he buscado mucho material acerca de como resolver este ejercicio pero no logro dar con la respuesta, que tipo de probabilidad es, si continua, discreta o independiente y a partir de eso poder resolverlo, bueno pues me gustaria como pudiera resolverlo ya que tengo variadas ideas pero no se cual es la correcta, si multiplicar o sumar etc, les agradesco de a ntemano porfavor, quisas para ud puede ser mucho mas facil, pero para mi de verdad que no, por algo me atrevo a pedir su ayuda, y asi poder entender este ejercicio, uno de los mas dificiles para mí.muchas gracias. espero puedan guiarme
[FONT=Calibri]1. [/FONT][FONT=Calibri]Estudio del mercado de refrescos[/FONT]
[FONT=Calibri]Según un estudio, se prueban tres sabores de refresco A, B y C, entre hombres (H) y mujeres (M). El estudio permitió construir la siguiente tabla de probabilidades de preferencias:[/FONT]
![](http://forum.lawebdefisica.com/image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAfcAAACOCAIAAACjTdbNAAAgAElEQVR4nO3dV1gbWYLo8Xa75+6+zdt++7Czb7sv2293dm73TAe33TY4te1uh8Y5YZxtcMIRYxuDAWecTc45Z0nkLDICiaCEUM6x4jn3AbAA4w4jcJXo8/v0YiRBuVD9VZw6qvoEIgiCIEvXJ0wvAIIgCLKIpiqvVCrFCIIgyBIyq/Lv/g0hJEnyI7/VIAiCIAvi/YDPrTyGYZ999hmO4wSCIAjibT777DOKoj5YeZqm//Vf//WTTz75F+QP4E9/+tOnn37K9FIgCLKQPvnkk1+q/GToP/vsMwDAQv4JgbBSVlbW9u3b0e8aQZaSX9mXh6jyfySo8giy9KDKI26o8giy9KDKI26o8giy9KDKI26o8giy9KDKI26o8giy9KDKI26o8giy9KDKI26o8giy9KDKI26o8kygcTtm1jv1M29Gl9VJUTSAEFI4YTXNvlfv1OudVgdJ0hCQhNX83r0m3EXQJI5b3nuixUYQFAAQQoq0WVzvf1uDlcApACEENIXZMZNxcnkwm4uiZr8uAEW57C6TwanXO/VmzIHT9MwHAEBihNXkNEz+XDuBU+iFxQxUecQNVZ4BtLH2fvnub+K+XZXs45vi65vi65P8/Za8S88FPQonAUg5r+nszoSvVySt8Unx9X13y7oePzpsIi3dXZcOpvzjm8TVM+892ljQrRdV1R/fPuuJa1alH7vaWiUwW0lASQQ3AjK+/jrx+zUzv23KplvdTVInoEnjsDgrumT3T6k+PimrtxfdShwWqlzEdMhpwiXvEaZHFu3ZmuLjk+x7uCKmUD5uJKbeCWjKqVO3FDVe2pP1g0+Kz+rMc2FtFf1mE4ZeWwxAlUfcUOUZQBtr75cfPNuY12+jJ78CnOLqlvM/Z51/JhwyYXJe09n9pU8KlXr6/ScDS3fXpYOFt1Nl4845vzVSWlV/fE/Zy0qNceoeyjo8+PBk5s9X+XVjTlIiuBGQe+nN6Ihpnu9LasZenC08d6urWebAAaHp6b17MC/o8WC/GqchhDSuqGk6dbD4duLoqJGggENS3Xx6V0FomlRqpQAE2IT47ZX8ozcay3rNNoLG1IqyZyW7TnEzWg1mHL26PjZUecQNVZ4B71ceQohpSsNKA4LbqkRW2YJVHkLoGsrlHvavSmw0mH+p8qSC2xBwpjatzWifei42lMPZd4iT2mq00ZBUj8acKrj0XCTUkVP3A1tnfMXe03UFvWYnbqp9XLI3sL643+J81xZMWxZWdPg6v0niRGe4/chQ5RE3VHkGzFt5ysC9V+5/vqVk0CxdyMoT4vK6owcqYnk6g/gXKo8N5XAOHKqKr9OZpzIOLD3d105Xv67W6HBCVlF3+ExdTrfZ4f7OwCXsv3mm8lmZakIkuLU/90q8RGKeWRbK1N56YmfZK57WQPxzawr5J6HKI26o8gyYZ8SGxo2KrFuVdx4L+jSuhRuxARRu7UjmnAxrrxTa8F/al6c0za2BuzP9b/I5PXr5hN1gxuwOAidpACEERm548a5LbbwRx3x75bS+scl/Z/mbOp1p9t1AKQo/kH3+1diYkZrneciiQZVH3FDlGUAba++XHzjKi+WqZOOW8XHLuFjVkNUQfLsxvdlgpQg5r+nsvqKwhNF+mWV8fPqmsJsdFD1V+fzgZ0MdI+Z3d1kcFD1Z+d3FkeniAfnkswz9dZ33gqpf5I8r7BQlEdwIyDl9v79RYHJ/23Gr3koQNAQWddmTin2bk79fEfvFP9JP3qx9ldBT1aHT2Cma0hYHF5642981gc33QiFGC6v3bq9IaTVa59ztnEg5mXPgbn+fEo3Nf1So8ogbqjwDJufYrEhYvS598+aMjb6JX3+ddiyil6+YHL+enGOT+N3q1B82Z25+d9vOSa7RmunJyqd+syplw6aMqbt2cNPqdGZASqvqj29PXLkm9YfNGZs2pqz8Kn77mYaSPouNhBDCyTk2K1Ymr/8hw/1tN+dFZMtlVhpCCDHrcLe4IoF32j9n86Y0n+/ivvAtfsnVGF2a4uDCc/cFfSp8vv/PhytPafIDc34O6eErXOgV9jGhyiNuqPIMmDViQ+p7+iNOZO0ObqsatOM0nKq8pyM2ANfJM24WbNlTFV+vMxMATlX+g3Ns5sLMrYlVe9YmHY0RCbWq0isFP1/uaBDP/pEkblBZtWaHqIizb0dFUovRMmeJMGXG6bxj0YMCNdqX/6hQ5RE3VHkGzBmXB86hooZT27IvvhANmUiwMJWHEFLWgd6bRzJ2X+U3jDlJ8IuVB6RFY1PpMCcx4+iqaiT6aNaR6MF+lb7xcdmu8y2VQtvMw6i0fPDWobxr8eIebvPx3aUxVRrd7H19UjIQsi/3WpJUbkHj8h8VqjzihirPgLlHXwGuEsddzV23l5PQqHfQC1V5CHFj3fMKP9/csCy5wgV+qfIuVW5w4aGrnQ1i90xIaBQ/P5539rFwUOvSNrWcOMWNr9eZyHc/lDI0t504xElsNBiVY09P5gU+GhpQE+5PwwJ8vKo+YH91aqsRRf4jQ5VH3FDlGTDfp6KExQ2nf0w/9XCwT+dauPnytHWgN/RI+qZzbRyhHfuFmZTA2va6au/OipcVSpWDogAEJG4c6Lt9vOJZ4YTKSQOt5NX5/GN3uhtH7C4KAEA5jcrsm8WHbnW3yFwUxIaLao/5l78on5iwUTSAgCQsCnH8laLAh4JeFfYbRoiQhYQqj7ihyjNgnvnyAFdJEm/krd9XHVevGqxuPLuvMPS1sENkGB5232Qap4Ogf998edzY8LJi19rcO+lyiaD/ekDOyYgebqdu5rcdltnNLtKlGH19tfhIEOdVkbhLoBtoEby9WXzhyUCnYrLRhLa9K+RMWcjjnhq+WjggLXxZdeRcbWabwTI5yIMZap5VHTvHeVso6RXoBpoGEyOK/W+2cYV2F2r8R4cqj7ihyjOAtvCTGkOiurkjjhkBxGX1neFBZRFpw43VnVHBBX5+ubNveRdfCXtVmF049Cik9nWZSj13WiOlbOm8e7Uxu9kw4ygowMTDT0LLT0X3t7YKnt4u3z332+b6BXdwRTYcAkynbctvvHiqwM8v129PxaOk4SEdNuOwKaEbEefdrzy5P8/PL+9keHu1wGKfMY4PMetwc090YPF+v1w/v5Lwt4NdEy60G88IVHnEDVUeQZYeVHnEDVUeQZaeP0DlASDsDqVEJxBoBYM6ocRqmpo4AEjMOTGkFQjm3HTDYruDIEwTBuGwWe/+AAegcEwr1Y/IHVNji4DG7Q6VTD/5nUVSq8lBevWfpKjyCLL0LPXKA0BYTJ35LXcCc3ftK9i7P39/EC+hXKGyUxAQRvHgne/efrU+a+++gn3vbgdKzoUKRAZdzeO89esLYxrMk7N+AYWr+wX3/DMPRwxKMQAoyqrUtOS1PbxZtGtf/p6DBYcv1qYUS8UmwntDjyqPIEvPEq88IFzyhsaAzYVPKtQmGpBOS29h3cmf8sPKtC5AGMWDdzem7klRznPSJQrX9vZc3Zr6w4mOTiMFIe3Uqkoi8jftr62QEhBQDo2y/EmZ/0FedoveQtOEw9xb1nLLvzAkQTLhtdMIUOURZOlZ2pUHuNVQ8yR33ZkeydT/kXaZtCW3M9cf4w9hv1h5CCiHpSer/Mf1WVczlWaXfZTXdGJ9zvkclRNC2mUTVdYd/bH4eaMJm34C7bKLqhpP7Sp91WHz0syjyiPI0rO0K09jJm1xaLqPfyvfMDWQQrscorKGoGB+pwn/xcpDSJNmycjzgPQftlZnNghjL2TtDOroMtMQAqdOXRye+9NJvmDWJGXKMi5NuJKz58GozjszjyqPIEvP0q48IB3WrpTijT5ZV94MNXeqevv1Sr3daHK5aAh/ecQGQgghjTvGahr9feLX78jYvrU0tnNyJ500SUeeBWTui5U7Z/843KDjPinYsq+p1eyVmUeVR5ClZ2lXHkKatEhGXl7M374lbf3q+K9X54Y8bnzxpqeq3+KgCKN4MGxt0o8R/W18Jf/drUcz5D5nHmVXjaedS/rfvyf9dKlndHK+DcC1Q/23N2cczlDNeXugbObOtPLN26tKJF55ORxUeQRZepZ65SGEgMbM+q46Yf4rztGA4sP7szesSvA52NCkcRnFg2ErY7/ZnBdwtOTo9O3YeW4EZ/qUIYByapSFt7K++EfS1itdgskrnH248sBhHcir/mlbRe6It1Z+xYoVXARBlpDly5cv9crPBCiHSp5xLXONT87