Ley de los grandes números: Lanzamiento de un dado

¿Qué es la ley de los grandes números?
[justify]La ley de los grandes números es un teorema fundamental de la [b]teoría de la probabilidad [/b]que indica que si repetimos muchas veces (tendiendo al infinito) un mismo experimento, la frecuencia de que suceda un cierto evento tiende a ser una constante. [br][br]La ley de los grandes números señala que si se lleva a cabo repetidas veces un mismo experimento (por ejemplo lanzar una moneda, tirar una ruleta, etc.), la frecuencia con la que se repetirá un determinado suceso (que salga cara o sello, que salga el número 3 negro, etc.) se acercará a una constante. Dicha constante será a su vez la probabilidad de que ocurra este evento.[/justify]
Origen de la ley de los grandes números
[justify]La ley de los grandes números fue mencionada por primera vez por el matemático Gerolamo Cardano aunque sin contar con  ninguna prueba rigurosa. Posteriormente, Jacob Bernoulli logró hacer una demostración completa en su obra “Ars Conjectandi” en el año 1713. En los años 1830´s el matemático Siméon Denis Poisson describió con detalle la Ley de los Grandes Números lo que vino a perfeccionar la teoría. Otros autores también harían aportaciones posteriores[/justify]
Regla de Laplace
[justify]en el caso de que todos los resultados de un experimento aleatorio sean equiprobables, Laplace define la probabilidad de un suceso [b]A[/b] como el cociente entre el número de resultados favorables a que ocurra el suceso [b]A[/b] en el experimento y el número de resultados posibles del experimento.[/justify]Así, podemos resumirlo con la siguiente fórmula:[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAb0AAAByCAYAAADH5w+RAAAgAElEQVR4Ae3dBbh0VdUHcPxELARRQAQUbEUpMQEJgxDBAjEIE1HswE4sBBVBsQMDMBARCVEsREVUbMUu7C4UlPM9v+OzXve7OTNzZu7lMnNn7eeZO3Nnzq6111n/VXufVZqZKZc0lzT/zlfSIHkgeSB5IHlgYh5YZWYwr0nQS9BPpSd5IHkgeWBhPJCglxrTxBpT3nwLu/mSfkm/5IGl54EEvQS9BL3kgeSB5IG54YEEvWT2uWH21KqXXqtOmifNp40HEvQS9BL0kgeSB5IH5oYHEvSS2eeG2adN48zxpBWUPLD0PJCgl6CXoJc8kDyQPDA3PJCgl8w+N8yeWvXSa9VJ86T5tPFAgl6CXoJe8kDyQPLA3PBAgl4y+9ww+7RpnDmetIKSB5aeBxL0EvQS9JIHkgeSB+aGBxL0ktnnhtlTq156rTppnjSfNh5I0EvQS9BLHkgeSB6YGx5I0EtmnxtmnzaNM8eTVlDywNLzQIJegl6CXvJA8kDywNzwQIJeMvvcMHtq1UuvVSfNk+bTxgMJegl6CXrJA8kDyQNzwwMJesnsc8Ps06Zx5njSCkoeWHoeSNBL0EvQSx5IHkgemBseSNBLZp8bZk+teum16qR50nzaeCBBL0EvQS95IHkgeWBueCBBL5l9bph92jTOHE9aQdPKA01RpnWMk44rQS9Bb0LQ+0/TNJcUt0bXx0vatv933X//n5RZl3O9pkHPS5dLmv9MuD7LGVAG8d5wWl2aujhzOdNp8rlddPE/m39c+LfG+3Kj0QyBHpYlZPN1+dOgS3z0/S7Xr3v9htEvabYyzSalVVe9pO3KtEWPpjn//O80p5zy4eb8757fXHTRv3rL3VlQ0mYM9LqYNr+7vCjwpz/9qfnCF77QvOtd72oOPfTlzTOf+cz29apXvar5+Mc/3lx44T/bof3xD39szj333OY3v/7N5TXUmej3m9/8VvPKV76yec5zntPS9Pvf/37zn/90W4AzMaHLaJAXXXRx873vfb95z3ve0xxxxBHNW9/61uass85q/vKXvwzt8dvf/nZz/PHHN69+9aubww47vPn85z8/9Pp5/vH0009vHvGIRzQnnnhi89e//rU3KRL0epMqL5wlCvzjH/9ovva1rzVvectbmqc97WnNXnvt1dzxjndsbnGLW7SvO9/5zs2TnvSk5owzzmh+9rOfNR/5yEeaF73oRc1XvvKVWZrmko6VQH7xi1/c7Ljjjs2mm27abL311s1LX/rSkYJ8SQc5JZ1deOGFzWc/+9nmqU99anOjG92oucENbtAqCj//+c+HjvATn/hE86hHPaq54Q1v2FzxildsDjnkkKHXz+uPQO5lL3tZs+WWWzZveMMbmj//+c+9SZGg15tUeeGsUOCSSy5paIH77rtvs80227Ta4Jve9KbmQx/6UPOpT32q+fSnP918+MMfbgXKwx/+8Obxj39885SnPKV5xjOe0XzjG9+YlWku6Tj//ve/NwcffHBz73vfuznttNNaq2X33XdvAXCUIF/SgU5JZ6zfP/7xj83555/f0uy6171uK6R/85vhnoTf//73zamnntrc8573bNZaa63mJS95yZTMaLqG8bGPfazZfvvtm/XXX785+uijx1K8EvSmay1zNAukwEUXXdS8973vbS07QpmmTEj/+te/vlTL3J5PfvKTm1vd6lbN7W53u+bQQw9tfvGLX1zqunn/Ak2/9KUvNazj+973vivIwcpjQV9wwQUrvssPl6YAxWqTTTZpTj755Oaf//yvO/3SV/3vm+9973vNQQcd1Ar1d77znf/7IT+1FGDlHXbYYc3aa6/drLnmmm244ic/+Ulv6iTo9SZVXjjtFBAvYcHttttuzU477dTGRi6++OKhwz7nnHOabbfdtrn+9a/fgiW3aJaVKcB1JCaFplzFQdOzzz67+eAHPzhWPGXllpf3fzwO3/3ud5u73e1urcfB5z6FixMPP+ABD2g++clP9qkyN9f861//atyzRx11VHP729++ufrVr97ss88+Y4UlEvTmhl2W/0TF51h3hMw73vGOXsLYTbT//vu31t55553XEFRZVqbA7373u+YFL3hBS9vXve51K2iEdtyeSbOV6RX/UaBOOumkVql60IMe1NsFd9xxx7VxZ9bed77znWgu35um+eEPf9i6M4Uonv/85zfXuMY1mr333jtBL7lj/ihAixaXu81tbtMceeSRjdhI38J62XnnndNNN4BgMmAf+chHtq5NCT9Z+lFATE8WJiVMklSfwpUsjicGyIU3TlZin/Zn+RoeBxnXMq/Fkd/85jc3V7va1Zp73eterfu979zS0utLqbxuaikgacCNwE0pGWXcxArZX7Yy/OEPfxg4RyAqCeZtb3tb8773va/VLMURfvCDH7TZn+HyqxsgtLgBxWZkkorr0FYJt67y73//u5ElecIJJ7TXH3vssc3nPve5kcJv3H66+i6/Y71961vfat7//ve3wve2t71taw0/5jGPaWkg/X6UYmGekoe4RsVVKSZoZpvDb3/72xXd6UvCh1R9FrpY69/+9rcVv/tA4H31q19tBiWC4AFW0Qc+8IGWbu9+97vb7Ml6iwDr1LxYU1zhseY//elPW6tMPNjWlUFgA8jMHR/YjsA7EHygjXJdf/nLX7ZJUuKgFDEJKsccc0zbt8ziLgtZJvHDHvawNttTKv6gYr7oyZLEV29/+9tbug0at3bMlbvUGNSR7KU/PDdpCX51T6AJUHJP/PjHP27fKUyLVWRW8zTw6OAPyWlrrLFGm0zF8utbEvT6Uiqvm0oKEBxuXFmFfPwE1rjli1/8YiMbbFA8TxIMIXr/+9+/TT8HrkDy5S9/efPCF76wFWJdwgYQEgJiDje72c3auixKGmqX8OYqlOauzTvd6U7t9Ztvvnnz0Ic+tB0fgd0lKKMf2aplP4RCVz996EOYAeq73vWubYbcaqut1qy++urN9a53vTYp4+lPf3rzzW9+s7MpAtlvUsptb5B+f5/73Ke1YCS/sGRKIWX97P27wx3u0AIrof/Rj350pf1/FIcHP/jB7daSulN0s5+NNbXddtu1dNtss82ahzzkIa2ARLcogEn/W2yxRcsvBLVEHGAnY1K9Bz7wgS2YRZ14B9SAmavyxje+cbsFBh1YZNbMXtAydR6477rrrq0X4VnPelab9COh5eY3v3nrleja4wiUjMM8gH9XIfDRw3ytjy0R1j34pAvE0IDCBYBvcpObtHX0Q6maFJgAvPiauUkEu+lNb9rst99+bUKYsR1++OHttqGuOYz7nQQgtMdToTCh98Ybb9z2TaHoWxL0+lIqr5tKCgAb1ojA/xOe8ISBGvqwwRMihBVhXZdf/epXrZZ+97vfvWHlvPGNb2wtFxYl8LMlQlC9tii0wyKwT4vwfcUrXtFq44CS4GfNlYUAiazTAw88sO2T9v6a17ymOeCAA5onPvGJrQDvAubPfOYzvfsp+xz2GbgaI9raACxLjoBltQFDQrfL0iNwWTG2gdzjHvdoY4HqvP71r2+F8lZbbdUCICsjCmEmPqNdlt4ee+zR7lUrrT2WyUYbbdRaE1HPO8A3xvvd736tC5ZFhW6vfe1rW7rhCX3ZN6egFXe2DePGZ7+hvik1QMG2DIoGS7sslAep8fjs0Y9+dDsfgEngAyh7FnkbSgABxLe85S2b9dZbr7XeZAcbG6CkQBnDj370oxXdoLn56wOvsZTrwlpjqRk78OU+1Sb6BN1qXkQjSsTjHve4dhz4VR3gjy/HyXyM8QBR/E0RodDga/RAf2th/xy+n0QJjT7iHeBZQ8qFxKlQ/FjCwhlob+36lgS9vpTK66aSArYYEFRS52mtXVruQgbuRhaTocESmFFYhoQjzZ3GGUI1fndjAkYCTDZeFNo7jZwQKsspp5zSCjFBeeBXprZz5+gf8AHhuhC8+jnzzDNX/DSonxUXjPGBG8/maskso4r1INTtoXre8563YgsIsAb2YlWsctY1YcwFSAhzSyrmR4juueeeKykSBJwkpVq4cZuypNENeJZ0s0aEctANYAAzrk3jcTjBKqus0u7nDOEMzFl7QKEswEj2KqApMyq5vAlelhZeCT5gfeILVhjXsPosWgWAAkDAVYK/39AYiKKJBKK6oMMOO+zQXsOSL5UgCVk8BHU9Y5EUw8orrUfxWbxoLcYt9rNSxu5yl7u0wBsKCivssY99bLPuuuu2SshiJOJo06EIlIpyS5F7hoVJscCjfUuCXl9K5XVTSQEuIkKUdklgdVlrkwxcO+IS4Wqi1RLSUWjHhBP3HY2+/M016hPeToHhUotxiUuxFLg94zr9cE0CLm6/UnC7BoACdkK3S/sHEPrRzqB+2s4m+BMCmkuOIB5WWKtieJQBp4oYT1kIJm5BYAPsWOkUCcKLi1FfhBtwY+GWdNAWZSDS/s0TXQl6LkRAVF4f/VI8/K4ey1UMDA0BA2vL5mbu5nBL2o9ImIdSoh9gBTBY9fop43bGzQIGNuYSShcLDuizbFlTsS4xLnMGrqy2KKwnfMD1CtxLQMMDFAJ7/gAsWoTF4zp7+/zGKo+5RLusT3yKDqV1bi548ctf/nJc2usdnVm9FD5uzHA3qmxMrD5KEsusBuBeHRQXoYnxsdxLl7hL0JuVZxM/T0LfkqDXl1J53VRSgMZ561vfunWlEJqLVVgFXEbaJkhoy1EAHNBy09tLJbkhBFBc438CbMMNN2xjG0CT24klQPsN4RP9AFCuuLKfaMs71xSXUQj98jeCXz+EzaB+yuvH+fz1r3+97ZtQZyENK+YF0LgMAUlZzJ07TUyQwERDdGMpmRN6+QwkuMWAXElTglsiQwhYdVljLEq06Yqp6t94tCnGCBhYdEAL36A5K407NopxSqqxLop+AFOMq+zHHAhi86V4xNjU04+M1zjBJtqPd7Tkri3pRIFjxRHkQZO4nvAHdJQb4BUuSRYW64872VxZb7UCZk4UKgqHRBBKGqD0vTXzPk5hLbKuWbC8EGVxD1J4WLiAux5LeW2fz5JiABplxVqUxbpRLO3VYwX2LQl6fSmV100lBQjCsB4mGSDhV8ZVog03G7Aj7GV3loVwE6TXLwtsUHGz0uYJesKZVs3aKQWBflgWu+yySxtXqtsi+FlFkiskehCMdRFnHNVPXafv/1yzXIfcx9yFwwrrRaIOq4jVXRZ05qJlMcqaVAhe1pp3oEabByCSWuridwAclgNQFPvUn1hgV5GApE90A2QsIMoGS4U71ffcldoeVPRDiLPyjK8s2hJT6+I/At+aqst6LIv+WEgSfGLsQA1dAAl6l+CqLnCjFF3rWtdqE1Eizov/xI0l0nBvh5ux7E/bFCIWokMYWKZckLEO5bV9PlMG3RcSjkolDK+yvqwJt6PM1oUUVrP7heLJ+qfcGHe83BOSZ1ZdddUEvYUQOuvOFgVoe9xBkhHGKbR9Apfwq4WSdtyw4hWEfS3AucnceDRymvOgQiCIYxEQNF8aabi0wgXF3akfsafS4og23fisSjc9a6JrOwYLRj8sl7IfltAwgR59DHuXJKJdVssoNxjlgIB67nOfu8ISibYJWDEsLxl/ddG22Bs6hOu3vAYwUhBiPgAwYq1dh4RzJ3Lf2cPFGrDWUSgtrE4uP2ARcbj4vXzXD7cyi612r6E7IAKeteuXBed4O3xZr5m5iqUB0sg6ZMVIbKEcPfvZz17JhWo85s3V7hBqShTlgOUveUXySDm/cvzxGW9pV4azjMerXvWqrdWI/wd5F6Ju/e4JGyzfOu5ImWMVoysvR5crvm5r2P8UJdYrOnKZu3fMO14Ojxc7RBOx0C73dlf7ael1USW/mxkKABY3vvhJl5Y7aCJuSAKdJVO6peJ6GivNmKZeJ49wDxGkXnUiQtT3DrC0zbXGNUWDl8gBRGxNUOzBY/04A7RL+BDIhAv3FAEabtGufuw/049YlX6AbQ3YZb0+nwEZbdrGf6AzrLBexHIkbdQCiDVKoAO2LmuVZQTUpaSzruqCltr0rgBOQo9br2vdXcsyQzdCulxjIATEgRnFoIzR1f1GP6yaMonCdZQlYwZGtdXEWgUuLLnSsldPwhVrC2+FomNMaIOX0a+OAbJwuT65RIGccQFPa951rmw9D3N0HSULMOkHYMhKBi7jFLSQPMK1Geuhvj6cdYu/8UKEG0o39Tj98JTwtnDfUmzMF83jxbJl/bF+KRGRKDSqjwS9URTK36eaAlx/shdZCKE1jxowgSLrzw1K6HTdlKwNGrVr6t/d7LRNfdL2uaKAF6HCMuCSKYVsjEfMiuXBxeRGVnwnHkfYdxWJEqwML1l2XFUKASBbsUvgsUj0Y/yRFdnV9qjv0IkltMEGG7RJCWFlDapn7yJBH4BeXsf6o0SIvYghiUm5jgWniPOxHoy3BkxADwhLIBC7RDfr01UAFDcrQBKDKtsE3gBEbGxU8hPlx3qxkmo+sHYsEC5SsTFKC4XI2kte4b50TV3QiXeC0hUWP+8BALLOeMk6iwtqVwF6tsj4vQvkow9KknUyVvTVRx2zA06UNRaZPXtdY4z2ut4pbyz6iCuW17gnWGRilmgOlNG/Bv6yTv3Z3IE6GtpKUgJrfa1YHz6XyDZKKYu6CXpBiXyfSQoQNDQ+GiENFCCxJLpuMoIDKLEqCFk3FNDsKoSqm7eOL9FeCXDapZvSDQk4WTIEs3iHmEYIq7JtbcqwI4h9VggEcRxWXB3HYWFKgycM9VUWVgz3HqFSF4JcP7T52iVXXzvsf8JVHBLoEZ4l6HTVo91zuQHkslgPYwV6xkboUlDs3wuBHEkulJEo+iPIxBIJwRK4KABcdcCophtFgAWHbjIIywIM0J7FJBmjS2korwdigI37uCx4yZjxgXd8wKK3jQAfsM7F+spj28wbr7IOuf9KywTAoQ8LFE0oO3H6iH4BGVc7UAkLqhwPWuE5gAnw/U8hwANdc3SfiIlpk/U3TnGfAczSA2Ju1oQrEjhbc+tCAQSAoaz16cf8eBj6HGZuzgDYPBL0+lB3yq9xI2EWArzWMvsOXT3tDBJYfsewrpnFYvyEoRuLdcOdxdVJ2Lv5ZeGJl0hWYV1xdUkCAE6+HzRvLh+CiVYO1LRD0BFiLATuQ24qNxoXlv1fBBNBJYgvqUOdeAEnbXGJiveEICIgbZa2GVm6f1yvLwIDeAG4Oi5EqAJLAB51vOsHEOiHAI5+JllbNJOdyr0JdEYV9GBdARxWAPpyIxuHWCO3FzcVIEEDgjeADN24eSUImau5AAJbF4CjRJRyrbRvOwJQpu2zBtVBNwCNbmhU041lhZ7WD5+Muq8IVdmx1sjY9aEvWxooL9e5znVad6F52pfnOC7XWDuxPooAF7zv0JBytt9++10qy5Lyw13Lza0t/EORQgOFBUcBw5NohW+0icZA0v/copSkcIFTzsQNWXyu9fIbpYQrFVBYM22MUyhgrD10d4+pHyfwcJn6LZQV9xklo1y7QX2RdZRQPC1Bh9VPNnUV15o3XpLRCmjR3li6FN6yjbT0SmpM0Wc3o2QKsQI326DFHzVkjM59QXCHK6ms4zvaNwtolgvhTtDQQiV9iJl4/pu4DUFMg3YjyWIT9+KWHFYIRzcRa0DCCqATVOdSdNNrW4yKBSPeRShTLNyEYjW0edl7+leXECZoAABBHEoIYUZD5kYkRF3PQrGZ2J418ZfSIogx0+gH9WOcdT9Rr++78bGwJJ6Yh/mNKoQ12hg/2qA7Kwi9zZ1lZl20ydKm0QcdzIdAdw0rAh0IZZYaIV279NDN90CFNWMd0BkIohvg7UruoBSgLesASIwqBCuFBlDhA7SQvELJkngiCQmY69/3hD+hixbm7nsC2ZzxICAC9vV8KBisOFso8JbMVPdtABI64Vl9cnGiY/A2JQfYUcgoayEr9ON+wIuu9YpxAFfKGlfsKOCvacQyNI+4xyhGslgBqO0mlD59Ubzck2TQqD78LqQgQczaUEqAp2SkGsRcC0jxlDW5ylWu0mZwUhrE9rq8LOUcEvRKakzwmQbj5nOTCbyGtkWbxAjli3YrcWJUbATT0pRodIQDJgtGHneINEApzdrq0vqBHgaipdIIx3FDjDuWy/p6NBKDQXM3HyHoxd8PmKwRWvbROo2VUEZ/IEpYOGlEEJ12a53d7ASQdoNu6MnKJFRYnfpXl6XApccSqYubmOJhnVyvPwKU5Rcxn7oOoW/dzKtvP3Ubw/4naAhSYwGiXcDbVR99KReAD93dB6wyMSvArj0KgLGXBbhwbQItddGBAMSTwwqwDLqhM7qxQAbdY9xuLEcWJEWwT7Fm7m3gitb6Y4GxSrjIuQkpLO5v6xKFogAczMfvMgwpsF0F31AygJ0+KGddvEKgi/9qL3hbH4C5vp57EfABedd6qcfC5WYdxFtd4yu/A8B43Fi1STFEB/cFixV9zAHf9E2ScQ+QjeoCaYCJt33XBXruc79bc3zmZX1Y0qMUtAS9cjUn+EzQuoloZ2Ifnu/knEJBdi6d8iVGhEEIPzeHhe4qLAEaPlcP4VAveledru/Uoz1xcWDALs3XGGidtDRHI4Wm2tXeLHznhuQyc8MTfF5ubnP0fVgWfeeijvra0UYAJtrqw28BeNGmPsQa6/6HraN2o06Md5SiM0k/Mcb6HR/gyZiL8bBUCMlwBdd1uv7XjnmYg1fJ50FLdAs6lm0EDdSr6V1eV34uaaCetofRTR/m6JpxeEGdrnGVfGB+dQFm6nmhy6B7Xr2Yi2tL8CzbjHWKsUS7sW7ltT6bL74tedE4uuhf1x32f9kuhSXmbnwxZ/2OQ2Nroo72rKNxDlrLuNb81SnrjZpbgt6wle3xm0Xls+eD576wUVLWlsQEsYV4cZVJNRZPkmbLbWlRuwq3BpACjhhg0sIdIqV77bXXbrW9Ydo6dwx3hzgCbTjLfFEAL+LhsKwIL+42GjtPxjDAni9K5WxnnQIJeou4ggDDieqERe1q0A1tiAvD71w3XZmD3BfAUVxiGEj1GTZg5R+3edPeLcJrWOGa4IYzxnE0tGFt5m+zQQGub14IMTIAxy3FXSRuuBDFazZmn6OcJwok6C3SagtEs+DWWWedNnYxzMSWxScA3mVRib0BRD7rQS6OPkM2HnE6Pm9PF+birDfQ1u2I/4nBAO9RweC6bv4/2xSQfi7pQvxJkoY4kViQtPEsSYHlRIEEvUVaTVl7gq9cmxIAhhXWlL0/NbBwMQnOCvR3WYrD2ix/A5ZidFL0xRvFF1l8EiOGFXEBWZzGAHyzzA8FxETsRZN5Z+O9vYaSE8RMsiQFlhMFEvQWaTUBjH1Tjn6SMTWo0KhlFkrNFguMAnC4H+3XEg8cFMCN6we9a0e7UsdltnFZSqZxbFAfrR3wyoCTRRXp0oP6yu+XDwW4s8WAKUn2Mkpeqfe4LZ/Z5kzmmQIJeou0+uJwjsNxJNGgtGRdxeZm6e5lzM5eFhYiK8velklBT5o9K09KPaEF9Jz0EGcijpouK9HeKHtgpNFHVtaoevl7UiApkBSYBQok6C3CKknRtS9LPM85kF0JKrphOUlQkRHnDMLSkrLHxT4mp0zIoJskkUTGnX1k9gNpQ1wRADuxACDbvzaqAFubiVmc4nsLcbOO6it/TwokBZICS02BBL1FoLiNt/YzOZh2kAvRpl3HCAE8wCiJpUwDt2XAxkqg15Xg0meY+hCL8wKiin13xuYoKS5PwDisAFvxSVsdWHs2FmdJCiQFkgLLhQIJegtcSSBhf5Nz9hw+Kx4mHuIYqHgBIW5LZ0MCE7G2ukgRd6yPzM7SAqyvG/S/cdhnB1BZe+GWlCzjtAKWHgtwFOhpn6XqaCPHSI063SDGY/Mr120996BB33cnPQzLfI3+8j0pkBRICkxCgQS9SahW1GGtORFcoogHMwKX8hQWn52nJ7MT6Dj7r0uoAyonlPc5BLfofsVH8TuAUx6J5UensDg30Pl09lz1cZsCRqdxAHLWY5/i2DTn/HlUST3/cf6X2TrodIl6HICd+9X5gd7zlTRIHphfHgg5wGgYJkMS9GpJOub/BC8rzmnrjiJzpp8kkvLlNBZnyA075NihwxJOAOO4RcalE8mlmNfuSBuLWX8A2RmBfUBP/zYpA3Jg3KdIbXfkGWuznPu4nyMW2adPSTpOrnFeI1dsvpIGyQPzywP2SVt/iXjDkgkT9PpI1yHX0C64LZ25yTU5adYlcNlkk03a7QpDuuv8iWuUJWkjOktRsgzQ8hIjtBF+tdVWa0Gv7/i041EvwHhaC8aW/APUKQv5ShokD8wvDzhQwfo7HFwuw6CSoDeIMj2+ZzUBKxt6PQpD7I7VNUnRDpCxR2+c4vlYFpkL1UMrWYuSVuLlO1bola50pfb08q4nLXT1h3k8qqOvpcedwJUqqWchL/sY+8QdjRn9gXi+kgbJA8kDwQNCTsM8Wgl6XRK/53dOAnfUlz1wW221Vfu4jjIjs2cz7WWTgp7DqT1DyqNIPNhSMsnpp5++4uUUFhqQWKON8yy3YQwRYxbTM6dhboK41rtjz+JZWFtssUUzycupMZ70gHmzJAWSAkmBy4ICCXoLoKosRxaRrE0ZkqyUSYtnewElp2H0tRZtbZC84vlaQGdQYXk5AQYQAclRoOdIKm16Vlx9VNqgPsxdPFOyjKdNTPJS18b8SRWHQWPL75MCSYGkQFAgQS8oMcG7E1UcKca1KX62kOLoMKe0yF6sk1G62uUClLziwZUAbxiQARHbD1hSnkQ8qmgP6Hloatcz+EbVz9+TAkmBpMC0UiBBb4KVseUAkHgSgrR+cTPbFgBR33hU3a0nHMg+crKLMzgHgZj2ZYxKXuEKtP9t0NMYXKsdlqPHGdkSYZzigIPGaW6yIrlLxQoda7ZcC9rEWlrPePk+aFf/7v/4fdrpYpwx1kHrPe1zyPFdthQIPscnyig+WQ48laA3JvJb+PoAABeESURBVE9JzQc2nk/HHbnKKqu0L4dN23gOMAjGcQtwcWKLFHyPACKAu4rN4q5zyor9bx4H4xSYrtPw7Z076qijmn333bd9qruxSpbhirW9oKtISPHgW8ek2T4wCFC76s7Kd2gr/smdag+jtYwXa1uM1G/2HTpLNX7z7n+/W4NptoJlFVtH7vcDDzywzejtm8Q0K+uY41wYBcTO7RuWgCfVX8Y27xHe6SqUZ/kCnsaBpxxK3zf80dXe5fVdgt6YlHcwNGBynuW2227bnqLiJJXtttuuzY7kPpwE9JzfqS5r7/DDDx8IemJ/TkuxPWH77bdv9tprr3ZDunHVRSwPI++4447tK8ZpP+FJJ51UX97+b+xugqOPPnqik