EVALUACIÓN DIAGNÓSTICA

1. Lea y realice lo que se solicita en cada pregunta.[br]2. Seleccione la respuesta correcta, solo existe una respuesta para cada pregunta.[br]3. La evaluación diagnóstica no tiene ninguna calificación cuantitativa.[br][br][b]ÍTEM SIMPLE[/b][br]Determine la respuesta correcta, solo se seleccionará una opción.

[b]1.- [/b][b]La recta que atraviesa a una curva en un solo punto se conoce como.[/b]

Tangente Diámetro Secante Cuerda

[b]2.- [/b][b][b]La ecuación de la recta que se aplica directamente cuando se tiene un punto y una pendiente es:[/b][/b]

[math]\frac{x}{a}+\frac{y}{b}=1[/math] [math]\frac{y-y_1}{x-x_1}=\frac{y_{1-y_2}}{x_{1-x_2}}[/math] [math]y=mx+b[/math] [math]y-y_1=m\left(x-x_1\right)[/math]

[b]3.- [/b][b][b]La ecuación de la recta que se aplica directamente cuando se tiene una ordenada al origen y una pendiente es:[/b][/b]

[math]y=mx+b[/math] [math]y-y_1=m\left(x-x_1\right)[/math] [math]\frac{y-y_1}{x-x_1}=\frac{y_{1-y_2}}{x_{1-x_2}}[/math] [math]\frac{x}{a}+\frac{y}{b}=1[/math]

[b]ÍTEM DE RELACIÓN DE COLUMNAS [/b][br][b]4.- Relacione las principales características de la recta con sus fórmulas[br][br][/b][img]data:image/png;base64,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[/img]

1c, 2d, 3b, 4a 1c, 2a, 3e, 4c 1e, 2b, 3d, 4e 1e, 2d, 3a, 4b

[b]5.- El límite en a de una constante es.[/b]

[img]data:image/png;base64,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[/img] [img]data:image/png;base64,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[/img] [img]data:image/png;base64,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[/img] [img]data:image/png;base64,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[/img]

[b]6.- El límite en a de una constante por una función es:[/b]

[img]data:image/png;base64,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[/img] [img]data:image/png;base64,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[/img] [img]data:image/png;base64,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[/img] [img]data:image/png;base64,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[/img]

[b]7.- El límite cuando x tiende a 2 de la función [img]data:image/png;base64,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[/img] es: [/b]

[img]data:image/png;base64,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[/img] [img]data:image/png;base64,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[/img] [img]data:image/png;base64,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[/img] [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAN4AAABXCAYAAABr2PunAAALJklEQVR4nO2dz2sTXRfHv3l5/oFpXYmrTvZ90GkRFaEuTNGli0TahaBQEkFQpNWIS39MEBcFTQoVRCxpdVdIsN10keKiiGQW4sYJIi5nSME/4L6Leu9zM0maTDIzNz/OBwaSZjL3tJ3v3HvPPefcGGOMgSCISPmfagMIYhwh4RGEAkh4BKEAEh5BKICERxAKIOERhAJIeAool8t49OgR5ufnEYvFxJFKpbC/v6/aPCIKGBEppmkyAEzTNFYqlRhjjDmOwwqFAgPAAIifE6ML9XiK2N7expUrVwAAk5OTWFpagmEYAIB3796pNI2IABJexCwvL4MxhgsXLjR9Njk5CQA4PDyM2iwiYkh4A4Lrujg4OAAA3LhxQ7E1RNiQ8AaEx48fo16vI5FIIJVKqTaHCBkS3gCQyWSQz+eRTCaxsbGh2hy4rot4PI5YLIb5+XnV5owk/6g2YNzhokun03j9+rVqcwAc9b62bas2Y6Qh4SmEi65QKGBpaUm1OQCO1hjz+bxqM0YeEp4iMpkMNjc3USqVxLKCamq1GhYXF8WyxpcvXxRbNLrQHM8nlmWJiJOJiQmUy+Wmc8rlspgjtXKUcNHt7e01iS6XyyEWi4Vm/