DFtOvjdgAGrOPcJoCvk3cvD3zx025YSVaBw0hIPTDg/f8Mg6mTMy5jAJlM3emVvy0s4ar8srT7mVlZf37v//798iC+s///M///u//ZnopvNif//zn//3f/2V6KbzYsmXLlm7lASActpFOlVAz4/wapEvZ1LR/TWYoV//LlQc0aRobfRWY8WNAXVmrMCYgbcORBp4CB5C2KuXJwVk7I4c1s1Yd7dQoC+7mbgvsFnrnxXDQiM1iCAwMfPToEdNL4cX+/ve/NzU1Mb0UXmxJj9gA0jQmuLUx1T9u3P5u8UlM3d56bG3ug1/ZlweE1dgSV7plXUEkR+9wWPvyOX6bM068kepwmrCYWhLLd/rxSsSudysPUJiqb+DeifwLuWrXR/n/LThU+cWAKu8hVHkPLenKQ9qpn8g8n7XxQANnzGrDAQC0S6dtTuX4+zc2qV2/UHlAYsqe3lt70/cG9w67AIS0XT2RfS1rw0+VKf12ChAGkfDp0bwT0QKBykUAQJOEQSwvjak4cba5VuGVg/IQVX5xoMp7CFXeQ0u78hCQuKqzO+RYYVBEU1qpuL52rDipIexy5WOuAQdTc2y23O6pa5A1uG/ytg7N+PhEfmiOz/aK5L6pPwMA7pQ0tJ7Ylrb9zsCYnQa4U9bUGXqqLPx1b1m9lMcZTHjKvXmhLqPDPO81j70CqvxiQJX3EKq8h5Z45SGEgCLNY9KS+JrAwIrAwOoroR3cXoMFQAgom1qeGVwRGDjnVn3zTmdj32jsZV5YvFQ749zcuMXYll5/PYxfryAghIDA9SJx/tuawMCKwAvc0BcDHWM27008RJVfHKjyHkKV99DSrzzy26HKLwZUeQ+hynsIVR5xQ5VfDKjyHkKV9xCqPOKGKr8YUOU9hCrvIVR5xA1VfjGgynsIVd5DqPKIm9dUnnBNDCvrahUDUgf2649mGCsrT9tVWn6TuKpqbPom5Q8Y9Q6KhafZY23lAeZUi5V1PHFV1VgVZ3xI4cBoNm47qPKIm5dUHuBKWXpY3opvsi++GJGx/mPGrKw8ISmvDdiftedoxaXL3MuXOZcCyy5fqc9o0GqdrOs8OysPXJa+0u6E57yLlzmXL1cHnS6/fZ/PG7I6KNa9IFHlETcvqTyhbO+9eyL562+SDwe38aRs35tnb+WD63O6zC4IIQSEaSL3dtGxG/y6EQfbPtTHxsoDXNnUcmpX0aNssdhCUoCyykcTgrL3X+3q0uBs6zyqPOLmHZXHzW1pdWeP5B47WXAsoPI5T8/y80l4Q+UhhIS4rO6IPyepyWBl2e+fhZUHNkX86ewjD4ViCzn9tw9l6W49sj43iqe34exag6jyiJs3VB7gSlna3dJT11uyc9tuBuRffD4iZfegjZdUntY0NJ8I4CTU6y0sW53sqzywdjXvX1uU1Dl7fMalrXjY9JKns6LKI6zlDZUnlG29d44XXno2LBwefXst/8DFNq6U1Z849orKU05T45uKo5eaS/utbHvTZF/lidGsYt/NnAqpi2U9nx+qPOLmBZWnbD05DWf3lkYXqax2fc3b6gMHKp9zDWwetGFv5Y+X3HjanVMoKiwU5iY1BPnlXXszOmwk2fbrZ1/lcUFivo9/S7sW+9DFRFkFVR5xY3/laYumIqbqVGBjkdAJACap5V87kHfxGasHbdhb+QPZB89Uh9yqu3Wr7ta1ioDdhddeiwa0ONuugMPSyh9obtWgyiPehvWVpy0iUcz57K37Kx8lCfLyBlOf8U78nOp3sY3L4pk27K38jBEb4LT05PEOH6t4yVHrMXa9ANhXeUKUXujrW10+Z8QGuCSNI2V8o5Vg12xUVHnEje2Vp53CirYrB7P3B3LDwhrCwhrCwmrOH8nZvr/yOZe9M228ovIQAkIyGHYkJ+iZaEjPrr159lWe1jfU7vApSe+zO2euKlyZuD91z5PRCTu75lKiyiNuLK88bdaUx1QcOVWX3T997S/gGqlqu7Qz58KzYQlbB228pPIQqEceHC+4ECMa0rFrHIJ9lYdAPxL+c3ZwkkzpnmRDWwc7gzbkPWs02Ql2vRRR5RE3dleeNgtFMRdyD1/vbFW/++AOpe8TRJ/M2BPcXidn6Uwb76g87pDWtpw6VvGsXKVDIza/Ctj4b8v37K9Or1drnBQNKeu4PPtm/p5zHXwNzrbj16jyiBurKw9cI1Vtl/cVXI+XqmdsRpR+Iv9+8Q5/bmK7hV0DDdPYW/mjRZej+SmZA5mZAxkJrY/uVl5/PtAhc7JsT5SVlYcANyjyo7jhkXVPEnrTMnqe36++fKmxoMfsZFvjUeWRmdhdeUzROZqdJOAN2WYNKFAOcasoNWmwRmhn10DDNFZWnjIMjmTEtkRFNU/fWhILRnvlDhZGipWVhxAC3KDv4fU8edQcFdUc9UbQNGrD2DUgPwVVHnFjdeW9Fisr703YWnmvgSqPuKHKLwZUeQ+hynsIVR5xQ5VfDKjyHkKV9xCqPOKGKr8YUOU9hCrvIVR5xA1VfjGgynsIVd5DqPKIG6r8YkCV9xCqvIdQ5RE3VPnFgCrvIVR5D6HKI26o8osBVd5DqPIeQpVH3FDlFwOqvIdQ5T30K5UHAISEhCxbtiwE+QPYtm3b//zP/zC9FEvNF1984evry/RSeLH/+I//OHjwINNL4cWWLVv2K5UPDQ399NNPbyF/ADt27Pj888+ZXoql5ssvv1y7di3TS+HF/vKXv/j7+zO9FF5s+fLlaMQGmYJGbBYDGrHxEBqx8RAal0fcUOUXA6q8h1DlPYQqj7ihyi8GVHkPocp7CFUecUOVXwyo8h5ClfcQqjzihiq/GFDlPYQq7yFUecQNVX4xoMp7CFXeQ6jyiBuq/GJAlfcQqryHUOURN1T5xYAq7yFUeQ8tROUBwGXDT+7zGybc190ENGXo7rv/cEBgBdOPop0qdXNJR2RkU2RU84MEYafYhk/9DMoxJnoU2fzo+bB45vXjacohF8dGtjx5I1YSlHVY9CiyKXL6Fv2wLYU3obTTEAIKc4iq2yNn3BsZ2fzoSU9Nv8kOIAS006iufNQ0+wFNkVGtLxNlatrz1bhEsK/yALea+nn9b6Obol92FzRrtPYP/7Yoh7hlpLpUJjaz6zfKZOUBrh8SZ8e1RUW2xOeNDUy4sPfXDcB1g2OZb9uiIlsS8sWDqunHEJau/J6XUe7t5UGBbFTPwKW/maw8wJQdg6+etERGtqRWjsst1DwXdsXt4paB54+aIyOb7qePiLQ4BSCEAJOMvHzSMiM47ZwRJ04zsHEtSOVpR3vNqi/TX/Rg7q9RhDSn8O9flZapaQghoEmDYPD5Vc6jF62xGYKMjO6YR7yw4LrsTgsOISQJQwP327+++ceqohSh+5vQuHM4r3TlX+NWbmnuc+LqGp7PNzm3YgeysgRZmf1pcY03r5TfzZ2wAoBbjZx7qd/4lD5OF2RlCbKyBjJSu5+FlpwKrE3qsQFAmmVDd9ckrDvfnJE1+YDJ21BJtcbInqYxjW2Vp2xGflFb+HXeg+cdb2Jqr4fWJ3K0pvkvoExbJeLEG4WB1zuaJth1lW/mKk8ZBoVvojih99ti3zbfu1EVljg8oMZnd57SC4Ze3qsOvd8W97Y54nrl3aThQQ1OQwgMkpen848H1T9PHJjcXnKbNRMWBtYtc5UnVK2dt69UhD3vSnnbEHK+/F7hhNY5u9PAOVTUeD2UE/WqJz255Vpg4bn7giEjSQFKVV7hu6YgLLY3fao2oq4JnGRiD+SjVB4AXCuJC8oNuNrZOmpzAghowiCRlz4oOXS8qVZBTFf+9d++Sg7I1U4vDsCt6rygxP/rrnzNhtWVVZrJ9QQIs772WcHavfXNWgq3Gjn30tdsbx0g3i0ArhkYuHc4ze/eiI4mzbKh8A0pO5NZFgCWYVnlKcOQ8NnVkvP3BYNmzKaQZ0dXXw/r7tAQ8zzUqm9M4e33Tdp/DVV+GmFsiKk8erEhr9PscNpEZY2BgbUpDXoLPesxtY8rjlxsLOwxO5y2oeL6U2dqM5oNVhrgowM3DhVFZMrHHQy/HhirPK7Jv5C17XpX9wRGOs38xLJtR5oaxl0z/5wButHo/ekBMaIRPUETjtHSGr8N+S+bzQ7S2fs6d9XeZr6eoD78Ez6Oj1F5QOHS8qotK4tSBuwzxnQom1QYsSf9WLrKRRKGBt6qLxL2HMped3VwOuOUXTYYsjZ9z+7k+SoPIYGpmhv3rylIFeLvVx5CgJl1pbfT1x7gi0hU+d+EXZUHDmF56/WTlY+rdE4IIWXryWm8fIYb12qe/UsEmMXYWdByJyBz4+qUg6jy02jNWExg0YUnQwNaEkJIyoQRJ4pvxo2Nzcg8rR59dKro0jPRoJ6EEJLSwdsBRbeSJBILoW9tPbWv/EWVRs90pZiqPC3vC/ohK6RAbXDREEJ8qP3w+rzHtQYr/m4DAdb2+p9X5z5tNNsJCCEEyv4LPilBWSqLy1AenLbm5oDUSjK+OX2EylMUZqoOSV1xqkeKz3oe5TLXRmV8d7B90IYbGnhrvkq7+6Jm/yZOjYaCEAISVzfVb9tSHh2aPn/lSVzT0rjTpyhjeN7K05hJW3wnc9PVQRWFKv+bsKvymLE5gRd4vCa9xz75b3FNx7WgsvAilX3mw4BzrGUw5UFzamzT7aA8f1T5KcAh6Ll8uPB2qlQ+uTNuGU+6UHgueqBbRbgfM9B18UDh3Uy5YvIxZllcYMG5h4P9GvtoUc2h/fkXbvAiIhvuhHfkNWl1zvkHyxYbQ5UH1pa6n3wL3rZZbCSEEAK96M6m1PPpEwbnu7dJ4FIoykqkw0ZysuVA0Rfkk3Q8ZcJkkr32S/7xAvfh7fq7d+ojkoeFWoKZ1fdxKk/Y5K+3xfs8kbrmPI9wjeYUf7eyrETmMjTwfL7NeFLRf39b7stuJ4SAclpaX+bvCO/Oj5yv8oDGDeqy6PwNx9p6ze+P2AAKt4/Udtw4WBxVZyQBqvxvwq7KO3Q1rzmBp+uLhZMvHFLN7w0PKroeK9XMXEBA6GV64YBBK5GkhBcfQZWfAsxd/HOHSqJyFarJvStCU3Kj2P96Z73YBd49ht9+dn/Jg0KlZvoxhVcKD93sapZqW1+U79yQevhqQ1x69+uwitNnuAk1Gq2TgXFlhipP67icH9aWZvTbHJP/aXz8zY6Un5+MKm0fyjWhqOBsXZEeVm2wyvovrU343q/4wZu+nMSm4LMFZyIHhowkEwdfF