2E6G52yL23kt4b2LnoUlHin9YzXBhts0Coya6yxRvuYnfjeu72La621VqvwnHvuuYsyM4oG4UOAhMa90IbFWD0X0fPxKDuyemdRQC2UDlm/aeWRFP76dCWgd95557UKEf5Ye+212/vCkYhdReKePccUwytf+crtNi0gOGslQW/MFQMKNGbuSJq+My4ltIjvEaa0oVEugq4u1eF2dIyZzdYYrKtwbdLE9OWlb0eAdQEtYepa47zgggvasRqn/7vaNwbfc2va6L5cCyvXOaduXvOUEGQ9vZxAQ4t1jqrnGkr8id+8e6q8WKd14mJejELIyHylzFizxSisWWvP0rf1hKIz6ZmuizGebOPyo4DENEqe7VClbPI5TjWSeEbZE9YY5BGgkDnsQrLZ1ltv3SqEDt2YtZKgN2UrxnWKAT3MdalT9x3fQ8h7plrX+aBTRqqJh+MRTja0c0XXmbKAgfuX5nv88cd39uEadbus684KQ74kdE477bTW2uSG9v9iFolODicAqhSfLPNHAaEPh1dQ4krQKylB0cbzJ5988kjFy1nDe+yxR6s09t3SVPZ1eX9O0Lu8V6DqH+iIw3AvLnUSiWPSPIlBjHCQX78a7sz9y43MkpUAVBfWkWPUnB+62WabNcPcl8ByUNy1bnfY/+gsPig+bD/lYio64rESo2jlHis1yUHmw8aev80GBfABRfa44467FOix3rg9ucEl5fVxgYv3c/VTHPtkmk8blRL0pmxFCFMWhtgea2sxBGufKbIwAC6GnkXtrc8cAQpgl+DBxVnHz9DAEW428tNkuTO7ChcPFzG30UKLdlj2YrO07MUs3OXmYauKGO5yTEpaTHot57ZYeF2yBM/jDXF/SVpdCXElXdwznrXpxCeZ4LOoSCXolSs6JZ/Flez7Y43Yv7cUxYkwxxxzTJuxuRjCfCnGPG4fYp9nnnlm65p0s9auHvPef//922PbZKY5sb8uYm6AivtZewstko0kJHFt+ryYhfIC8MTzFjNJZjHHmG1dvhSgwB155JHNrrvu2hxyyCGduQHlCLnId9999zahS+JdF5CW10/j5wS9KVwVjGi7AE2K/5wLrLZKFmvYND37Aj0tXVC6jnEtVj/T0A5QA1ZdYGZ8LLsddtih2XDDDdsM1q5kH9ai9XDzc5XWRWIRS1LSgAPIPX1e/C8AVpueGegkeIkrBxxwQHPta1+7dalKrqHsECZ4oC5iiR4dpV3uyrPOOqudD4XFbyWPGBt3FletbRldY63bH/U/BUw8VP9e5tl1Vipr4YwzzmiFKFc9d7msYyBMoRtkTeBFcxfX1r4DEvw/6HrjpSiIW7oePT3VAy2GFYqLdiVtlP2Mq8RIHkMT96m2Ig5u7U444YSWB8xh0Pm1eAJdZEsbh0zrY489tlWqho3fPYq+tg6oJyRx9tlnr5ScFnMEZHiKstfFU+4FXiUxP252blC8q45tPWViFd4nI2Q7U6Qof4OKeLcjEWOM+N3DqYfxocQwYR1zcjKV7RPxMOxB/UzyfYLeJFRbgjqYzU0kW9AJKV3ZmYsxDEKYUMLg8+z+orG6SWU6Oq5NKjYh3LdYH4BKgO2zzz7N5ptv3u6JtJVFtifhhr6EjKPjbB9xqAHAcxi4U330La5iq0EZU9W2+s5DpZFLONh5552bgw8+uH3JzANApdYts5fA23LLLdv3vvPous64CVVgZKsM15ax2rcohb3kG+MGtg5DQAOWJmAX/5HxChy6UuLR+pxzzmkzl9HfflK0IADRtS6EJ+UBTYzJ9baToA/LhbAs6RH19UMJkbgRaxT9oPE4hfsY4IqHyfbdb7/92i0AFNY4h9b8AZ+s6VIpAUDubUqBtTT+TTfdtLWitIlPuu75mLc9pOLO6tk65Wkj5ZYECgb+cBC9A/F5MPB3XcTk0EzcV/yXmx3PWGOnTaFV3AfGDOCBHpd8F4iiOUWAl8o1rjVG79yi1rgu6lA4AaRYoesdpGE/LLnURYe6jXH+T9Abh1pLfC2NjhsOo4elsNhDwFBSlGfRN7+YtCDAxDPXXXfdVogSzOPQ3D47gpQA1g6BRigDQVlzklQc9k1bJgAJE+Cw9957t+BHu3bCD0WHBh0atjEQ+jYPO4gA8IhHAmVH1hHcgJWFUAoH+7JsvfDYK8A0adGm/ozTFg/zYWWYm+dImnMANBqyFHbZZZd2zmJFLCogvtNOO7WPzlKn65xY3gaPwUIrAlP7lDGgILu1LISkMey5555tHIr163p9sVAIS+fAdlki+gGkZT/GqZ9TTz217GbkZ+uinuQnAOFpJgQ70HLABEtcfB74SJ4K5cDannjiie0BE+pZO+PHM/gEoGmja+sA/kBDgCIcoZ71NY7YPkBusJjCWnPovDXBQzVPS9aiZNh7ql+0F9s3XkBJWQllwDqjHZDkwQgwLAnFkgf4QNS11g4dHMyPT/FvXXhHjjjiiFZRAnyuNxfXosMw67Buq8//CXp9qJTXLHsKADluHoeHE+RdN/QgIqgLgACMG7W0ZLh5AIGEEjdwWWi3YodiJARNV6FNEzxxGHkJGIQZq4+mDwRKgcbasFWBxTUsC7Wrz/I77RCGrDquzVIQmzMriVWpSMQhXF1bAggXKNBcf/31B54MgzYEJQAIi8jcCXdKRFnQClh4KDJ3ZumW5NoEHNx1lIi6dPXD26EfbsK+xdi4DIErq4x1ueqqq7ZABvDKuDgQYP3HdxQWSSNARVihFOrctUANvQBIXbggrbe1j8KqRQ98RiGggBkXJUBhXVGY8HfJI+ZtnyrLCiAB/1hfY+KRwEOxdUc/zvCl2LEaSyVLP9zQ+JnF6kQjil0UgMnidGpVXbh/uUspPRSnKO6lgw46aKX1jd8W8p6gtxDqZd1lQwECBvhwU4k/9C0EBzBwDB1XW5fFHMkqwKsshCOgJCC64j6Al9arbW6nEvC0Q6iw9Ah/R86VRTzEMXVcn5PGRQggYyasCOewPqMfgpUQI9AIfsKdi1HfhG8U1i0Xp99YOKWQj2vQzuZodcNtpj+aPytBIbD1AxSArba0XRdCmlvR73Xp6kcb+mGx9S1iutaGQmGdWOoUJu/1ViOKB0uXAuRlvYEMyy4AvuyXlcUtGaBV/gZUNtpoo7ZugCjQ594EhD6Hl8HveI9VSwlA27JQuliIaMnSqov5WTOAroi54TfAx4VZAigaGC+6u48oOlEogTa02//KkqwLJcZ9R4lCn2jXunMNu8cWsyToLSY1s62ZpQCtXZzKTSs+1rfQogkVmnTthos2AKr4C/dSWbgK9UfwdO13IpRYLQQNYR3CQBtcWDRxwkLMsAQZbjTALSHHiSy1Rl6OYdBndQhRFiqro2v/FgFFuOmPQGUVuL5MJDFmwlIMU1yHFVLOI/oXKwJ6+qJEcB2aIwCJRBbgpJ/ddtuttZRKizra8c7icbwcQVuXsh/XdfVT1+n6n0XEfUrYGydQp2Swdsv5+Q3giNuxiP2OV/BMCQxlH44hFO8Vz6oL60f8F5ACaaAWdAJy2mThchkqLDltUX7Cios2KVosXCDWtV2G23TjjTdueUgdlqD/KTolv/kNLbgzJU6J3QIqtEFfY+YtAJ61cqYut7/7I8AX2AJvShclp0sxiDlM8p6gNwnVss6yogABT9CKyYhXcOn1LbRRwt6NTvutC6uGxSEwL7swij5ptoQzF12X9SPbjSUoUaIWSgS+xAMJB8CzLEBHbIkgERebpLCyJMLYvyX5BMANKoQbcJaEAMBLaxcgsrw8kJhwJcS6iliV39dbb732ocxoyqopaYpGsvqMiZsvLMKyPeM0bgpM19y7+mE5lv2U7Q36bF5h+YqfOgCeexaoRwF+2uUOFA8l8Flk5gZ80a0uQN66chF2ubwpZ/gBrwIzFiSahNIE+IAb/mLhBxAB+LpwswJggA14ygJwWL/4S+wQsFKkNtlkk5b25bU+U+xYr86z5XIH9Cw78VVj4LbGs6VCEG1QBszZw7jNCx/ZwtMF+lFnIe8JeguhXtZdFhQgaACQYL4YgkSTvoVgINBZXWVsKeoTPFw0BCJ3YBTuMXEd7qNBIGu7CkvQmMrMPG2ow63JgirjO34jGP1G8AxqO8Yx6B3AiBMBGMKnS0BHXYLWXLbZZptLbYIHQjb8+43wc21XQTvAzvIQswJ+a665ZhtfBSoKwasfglqiQ4BO2R7hqw0xoi73oH64lV0jTlr2M8lZqsZAqRHLFLezrlH8hnYexmzuAND4uf94CGprST3fa0d7km7qQmngiQAmeGqdddZpD4oGGqWFrR5QY3l7yb6tC4WNcgA0wzKMa4CgPmzhwU+8Diw8FmtXYhTrkhV4zWtes3WH4xvgrI548zBrDW+ZN6WQQgDMZTTrC/266BTjnOQ9QW8SqmWdZUUBbh4A4ZR5Lhhact/CZUmz7dLKtSHuJmEBCJUp4wQyC4BlGS4fWjABEAJCdqfTYQArgV8WQEdAEEzGrw7rwzthRuCwlJxAYz7xW9nGsM/AidAZtR9LGwSxDfYEZA3OrA77D7XDYjA/YMBVaVzmFXE571yZ4RKjTHB5ctEqriVMAcKgOCWrktVlXbj+FP2YT90PkON6Ez/Tj72P4xZjkmhjLbmgy0QMlqjMVVYLSwfosYbEZwdZzhJttCWpI2K4hL7xh/A3D+DtCQksR1YhwJHFGgUfmJvf7P/jfkQHykzwl7GJD7ICawuMW9R6oiMLjfJk3NyyPBDBb9pUgBNe5ZkAgNadMsnqD7qXY9OfseBLJdbInPEvF7btPHiny6KPtiZ5T9CbhGpZZ1lRgEVFa6Zh1lbTqIlKSqAtA5euQoix1gjucO0RAgCAcOMWJRwUbh7gGQLRNYQxAVQXCQFco+J5EklYGBIY9MENZa8VACcwWAAAt3Q71u3V/4vJADLCJ4RkfY3/CS/gIu2d4lALOFazdgh7ghPoSbMHOIQp67fM8os+WBaSQghSlohC8HN96aerEKAyFCOb1fUKpQKgDeqHS1Y/daJRVx/1d0Da1hBKhphXCHHXWVeggUe4Pc0XL1BUugogE6ujzKBVtIVWEk0oA3XBd9yzxi8WGAXosBjxJr4AKhQSvB58YNsBsOyKRaOFWDLr25pRwCghwJhV6KVeZO7iL8rfMMXBGCgF1gVfCinYxF8XNMXzQgLukbgf6usm/T9Bb1LKZb1lQwEaMgDhNutK2Bg2UXuhCFmablmAARccgUc7