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l Reconoce las diferencias en el nivel de desarrollo económico, político y cultural entre los países de América Latina y de Europa, en la actualidad.<img 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30ne+l9F2YNrg9xquvcDdA4Rx57+iyr3aWg3cNTx33ie7rQ/Z7NHJ8VTRTXhpNAfIZB2A2BB62p3xgXERAaW9b6l336DcKmvyY8aDS0ME51Ok2ptgFzWkbNLrIN9ev3wycXcCAS4Nc0OttkAusDv/COi+d+oYFuJxtStqHQB4AAnfOhhTgKOwptp1tRN+pMTYd6q64uQJZHNLWmNoAJrfWaoX9DvttskvCYz8o29D/JVjh0haWvN1ezC67Fd/eyTXv6q2xzkgECwR0Xm47AOoU9pSMAWi9+s6nf06LrxGHZAc9og6d6rSbwlzDcchb/tNe/Yq+YhJjYXG3aW2R3NC/1Vd4bAZnVdNHzfS+36jsrSBS9f/D7a5pOqVD9ps3wmT528F5zqdNh+xQfOPCjl4/hBuq3NJG3QX6qP4lgZWXCMd8bGRnSHG7sNII/e9QD9laZZWtFucGj1JofqsXx0X/dZ/wC4f3X07KzmgADS45LF1MEkk6qqcY5RYZIXiETMjibEY3GtmAhpsfX9FkweXDHDOGY0DDJpGgguDmAk0630TvsdvfrtcEUnEPLQ07vmenjqmybMqi8M5W8PJjlhg+H0n8Snkh47gA7gHcVuN/ZY8vlZ8hmMsImleTple69A9GNJoe3SvoFflilma2tTgL6WQL+l9Vb+rfM/PXWZ9dLKuxbEd/CqjOX36sE+HXw4o9NtwPX0AOy3uI8JdJnY+RpsRtIvbaxIPX+IKxIqGs4meRHnM+6tshp09P4VZz+EyR5nxkLQ8lmh7Tsa+v2b+S1W8vPkOXPI0CTIjMekV8pAG/2a39VcFg+IZr0a266vTY1V611QV3gQOk30F4Q0myqm/lx5ZgN0f+nfqO48v4jHDv6A9FsY3CpcTIyJIYxI2d2s70Q63O/m936bhWtYWTNcSGuBI2IBBr6+nQoa7jYgQZ9TPHio2YGne5Q3KvBfhWSF1a5XmR9ep/r1/NT6Is3uL3Fx3q7WhogIiIqqyIiIiIiIiIiIiIiIiLmHOeY6TKLRem9A+oBsVdgWDuunFct5rxzDKXSxSvJJIcNLWGzZpxPXv06gdllVrijBIJnh3A5SQJtK6sLq474t3B3cj0UaMiRg0xNDf4rJJvrvfpa6Jy9xJrsQPJALGEyNBuqBN2fUC7XKW8cGtrXRBoJ0m3A+4NVuOgu+x+itzXBmDlv8INeGCPUBu5shDT+X9AssO1mc7NoAOusnnv8Ae2gUupE0A8kkzBBix0gQ1sgaSPHiq5wrL+JDMaRrSSKDjuSWi2g+g8tWvuNy1kPc8aWNDdhdgHcHahuPfrsvvIuGDllx3DY3O1AdHbNGo1t5S+voVP8AEs1xfsdu3svI+pY51HG5MM0AwHEkaGTe3ERy4KmKqMdRy1DIdbf8bunNeMHhAjGqXw21v5BZP1Lui2ZOKgkMiBJ7ACyfYAbr5wDBdkygOBMbCDJZ2rs33s9vS10GGJrBTWho9AAB+QRuEr/URtMU+02AEDrxPiSvOw9NjG/6IyjzK0OA4ZjiBeKkdu7260PsD+ZKlERe7SpNpMDGCALLpVN/arkGPBLm9RJH+pIVdwc7BeY2HhOfbixpcWyBgLiBqJ8XZu9/RXvmjhhyoPCAvzNJ+1+qxR/GtaGhsWwAG3oK/wBa9GjUikGg3k/3Rwhc72y8kjhulRPEuZsoZz8LHx43nwg9rnuLWt6WXkdRvVAXZC3OS+YpM1szZ4hHLBIY3hpJaSLFi/cOHU9PdbUHCXDNdkkDeMMu/Zv9QvvL3CTjvyHEV4r9fbfd5/qFm408kACYF9871YZ80nST+lOrlfNk8udl5TISdGFCT/vksOc0e5AcPrGunzucGnSLdRoeprb9VU8HkbHc0uyWF0hcSTq9fp3Js/dThntpkvJvu39bdLeKVml0NC08znh0fDIM1jA97nMjka69nAOD9gR3bY9ivM/NudFkx40mFFrnbqhDZD5Ov+a6t6AJOkD2tZJ+UXCOSBjbiMgkbuNiGub+ZBbf+1TudwkyZkE9bRtIv0sOB/mtDsBoAZzcf+v7VBtD6ftQfDedntjzfi4WtkxK1CInTJqJa0Nu68wAv3HRRvCeZ5Ip4psjGiDc1zG6o5C+WLUAGCRridI6bACq33FKwv5Y8Q5gcABOQQfdry9t/osOFyzpdGDjY7QwjU/w2Fz6re9ze3Xb19lM0AHRv5nhuv8A7r79BzSKlp7v8LU/6pzZczIxcXFjf4L2gveS0BhNG/MLd6V/pK1+EcxxwO4pM6ANEEtHS5xdK4yytb8ziGku9AB5lZ+EcJMOTkSkD8Ug3tvRdX6FaDOVtQzGvAAyHh4PXdsj3i/zCrmo3boIbpN7ifyph+