3FkMhnU63Wsr6+LpQ0iJFSv4A8TjuMwTdNEhAn+RqDIFIvFhs+z2WzD56VSqeHzVoeu61H+Woyx/yJqTNNkjDFhSyKRiNyWcYB6PB8sLCxA13U4joNCoQAAqNfrotezLAvXr19HOp2G4zgAgPPnzzdcY3V1tWM78Xg8YMuPx7IsrKyswDAMLC8vR9r22KJa+cOEaZrMtm3xnvd+pmkyx3GYrussnU4rtNA/3G5N01i1WhU/B/V4oUI9ng+Wl5cxNTUl3vP528ePH7GwsIB4PD4wSwLd8vLlS9i2jWfPnmF6elq1OeODauUPM3JGgaZpzHGcUNvj87Bej0ql0nA9Pt9s1avB0+PZts0ANPSKRO9Qj9cHZ8+eFa/fv38/VJ5A13WxuLgITdO66qVfvHgBANQrBkSMMaqr2SuWZeHff/8FAJimOVSOiVQqha2tLd/fo9slGKjH6xHXdTE3NwdN0wAAX79+VWyRPzY3N8EYa3twEolEy58T/dGT8ORyBfzI5XJB2zawuK6L+fl56LqOBw8eAAB2d3cVW0UMEz0Jz7ZtZLNZX9+RRTrsdUV4EPHW1hbOnTsH4Gg9z7IscU4ul4PruqpMJEJgZmYmsHu4J+FNTU3hyZMn0HW9r8aHhf39fcRiMbiuKwKbt7e3MTU11ZBJ/uzZMwBHoVfPnz9XZS4RAmtra4HGrvY1x4s6wkIVnz9/BgCcOHEC+XwexWKxQXDpdBoAsLW1hVgshnw+P3ReTpm1tTXx+uDgoGU86jhRq9Xw8OHDQK8ZWXaCaZri9cmTJ6NqNhC440TXdayurjYFNt+/fx+7u7uwbbvtOcNCLpfDysqKeF+v13H16lVUKpWWdWLGAR48Hij9LAImEgmx0MqDawlilOBBEoZhMMMw2gYj+IWWEwiiDfIQc319PdCsfBIeQbSBDzGz2Symp6cDHW6GKjzuDfQerVyx3nLm3kI7rusil8uJBNOJiQlkMhnUarWW7aZSKXGdeDw+VuuMRP+Uy2Xs7OxA0zTcu3cv+Ab6Gad2M8erVqsNY2O0GR/btt0QdAwpQLdarTYloPLDm86STqfbBgkPW8oOoQY54Vkup9/pHvZD6EPN6enprmICp6amsLS0JFzzAHDmzBlYloW5uTlMTEzANE2Yptmwfliv1xvWz3jFLtM0G64FAPl8fugX74nwuX37tqhxGpp3uh/V+vFqosunhZz6kkgkmKZpTeUTvG3jb2/m7f0YO+otvecR0VOpVPpKaTruCDJZVy7NISc9MzZkPV4/7OzsIJ1O48mTJ02f3blzp+F9Pp/H3t5eU9rK9PQ0ksmkeN9qTkgQwH+pUsDRurOc9Bw0A13e77iJrXcIkE6n2+aKnT59Wgx3d3Z2gjWS6IoLFy4MfHYDL6Ov63roKV4D3ePNzs52HXZ18eLFtp/xQGaCaMf+/r4o5Pv27dvQ2xvoHq8Tuq6LRc1Tp06F1o6qOpeDzKD3Xn5wXVfs0JRMJn2HxqVSKRweHuLTp09df2ege7xOjEuQNhEuvOCTpml49eqVr+9altVTJv9Q93hRMUpPd6IRy7Lw9OlT8X5hYaGr7929exeTk5M9+wxIeMRY8+fPH/G6Xq93LaR+c/OGeqhJDA/twgeDOPrZw497W7s5ZCqVSsNnfuZ3AAmPIJRAQ00iEoZhHS9KqMcjCAUMtfB+/PghXv/+/VuhJQThj76EJ5ev+/nzZ9vzvPGR3759a3uufB1ZWK3aljOCf/361fZcb3tUdo/wi1y6EQjgQd9LZLXjOE25c5qmsWKx2HSubdtNmQS6rreM7q5UKk15d9lstmkzENu2m/LuNE1re01d15syFMLeYIQYHWzbbsopNQyjrwyFnoTnFZJ8eNOD2p0HT2rFcTvheNM+jrum3H6nVBSC6ESne6hX8dGmJQShgKF2rhCdqdVq2NzcRCaTaaprE4/H29atIcKFerwRR86sME0TN2/exOTkJCzLwq1bt/Dlyxdomobt7e2xLVirAhLeiMOFl81mmzL5a7WaqF+j6/qxXmQiWEh4Iw4XnuM4LZOK5+fnRWBwu3OI4BnJOZ5lWVhbW0MqlWrYWikWi2FmZibULbTK5bKo/RmPx1vOn3K5HCYmJhCLxRo2CAkD9jeItxtBff/+PVRbCIlAfK4DhOz+9a4tlkolsU6o63rga3mtXM/JZLLhHO/6o1y3UQXy+hQRHSP315Zv/lY3dbFYDKXUHy+Cyq+ZTCZFO1zgPOigWCyKMnIqF/Llv1WQJfKIzoys8AzDaHsOv9mOO8cvjuM01P+U63lWKhXxvlV0jyp4b9eqHikRLj2HjMlDplbFbKvVqohw0TStb0MZO4qYCWJoJg/1woSHqvFiu4O0lZn8/xukh8G4EFjImPzE9O51EFTPYppm309nx3EiG17Jw81u2uq32nK3wpbD80h0avDt1czlcjg4OEC1WkW1WhU///DhA4CjyP9r165B13U4jgPDMHD58mW/zbRkeXkZs7OzmJuba4oW75Y3b96I15cuXQrErnbMzc2J1xsbG6G21S2bm5tix1fTNJFKpRRbNKb4VWqpVGoY7vGnOn+iJ5NJZhhGaE4D7sTopeezbVv0xGHayJEzOPqttR8EYTmWCP/0PcmR/5nZbJZpmhb6Dc2HZH7E5zhOpM4E2UYArFAohNpeJ+TNOEh06ulbeN7deDo92YPeNUbTtKZdXVohO3rCFh2f42azWdGudz0vSuQ5N4luMAjErcf/qa220/KiQniyBy/sIR/vWblDiTsyZM+u4ziRejh5T9/OwcOH74PkdR11+hae4zjCbR7VIqyfoWYUbnPTNMWc0TCMhuG2/KApFArinKj+Vlz4x0Xq8HMGYR46LvQtPL55pPepHhZ+nCvZbDYSt7m8vNLKLm/piW6Hx/0ibynczUHCi46+hMcXhmUHS9jzJy70Tu3INoW9VsVv7kQi0dIuOUa03Tlh4K2LQ8IbHHoWHr+x+dKCPJySzwnyJut2AV1eNmg3b+FDQLrZCBX4Eh4XGhedfFPz4RafS/BzgryxE4lEV71XJ0+i4zhi/ZEgVND1nef1Rnrd0vLQTl7Xixq/XlOCUEHXdx6fLxzndpbXylS5puX4SBIeMahQ6QeCUMBIln4giEGHhEcQCiDhEYQCSHgEoQASHkEogIRHEAog4RGEAkh4BKEAEh5BKICERxAK+D9tibk02RifogAAAABJRU5ErkJggg==[/img]