Ll1nbmruNVZLZBgSUjIkCQKfFW4kgidSxqN9wkvCB9dcxPrspVNXIgNBKw2dS8s4CDrgMihxItot31kwLFRCpxx7XKNd7jdavwxGtHN9CXqElTGFxk54ij0BbHWAH2WjK2vS3jCWKlcgK0lhGYiNdWWyEuSus11CfLG0DigSMlApEXUp++lSLurr6/8pG2gE1M0nCjpwLwIegAXA0J8lhE61C92ac5GbGwutdN0CUxm83LJ1AeSyZlm3rosCcLk1AZXPwEYSEJDBf4q4ItADaFH06zouWbG+4BnbOQBrrAXeYuHG/QKk8QCvRGntRrvWB4+iEd6iqBmf2HNd/IZmFC6WbCgv9XWT/p+gNynlst7MUoBA5EahOXvJLLvCFa7QxnjES3zHFdXnZqNFsy7EI2i+6rJ8xChoywQ3cAg3EKIRAAQlYCLo/E7w0NSBZ6RoAxRWASEurgJ8xLdcKx6lPqA0BskshLsxs/5YekBTPAXIAL4Qdn0WjisNCET/hJW56R/tWC7cUDIkWRtce+gIoJ0Ggn5cuCxZyQneAR0QVI+lYH6An/vN3LTvJZ7EWmXREX6xydyYABdFghAmaF1PCUB7sU/1akDRD1BCx2H9RDJIH/q4hgVsnbUNlMzN3I0JvfXHWg0Lk7C3HcH4WeHoEeOn/LAYu5QT4Ckmam7l+PUNFCQAabd0+eI37UlmMhZ8QrlAGwqL4ntAJe6Gh7SN/6wjpUwWZVzLKmTJeccLXKL4K/pkmUsgouAZi3nF3PCLtbJhPqxKVi2XPyWFez6uF5PFd74Xp+TCHeZp6LtW5XUJeiU18vNcUICWSvAAhjiNwtPFV1999fbGDlddndHWRRwASmDY0C7lWl3JJQQJTboGPG2wWGjz3Dey46Tyq89qYx3FTU4wAGFCjZvKdbR6Gj3BInPPHFgxLE7XqxvbB7RPIBM2tO8SeLvmUn5H2NG4afay8LjlzA3Yop02gRohaj6EVYAt65RFI2Ykg5LFwOJQnzAT8wFgrBug5mSVoJ1rWHdS7LmGCcyghzGpQyiWY9IXpYMy4Pq6sFaG9UMpKPup6w/6H70BibGLfwFdVr85cHcCPSCIPorxswwBBkvKdV7WFzha63AXln0CY/yijrWOeubNtUkRsA5Bp6hLEQr+wjfWq+SBsC7FlSlQ2maZytYF1OFe1R4ApISIEQJ4YKvPsEi9U4jwofhtjJFyF9mbAEyfCkvYfLlz0S6upwQBawqg+y/ajzktxnuC3mJQMduYKQrQaMUe3Fw0WgKWVea4KILLd4RQnZQxaJIsM64nGaDqaodgq7Ppoj7hxBICitw7LEXgEq6kuM47IcGCADQEF7CjVYvd0bS5Mgm+OIJKHVaU9rRrXiyKSYu2WGZA3Nz0h3asj9KNBcRYAIAPXVlvwI11SXgRhuYACIGpAgQIdLQyN+17ibGxCEJA1mMHDFzSUQe4sJQiZlpfrx/WIjpGnbKfLrrXbXT9b+yEPyXHvNEcfbTNzQcougqARQeKjmu1weoCol0Fv4hLWnv8oo6XrFiW2aB5cz1aK/xIIYjYcdkHGlMujAXvszTDZVlexzvhlB2eC3Os3flxLWADWDFG/IfueMA6lMV8y/tGHWOl1AyKkZf1J/2coDcp5bJeUiApMNcUEA/k/hWH64q3zTVxpnjyCXpTvDg5tKRAUmB6KSCGyn0sjsW9m2U2KJCgNxvrlKNMCiQFpowCMiEdu+Xwgcsi9jRl0102w0nQWzZLmRNJCiQFLmsKiF2K1Yo52jbyf//3f+02inj8zmXdf7a/cAok6C2chtlCUiApMCcUsO1AwoqMR/sk11hjjfaRSbIrs8wGBRL0ZmOdcpRJgaTAFFBAqr3sX9mQ9lgCQO/2oWWZDQok6M3GOuUokwJJgaRAUmARKJCgtwhEzCaSAkmBpEBSYDYokKC3qOt0SfNfgv4n35ukQfJC8kDywDTywL+bS5rpfq2yqLh0mTYG9KabmDm+XJ/kgeSB5IHp5oEEvQTSVCaSB5IHkgfmhgcS9JLZ54bZUwOfbg081yfXZyl4IEEvQS9BL3kgeSB5YG54IEEvmX1umH0ptMjsI62V5IHp5oEEvQS9BL3kgeSB5IG54YEEvWT2uWH21MCnWwPP9cn1WQoeSNBL0EvQSx5IHkgemBseSNBLZp8bZl8KLTL7SGsleWC6eSBBL0EvQS95IHkgeWBueCBBL5l9bpg9NfDp1sBzfXJ9loIHEvQS9BL0kgeSB5IH5oYHEvSS2eeG2ZdCi8w+0lpJHphuHkjQS9BL0EseSB5IHpgbHkjQS2afG2ZPDXy6NfBcn1yfpeCBBL0EvQS95IHkgeSBueGBBL1k9rlh9qXQIrOPtFaSB6abBxL0EvQS9JIHkgeSB+aGBxL0ktnnhtlTA59uDTzXJ9dnKXggQS9BL0EveSB5IHlgbnjg/wE79L5tQQuZTQAAAABJRU5ErkJggg==[/img][br] [br][br]
Biografías de Cardano, Bernoulli y Poisson
Preguntas:
1.

Informatie: Ley de los grandes números: Lanzamiento de un dado