u+T+Y/C1OF8w8Rc6B82A0wT0QYiTJE124dICaqiD2799l45i5mzcd0zhj48cMXy+NJ+LOB3ja13etgd+nfZS+Jh5QEUZeI2R6QS2re1oAo7m9h6D1UbLyu4unJiZI6UuPivouaDezb3aa26bfRQ3ZZvuy+E8eusdzdDni09jpxVj5f4j8VjRT6dPiMDtPXST1F997Uko7gWGYII4iKLAR9rNdPZSK5XxmMaLdswJRERVUoiIiIiIiIiIiIsU8LXintDh6EWFlRQRNiip+flRYb/Lw57hR84i1FpF0S8X5T9QR6G9oLmzmkT4QiEbmPc5okBaQ0BtO8p93Bte1q0c3ccdgROkjYZHO+RriNOq2jqSOxLtN7hrqqt4bjXGhPjYsrZGh7h5msJ2dTNQ3ogAiqI7hZOqCiC8Cct4sPxZHF7RndcTz8tY9FF8qYox8d0kg0vkPlHQ6B0+lmz+SkeCcG+KLy4vaBVOqwetjfv/dOExUx+XM0ubHRZeq3vBIAGntqq9j+hUfx79pWTE0+HglvYPcbaL2G2xsE3RHReRSw22ruxWIN6n9vIWF7G0a79bTCsKT8SM4H2hdGwMNkDAyNtNH5n3J7k+q21TP2fc0TZokjyImsfE2O3NcSJNeoE6SPJ8vSz1VzXuNiLI5haYKIiKVVa+XksibqkeGt6WTQsrLG4EAg2DuD7FVD9q0rmcPcWCzrj/mrRw3/ACY/9jP/AKhaFkUw/iSPKPlVDvvLen5W0sUkrW7ucBuALNbk0B9SVz7mjmLLgkmIysaMR/5UIHiyy7fvUPIT9hv7Wo7mPieVk/4ZMzQzxizS2iQyXW0Oc71Z8m3XYrVmFc6CSIM+gnuCVm6sBMC4+YXTvjY/E8LWPEq9PevVbKpOJmy/4s2GRkZIxWufIGAOMmwcA7rpu9lA4HM3FJ8GTLDomiEkFpZb5K0k+zQA4e533GyhuHc6II3anjMbuSnaga8/RdURUniXHsl2Niyxy4+MJmB8r5nWWEtB0xsPz73+nuV95A5jmzHZMUzmSeCWaJWNLBI1+sXpPT5f1+6rsHZC/hr5x33E7RuYN4q6oiLFaIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiKi/tBx5pI/C0kxa2uD6sg0epvYCz26dz0UFxjh3g4cMzGtaLduAAXh5tpdQ3I3APpS6FxrhIyg1rnuDRqto6O1McwX60Te9j1CycP4ayPHZjuAexrQzcbOA23BJ39fdYPo5yQdCrvdmo7NVvgXAWOw45BIXOc3W47k2d9AAdtp6UOpC0eJcpvnDNUTngnU4ay2tqHlIbZHoaVz4XwmLFaWws0NJJ02SLO5oE7KQWDvp9FxzCWn/AIkj9enVKVV9NuVptw3Ln3LXKuRFJI558HURRY+yQ09CBV7GhfoTW9K+xtoAWT7nqfyWRF1sphmncegVXEudmOqIiK6hRfH+GfFReHt8wO/Ta/QLUiwMxukDJbpFCtLeg7f5fop9Fo2q4Ny2jmJVCwEyqt/009pmDHMDZi4uJFvOqyRdd7o7r1Ny44xY7QWh8DiW9dO7g4Hp2odlZ0Vv6ip2OUeyjZN781BwcIcMkZD3NLvDDHEdSao7V0ta+Fy6Y8STGtvnN966M9v4SrIijbP9vTRTs2+/qqzLy4bgc0sLoWBgDhbKF7jb3/QLb4Lwh0EssjnNcZaLiNjYJPSunmP6KbRDWeW5T7c590FNoM98EREWSuiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIiIv/2Q==" alt="Modelos de Desarrollo En América Latina. - ppt video online descargar">

Motivación

Explicación

Analizar la información para participar en un conversatorio para que expongas tu punto de vista.<a href="/web/uploads/561/410a4a1e88-modelos-econommicos.pdf">410a4a1e88-modelos-econommicos.pdf</a> <img src="data:image/jpeg;base64,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" alt="Modelos económicos de Latinoamérica que puedes implementar">

Ejercicios

La tarea propuesta la encuentras en la plataforma institucional<img 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" alt="Dos modelos económicos se enfrentan en América Latina - YouTube">

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Bibliografía

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calificable?

Activo