[b]8.- El límite cuando x tiende a 0 de la función [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAWQAAABlCAYAAAB6MJkxAAAS8klEQVR4nO2d34vjVBvHn768t+uSGa9UvNj0QnFhBjczCM4KerEpqxfKKunijbDCbLp7PUqHufPHztwIIjMdmAUvhLYwoIgdZ1xwwHTFXYu0qHjhpojoXiWO4h+Q92LfhJOTkza/2qYz3w8EkjQ/Tk/Tb855znOep+A4jkMAAAAmzn8mXQAAAAAPgCADAEBOgCADAEBOgCADAEBOgCADAEBOgCADAEBOgCADAEBOgCADAEBOgCADAEBOgCADAEBOgCADAEBOgCCDXGDbNjUaDSqXy1QsFqlQKFChUKCZmRkql8vUbrcnXcSpotfr0fb2NpVKpUB9VioV6vV6ky4iEOEAMGG63a5DRA4ROYqiOKZpOo7jOLque/uJyDEMY8IlnR7cOpMkyau3er2O+sw5aCGDifPvv/966x988AGdOXOGiIg2NzdJkiTvs48++mjsZZt2Njc3aWlpiYiIyuUyqarqfYb6zB8QZJAbJEnyxMNlcXHRW//777/HXaSph60/HtRn/vjvpAsAwNLSEjkhYbnv3r3rrZ87d25cRZp6wuqTBfWZPwpOlF8OgAnQbrfp/PnzRPSg9fzrr7/S7OzshEs1vfR6PZqfnyciIkVRaH9/H/WZM2CyALnlnXfeIaIHYnx4eAjxSEi/36dGo0HPP/88ERHpug4xzikQZOCxt7dHq6urVCqVPDepQqFAxWKRKpXKWF3PNjY26ODggCRJok8++YTm5ubGdu8wGo0GzczMUKFQiHR8r9ejjY0NKpVK3nmsK1+j0RhxiYlKpRLJskyXL1+mo6MjkmXZN1A6Tmzb9lzx2OdrYWGBVldXqd/vT6Rcaej1erS6ukoLCwuB/0yi33iyTh4gD9RqNUeWZZ9LVNhSr9dHXh7DMDyXrW63O/L7DcOyrIAL3iAMw3AURYlUn7quj+U7mKbpVKtVnzvcOOvWMAxHkqSBdZGX3zsqbH0OWhRFcSzLinRNCDJwVFUV+q2apikUFtdPeBR0u11HkqTc/Dm73a6wDgaxvr7uO7ZWqzmOIxb2cb3kXDRN8+6rqupY7un+pqxAub+tYRi+xoAkSSN9vrKCF2NN07xyi/43Uesaggx8gsyLg2maAQFxBSZrLMtyZFnOjRjXarXQVt0gWEEWtYD53oimaaP6CgPLlqSD7J4XZ1IJ+3yJXuhuj2jcvYak8P8JSZICLWDR/ybKMw0bMvCQJInK5bJvnztJg+Wff/4Zyf1ff/11Mk2TDg8PAzbj1dXVyLbbtNi2TeVymXZ2dujw8JBarVbiay0vLwf2FYtF3/Zx9gfu9/t0cHDgbSuKEnimlpaWfHbtra2tsZUvCffv3/dtLy4uBgZIRf8bdgJUGBBkQPv7++Q4Dv3111+Rjj979mzoZxsbG17shJmZmcCgRq/X8wZ1FhYWvP3b29veH3d+ft43QFIoFOi9995L8M2ScefOHZqZmaH9/X2am5ujhx56KNb5Kysr5DzofUYajBzkD5ykPtvttne8bdu+49mXqa7rcb5WInjxCvPs4CewiAaQe70elctl75kolUqB77exseENoO7t7aUsfTT4MoRx6tSp4QeNpE0Pjg2WZQ3tnrmEDWS5XVTeluh21S3LGjrg4957EvBd6rR/G76ewrr/SeuTLa+u697vxQ6sxRloYhlWZh6+7sJsqbxZgzedtVotYV2w5g3ePj8qs5fIHDHMZKEoSqRro4UMBnLr1i3f9vvvvy9s5bjRwwzDIMMwfJ/t7u6Sbdv05ptv0tHRkbff9Yvd3d317Q9j0DTgaaHf71On0/G2NU0LTBcnSlefLFtbW/Twww9ToVCg8+fP0+LiItVqtdz7If/+++++7du3b5Ou62RZli8eh2veaDQaPlOHJEkjc5U8c+YMVatV375SqeS57fX7fdI0zVeWnZ2daBcfxRsEHA/cQTZKMCrPn+eOSrMttmkhyxYy6+UwqLfBk5f6dMsQtYUcpTXpOMHewPr6eug1+ah19Xrd88wZZwQ7foBUtGiaFuv3gSCDUNguYNwursi9K++j52FkJciskMT1JMlLfcYVZMcJmiPYl0i32/W9pKJcXyTyk/DMMU0z8N34RZZlp9VqRb4mBBkIYcUjib2xVquNTTyGtVIGLVFa/VkIMmvvTSIe46zPYSIzbOExTXPgGIEsywFXwGGCz14vSn1m/Yy0Wi1fGXRd92z7okkwUX3NIcggAB8wPkmXmBexUXYl8y7IrOknaUtunPWZtSA7zgNR1nU9MEGkVqsJB3XjlDHKb5jlM8KXV5blwP343yvqgHTuBbnVajmapo3FeV6WZUfX9VxMSpgUbEsuqRi712EfyEE2wbyTRpAty/Lso2m61Xmpz1G8EHgTRJT/Om/mGCd8b6VarQqP418yUeost14W7XabFhYW6MUXX6Rms0kzMzMjvV+/3ydFUWhra4vm5+d9o6YnBXbkXpIkajabiUbie71eYMT/hx9+yKqYU8Xa2prnVZE0SNJxr8/d3V3f9vXr1wceX6lUqNls+vaNM0cgPzHq9OnTwuMSeQVl+eawLMup1WqOpmkBm5Db+owCO0+cnSM+DlhDvSRJY40zMGncVseglpyiKAO7iG6LUJIk38i5qFs3LSRtIbMtqbDnyH3Ww8hbfVKM1l4U+O7/MPODO7YxzG95lPDeFWG6Ftcu7jgZmixc1xP+wY1ScBZ2NHmSYshW+kkQ5Sji4R4T9qdhg6q0Wq3AgzsNQWNEJBFk1sQQ9tyzgz8i8lifWQoya85xGwKDvpP7/LmTLOJqS1bwbneil6Mo3kUUMhFkPvIR6w/I2nqGCRt7nTyIYBSROg4MGwXnF16QeR9S98/BC9n6+rpjWZajqupU1adIkIfZ1qOG3xQJfJ7rMwtB7na7zvr6eiRPCX6GHnscH6XQsiynXq87qqqO3Ddb9BuxMyj5z6MG5EotyKIpjeyAAytqgwY02OvkaQAoSjd+2hH5uEYVZH5qNT9FVBRneVpCLFqWFRrbWNO0UFHiW1BxBDnv9ZlGkEUvNlfMwgSUb+yxPr1h9Rw2yJYlfOt+0BInOmJqQRY9IHEfDtaOlDdbI9t6HFf82HETVzzYFybfNef/WN1u1+fyNS0z9ZIKquPEdxtjn6u812caQXYcx7OHq6rq1Gq1oVrhNojCJliwgq0oSqxJGFlQr9eFY2bubMq4WphKkEVvvCSCmnd