjrrCOlSpmKSMF1qUU2s8YEvk4zXMHkTXsefLdjm4qqSTXfgU3dGSzlpZLyx3HmL3kXzN+oRaYvZ2Yce/apBKBloCKssirAIDAEDSsAEpCUtTNdMzwNNJE1WTCye6HsZ7CSz5Q2gzKtsmtrL9RrQeExHQqYGVKvsZVpF3Pc32shVKQztexnpr8bXJi+7rPHi+xteTjUglu0yY0pBcWVapvnHq8CK8tbmD++eR1rHtHUjmNClnpTcpvdJHmKeqXNeeJTeHzhJJG+Jr34c27mXnlvtdRqx5THOnXkpPCfPdi61g498+q2+g+0e0lnMo4T3I1Y0zm+26olhJPhYPEaxcOM5J9/sfRr+zpqEZRjs+eT5j7VY68LxD4p/rh/Lf89Wp61JRSyY6+ouW7kZKUJYbjFPHiRK+XDpxey3w4NPulh7+vc6Jj+Oa7/q9SupGSaLz6Zbx28UznkuRnry5sCQLZqgAAEAAAlJaKKlkwVHSBqomaBppk1WW60YzhIU273N8JGVawyhMZ0XsJKc+/oMrSWURprhqmjXZV+xj6ljc4RrYZnqdi8X616ii8lbi361ht474MtpV2Q1oNNb/Iyjo1C6lYU1+GOO2VyZruzhHdJ59PuObh4WxkjSc8ZfPmO1HCLT6E6k+nD8j2FW2xFLyKWNCEOOe77m7Kf84F3pX2VVV8Eos+be19sotSS74PqNxTwfPPbOlt8y/jv+oNyXFJLCriKWF80mFxbwe/uovzTf6rJytHlYNvQ2sJL9je3lc8nYR3EMPbb0M8hleU0tm8sWVDbF6w3OBAyCUWzVAMEMAgMgQNKWWTIRMRHHakaIszUjvAmrjXTkb6L2FsGa6c9iK0jdCf3NNnd4eGLIVNjk6mGRZ1c1yvVSq7GPq+LBio6jhYa9DvbPq3MuWNey+nodNqbYN8auO4nsnhoax4Ma6cV29+5bHW3WCtnTwss61GuewK/wCKVK/Tl5KWWrOTeFlLuIddvulefYNB1SnCHRU2ly/nvn+eASeC1ZPD17rKSTPJ+11qnCX1H9o+prpaae6f9xZ7T4UG/IM96mycfNbebTQ1UthTKSz8xvOOVleGTq25fj/ZReT3MNTg1XnJlqdkbZ9OfaqJZEQyWzRkCMksAqQSGRpBdFCUI47xOsTimdIsmrjqpGqE9jFFnanLYVipWihPlFKkisJA2Sa7lsN9CnmTWewroxzhIYaVTaqZ+qM9+mmPb09OGMM3U2ZKT2RppM5rHXi8a5VsLkwXl43wTXba/nmK61Tp3fArD+3HGtTcmnLfHHzM91bQqNKWPhzhrlI6TvIPZv0wcHcRXhjvnuXnsZ712NOm6hK3bUpNx7Pw8zB7Ta/7z4YvOeTi9S32WTHe1KMnnCi/JYX0Npmd6yutc4WQg213HiklDd4XfxFcKsc7MrOq2XqdTizMc7mWXnBmnyd5I4T5ZplhpVAAMtCgZLNFWgIAQiQJIRQFkCljpE5HQAvFnRs5QZZMmqldYPY6YKUkbKNByfBNVGrSaOXlmyvDpeV8/wCpezo9Iwdv1LzJs60zeO9nUyk/FZN1uxZZLC6e8f2Yxt5bnLZy8dMvfLv7vKZ53VnjlNY8GekjPY85rEXKfT25YT2NTw1aPpSlic99tk/3x3O9XTqP56Sfg1lfocY1pJLHbY72ly5Sw