[i]Los puntos medios de un cuadrilátero determinan un paralelogramo cuya área es la mitad del área del cuadrilátero.[/i][br][br]Una vez dibujado el cuadrilátero ABCD, dibujamos un nuevo polígono EFGH, uniendo los puntos medios de cada uno de los lados.[br][img width=362,height=159]data:image/png;base64,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[/img][br]A continuación, tenemos que determinar la relación entre los lados h y f así como entre e y g, para deducir que se trata de un paralelogramo.[br]Para ello, utilizaremos la herramienta [img width=35,height=37]data:image/png;base64,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[/img] [b]Relación[/b].[br][br][img 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[/img][br][br]Una vez seleccionada esta herramienta marcamos los segmentos h y f, obteniendo que tienen la misma longitud y que son paralelos, como podemos observar en la imagen siguiente:[br][br][img 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[/img][br][br]Al pulsar sobre el botón [b]Más[/b], obtendremos en cada caso lo siguiente:[br][br][img width=242,height=145]data:image/png;base64,/9j/4AAQSkZJRgABAQEAYABgAAD/2wBDAAoHBwgHBgoICAgLCgoLDhgQDg0NDh0VFhEYIx8lJCIfIiEmKzcvJik0KSEiMEExNDk7Pj4+JS5ESUM8SDc9Pjv/2wBDAQoLCw4NDhwQEBw7KCIoOzs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozv/wAARCACRAPIDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwDtdF02ym0y3vLi0hurm9+dpJ0DHJJIAyDgAccVdfTNOQy503TiYRlwsKEj/wAdqrpRkXw3pTxxtIY1jYqnXHOcVCsWoFpspd5lJPKDDezH0759q1alpYyTjrcvTWmiW86QS2VmJHGQq2itgZxk4XgZ4yan/sbTP+gfZdcf8e6dfyqLUNKN5dNNFdmHzFRJBtJJCMWUqQRtPJHcc9KzY/CMUUbKt4rFnYs0kRcnP8XLYDjswx9KevYWncvwWuiXMskcNnZsYyQx+yKF4ODhtuDg8HB4qSPTNJleREsbItE21x9nT5TgH09xWfceGPPh8g6i/kou2NdpyV3h8PhhuAwR2PPWmDwlbb23XCeWwA2iI7iMKNpYsSy/J0Pr1oV+wOxrLo+mHpp9kfpbp/hUNzb6DZPHHc2NmjS/d/0NSOoGSQuAMkcn1pmn6Mlhc6hKbpnW9IyqAxlMFuhB6/NjIx0FSX2lw30ttKZ3R7VCImOWIbKkE5PP3eh65p69gZK+m6NHOkL2NiskgYqv2ZOduM9u2RStpOlqVB02zJYgAC1Q/wAhwPesiLwlHHbNEt8dzb9zlGJcNt+9ljz8vJGM57VJD4XSKzFqb/IAT98IsSjau3AbP3e4HajXsDt3NCPTdJmiEkVhZMjEgH7Mgzg47j2praVpw/5htn/4DJ/hVKPwzAjrM88fmIwZPKgCJGQynKLk7c7MH/eNa0jgk1pFd0ZyZTOmad206z/8B0/wqB9OsQf+PC0/8B0/wq/mmOuRWnKuxnzMofYLH/nwtP8AwHT/AAo+wWP/AD4Wn/gOn+FTsMGkBp8q7BdkYsLD/nwtP/AdP8KcNPsP+gfZ/wDgOn+FSZpQaXKg5mMGn6f/ANA+z/8AAdP8KcNO07/oHWf/AIDp/hTwacGo5UPmYwabp3/QOs//AAGT/CoZbPSoLuBpNOs9pSQf8e6f7PtVwNUN1bm58sqyhkzwwOCDj06dBUSirFRlqIkekS7jFo8EoU4JjsAwz6ZC1E66HKIiunWX+sGf9FUd+R0pn9ksWLYgBJycPIM/lTl0yVVRU+zqFIOMtWXIa8xBdS6ZG7tHptl5akKAtgjknbuOTkY9BRdf2Uum3PmafYiWJsbltFXoR2wcdfWpzpLMxYiDceCQ7jP5UybRpZLSSCM2yB++XPfNJx0ZUZK6uYC6xpBP/HvZ/wDgMv8A8TVm0ls7/wC0NDbWgSBd5xYq5YY6DpluOB6c9qlXwcyn/WW3/j/+FPHhOQYxLAMHcMM4wfX6+9cUYVlLVaHq1K2FcLQdn6f8Az11bSvKUvbWW7HOLdcf+g1c0iDSdfubiEW0A2wcPFEEZG3cMCAMEU8+D2YY323/AI//AIVqaDoI0iaSUujPIoTEYOAM5796ulTq83vbGeIrYaVO1Pc4yDxDcrBGGfcwUAn14orET7i/SitDiPT9EDPoekRLI0YkiAYrjPCk9wfStX7Cf+fu5/Nf/iay9B/5BOif9c//AGRq3quTZEUmVfsJ/wCfu5/Nf/iaT7B/093P5r/8TVuip5mVyoqfYB/z93H5r/8AE0n9nj/n7ufzX/4mrlFHMw5UU/7OX/n6uPzX/wCJo/s1f+fq4/Nf/iauUU+Z9w5UUxp4H/L1cfmv/wATS/2eP+fq4/Nf/iat0Ucz7hyrsU/7PH/P1cfmv/xNH9nL/wA/Vx+a/wDxNXKKOaXcXKuxT/s1f+fm4/Nf/iaP7NX/AJ+bj81/+Jq5RRzS7hyx7FE6XGetxcfmv/xNH9kxf8/Fx+a//E1eoo55dw5Y9ij/AGVF/wA/Fx+a/wDxNH9lRf8APxcfmv8A8TV6ijml3Dlj2KP9lR/8/Fx+a/8AxNL/AGXH/wA/Nx+a/wDxNXaKOaXcOWPYpf2Yn/Pzcfmv/wATR/Zq/wDPzcfmv/xNXaKOaXcOVdin/Zy/8/Vx+a//ABNL/Z4/5+rj81/+Jq3RRzPuPlXYqf2eP+fq4/Nf/iaPsH/T3cfmv/xNW6KOZ9w5UVPsH/T3c/mv/wATR9g/6e7n81/+Jq3RS5n3DlRU+w/9Pdz+a/8AxNMVGhvhF50kimLf8+ODux2Aq9VST/kKJ/1w/wDZhVRbuTJKx44n3F+lFCfcX6UVBZ6joI/4k2hn/pn/AOyNW7WLoY/4kWhH/pn/AOyNW1TYkFFFFIYUUUUAFFFFAGdqurrpT24a2lnWbfkRDLKFXdnHf86i1HXVsVtJI7dpobqN5PMBA2BU3DI681eubO2uXja4XJQMqfNj7wwR+IqG50qxuIbe2nUhYVKRKJCp2ldpHvxUrmu7m0nS9nFJe91/H/gFBfF2myuyQrPMwcIgjCnzCX2cc8fMf4scc06HxZpk11BbL5oklIBDAZjYkgAjOeoPIyB61cTQ7KNvlSbYJBKsRmYojBt2VXOBzzRBodlbTrLbrNEwOSqTMFfkkbhn5sFj1qjEr3viK3sJrqJ7eeZrVd8ghUEqgVSWOSP7wHHNObxDZqhYJKeJTjCj/VuEbkkAckdT0qPV/DiaoztHL5BuAVuGAbc6kAYBDDso4OR3qWTw3pksrSNFLuJLACZsISwYlR0BLKD9aAI7TxFDf211c20LGO3tjMNxALEFwV4yOqdQT1preKLSOESyW9ztbiMqgIlYFVZV57Fu+M4OKtWujafax3EECN++QpMGlLMQxYnOTkZLMfxpn/CPabksYXKg5CmVtqHIYlRnjJUE+tAEJ8TWvH+i3Z2yCKbCKfIYyGMBvm/vA9M8c1FZ+KYbhpfNtZY1UFo2GCHAiEjd8jg0688NwzXaTJMILfzRNMvzZdhJ5nJ3Yxu9Qcc4qdvDWltGYxFKinA+SZhxt2EZz3Xg+uBR0DqNtdfjvdRtra3tZjDcCTFw2AuVUEqOc55xzjocZo/4SSz+0LF5NztkbbFLsGyT94IzjnP3mHUDjmp7fRLC0vEu4I5EkjDBF81ti5ADELnGSAMmq8nhmye/+0bpVjMbL5IkYBWLq+5OflO5c8dzT6gNHivTDepaAyeYz7DkD5DvKDIzk5KnoDgcnFW4dSebW7rTvsrqltGrGZjwxboB/nsabb6FY2siSQCeMqcttnfEnzFvn5+bliefWraW0Md1LcquJZgqu2eoXOOPxNS76WNIOCUuZX009br9Lk1FFFMzCiiigAooooAKquM6ov8A1w/9mFWqgAzqo/69z/6EKcdxS2PGE+4v0ooT7i/SikM9Q0En+ydEGf8Aln/7I1b1YGgf8grRf+uf/sjVv1UiY7BRRRUlBRRRQAUUUUAYPiCKaTVtEKlhF5sy5X+GUxMIz6dd2Ce9c3p+ieM00+GJnkiuIZLjy557ne/zQFUZvmYff6AH3wK9CooHc83t/DvjGXSEhubu/jdTO6qt5tdW8r93lhIxYGTBwT+AFGo6b4igmh05ZNUujM9y8Ij1Hy3I8uLDM+egkLHaffAI4r0iigSOD1Dw/wCK5NP1CaK9uXv5J4VCpdFUkhCLv2LuUKS4J6qcdxmtGfTvEDeCrG0eS5uL6ORGuljuBDNLEGOUEgbAbGOd3OOtdXRQB57qeieL5LWb7E1xHv8Asu6M3YaV1VHDLvDJkhiuTkZx37yX/hbXtS0y8W9ub2e4GnQRwIt4YlkmBJk3KrYzjAyeK76ihgcKdO1uG+u7jUFuhp4imMzS3gkia3MWEiEWT84bGW74PJzXV6Etynh/TkvN32hbWMS7uu7aM596v0UAFFFFABRRRQAUUUUAFFFFABRRRQAVSmJGppg4/cf+zCrtUbj/AJCcf/XH/wBmFXD4iZ7Hj6fcX6UUJ9xfpRUFHp2gf8gvRf8Arn/7I1dBXPeH/wDkGaN/1y/9kauhq57kQ2CiiioLCiiigAooooAKKKKACiqGo61Z6VNDHeMyCVWYOFLAbcZzjnv+lTXGo2lo22eYITGZRwTlcgZHryw496Sabsi5U5xipNaPYs0VSGqQtrR0lUkMyxeazbcKB2GfWol1/TXg89JZHQttXbA5L8EkqMfMMAnI44oTT2FKEo25lvqaVFULfW9Ou7sWsFx5khyFIRtrHaGwGxgnaQcZ6Ug1zTzNLCJXLxF1IELncVIDBePmIJGQM9aZJoUVmx+INNmA8qWWQlGcqkDsVAYqcgDg7gRj1qMeJtMJ4lcqRwfLOS25lKBcbtwKnPHSgDWorKPiTTVikmaV/IRgPOWNnUgqrbsgHA+YdcVbtNRtb5pFtpC/lMVZthCkgkHBIweQRxQBaooooAKKKKACiiigAooooAKo3P8AyE4/+uP/ALMKvVn3X/ITj/64/wDswq4fEiJ/CeQp9xfpRQn3F+lFQWemeH/+Qdo3/XL/ANkauirnPDx/0DRx/wBMv/ZGro6ue5ENgoooqCwooooAKKKKACiiigClfaXDqDbpWkU+RJB8pH3XwCfrxUV/pQvrjTWOBFZSeYW3ctgYC4xyCcE/7oqh4glvRrVhFbStHm0u3hIXcGnCDZlf4sAscVzlveeNJNLgnW0vHvooLsB7mIAu2I9hxtXH8eARyR3pJLctzk4qLeh3q2iLqL325vMeJYiM8YBJ/PmsxPDMMU0lxFe3EVw7lhKioMZBB+ULtJIPJIzwPSuTS68dz6VE4nvYpUjnkUi1G+QqY/LVwyDqS/QDIFLf6l4rtbhdPW81KS5UXRgMNpGzXG2RBEXGMBDuILDHFO1tCXJy1Z2VnoFnYyQtA0oEErSIpbIyYxHj8h+dU/8AhGPtH2j7ZeysHuJZIUQjbEHYN6c5AwQcjk+tYOqzeNYbC7u7aW7aRtQMXkRxKfJgAyGjwjM2W4zg8fnWpqVz4hXwtpchN1HdOy/b5LC3DzIu08rGw/vbc8cZNHmLyL8Xha0gs5rZJ5ws6kEjaMfOXOAABjJIxjGOKiXwdYKq4lkLo5dGaOMhSSxPybduPnbjHHHpXN6td+NIIriSwhu18y5i3yLbjzNvkL0VVfjfnOAcHjIqfVIfFl3ZX80l9qMBgFpst7GFQJMhDMVyu44O7jPtQBvXXhCxvEZGnnCuu1lCpj7qrkDbhThRyB3NXrHSIbG+uLxZXeS4ADZVVHXPIUDJ7ZPOK5G5vPELDVhfvfR2yW1y0hkhWOGIKMwNE4wWY8ZGTznpXb2TzSWFtJcDEzwo0g9GKjP60AT0UUUAFFFFABRRRQAUUUUAFZ95/wAhKL/rj/7MK0KydUdk1KDb3j/9nFXT+JET+E8nT7i/SioVmmCgCFCMdfM/+tRWdzSzPT/Dv/HlpP8A1y/9kaulrmvDn/HlpP8A1y/9kaulrWpujOGwUUUVmWFFFFABRRRQAUUUUANaNHZWZFYocqSMlT0yPSnUUUAFN8tDIJSi+YBtD4GQPTPpTqKACiiigAooooAbJGkqFJEV0PVWGQfwp1FFABRRRQAUUUUAFFFFABRRRQAVgeIJWi1K0K90x/4+K3653xJ/yEbP/dH/AKGKqO40eSfbQvHkuccZBH+NFQHqaKxuzrUI22PYPDv/AB5aR/1y/wDZGrpK5vw7/wAeWkf9cv8A2Rq6SuipujghsFFFFZlhRRRQAUUUUAFFFFABRRRQAAZOKqxXNxNGJY7VSjcqWmAJHrjHFW1+8PrWbZ3OyyhXHRB3oAteZd/8+if9/wD/AOxo8y7/AOfRP+//AP8AY1zmqapLHdXokvLi2kjjU2EcTECZsemPnO7gg9B9c0zS9Y1GTUlTUvMjhM8ywlX4aQH7jccADO0dDg+1AHSPPdRxs7WikKCxxOM4H4VYVg6Kw6MARVOa63QSjHVGHX2NWYP+PeL/AK5r/KgCSiiigAooooAKKKKACiiigAooooAK53xJ/wAhGz/3R/6GK6Kud8Sf8hGz/wB0f+hiqjuNHjp6mig9TRWB2rY9g8O/8eWkf9cv/ZGrpK5jQZBHpmlykMypF82wbiPlYdPrW3/acH/PO4/78tXVNNtHmwaSLlFU/wC04P8Anncf9+TR/acH/PO4/wC/JqOV9i+Zdy5RVP8AtOD/AJ53H/fk0v8AaUP/ADyuP+/LUuV9g5l3LdFVP7Rh/wCeVx/35aj+0Yf+eVx/35ajlfYOZdy3RVT+0Yf+eVx/35aj+0of+eVx/wB+Wo5X2DmXct0VU/tKH/nncf8AflqP7Sh/553H/flqOV9g5l3LYODms1dNnRQizxFV4G5DnHvg1P8A2lD/AM87j/vy1H9pQ/8APK4/78tRyvsHMu5F9huR0mh/74b/AOKo+wXP/PaH/vhv/iqR9dso22sJwf8Ari1NPiDTx1Mw/wC2LUWY1qObTrhlK+fCNwIyEbjP41fRQiKg6KAB+FZv/CRad/fl/wC/Ro/4SLTv78v/AH6NFmBqUVl/8JFp39+X/v0aP+Eh049Gl/79GizA1KKzf7fsPWb/AL8mj+37D1m/78mizA0qKzf7fsPWb/vyaP7fsPWb/vyaLMDSorN/t+w9Zv8AvyaP7fsPWb/vyaLMDSorM/4SHTh/FN/36NJ/wkWnf35f+/RoswNSuc8Sf8hCz/3R/wChir//AAkOnf35f+/RrI1m/t768tpIC21AAS67f4s96cVqNHkx6mil2k8gZBorA7lseqeGv+QHH/12m/8ARjVqUUV6sPhR4U/iYlJRRVEgOtTLRRQA6iiigA7UhoooAbRRRTELSN900UUhmPdf6+qN1RRWMjqpblLvRRRWR1iGnJ1oooEWk6U6iigAooooAKa3SiigCu/Wm0UUDCh/+Pef/ri//oJoooYmcjbf8esP+4v8qKKK4juR/9k=[/img][br][br]Lo cual podemos entender como una demostración automática en la que nos confirma que esta relación siempre se cumple.[br]La misma relación obtendremos entre los segmentos e y g.[br]Por último, para establecer la relación entre las áreas bastará con calcular el valor del cociente entre las dos áreas, cuyos valores aparecen directamente en la vista algebraica y que en este caso serán polígono1 y polígono2.[br]Utilizamos la herramienta [b]Texto[/b] para introducir la relación entre las dos áreas.[br]