7Lfujj3NqJgDgZJHK7e3LL78M7Ltw4ULs69y4cYOIxPF488CVK1e8dTfxJgAAZE0qQeZ9AYmInnvuuVjXaDQaXsSqPIox0YPoToqiEBHRwcHBifNPBgCMh0SCbNs2VSoVMk0z8Nnly5d9gcWHOWx/9tln3vpLL72UpDhE9CAwNZv5dWFhITRL8t7ennesKOi3iNdee81b50NSAgBAJsS1cVCKwQ4RrOtLkpFi1+1HdG/R6LNoZDbKKChrLz+ug3sAgMkSq4Ucd3qi280fdD3XXCFJkjAP1TDW1tZ8ObtYjo6O6ObNm952o9Ggy5cvB4576qmnht7nkUce8dbD7gcAAGmIJchzc3NerjA+Yj7Rgxxd7ueO49D3338/8Hp//vmnt55k3ne73aatrS2SZZksy6JarRY4xrVz93o9qlQqwuuIMjbw8C+LLObOb2xsBHLHZbVsbGykLh8AYLwkHtT76quvAvviBk756aefkt7eQ1VV+vjjj2l2dpaWl5dJlmXf56ZpUq/X8wXNabVaZFkWEQ1vxbOw146SQRYAAOLw36QnsnnBXJ555pnEBRmUeTeMpaUl2t/f9+27cOFCII34pUuXyDRNkiTJl2LecZxY9ysWi95A5h9//BG7vDwrKyu0srKS+joAgONBohZymPdCmqSCYSHs4iJyuxOJcVr4JIwAAJCWRC3kb7/9NrCPzQQ7SZ588knh/s3NzZFloZ1mCoXCpIsAwIliUM88UQtZFBw7iclhFIhEV5bl3E46AQAAl0QtZNGA3rPPPpuqIL/99luq81lUVfW5pokmsKTl8ccfz/yakyCuHR0AMDpit5BZ32GWJ554IlVBspqObNs23bt3L7A/zO4dh7t373rrjz32WOrrAQAAS2xB/uWXXwL7ZFlONKnj7Nmzsc8ZhG3bVCqVhC3iLLwi2BfRqVOnUl8PfsgAAJbYgvzNN98E9sXx5WV59NFHvfUsZr+VSiXqdDokSVLgsx9//DHVtfmJIBggBABkTWxBFtmP+Yy4UZmbm/OJZxqzRaVS8XyjP//888DnonLHgZ1VmJVHycrKim9mY5YL/JsBmD5iCbJt20JzQJRYEGGw8ZNZG+0gtre3vW55v9+nUqnkTQap1Wq0tLQUmLHX6XQ8wbdtmxYWFmhvby9yOW/fvu2tv/DCC5HPAwCAqMQS5Dt37gj3R4kFEcbLL7/srbOhOAfhmg/eeustkmXZM3domkbLy8tEJA6Uf/PmTbJtm65du0adTifW1G029vOrr74a+TwAAIhMnNBwfBpyEiRhTAIbgjNKfjBRuE1FUXznDks0yR8/CDbPGUJvAgBGRawW8tdffx3YlyRlE8/bb7/tre/u7g49nh8AVBSF9vf3aXZ21ttXLpdDBxsVRaFms+k7fhDb29ve+htvvBHpHAAAiE0c9SZBSzOLpKR81ulBLVfTNL3028Oy7pqm6WWtda+9vr4eK0uvaZpoHYOR4/bC2Ize4OQRWZBFGaYpYZYPEa1Wy7tmtVrN5JpZwJpHut3upIsDxoBhGI6u6z5TmqIosV/mLiJTX9gyLYJsWZZTr9cdXde9BhJbV9VqNTNtOElEFuRarTYS+zGLruuZtrzTUq1Wc1UeMHqGjT3Ishz7xXzcBJl/WYUtkiShEROTyILMdv1HKVJ5EWWI8cmD7aURk2vRMAyfAA0zq/HEEWTDMEb19TKDb5S5LWG+nty6AtGJJMiWZQlbCqOCFUNN08ba9TFN0zNTSJIEMT5BsGLCjxfwoholMa7o3OPAIJOlqIeBVnJ0InlZsIlCXT788MMopybi3XffJcMwSJZlajabJMtyaD68rLBtm8rlsufXrKoqdTodhO08ITQaDV+skldeecX3OT87c2dnZyzlyjOapgVi2IiCbiHdWXSGCnK73aYbN2749um6ThcvXhxZoYgeTDa5d+8etVot0jRtpPciIpqdnaVOp0O6rpNhGLS/v58oYBKYTvhJSfzsUz52SafTIdu2R14uF9u2qVKp0MzMDBUKBSoWi4H4Knt7e1QsFqlQKNDq6urIyuL8f3p+o9GIdHxY0gggIKzpzE6GYJdpGHQAIC6yLA/1HuKPiWrvTWuyME1TOIjGmg15U0Eck0qW8HZ4uIrGI7SF/N1333nriqJQtVol0zQRtAYcS/gYLaLeUbFYHFdxfNy9e5cWFxfJNE1aX1/39pumSe12m3q9XsCklybhcBq++OIL3zZbXhCBSb8RAMgDxLU+RfBT9qP2FtkWsmjav6qqkVu07EQltwyuH/CkWsUufK8aven4QJABcEYryK1WK5LfbtT4KrzphHLgmmlZlm+CiK7rEy3PtJIoySkAIHpexYsXL1Kn06Fut+sNiFmWRfV63RcPvNPp0Nra2tDr8TFa6vX6QG+gtJlpoqQ/W1tb8+KR67pOm5ubQ88BQSDIACQkTl7FM2fO+Dw1ZmdnqVwuB5IpbG1tDU3U8PTTT/u2J+2aub297cUjhxinA4IMgADepUxEFnkVl5aWAinH7t+/P/Cc06dP+7aHtWDTZqYZFO+80WjQ1atXiQhinAUQZAAoOPFDNJmBDfsqSVJmeRUXFxcjH8sKoMvPP/+cSTniwnp3KIoCMc4ACDIARHTu3DnfNi9yvBkhizjgLvfu3Yt0nCuAiqL4WtVRWvNZY9s2Xbp0iY6Ojrx45KJjkAE9HhBkAIjoypUrvu1PP/3Ut33r1i3f9vXr1yNdt91ue4Njoun//X7f5wMtSZLQRNBut71kws1m09eqTpvANwnXrl0j0zRJkiTa2dkJJHuwbTvSACXgGLtfBwA5hQ1qRYxfb7fb9bmtaZoWOJedKcfCxxFnYyp3u91ALGHWlU4U1Mt1b+ODHRmG4V1v1MF8+Nl4wxb4I0cHggzA/+F9aUWLqqpCX2FWeNkp1WGJHUQLn5iBFz72c36CiLtkHaNchMgPGoKcDRBkADjq9XpgEoiqqgMnX7DCy8fBaLVaTrVadVRVDUwQUVU1NLuGmxRCkiShqNXrdV/qs3EIX5wXjOgFBQZTcBzHiWjdAACEsL29TVevXiVZliMP0gHAg0E9ADLg8PCQiEYbJxwcfyDIAKSk0WhQs9kcS5xwcLyByQKAlFQqFZqbm6Pl5eVJFwVMORBkAADICTBZAABAToAgAwBAToAgAwBAToAgAwBAToAgAwBAToAgAwBAToAgAwBAToAgAwBAToAgAwBAToAgAwBAToAgAwBAToAgAwBAToAgAwBAToAgAwBAToAgAwBAToAgAwBAToAgAwBATvgflEal0edl77IAAAAASUVORK5CYII=[/img] es:[/b]