+MPC9A8qlk/TLWsKGPhpr9DzWp28E89OPke3uaaxx6+m39zzeq0s8Yf9C8TlT8nydnOPJ9fxbLY01YYWcdikqa6zTqE/hSOi3zHLPVtL3M4ZCpIrFmkjG666IglEASCAyAwjAYJIAkkoCcAYRdM55JTAOqZNPk5jr2T0/3tbdfDBdb9V+H9d/kKnDG20v3cU5fiay/LPY02tHyN95HdnK3iZtuI91hjO0WxncTvRlgZi8tmn1x7fqjPGvjcc0UmL7/TXvKPzMt46vOuIpXaexnrU+qeRZOtKL3O1K+MblrN/qndO2ytjm7fG6Rloakl3NtC9i1+4SK1ZxE5LHhtgUXlJc+PP8+Y1qNNbeItv57YYeU3nHkbyPTMxXNfJp1Ktl5FsjsxP24t6/SrJiQCLZOkWSVRKBQaILZKsAGBAAVWRDZXqIAupbDIEAE5Pon+nlli1q1n+efSvSKS/dyPnSPrnsvDo06l/wDXxfVdX3Fr0r4/bHemamzRePcz5IbtuNggFDdEtDgrbazGlHD2YjpSGVrVYqHLU9AU8uOzPMXmj1IPeOV4nv6VUtNJ5TS/yTZ0S18y/wBu+2V5HCU503t8z6Hd6dTl+Vcr/ORBq2kxTeNuGtvH18yfqrsJ6eotc9n9hVqep7c85NN3p0v+wkvLKS3HnE75TrV54YqtRt5KFnEjBuwUBEtEAlZMkqmWiBxKIBMANBJBIJcyUCBDIAySGAET69oVRPTrfHaKT9Uul/qmfIEex9kvaelSpO3r9ah1OUZRSeM7tNPzy8+ZOovF5T685OMaM5JuMZNLdtJtL1fYe2Fa0mk6a95/6lz8lhDGnqDj8HTGMXt0pYX0J62eWs6m5skZtStXSq7fhe8X5GiG6GBTNVGeMGTg7UpgDSlPzOynkwQn/PkaY1MEh3cjDrMdoPxzB+vK+5ti+5S/oSnQqOCz7txm/Rb49cKQjeSqxFN1SX7j+8tpdW2HnfYWXdrJdvoPhdeXuKHJilAd3UBXWiVKjUcJQycGjXEv7tPkfU/XrCiyNtzCEKa2XVLf0XYwdQ/afSzAhMGA6gkgkKSAACiDZVkshiAACADXZX06UuqEmmex0r2wUko1vr/c8IGRcOa4+uTrQqw6G1jmE+cMx2NX8UJbShs19/Q+fafq1Wk/hlt3XZj+319VHGT+Gotk3xJf9W/Amxrncr2E6eVsclszpp91GpHK52zHumav9lKXC28ewluEapvp9MYupVahBbtvY8/qet21tnqn7youIQ3x/wCn2PD697QVrqWZvEV+GC/Cv6vzHInW5HrNZ/1AUW4WsFhPaclt8l3PO1vbO9l1f83T1LDUYxSa+aeDzzArkZXVrS9Qrbf8tTbCXxy2S2WNztb6zXg9qsn5Tbmn9fsLyQT2vSUtUp1liSUJ+vwy9G+PRmS5oNPj6biY7QuprZSePDn9xcXN/wBaektKait/p3ZlleTf5v0RxlJvlhwXf8Xr1XJ5ZzIJGgFkyhIwsTkqgA0gADIEMAAIIABECQAAAyAADGw1qtSacZccZWTfqfthdVodDlGEXz7tOLfq8skBcV9rx57IAA0ggAAAkAAIJAACAAAAAAAAAADBOQAA/9k=" alt="Thomas Hobbes - Wikipedia, la enciclopedia libre">