67y3/0t3u8MLzS0bup2s+bCgeQvvyotU1O4ZezB6ri1r8bnjqdShK6Gs/rb3IQ+h6GB57Mi60WLkhOReyhJ6QK0UyN+uT/vft1ETdS7ynO//0dawOXa0NC60NCa65dK9v2UcTFH45w8+hqR+o8VOYEhUwtwO6z+ZWJXXplCaqPg5NHXVXEr95bffLeEoXW3Iltet7BsQgaj2Fd57uXzzTzZ5AuH0nb3R54uCH46qpjvd0Zr5KjyMwBzF/9cQOWzMvXUkAulq7hZvPtiW/WwY1blD1e+rNIY6KnHlF0r3BncXjOi6UnnHjrJecPTGFy4RS6OPZ/vH9bTKnd9/O2Fycpv5JSMOabeFamJRL/kdRFCuWXeQRiAK0YeBqRtPNnSrMBwxXC0f/qRR8IRA0k5baJy3s/r8l+0WFxM7M8vWOVX/r+kwOeCoiLR1K1wMD4k89cqTxoba3xW5KUIpir/mm8eySvzPdIlxkmLoPPsD9zaCWOtu/I8n29zw1OFRUWioiJhfhY/OjD30LUegWVyXz7127XlLwtERfmCxIel21Yk738gmpj8kZOV90lYf7mt8N0SFomKK8bqx5zsSBorsLDyweeaOJLJ/UxU+d8FmLv4545UPClR6SbXx4cqf6jieYX7nWCq8qMWi0Ld0qefMBM0hBA6+1Kq9h3mZnWYPv6xWCYrv6GqcNgx9c72i5UHlomcm/nr1hc/r9NbCABc9lG+tEfhmlx9wDx6b0PSrtcyAwPvkh9nxMYxkbg3fs0DiWPO8wjXcHbxd99XVisxQwPPZ0X22x6HsY9/en1Fhdw+XFix7eKA3G6eUflZc2xowj5W0xzgm321Su+aOWJDUzaFLPNGls+uqswBB4BTlUcjNr+KfZWvPnOyrmDQCSGEkFS294SdL7mZLDfMt4Co8rMBcxf/3MHie9njysnPoODqwmtFJ251N8sw92P47Wf3FUfnT6gnH4Op84ILj4X1tI9js78bIS7hHfQrT6jXW/5QlfcpSe21OSYL6ZK93JZy4KVEbZ97PBpYtZXPyratyrqeLJHbqHlCTipityT6RI1oHAwcy/4Yc2wo3NoYlfHtnlbBrP1mQDoM5aFpq4L6ZE5iqvJ9LsyoSD2TfblAmB+cc6FI53R8qPIQQsquFsfsTd54b0Q7e1wekNhEW9upDcm7L/eNYgBV/jdiV+UJU3tK7fnjvJQuG4AQAtdIddvlM+X3StXO+R6OKj8HJuq/fqToVrJEZqchhMAgfRNUcO6+oFft/qMaE/ZePlR0J102PvkYvfjFqfxzj4cGhsfL4tpiSxRyMzX1wJzqffurU1uNtj9K5YGzs3H72vxXLWYbCSCEQCW4tjHtUpbSOOfgBG6sf1652yf11MOhQf3kIVZK19EVfqezaQKfmnbplD79IWnrM4meiQMbH2UmJU3qOlsDVmaFVupx95NIk6Dr/JbM65VGknxXeYx0WppjMn1PFAX+UJw5hpO/XIh3HFsAABTPSURBVHnNWMyOlH1vx81zj77SmEFdeifrO9+CBy1WgCr/27Cr8sA1xuu4earsXr7SCiAkLfyMhmtBtZk9tnk3FFT5OYBJFneh6Exkf6cSBxDgY4Jbx0sj0mXyGWMuwCh9E1h49r6gR4UDCPCR/utHSiOzxxV6ZV5I4b5r/LoxBwUhJEw1j0sOXWypHLLjH/6Ji4SpmZRAMxSyJSMwdVzroCEErt6WPRuKYjvM9pkDNsDRn8U9tC7V/25Px7hr+kNPwNrZtGdVZlSNyU4ACAEu6Q5ak36tWGtj4LPDH+mzr4BymJpelO7YWRnP01oABBQ23jXw4nTeiTv9gyYKuiuPAwJXcDgbv01Yt7O5xwE+XHlAOs3d2bz9G4vjBxzzfCqKxCba206tT9p6rmfESaDK/xbsqjykrZKx+NDSM6Hd7SqHQTj8+mb51QcCgWn+v3lR5eeibN0p3GOB3MQGndlsaEnmnrzYkMefPbBOWTsTq4+c5aU0681mfWN89bELjUXdZiftEpfWHztcEp4jG7c45I38awcLbiSOjhgZmP3N2KeiSFNNeO7mM011YgdmVpfey99xobNLg884gAqw4d6LO5PWn2rmjdpnnr0A2BRxJ9K2XWxvU2CEWVV0L3/D3lquxMVE5D/WGQ4gAJhWXZXY9CC8MjCYExxcdfoy9+nLvna5i4JwZuUhoOyygaurEnfGSC1gTuW5q/6eeiCQExzMCQ7mXAouP3OdF5MuUWH0vJ+Kwk067oO8FWvyI7kajWzo7qrYFX7Fl4Knnh4czAkOrgmL6h+wsiRqzGNZ5SGNOcbaBl7drrxwpjzwYsXlaH5lj8VJQwickqbB+Fe9FUL7u2VFlX8PbVcpyuNrL1+sCDpbeuEy71XpuMxMAkhpewbfPO3m9lvsgLYrx0tja4IvVASdLT1/mfe6XCE3UwAC3KDlpdReOlMWGFh+6kLF7WcDHWKHi4lPSDF3hgPKIh5Nia44fa7qwtnic1frUlsNFgJASI7XtYeF9/cbHKN5JetWvP16c/7p89XTVeG9ajA6cEzd2f/4SuGRwKqLZ4vPX6tPqNWacGY2rQU5JyWgDNparnx05qREQDvGJ7g8perd2ccAICxWcb+sunqsmiPmtarleoyafjCu09TXjIvNk6ces4nqpfxxDEAIKEIrlNc26c0U7dJqaqrHqqdvHK6kvlevtpAAQprENUJ5fYth5qEhQFFWhbKmVtYpdbgc1sEa93Onb5L6Jo0GZ0vUGMe2ykMIKMw5IZpo5o5xGsd7xVbb5MsJEOr2vuiHDTGNJvcHVDCHbEjJ7zfqWTZtitFzUlJ2tb6rRcqpFrf26JRmggQQQto+Nhh1ui6dozUBCCFlV+k6m6WcanFrr15lIaZ312mXwTjQJqupHuO2qkbVLpyhT3EyerYy0ixTNdaKOdWSjiGT0UXTEEJIW/raT26prRt36CSKuhrx7KqI+TInQQFIYWqRooYnrq6W8IVmM8bIXHkI0ZmHkZnYV/kPITWd/c+eN8a1f/wZH78b+848DHDx4J0rTRkNeq/4O5Z9Zx4G2EDb/n1NzUpsnnMqsQ+qPOLmLZUHdkN9dktkTG+H8uMfC/zdWFd5YO9Pawh/2tskcXpFpFhXeWBpiiy9+GZUbmP+HDW/Bao84uYtlYcEppLph8U2uzdsZayrPCT0Y9pRmc06z8nm2Yh9lceVfcphtYtgbAzm90GVR9y8pvJehX2V9zKsq7y3QZVH3FDlFwOqvIdQ5T2EKo+4ocovBlR5D6HKewhVHnFDlV8MqPIeQpX3EKo84oYqvxhQ5T2EKu8hVHnEDVV+MaDKewhV3kO/UnkAwKpVq5YtW7YS+QP4/PPP/+3f/o3ppVhq/vKXv/zXf/0X00vhxf785z//9a9/ZXopvNiyZct+pfJcLnf58uVcLpeHLHUhISErVqxgeimWmq1bt548eZLppfBin3/+eUxMDNNL4cWWL1+ORmyQKWjEZjGgERsPoREbD6FxecQNVX4xoMp7CFXeQ6jyiBuq/GJAlfcQqryHUOURN1T5xYAq7yFUeQ+hyiNuqPKLAVXeQ6jyHkKVR9xQ5RcDqryHUOU9hCqPuKHKLwZUeQ+hynsIVR5xQ5VfDKjyHkKV99DCXN3bNdBx2C9vr39rl23Gw2jaNdJ3aVf+/hNdwzht620/eqAyZ3jGxX1oytLdceJwY5Nh5tUMaMwkTzpeFJivISnC2Nl2yC/Xb/Zt58GSc4Vql8PaHlcy+668g/6c5FqNyTuujsA6LKk8cNmH67oizuX77S659qCvTe744CWNCEtvQWf884Ee7eSLmFB1D764VuB+SezlPM9R6Bh9PbCm8rRNIcmKqDy2K3fvpfr0Bq3R8d56AS5F50DMpdKDfrl7g5sKOo1WFlwVmcnK0/aR0qYz/vk7/QpuxgoH9cSHr1vj7EupOpMm00+tVeDo45/xz9/prlNJQqfNRTGwPhem8o72mhV/ff23v2c87nC8+zJNukQZ+X//69t/rG3owShzM2/115mvejH3EynS2Fjj+11ZhWZW5Z26kWifhM1vFQSJa+u4a1ZkRparh4cN7tuoUWrEcZuJF5m28oeaisGprwv7x6velO3bVniHizr/z2BF5Um7iMuPuFARnTrc0ih4HVp+/V4vX0PO91DKMDj0NDA74Gp70wQJIYTAMVTSfPFseVi2VDj5Uhkxq/Q4s9e9Y0flAa4Ux94ov3yvq7JVWhnLPRlUl9lqsM7a9mkdv+vGmeIbrwSN3dKCxxUBp2tz+UYb09sSc5XHxop5B49Vvq0c72vpizyVe/rtmMI2b6eBa7Q3+KeEVZEipW1ynVLjhaVrfCvSW9WDU+Eyau0UI1eXWsjK//VvcVviJ6Y3R0A61emH4/6vx5X3XZkT2//+5T0BYTPxItNXb20ZmN6IAaAsCml8UNoPwQIF9d4zkF/DhsoTGkVOdNnx4LZaGUYSDhGn/VYIN6bW8P4rgDSoymLKNn+VsO/KdOUJU0t8zcWg+px+x3sPZww7Ko+NldWfCKh8Va02EBSmkcafL737ZnjYMGM7oY01ESV7zjWV9FtwmnKIBm4fKbgaOzpqYnhbYqzyzvH4Q+k7I4dGDARNYuMV3K07eOVjznkupOjS5AVnrf7yzbcR7yrv6HiavSqgvddIMJ6iBav8yr8lnjmf993Rbik19UVM0X9hZU7g6eSPVnkIAW4xVN7N8NnVNjjvzh/yi1hQecowMPj4Wknwy7EJEkz+89GlogtPhmWzhg5ol17Nec254Je2eWPawenKA7Oq+FHl+Svt9XIWXbaaFZWnDLyIshPXOnjDDgpCSBt50WWHLrdWiezurR9QNo11XO204zSEEBokL07mnooe7FMzvDKZqjw10um/ISe6Wm/GAYSQHO06vi4zrExrnp152qgseliwNSB7zzdvV92brjytLzyb6hshnLAxHvmFq/yqL1IfpDUe+bY4X0pCCAFF6uu5Pts5L++lfszKu0zaolsZmyJGjL97VSBsqDwubegMOVUckqGwQAghdMkl8aGlp2/3C2Yd8rELOH3xD/mc6t4XIYX+05UnFJL40IId27IOH8vbujXn2NWWkh6zg+mBZVZU3jqedL7gRFhvh2JyU3L2Z3AOBtXndpuxDzwDqEYeHCsOT5JIrAwP2TBUedpYx9u8pjCOb516J7SMRf+YejZFoZ91PIMYyal5ENvXOCyK+THR592IjUP