[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZYAAABWCAYAAADsZ7CWAAAUVUlEQVR4nO2dzWsbV/fHv/rxbNMwclZtCcWjLgoBmXScQGIXnIUlHAgNKUjGWRQCTaRAFi1EQW53zYtU6KJQS4YESnEZJU03pjK2A/VCoiS2CzOLkEUyppTQ1SiG9g+YZ+Hfvc+d0YxeR6MXnw8MjDXXM3c0o/u999xzzg1ZlmWBIAiCIHzi//pdAYIgCGK0IGEhCIIgfIWEZcjRdR35fB7xeBzhcBihUAihUAiTk5MolUr9rt7QUavVUCqVkE6nEYlE+PcZiUSQTqext7fX7yoSxMBDwjLEVKtVTExMIJPJ4OLFi3j58iUsy0K5XIZhGJifn8fi4mK/qzlULCwsYH5+Hjs7O/jll19gWRYMw0AkEkGhUICiKKjVav2uJkEMNCQsI0Aul8PVq1cxNjYGAJibm0MqlQIAFAqFflZtKJEkCevr64hGowCA8fFxLC0tAQD29/fx4sWLflaPIAae//S7AkTnTE1Nwcup7+jRowAOGkKiddbX110/Z98nQRDNoRHLiPLbb78BAB+5EN3x4MEDAEAsFsPU1FSfa0MQg02I4lhGj1KphPn5eUiShJcvX3ITGdEetVoNz549w3fffYft7W3cunULN2/e7He1CGLgoRFLh+zt7XHvoXg8zr2H+u1BxERFURRsbW31XVRKpRIikQjy+XzTsrquY3l5GclkEpOTk7bvdHJyEvl8PrCJ83w+j2PHjuH8+fPY2NjA7Owsjh8/Hsi1nVSr1ZHzUqtWq0gmk7Z7CofDiMfj5M04ClhERwDgWy6Xs0zTtCzLsjRNsxRFsQBYkiRZlUolsDqpqmoBsBRF4fXpF5VKxYrFYrbvqFl5VlaSJEtVVX6sXC5bkiRZACxZlgO9N9M0rXK5zJ9p0N9tNpvl12XvkmmaVrFY5N+VpmmB1adbTNPk74WiKLa6i895EN5honNIWDqENYLZbLbumGEY/Lgsy4HUh4lKKpXq6w/SMAwrkUjYhLddYSmXy3XH2f2xewwa0zR5o9fsXpyI99YOuVyOi4fbM212fBBh74ZXnTVN499VLBbrQw0JPyBh6RD28nv9oMXeeq9/9KzRbbfB85tUKsV7m6qq8oavHWFRFMWzDDtXozK9hD3Tdhu8ToTFNM2GnRdnmX4/+1YQO1yNOgdsdEgGleGF5lg6xDoQ5ZbmMLziHmq1GtLpNLcxu81D6LrO53DC4XDdcTanoqpq3cRytVpFKBRCtVpt8a66Q5IkFItF7OzsIJlM4syZMy3/L3Od3tnZaVp2d3fX89ja2hq320ciEdc5iHw+z7MULC8v247F43FEIhHXc7969QoAcPHixaZ17JYnT57w/bNnz7qWGRsbg6IoAICff/7ZtYx4r/F4vO648x3Udd2H2rvz999/8/333nvPs1y/5wUJH+izsI0srfS6xFEN20Sbs6Zp3PwCl566YRi2416bYRg9u89GiD31bnvUYu/ca8QgXo9tiUTCVoaNqtjmNLuxZyKaFA3DsI3G2h2BdjJiEUd7jebpxHeo0TnYViwW+XHTNG3vKXo8uhZHLM7nIsLuSZKkntWF6C00YukB1WqV96pjsZhrmXw+j+3tbWiaBk3T+OePHj0CcNCTvHTpEmRZhmmaUBQFs7OztnM8fvy4pQDI8fHxTm9lYGBxJABw7ty5uuO1Wg0XLlxAKpWCZVlIJBIAgIcPH3JPsuXlZRQKBaiqinK5DAA4ffq07Tw3btxAIpHA5uYmjh07hlAoBFmWsbe3B1VVsbOzMxQ96mq1ikwmA1VVYZomZFkGANy/f5+XuX79OgzDgKZpyGazUBSlp/c2Pj7Ofw+bm5uuHn57e3vY2NgAANy6datndSF6TL+VbRQRvcK8PHbK5bKtt8wmNVlvPJFIDL1njF8jFnFk5vWdmKZpm4sQJ4ErlQr/W/Q2C4pORizlctl1lOHEa8SiaZrt/5gXGStXLBb74lEmjpJETzfLsmzed8MwZ0R4Q8LiM6KppZ1GTPR6ymazQ+Xp44UfwiI2RO02hLIsc7OWJEl9a6w6nbxnYupl+jNNk99js3OLZijmwhykK7wTp0lS3Poh/oS/kLD4iGjTbvfHIfawg/jRu9nf29laqZ8fwiLa29vtXYtuz0G4rnbzfbrVz+lizebKDMOwVFW1YrFYy8JiWZZtPq6V5+E2Z9XO5nYN0zRto3P2TE3TtFRV5XXsh0s54R8kLD4hNgKdNqLsR+XlXuonwyAsYq+2E6EVzT9BjP78FhbLOvgOnXFBiUSCd1yYsLQinOw8rbpr90JYWEfBK75LvGYQvwOiN5Cw+IAfwXuiWWNUAsO6EZZOTYoiorD00+zTaYBkM5zmrWaIAtUPxFF5o/eB4liGH/IK65K1tTXMz88DOMgkzNbtaJeFhQW8efMGALC9ve1b/YaRxcVFvo6MqqpIJpNtn6NareLatWuQJAkA8Pz5c1/rOAg8fvyY71+5cqVh2Xw+j83NTf53L+NVvGDeXgAaxjhNTk7y/aBisAh/6VpYxESBjQL9RhFd13H58mUA3YlKOp3G9va2bTGpfvzwB4FSqYQ7d+4A6FxUdF3HhQsXkM1mcerUKQDA1taWr/XsN7qu4969ewAO3r1GLuWlUgmZTAYrKyv8s6dPn/a8jo34559/PI+xzgAAHDlyJIjqEH7T7ZDHMAzuZYIWzR5i2X6aKLqFDdkbee0080ZiZjTmesy+F9FVVFXVoUo0yGjXFCa6FXuVZ+f0em+YFxmbRxDzaYllgvQQ89sU5kx02mj+iAXZMlMZm+MQAxQrlYprfja/EV2oG5nuKECyt7DEqqlUqi5IW5Zl2xxep/hmxBS9Uw6DsLAGq1G2XVbGeY9MSNxyfImTm8xTZli/p3YnYt0aPRHRo0gkl8vx+BZFUWyNrViHYrHIywQ5j+WXsFQqFdvck5enXCwWs7LZLBcV8V5Fpw1N03iZoISWCaLX70ach2kUv0O0j/P9Ye9QLBZzzQISi8U6dnrxTVjaSZE+7MIixhi0son36PS0cU72i44A7TTKg4RpmlalUrFNwkqSZJXLZc8XtV0PJBHx3XNrbMVODysTZJqbboXFzYOv0Y9eLOcMKBUn/MUyQSGOttwCJIP0jDxsOJ+7U7hN06wTnk47YH0Rllwux7d+5bHqBtHbqF1hEdfR8PqeRFPAMEUgtyMOzvtyS7XfqrCIgYRuPXixwfIq00u6FRbWi1cUxUqlUg07Y2KP32sJBVGo+rHMAhuJO3vJ7P6G0ew7DIjfdSNTl/O5dPI8fFuaOB6Pc6+PXC5HS7gSBEEMEKFQCMBB/sL19XXPcmtrazh//jz/u5P2nNyNCYIgDhGffvppw+POxKx//vln29f4T9v/QRAEQQwdrRqn/MhwHdiIhS065dzcAqDYwlbiJi5SVKvVkM/n+YJO4XAY6XTadVGnarWKZDLJzxOJRA5NnA1BEES7OJczaLQomxeBCcvU1BQ0TeMr3jViaWkJxWLR9Ziu63j//feRyWRgGAaAg4DCQqEARVFsgYXpdBrT09N4+PAh/8wwDGQyGaTT6S7viCAIYvR49uyZ7W+vNaUaEegcSzQatTXyXoyPj+Pq1atIpVL8sw8//BC6rmNmZgbhcBi5XA65XI4vYAQcCMzdu3cBHIhKoVBAKpVCLpeznQsACoUCpYsgCIJw8Ouvv/J9WZYRjUbbP0nHvmsNXNT8imMR3SJjsZgtgtjr2sD/1t9wusk5U9NTam6CGF3cgv782oYx/q4VnHFOnd7n0HiFbWxsIJVK4fbt23XHbty4Yfu7UChga2urTmmj0ShfshaA65wMQRDEYUWcIsjlcpiamuroPEMjLJIk4fPPP3c9Njc3Z/s7lUp5Dt9OnjzJ98VsqwRBjBbr6+uwDoLAfd86bXAHmXw+z9vERCLRVSzi0AjLqVOnWnaD++ijjzyPNUrXTRAEcRhZW1tDJpMBACiKgu+//76r841MHIssy9xL7N133+3ZdVj0KkEQwWH5kyBkYBAzlfhNpVJpa0QlLv+hKArW19e7jmUZmhFLMyKRSL+rQBAEMVTUajXMzMxgf38fkiTh/v37vgRIjsyIJShGredEEETwNMrVFRS1Wg3xeJyLipvDU6eMzIiFIAiCaJ2FhQXs7u76LioACQtBECOKW2oov7ZhD65Op9N8jmdpaclXUQFIWAiCIA4VpVIJhUIBwEGsSjKZ9P0aNMdCEMRIMgjzGIPG3t4eD4LsNlalETRiIQiCOCSk02k+Wd9KrMrk5GRHIRYjM2J59eoV33/9+nUfa0IQBDF4lEolPq+ysrLS0K24Vqvh22+/5ZP77eKbsIg5/ButOObMz/X8+XPPYB7xPKJwuF2bBUcCwF9//eVZ9vnz53X/64ffNkEQxCDz5Zdf8n1x6eFmnDp1qv2LdZgEk2OaplUsFm0ZMSVJslRVrStrGEZdxlFZll0zaFYqFUuSJFvZbDZrmaZZd85UKlV3fa9zyrJcl+HYeU6CIIhRQlXVjjM5x2Kxtq/XtbA0Sk3tTJ/fqPKiEIjp8pvdZKNzitevVCoNyxIEQYwqjdrUXghLyLIolJwYPnRdx8TERNt5kQiC6D3kFUb4QrVaRTKZRDgcRigUQjgcRjKZ7DiQrFlw28TEhM930Ht0Xcfy8jKSyST3tmHb5OQk8vl83XrjBDGMkLAQXVMqlTA9PQ3DMLC7uwvLsrC6uorNzU1MT0+jVCr17NpHjhzp2bn9pFqtYmJiAteuXcPm5ia++OILvrZHuVyGYRjIZDI4ffo0iQsx9JCwEF1RrVYxPz8PSZKwvr6O8fFxAMDU1BTu3r0LAJifn4eu6x2d32qy4JLfqSiCYGVlxRbtPDc3h6WlJQCAYRj46quv+lU1gvAFEhaiK77++msAB6t2Ot22P/nkE76/vLwcaL0GFUVR6lY8BWATmp2dnSCrRBC+c2iEhaUyiEQi3K4dj8d7aqYZdfb29njA1dmzZ+uOj42NIRaLAQDPTRQUtVoN6XSaP+t8Pl9XRtd1PpcTDod7Wp+pqSlYltWSaOzu7va0LgTRaw6FsOi6DkVRUCqV8MMPP8CyLBiGgVqthvn5eZ47h2iPJ0+e8P233nrLtcy5c+f4fpAZYRcWFmxilslkbOY4XdcxMzPDhVGW5cDq5oY4r8LEmCCGlZEXFnGFtNXVVe6aOj4+jvv37wM46E2TqaZ9xIb67bffblo+qFQ7+Xwe29vb0DQNmqbxzx89egTg4J24dOkSZFmGaZpQFAWzs7OB1M2LBw8e8H1RjAliGBl5YXnw4AH29/ehKEpdvEM0GoWiKACAb775ph/VG2rE9Dxs0t7JiRMn+H6jVDteLC4u2lxzW3FjPnHiBFZWVhCNRhGNRpFIJAAAf/zxBwDg+vXr3NlgbGwMOzs7uH37dtt184u9vT3cu3cPwMEczJUrV/pWF4LwhW4jOk3TtKVUcUbbW5ZlaZrGI/QlSer2kpZlHUT8l8vlpuVYCpdsNut6XIxIdUsDQ3gjZl3wQsx44PZutHJur83rmToR01lks1lLkqSBSeNjmqalKAr/bWia1u8qEUTXdD1i6Zct+9y5c7h8+XJDN1Zd13lyyqNHj7qWOXPmDN///ffffakb0T0//fQTyuUyNE3jrsWGYSCXy/Eyd+7cwdraWtNzffDBB7b/WV1dbZp4NJ/PB7LCYC+XhyWIftGVsPTTln3z5k2cOnUKMzMznuLy4sULvn/8+PGm52yUlZkIlrGxMczNzdka2vHxcdy8eRPFYpF/9uOPPzY9VzQa5am/s9nswKSAEZeHXV1dJVEhRoduhjvlctlmjkokErakZYlEwlIUpWdmB9M0LUmSPE0IrZi5TNPsKtnaYYY9bwCeJhzRDNWK6bJVgNYTiJqmyU2ig/KMRfOxWyZwghhmuhqxzM3N2YK9Pv74YwDAxsYGFhcXsbm5ySdIe8HY2BhWV1exv7/fcOTS7BxEZ5w8eZLv//vvv65lxAn7d955x7drM6eLVlhYWMCbN28AANvb277VoVMWFxe5+VhV1Z6sOU4Q/cRXr7B2bdnVarUrO3YoFML09DQAcHFxLiRG9A7R48u5gBqDmRdlWe6JqafZnF06ncb29jZPmbK/v99xehk/KJVKuHPnDgASFWJ08VVYBtWWTfSGubk5/ry3trZcy2xubgIAPvvss5bPyybOG03Ms+j0RnN2pVIJhUKhLjfX06dPbWWCEhqW/QEAcrmcq6iwzlaQwaQE4Tt+2tX6Yctm7qxu8yziypbFYtH1/w3DaNt9lfgf4jyWYRi2Y+KzcZtnY++K0w2ZndPrHWLPVZKkumvi/+dy2NyOeG7mwizLsmWaJi8TlJs5u34ikXA9bpomn7ciiGHG1zc4Fovx5YT9ildpRLPJ+1ZiKMQyXuJDNIZNRCuKwht6trR0o9gM1tA6BUQUq1Qqxc/JlsH2Oq9zldBUKmU77rY8a1CdiWYrmDo3ghhmfHuDU6kUX+ue/Th6HezFhMzrOqLHl1cvUayvs/dLtI6qqjzQj40KRFFwgwmLUwAMw7CKxSL3KhQb3FgsZuVyOdcRkDiS8epIiIG67QRsdovoQUfCQow6vrzBrHFm7qRuIwBVVX0Vmlwu11KkMvtBe42gWG97UNxQDxNsdEvutgQxWnQsLP22ZcdisZYaJNEE4SzPTGlB2tmJAzRN4+YzgiBGi46EZZBt2W6w+kiSxAXEMAxuZqEec7Cw/FiUG4sgRpOO3I1ZzIIkScjlcjxGgJFMJvmaEqxMP7PHJpNJVCoVzM7OYnp6GqFQCIqiQJZlVCoViiUImNevX2NsbAy7u7uUxoQgRpCQZVlWvytBEARBjA4jvx4LQRAEESwkLARBEISvkLAQBEEQvkLCQhAEQfgKCQtBEAThKyQsBEEQhK+QsBAEQRC+QsJCEARB+AoJC0EQBOErJCwEQRCEr5CwEARBEL5CwkIQBEH4CgkLQRAE4Sv/BbNatsDIZOpLAAAAAElFTkSuQmCC[/img] [img]data:image/png;base64,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[/img] [img]data:image/png;base64,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[/img] [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAXkAAABWCAYAAAAqjuZqAAATTklEQVR4nO2dz2vb9v/Hn/7yuXZDTk/bGCPKDoNBSqe0sCaD9BCHDMpGB3bpbhtL7UIPGySde127yTsMdqjt0UIZZXK7ngIOiQvNwT50SQbSofSwyoxRdpKbsf0B+h6y93tv2ZIt2ZZkO68HCBTrHemtX8/3S6/36/V+J2zbtkEQBEFMJP8XdwUIgiCI8CCRJwiCmGBI5AmCICYYEnmCIIgJhkSeIAhigiGRJwiCmGBI5AmCICYYEvkxwjAMFAoFLC8vI5lMIpFIIJFIYG5uDpVKJe7qjR2tVguVSgW5XA4zMzP8es7MzCCXy6HZbMZdRYIYHJsYC+r1ug3ABmCXSiXbsizbtm27Wq3akiTZAOx8Ph9zLceLVCplA7AVRbF1Xbdt27ZN0+S/S5LErzNBjCtkyY8ZqqpidXUVU1NTAICVlRVks1kAQLFYjLNqY4kkSdja2sLs7CwAYHp6Gjdv3gQAHBwc4OnTp3FWjyAG5n9xV4Dwx/z8PGyPEShefvllAIeiRPhna2vL9Xd2PQliEiBLfgJ49OgRAHCLnhiM27dvAwBSqRTm5+djrg1BDEbC9jIPibGgUqngwoULkCQJv/32G3fjEMFotVr45Zdf8P3332N3dxdXr17F2tpa3NUiiIEhS94HzWaTR2EsLy/zKIy4IzGYwCuKgp2dndgFvlKpYGZmBoVCoWdZwzBQLpeRyWQwNzfnuKZzc3MoFApotVoR1BooFAo4fvw43n//fWxvb2NpaQmvv/56JMdup9FoTFy0T6PRQCaTcZxTMpnE8vIyRYVFQcwdv2MB/o1qAWCrqsojLnRdtxVF4ZEY9Xo9sjppmsYjQ+KOAKnX6zwihV2jXuVZWUmSbE3T+DYxWkiW5UjPzbIsu1qt8nsa9bXN5/P8uOxZsizLLpVK/FqxKKBxwLIs1wgm23be51F4hicZEnkfMEFyC1E0TZNvl2U5kvowgc9ms7G+HKZp2ul02tEIBhX5arXasZ2dHzvHqLEsiwtQr3NpRzy3IKiq2jVss9f2UYQ9G1511nWdX6tUKhVDDY8GJPI+YA+i18slWrFhv4BMAIOKz7DJZrPcCtM0jYtQEJFXFMWzDNtXtzJhwu5pUPHpR+Qty+pqSLSXifve+0E0fro11OyriZwK4UE+eR/Yh42hL5+3V1x1q9VCLpfjPkk3v7VhGNznn0wmO7YzH7ymaR2dgo1GA4lEAo1Gw+dZDYYkSSiVStjb20Mmk8G7777r+39ZOOje3l7Psvv7+57bNjc3uZ93ZmbG1WddKBR4dnC5XHZsW15exszMjOu+nz17BgD48MMPe9ZxUB4+fMjXz5w541pmamoKiqIAAH7++WfXMuK5Li8vd2xvfwYNwxhC7d35888/+fobb7zhWS7ufqQjQcyNzETgxxoRrX22iD5KXde5iwAuFqxpmo7tXotpmqGdZzdEC3ZQS1O0Wr0safF4bEmn044y7GuDLe2uIXZPRLeXaZqOr5SgX2b9WPLiV1C3fh3xGeq2D7aUSiW+3bIsx3OKkL86RUu+/b6IiNnFRDiQJT8gjUaDW5upVMq1TKFQwO7uLnRdh67r/Pf79+8DOLSwzp8/D1mWYVkWFEXB0tKSYx8PHjzwlew0PT3d76mMDCxOHQDOnj3bsb3VauHcuXPIZrOwbRvpdBoAcO/ePR6RUy6XUSwWoWkaqtUqAOD06dOO/Vy5cgXpdBq1Wg3Hjx9HIpGALMtoNpvQNA17e3tjYWk2Gg2sr69D0zRYlgVZlgEAt27d4mUuX74M0zSh6zry+TwURQn13Kanp/n7UKvVXCOlms0mtre3AQBXr14NrS5HnrhbmXFHjK7xinyoVqsOK5J1SDErNZ1Oj32EwbAsefGLxeuaWJbl8F2LHXj1ep3/LUbtREU/lny1WnW1vtvxsuR1XXf8H4vGYeVKpVIskTni14MYMWTbtiOKaRz6GMYZEvkBEN0BQQRFjB7J5/NjFTHhxTBEXhSFoKIkyzJ3vUiSFJtw9Nvxyho2L/eUZVn8HHvtW3SVsLDMKMN722l3m4lLHA3xUYNEvk9EH2jQB1W0PKN4Ad38tUEWP/UbhsiL/tmgVqcYyhlFON4g19Otfu1ho6xvxTRNW9M0O5VK+RZ527Yd/Td+7odbH0eQxe0YlmU5vlrZPbUsy9Y0jdcxjjDZowSJfB+IL2S/ghbl8MDjIPKitddPoye6KKL4Khq2yNv24TVszztIp9PciGAi76cRY/vxG4IahsizRtsrf0Q8Jg2THR4k8gEZRqKO+Ok9KUkgg4h8v24vEVHk43RN9JsM1Yt2F0wvxMYiDsSv1W7PA8XJhw9F1wRgc3MTFy5cAHA44iMbdzwoFy9exIsXLwAAu7u7Q6vfOHLt2jU+Dr6machkMoH30Wg0cOnSJUiSBAB48uTJUOs4Cjx48ICvf/LJJ13LFgoF1Go1/neY8fBesKgZAF1zKObm5vh6VDkeR41AIi8OItUtqWcSMQwDH3/8MYDBBD6Xy2F3d9cxMUUcL+EoUKlUcOPGDQD9C7xhGDh37hzy+TxOnToFANjZ2RlqPePGMAx88803AA6fvW5hspVKBevr67h79y7/7fHjx6HXsRt///235zbWMAPAsWPHoqjO0SOI2W+aJu+th89Pc7FsnJ/Rg8I+K7tFP/SK6mCuHhZOya6LGP6madpYDULFCOquEUMlvcqzfXo9Nywah/mdxfFdxDJRRtoM213TPghet/4GllDH3DnMJy4mI9XrddfxgoaNGBbazb1EyVCHiLo67Oe1rydR7OU/CiLPxKPbqIisTPs5MlF3G3NG7JhiEQfjep2CdqK5CZCIGJkhoqoqj59XFMUhfG7z4CqKEmm/x7BEvl6vO/oqvCKOUqmUnc/nucCL5yp2uOu6zstE1eixxsnrvRH99t3yAyad9mi7kRD5IMPKjrvIizHMfhbxHNsjFto7asVO3CACOUpYlmXX63VHB5okSXa1WvVsEINGcoiIz56b8IkGCCsT5VAPg4q8WyRUKpXyvJZiufbkMbGzViwTFeJXiFsyFE1Af0j7cBNjJ/KqqvIlrnFVBkGM2ggq8uI44F7XSfxcHafMvyBC3X5ebsMT+xV5MWnIzbIVxcOrTJgMKvLMqlMUxc5ms10NI9EC9Bp2Wmw04hiamn2hto/dxM5vHF2Tw8StUR+2DvQ1/d/y8jLvPVdVlaZJIwiCCIhhGDhx4gQkScLS0hLu3bsHYPiaSiGUBEEQMfDpp58CAL7++utQj0MiTxAEETGFQgH7+/tQFAWrq6v466+/QjtWKCLPJrBoX9ySHdonxm6f8KDVaqFQKPDJIZLJpOekxmzCYHEC5KMSx08QxHjQbDZ53sN3330X+vFCEfn5+Xnous5nsunGzZs3USqVXLcZhoE333wT6+vrME0TwGHyULFYhKIojiSiXC6HhYUF7tcCANM0sb6+jlwuN+AZEQRBDIdcLoeDgwPk83nMz8+HfrzQ3DWzs7MOwfVienoaq6uryGaz/Ld33nkHhmFgcXERyWQSqqpCVVU+GQJwKPbMl5XL5VAsFpHNZqGqqmNfAFAsFillmiCI2CmXy9je3oYkSfj8888jOeb/wtx5kFmKxHkgf/31Vy7a169f57+vra05Invu3buHZDKJSqUCXdcxOzvLy66uruLEiRP8759++imSVpMgiOgRdWHY1Ov1oWhHs9nEl19+CeDQgxHVrGMj2fG6vb3dIfCMK1euOP4uFovY2dlxCDxw+CXBpoUD