Motivación

Con el análisis de este vídeo puede comprender la política de thomas Hobbes.<a href="https://youtu.be/Jr9__vQK2LM">https://youtu.be/Jr9__vQK2LM</a> <img src="data:image/jpeg;base64,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" alt="THOMAS HOBBES | FILOSOFÍA Y CIUDADANÍA">

Explicación

Leer con atención los postulados políticos de Hobbes en la siguiente ayuda didáctica<a href="/web/uploads/561/b6bbc9cdbe-filosofia-te-thomas-hobbes.pdf">b6bbc9cdbe-filosofia-te-thomas-hobbes.pdf</a> <img 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" alt="Pensamiento de Thomas Hobbes">

Ejercicios

La tarea a resolver la encuentra en la plataforma del colegio.<img 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" alt="TEORIA DE HOBBES - Docsity">

Evidencia

Evaluación

La evaluación es continua, se tendrá encuenta todo el proceso que tendrá el desarrollo esta clase, vídeos, diapositivas, taller, puntualidad.<img 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iS4Ann/Ttc81SJzZHZku0209UPOiu5EoURoQfCrZzMdsItMC8oQ7j1+yLSP9w8lExsUTB1sJ3VcXj6aqbN55EDW+gSAvtEjQbA8lNlQdQDlsD81CLjXSOusctFOrPLmZ9AEOp12Fp68oSmFTnmb7/wC0mja++6Zrb35enzUnOAyDpO0TJF1gI2+HvAs60tBBvHzCKxocbDNOm53jpGqyaWLImWg5bc/C2MNxhxaAYfGghrPLo1AlAtFlTEUnAERBMgjT5Kth3uadQL89Y2vtH1WpiOIj4QRnv+p21phg2CzMWRJy6ATtGgsBstQbo6Dg3EMhkAkcgJIOu2y6vh3Gm7EGf9RdeaYeqbRI5fkrWwtas8fCXOPJuvzIMrmyYrZ2Ys7qjusdxam1pMgnYDTysXEPqvGZ1RrW7CDMdO/JUm8Dxl6jsO8huW9S4bmMA5TE36Ls/ZTgrBFauS+of0MEGDpmIFh0RjgadDzzJqyh7O+ybqg97WGVn7QZk87bDqi8bo02FzKYyMp3cXzAOwP93RdH7ScfbRblLviiQAbjYk8jylePcd406sdYYD8LQTHjcnqVeUUtHKpt7ZYx+OboCDJ2JPSJ21lXKORoAA2EmJklcb77zfqreGxpgNm82OscjKXgFOzqqs5ScjXNI3E+uyz8RWyvDr/pH6psOVrKxwl9MkCtUc0Tp8QDj3FwocQwozxTcMg0zgu2uM0XQTGlF1YsbxBjmwWtI/tBdDhv9lzmNkkuIi1m2mB9FoOp7OaCbCwcybmCZF+6qCiZLWwNXaEg5dr6lUSOeZz1a5PTZQLdLfk6K/xLD5X2iD8Ri2u0eCqhA0BJ7jrsrI5n0iGaAckRjOh8BMWkcoNwp06kf0+qJjSmzokevr4Sc61u14mT0/NlIOEQJ2OveUJ4m97zAsdP9qbKirOB0nUzPSBNtd1Co4STteO9o+6d7QCbaDz/AICG4chrCFGFmJINrQEnzER2+qdjBrrsnA6kTy06ysgDCRbWRPK8apg+0W159E72iRe0b2I+aiAN7j6+eSzQQvvDF/uR5VjCUC82BvqeSrYamXnKNTyNh1I5BdRTpsowym2SdTOtruPlK2PCNg8NgKTSA74jqRrPVddw7EFoDqbBkpgXIkNLrZy0c9uUrJwfD31C0nM7MS1rWAOdUIiQ0WDQNyV2HH2ChRZQyMp++qSdDDGltzFvhsPMpVs6dR0KtjauIOVz2AOnI2XAf9ZBcwE6uNyJ5LEf7Tvo03BhZScSQ6t+pxj9tMblaPHOP08HhyGPms57w1nwk/EBFQOEw0Aa7yvMK1Y1Dnqu1mGwAByysGh6rS/pr9FjiPEXVSSScpN5PxPJ/c/n2WTi6kujYX1+quPqzo0md3bdlkVHAuOpkrR2Tm6JP2j0U6BIcOYQfzdSH5dM0STNnD8RGk3jXvstbh3FHgG3xAjKRqBygiFyJjkJRmVHNGvz5rJFFkZ09XiNTR4LpNxe3mLLFxtctcSHa6dJFxa6qvxLzYuMb3sP5VXENLri/O90yFySvhXqOBjcyZm0+NRuh7z1GiLA6+n1QzT1M6Cep/JVDlYnN07KdESTcBIstvp2+QSDSLgzr38hExpPqdjfpyhCDoI6aFEqvO0ibxe0nvyQ3Enn6KZUG6Egb3/ICTnRbX0TMdB5bfO0rAsR6ER1T8v4KZo+ykBcX01WRiUmb8r81BrZiSL2jTtKem0G97T/ALlbXC8GGM946HVHuLKbCdGxJeed4QbDGNs1uAYChSZ75+eo8XDCBBOwDdSPRa/CsL752Z7WtJOVo+ENsAbNOt4E6SUTgvBmFmetmbIMnKfhDRdx3gI/D+MMYHvGSnTYcrHR8QmC51TNIc0gFpAEHxKkdajSNDgbqtCi816fuwxrnMFQe7quzmCP7QNgbu2XN+13tBTc9lKiJp0WnKDJJc4y7NN4B2WPxvjIqVH+4Z7umXEidYPL+nn0lYTsSwW1MaC2nNboLXWWcVUc9xe6JOvKOQGw6Kq/GNBtc9NVUxGILtdNht4G6hVMk9T2TKJJzLlXiJi0i0ST6qgCVLOdJ1/NU9NqakhG3IZIHoEV8DcqIdyhYPBg3aD4Vqlg3kch10+SBSLtgn118ch2CIdB61BrbBxceQgKGIpgGMxnfcA8pUqJgzPpYotSpSn4mkO38bi6Gw6M51KTr4/hBg/b/S2feUibg2i/XmgPwtN2Yh+4N287RZMpiSx/hmN/P8qdIXsTOthHjqFN+FywDvN9RCCLb+qdOyL0aJcdegPlDc877IrxtOiTxN45WSDAc3ZOGDQ9Tf6KUapiNYMTaN/8LBIPGx1Okj6JyB/vRMdUqYMgDU2+a3DUXsDR1cdG/Kfmuq9m6LKZdWqgOflLqbSJEkQNPmsvh2DbmE/oaJtueo5qxi+KND5klwFmt5AH9R5aJGzphHWzRxHFXimS9xJOuwPRnRcnjeI5z2/SBfmb80HF4xz7mLEANGg7BVacCT/aY7wLW7oKP6aWT8FXrl2pI6IM8vzunMen4FIMmftp5T0iO2Dz8vJ1RDlknNOuo2n8soAieYmVOo+7tJk/LZYAV9MNInkD/wCwkKFSqIgWHPdBJO55dUo9Fkgtjg9U7XclCUSmwkgC55BawLYmlFAlu1tFoYPgdV0EjKDvv8l0mB9mqI/X8ZPOwPWApyyRR0Y/jzkcYxpMBoLjyAkadFco8IquvlIH9xj/ACu4c2nTENa1oFrWjsVmnHBzvhAhv7t0iy3ws/jxj1mRT4PH6iSTewjlv0QsXSo0xAAkkTeT3nRH4txgn4WkzzWQb3if9fyqRt9I5HGOkDa68fCJzA6a6hVm0XOMNaTabAnfX1Vx7csX1F5H0sguaY2HW89rFWRyyRZLN7we34UqjYIEH5c/wpqrb7d7JnT89vCUIxI/P4OqE/6HvruIsE4NpMz9unJQLTa1pMT0F58FYFDRY2Mc9FZwLg0SW5uQmI6nkq+Qd/pPKE5cb3PhBjx0X8VjH6DMAdADAjTUaqtXfrGhOQRrpc+NPKA3XTcH15KbwMo2HxX3ubz6LUM3YgQGzcGR1mEMtEOI6ba7kqT3TaN516KA01PW+tgFhBmsnyDI7ck7XQBrE8u+/lQzn6+oTu2n87LGIui49e+iTmz5/JTucZMX0P580hUibTv6omE8XOihqnzdBf0VjD0C45WgE+gHNBsKTfAdOkSQBc9Pqt2l7uiC0XfFyRz5HZWMHhGUWzvrKycbXL3uPOwU7tl/FQV+zouB4v3jagOrGk2HcCTvdAre0Dw0C0gfqIk32CHwunkoVHwfi+ERybcz0koBLqeUtZmqETpOWdBGilStnV5SUVQqj3uGas4sbtm/U7oxgue6p1seT8LAQOpv3VylwXEVXZnAgn9zz6AckV/s/ls6qB2bPyTeUUSam/RjBl7lFFMRIJ305aq9V4G2Ja9/kAa9lQyljhJJIP2j5KiknwjKLj1DPpnmDHmxuEMhxGluVvurMtBm4Bv+QgvEm/z5p02SaHdrOn+R1AQiBzmBJjW5gKNTXXoN+1+6i8QAPM9tE1CCzxs70URUIgyZkx9T9EPsTp6p2m47QsYJ708zJuT5lJjDt5Q+k+UZp03QGRKdJuJHylRc776qLidreUiJgmRmE/afRawjGx8Js1oA1/mUnkRJPooZ+pPgLCjmmb6W+R8KJafz5fVIuubalRc/+D/KwCT5uNDpP59VEO/Lp88nrHXyp4akTYHpfYaygFbJ4eiXHKNdzyHMyukwOFaxsx8PPn1PJV+HUWj/AMQL8z36JY7HZyQDab2iYUZNvR2QioK2RxmLDugFvMTJWVhySQT4Honrvm2yPw+nme2Zu4epTcRO/KR1T8I73NOm0SP3R6q9g6LQJAjvIjlPNVqeJy22+qhxHigDbHb8C4ttnp/VK36J8T4m2kLfE47XN+6xq2Ibkz1HxMxTaRmJ5E6MasnFYsudJvyH+Fq8J4Lnh9YWMENnWP6unRXUFHbOZ5HklSCYVr3t9+8gA2YwSBl/qvqFgYp2Z5PUwt7j+PJgAiIygD+kfysANnYztz6lWgjmyunSEXRYT5HPkk2b/eT9FJ7YBJnS0alC94Toqog2MY56HxbSExI0v06XJ0UqgTZTrG3oNU4isB5KK2noNAAdVBrD4U3VJSsZIZx/AEjIvbQdPCkZ8ITieSARFx2O/I+in7okDoI8fhTtEW0nXspNm0GAN+mwQCR92NLynawXBUQN5Q6jpP54hYzpCebm6g5pnbwk5imxlphYShAK0x4AGUebfMqtGpjkp0R0/hCQ8S7/AMk6dPmgVa2wifyyZ7gB1KrjrqlSGlIIwSfUrZ4XQzGRaIMrKptgdSVo/wDObTBAGo0Bi/U8kJ2+FMVJ2zbx+LaxsuN4A2k9gFzGIxT6rrT2URnqulxjqdB2/hbOBwrW9SdbX8KaSgV8pZHXoJwjhYaczruiw/p/krXxb3BsNFzY9juOqBh60T8MdN0SpiYuTHj0Ci22zpioxVGQ/BOkkiTtOkfys/FVW0wQCXPNiY+EdJRuK8XJJbTlo/JWJB79T1MBdcIv2cOWcb0Ee6TM95P5CkIi5hDYOitU9NArI5Q9Soc0C3idkJ7SJuZG6dJKygOqJJtHa090KNu/0SSQMDLud0zTflofmkkiKx6R1RqjQBYXjVJJKNHgPEGIGyG0XSSRQsgbTN1KnqkksBDiSY7/AEKsudAFkkkGOV3vJJ7J2hJJFGJtcY8JsG3O4SkklYTp8PgGtbO8T0+SejirgADzc+qSS5pdO+HEFq1conU91znEOIvcSJgXSST4uk8/Cky/50RS0egSSXUzz/YRjJVmmy3lJJMgn//Z" alt="Thomas Hobbes - Wikipedia, la enciclopedia libre">

Bibliografía

<a href="http://www.filosofia.net/materiales/tem/hobbes.htm">http://www.filosofia.net/materiales/tem/hobbes.htm</a><a href="https://nuevarevolucion.es/filosofia-la-teoria-politica-de-hobbes/">https://nuevarevolucion.es/filosofia-la-teoria-politica-de-hobbes/</a> <a href="https://scielo.conicyt.cl/scielo.php?script=sci_arttext&amp;pid=S0718-22012008000100009">https://scielo.conicyt.cl/scielo.php?script=sci_arttext&amp;pid=S0718-22012008000100009</a> <img 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" alt="La Filosofía Política de Hobbes | Thomas Hobbes | Leviatán (libro)">

Foro

Espere invitación al foro para que exponga lo aprendido de la política de Thomas Hobbes<img 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" alt="EDAD MODERNA CLASE 3 Empirismo Ingles - TOMi.digital">

calificable?

Activo