69Mek7SeLTuzI3r41y+9GR5vcRTK0Iheu8l+mxTSMvN6RHtVihxBQuKUhOtPvhZD3MPWrj1R5QLksvfk1x7eXJfbbmR5L9EosqDwmruWHnCuLKNW4IIQQUprxjMiSI5fbm5Qz/zqjMTtmNmLOCVlqRPF05Wnz4ODDwLTvt5c+yBnjdwzFhZacONeQ221B4/LQLIsLKrr0YLB/6ggHIS6tPbKvMq5GZ553mNmir4+vvhrVWSuyzzNA8XExVXkdl/PDuvLsQbtzcg2QivifkzdFD49bZx6CBbjZbrDgBK6I35bkO115Wt57dk38Vz+Vp9SphvmCR+czNx9vadcQTBx8XcjKpz/vMHS9zNnwUGwHNK4fidqQ+6Zb3+Jx5Vf8LXbluowtWzKnb1l+eytzh3HCZuJFpPy/LxLXb566a/vOwrCEoc4xu41gev/NO7Gk8qFXqx7UTg0Y01pFZlTJ4Utt9Yp5xuBojXxm5W0Kaebd6vDIgQETSZH4RGtP2Jni66/HxhmdKMKaypfcfjksmprPRkjKawN2lb/haE1z1w2lbeu8cSprzXdxX/9UFlurMTI9zYbJyv/ALZc4sckVQE0k+iWvixDKLfNNtCFnV14tfnU2KzhTobXTgCJM3a0HfTLDq42OD8/RWTwLWvlOu7qi/LtNzQKCdg51HPKtbbPYPK+8z3dZD3j68XHLu5tiwm7FacJm4kWmrdpUVyO2yCU6fnHNvu+StoUJVcyPg3krllQ+5EJ5ZIVu8s+331N5SFOk3eQ0m4nJd3lyQhJ/q/jYza52NZNHaVhT+aKrj4UC3dS+/IcrDymnS6s2dJY2n/dL23i+o3bUwewmxWTlN1TmC6f35X9P5SFFWvV2o2N6Uo1L9nxT0g+Px7ROBtblQlb+RbcLmxi4vLIwe9QuzCz0CRHqcPsvVB6QuLKycvWKhRixAQA36xue53+/Pv9Rk4XpPzG9FUsqf+1kSWiO0gYhhJCYkCXfKTsV2ts338jCnMrPvVctSworDrjOb1GiysvigvJPhfd3Kic3JddQLvfwmdosvsk5/xMAhRlrH5f8vI+TyTcxe2yDycqvKUrqnh6Xd0hjtqYei5dr5x0PnlP59+6N3ZLoEzWiYeIdc0Er34PRmKHsStrh1L60Ixk3OGaSmKp8L047R/hHv0qLara/ex5NYKM5xd+u4dbrXZLi6u1+tXV6+p8fl6cJo7D/xqbEjXtbu+xoxOafwYLKk5ru/qjgkmvxMh2AENJmkSjmUlHgvcER169VHjhE1fzQC7znVZrJFxk+PvY2pOjErZ4uHZM7o6yoPKktu1F8MrSrSeoCEEJgaXxavvdcY8mA7d1BC6CVvLlWEZYgHjVMvinio0XcQzvLE+rnH7v/aJiaY0P0t/ity3veaLISAEJIy/vOrU+7kqsyuX618uR4OWf39qqC4elpl3bxw41Jfi+l+nmfu8gWuPKAcva9zVqxK2v3t0WFCop+V3kCEBbZy5+TDsYppmcyA9JprL6d9u2BDpGL0NVy1qzIiRfgEFB2xWDo6pRzZUbwO+fYkDZT68u8Fasyg8sNaNjmn8CCykPXuCTxTvGxkO4uPQUhMdHeE36zMrxYPe/u5Ox9eUrX03/vbNGlmBEpDiAktd19ERdLrsaOjc/3DvHRsKLy0NmfwfU/xk1tMdgBhC51/tWS648EvTNnSRKawquFOwNbqkX2yXmpDY9Ldwc2lQlszB6+Zmy+vHk0emva4VcSpY2CEDj4jds3lmcO2OYfdJm9L4+L+Ee+T7tVrrfhAELgFLYfXZURzjHYvX1c/kUPBgFl7Wrc+mXs17tahQScUXkICIcgqWDl6oKYGp0TApq0DxbyDq7OedxkJQHtVAjvbks+8mxM47L2JpWs9y0vkhPw986kpAmjaCBkU+LaXc1od/6fwIbKA8zMz66/eKzyFVejU47nRZUFBbdwJNi8yzRnxIYyq8uelB8+yEls0OoU0qzwIv+z9bm9Nia2LDd2VJ62Dw+EHysMfi4c0lqGSxpO+Fe8rFTrZ21YhLq+5fTe3PNvRob1VklNa9CewohMuZzpCWuMVR7Yu18VbjjILR60OXWyuKCMn+8MiIzE/KtjzogNoSu8nO6zn1c15sR0kten01Yfbe3UMvMJqYWuPASEeTRqVfyuBCUOZ1UeQkDYDM25Ddd3pfj4pviuT90SXJ/boJ2cD0MTmKyxLXh70mrf1HWbSp7X65w0hFNzbN5+syrF13fGbWOW3z2Rcp758pByWPtSi7/9LiMoU8Wijz96CTZUHgKAG/Wt2fVn96Su8c30v9hc2muyUQDStoHC1uvna+PazO82s7nj8oC2TyhKn1Uc3Jy8xjcz4EpLeZ/Rymzj2VJ5CChM2Tfw5GzeVp9k3wOl93OlciNBQ0jJRZEXS8PSpFILTROOkdq2awczN65JXnuo7FGeTGYgGflQ/kzMneEAkHZdU2z5z5vTfNekHL3dUSt2umgIISHKLt+5u7FBibnbM3dcnsY043nheevXp/isST1+t7Ne7GBqTurCnJMSELhB75qaJAQoh8Fpnhp+AoTdqTfi7tMeYITN6NTrHXq902DFsRlbIE0SVqNTr3fqDZhz6uuAxnGD3qGfe3MarCQNaNzuMpiIWUfWAKBcmMHgtDgZmZnq3VhReQghACSGW0xOvd5pthI4NblAtEUoehXX9LTB6N5YaMppx8xWAneHn8admMngmP1cJrGk8hBCQJEOi8ugd+hNmAOjp/JNWRpfcF7ljI2aaAghTRA2k3PuYxjF6DkpAenEjAanXu802whianUAUtF/eWt9/bhrxt9ClNPkNNpnvCkCGrO7DHqHXu8020mmPhIF0ZmHkZnYUvn5ERNtvU+f1Cd0WNm5fB/CnsrPz6XKu1L1Ml0qY/y0ZB/AvjMPAwe/cfvhlhY15hUnUkGVR9zYXHlg1lQkNYY/GxQyffKs34vdlac0zW23o1tLei1OlkaefZWnDaUXCm/njetYu8pmQ5VH3NhceQhoHCOdLsrrRuLYXXlIE6TTRRIsGNr6ENZVHgLcjjtxmr2rbDZUecSN1ZX3WiyvPPuxr/JeBlUecUOVXwyo8h5ClfcQqjzihiq/GFDlPYQq7yFUecQNVX4xoMp7CFXeQ6jyiBuq/GJAlfcQqryHUOURN1T5xYAq7yFUeQ/9SuVpmv6Xf/mXTz755P8gfwCfffbZp59+yvRSLDXLly9fvnw500vhxZYtW/anP/2J6aXwYp988smv7MvjOP7ZZ58RBEEiS116evq2bdvQ73phnTlz5sGDB0wvhRf78ssv6+vrmV4KL/brIzaTe/QL+fcDwlYAAPS7XnAAADQI5gmaptEK9MT7G/UnjCwHgiAI8nGgyiMIgixl/x8BWF+mp90ohAAAAABJRU5ErkJggg==)
-------------REFRESCO
SEXO------ A----- B------ C
HOMBRE 0,1 | 0,5 | 0,25
MUJER 0,15 | 0,3 | 0,1
[FONT=Calibri]De acuerdo a estos datos:[/FONT]
[FONT=Calibri]1.1. [/FONT][FONT=Calibri]Calcule P(B o C)[/FONT]
[FONT=Calibri]A) 0,75 B) 0,4 C) 0,35 D) 0,3 E) 0,25[/FONT]
[FONT=Calibri]1.2. [/FONT][FONT=Calibri]La probabilidad P(H – A’) =[/FONT]
[FONT=Calibri]A) 0,4 B) 0,3 C) 0,2 D) 0,05 E) 0,1[/FONT]
[FONT=Calibri]1.3. [/FONT][FONT=Calibri]Calcule P(B / H) =[/FONT]
[FONT=Calibri]A) 0,4 B) 0,125 C) 0,05 D) 0,15 E) 0,25
[/FONT]
[FONT=Calibri]1.4. [/FONT][FONT=Calibri]Si se selecciona a una persona que gusta del refresco B, ¿cuál es la probabilidad de que sea mujer?[/FONT]
[FONT=Calibri]A) 0,35 B) 0,3 C) 0,857 D) 0,782 E) 0,627[/FONT]
[FONT=Calibri]1. [/FONT][FONT=Calibri]Estudio del mercado de refrescos[/FONT]
[FONT=Calibri]Según un estudio, se prueban tres sabores de refresco A, B y C, entre hombres (H) y mujeres (M). El estudio permitió construir la siguiente tabla de probabilidades de preferencias:[/FONT]
-------------REFRESCO
SEXO------ A----- B------ C
HOMBRE 0,1 | 0,5 | 0,25
MUJER 0,15 | 0,3 | 0,1
[FONT=Calibri]De acuerdo a estos datos:[/FONT]
[FONT=Calibri]1.1. [/FONT][FONT=Calibri]Calcule P(B o C)[/FONT]
[FONT=Calibri]A) 0,75 B) 0,4 C) 0,35 D) 0,3 E) 0,25[/FONT]
[FONT=Calibri]1.2. [/FONT][FONT=Calibri]La probabilidad P(H – A’) =[/FONT]
[FONT=Calibri]A) 0,4 B) 0,3 C) 0,2 D) 0,05 E) 0,1[/FONT]
[FONT=Calibri]1.3. [/FONT][FONT=Calibri]Calcule P(B / H) =[/FONT]
[FONT=Calibri]A) 0,4 B) 0,125 C) 0,05 D) 0,15 E) 0,25
[/FONT]
[FONT=Calibri]1.4. [/FONT][FONT=Calibri]Si se selecciona a una persona que gusta del refresco B, ¿cuál es la probabilidad de que sea mujer?[/FONT]
[FONT=Calibri]A) 0,35 B) 0,3 C) 0,857 D) 0,782 E) 0,627[/FONT]
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