4OrDJwiCiArmpkmlUn2N09QvIyny3T5lVlZWHH9ns9kOgWecPHmSr4fVyhMEET9bW1uwD5M7h74Mw4qvVCpcg/od3LBfRlLkT5065ftT5r333vPc1m2IU4IgiChotVo8+ENV1UBu7GEQqk8+LGRZ5tE2r732WmjHSSQSoe2bIAh3+kjCH2kuX76Mg4MDyLLccy6AdsrlMi5dujTQNRlJS74XMzMzcVeBIAiiJ5ubmzzK8M6dO4E6W1utFr799tuB6zCWlnxUTJpFQRBEtLCJhgDgq6++8iwnzhD3ww8/4NGjR9jd3cXBwcHAdSCRJwiCCAlRpP0Gf5imyd3Rw2As3TUEQRAibsOjDGsZJJHSbwRPKpXi/6Oqasf2QSCRJwiCmGDIXUMQxNiztbUVdxVGFrLkCYIgJpixFPlnz57x9efPn8dYE4IgiNGmL5FvtVp8/ffff/cs1z5ezJMnTzzLivsRRdzt2GLP8x9//OFZtv14Yr0JgiBGBTGEspum9kWQCWEty+qY2FqSJFvTtI6ypml2TN4ry7LrxMT1ep1PvsyWfD7fMemwaZp2NpvtOL7XPmVZdpSNYyJjgiAILyzLctU0N03tl0Ai3y7a6DLDuFc5AA5RdputnC2pVMr3PsXj1+v1rmUJgiBGAb+aNgiJfw9EECMLm9V+WON6E8RRYiw7Xol4YXPpJpNJPu9uJpPpO2mkVyKLOPnLuGAYBsrlMjKZDObm5hznMzc3h0KhQH1ERCSQyBOBqFQqWFhYgGma2N/fh23b2NjYQK1Ww8LCAiqVSmjHPnbsWGj7HiaNRgMnTpzApUuXUKvV8MUXX/DMxWq1yucePn36NAk9ET5DcfoQRwLW1yFJUkcHttghr+t6oP2yvp5JQewTqlarHds1TXMEAxBEmJAlT/iGjaKXzWY7hkz96KOP+Hq5XI60XqOKoigdM5kBcEz9tre3F2WViCPIRIp8s9lELpfDzMwM94MuLy+H6kqYdJrNJh9F78yZMx3bp6am+CBLxWIx0rqxmXfYvS4UCh1lDMPgvv9kMhlqfebn52Hbti8B39/fD7UuBDFxIm8YBhRFQaVSwZ07d2DbNkzTRKvVwoULF/g0XEQwHj58yNdfeukl1zJnz57l64OM3BeUixcvOhqW9fV1GIbB/zYMA4uLi7yRkmU5srq5IfrhxdEHCSIMJkrkW60WFhcXcXBwgI2NDR5uNz09jVu3bgE4tDLJnRAcUTRfeeWVnuWjGm6iUChgd3cXuq5D13X++/379wEcPhPnz5+HLMuwLAuKomBpaSmSunlx+/Ztvi42jAQRCnF3CgwTllilKIrrdkVReOYtEQwxEc6LarXaVyIH23c+n+f3CP928KbTadeMZvGYYudmOp12JNKl02lbUZSRyXQ2TZNnd49SvYjJJfCwBmIKrtuLrOs6f2klSRpKJVOplGuUQjtsGIN8Pu+6Xcyu7SYcRCd+RF6MKulH5LstXve0HTFyJZ/Pu0YCxYVlWbwRkyQpcBQSQfTDwMMaiA+qruuOMWi8LOqgqKra86XQdb2nwPQrQkS4Im9Zll2tVh331zTNjiEv/DT04nPgtzHvNrSGn8WvwSAaPyTwRFT49snH6ftcW1vDqVOnsLi46PANizx9+pSvv/766z33OfSR3oi+mZqawsrKCmZnZ/lv09PTWFtbQ6lU4r/9+OOPPfc1OzsLSZIAAPl8fmSGQcjlcrzjd2Njw3GuBBEqfluDuH2flmXZkiR5WkF+XDGWZXkOfkZ0h91vdEl2El0lfqxuv0CwmnthWRZ3243KPRZdnMMcXZAg/ODbkl9ZWXEkdnzwwQcADmcgv3btGmq1Gra2tjqSZIbF1NQUNjY2cHBw0NWi77UPoj9OnjzJ1//55x/XMuLY/q+++urQjq0oiu+yFy9exIsXLwA4x+iOi2vXrvHwTk3THIlQBBEFfYdQvvXWW3z9xo0b2NjY6CqijUZj4FnTFxYWAIALffukJER4vP3223zda/IX5gKTZTkUd0Sv+PZcLofd3V3cvHkTwOFz0o8xMCwqlQpu3LgBgASeiI++RX5UfZ9EOKysrPD7vbOz41qmVqsBAD777DPf+y0UCkgkEtjc3PQsw7JCu/XxVCoVFItF3L171yGmjx8/dpSJSvRZ1jUAqKrqKvDM8IkycYw4gvTr54nD9ykOkNXuFxYHyCqVSq7/b5pm4JA84j/Efg/TNB3bug1eZtv/hbe2R92wfXo9Q+y+SpLUcUz86/tnfQHivlkkiyzLtmVZvExUobPs+Ol02nW7ZVm8n4MgwqTvJyyVSvFwyWHFw3ejV8ern/A9sYxXQ0B0h3UiKorCRZdN39gtNJCJXruYiw1HNpvl+2RTTXrtt332r/bRHMVO4Kgb9l4zk7UvBBEmfT1h2WyWz0PIHtSw435Zo+J1HDFyxst6EuvbbhUS/tE0zZGZKsuyQ6DdYCLfLsamadqlUolHZ4nil0qlbFVVXb8MRAvfq1EX49KjzIsQI5FI5Im4CfyEMaFkIXJulrGmaUMVfT/JULb938vl9WXBrNBRCa07SrCvPgohJIho8SXycfs+U6mUL3EQP5PbyzN3T5R+WeIQloU6rAxogiD801PkR9n36QarjyRJXMxN0+SuALIko4WN10Kp/AQRDz1DKFlMtCRJUFWVxyAzMpkMHxOblbl+/Xqv3YZGJpNBvV7H0tISFhYWkEgkoCgKZFlGvV6nWOWIef78OaamprC/v0+p/AQRAwnbtu24K0EQBEGEw0RNGkIQBEE4IZEnCIKYYEjkCYIgJhgSeYIgiAmGRJ4gCGKCIZEnCIKYYEjkCYIgJhgSeYIgiAnm/wFXvN5+/WK62QAAAABJRU5ErkJggg==[/img]

[b]9.- El límite cuando x tiende a 3 de la función [img]data:image/png;base64,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[/img] es:[/b]

[img]data:image/png;base64,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[/img] [img]data:image/png;base64,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[/img] [img]data:image/png;base64,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[/img] [img]data:image/png;base64,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[/img]

[b]ÍTEM DE RELACIÓN DE COLUMNAS [/b][br][b]10.- [/b][b]Relacione las propiedades de los límites con su respectivo ejemplo.[/b][br][img]data:image/png;base64,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[/img]

1a, 2b, 3e, 4d 1d, 2a, 3e, 4c 1b, 2a, 3d, 4c 1c, 2a, 3b, 4d

Information: EVALUACIÓN DIAGNÓSTICA