[i]Al prolongar longitudes iguales en los lados de un cuadrado ABCD, se obtienen nuevos puntos E, F, G H. Comprobar que EFGH es también un cuadrado. ¿Qué relación hay entre sus áreas?[br][br][img width=275,height=205]data:image/png;base64,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[/img][br][br][br]Comenzamos dibujando el cuadrado ABCD utilizando la herramienta [b]Polígono regular[/b], dibujando una semirrecta sobre cada uno de sus lados que utilizaremos para prolongarlos.[br][br][img width=219,height=222]data:image/png;base64,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[/img][br][br]La semirrecta se dibujará con la herramienta del mismo nombre [url=https://wiki.geogebra.org/es/Herramienta_de_Semirrecta][img width=24,height=24]data:image/png;base64,R0lGODlhGAAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAwAVABAAhAAAAAAAAAAAGQAAFQAACAAAAwAAOgAAIQAAJgAAOAAAKgAAOwAALgAASAAAQwAAUAAAQQAAfAAAfwAAhwAAkwAAiwAAkAAAuwAAxgAA/wECAwECAwECAwECAwECAwECAwU2ICCOZFkGZmqiaguwbgrHgDFFB102WeboJASlAhyhBMVXUjQrNoFP1+LyKCwlGcyyZoFsv4AQADs=[/img][/url].[br][br]A continuación, tenemos que marcar un punto en cada semirrecta que esté a la misma distancia del vértice[br]correspondiente.[br][br]Hay distintas formas para conseguir estos puntos. Una de ellas será dibujar una circunferencia de centro cada[br]vértice y radio fijo, utilizando para ello, la herramienta [b]Circunferencia (centro y radio)[/b]. En  este  ejemplo  ampliamos 2 unidades, por lo que dibujaremos una circunferencia de radio igual a 2. Este valor podría[br]haber sido variable, para lo que bastaría utilizar un deslizador.[br][br]Determinamos los puntos de corte de estas circunferencias con su respectiva semirrecta.[br][br][img 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kudLHTALy2w+nV0H5j3HTbooAit7mG7t0nt5UlicZV0bII+tS1mT6MnnPc2E72Ny5y7RgFJD/toeD9eD70wX+pWfF9pxnUf8trI7h+KH5h+G6gDWrlviL/yImo/WH/0albCa9pbtsa9jif+5PmJvybBrA+IV9aSeBtQVLqBiTFgCQH/AJap71rR/ix9UJ7HKN94/WkqJ7u2Ukm5gAz1Mg/xqA6nak4hZ7hvSBC/69P1r6fmXcxsXKgubuK1ChyWkfiOJBl3PsP69KhJv7ngKlnH3LYkkP0H3R+tTW9nDbFmQFpX+/K53O31P9OlF29gIoraSWZbm8xvXmKFTlYvf3b37dquUUU0rAFFFFMBk0MdxC0UqB42HINU/Pk0/wCW7ZpLb+G5xyvtJ/8AFfnir9FS11QCAhlDKQQRkEHINLVI2BhJaxl+zknJjK7om/4D2/DFL9snh4urOQD/AJ6QfvF/L7w/KjmtuBcotP8AkZ/D3/X/AP8AtKSq0eo2Upwt1Fu/us20/keamtJov+Em8PnzY8C/yTvH/PKSs68k6UvRjW56/RVWXUrCEZlvbaMerSqP61UOvWsnFlFcXrZx/o8RK/8AfZwv618ubGrWffatFazC1hRrm9cZS2jPzY9WPRV9z+GTxUBi1jUD++mTTrc9UgPmTN9XIwv4A/Wrtlp9rp8bJbRBNx3OxJLOfVmPJPuaAK9jprpcG+vpFnvmXaCo+SJT/CgPQep6n8gNKiigAooooAKKKKACiiigAooooAKKKKACiiigAopGYKpZiAAMkntXONe3viV2i0uZ7TSwdr36/fm9RFnoP9v8vWgC9qPiGzsbj7JGst5fkZFrarvf6t2Ue5IqqIfEmpczXFvpMJ/5ZwKJpse7H5QfoDWppulWWk23kWUCxITlj1Zz6sx5J9zVygDAbwhptyuNRkvNR9ftdyzL/wB8ghf0rnPHXhHw5YeCb+W00PT4ZFMWGS3UEZlQHnHvXoVct8Rf+RE1H6w/+jUrWj/Fj6oT2POZPDWiM5P9lWqkHhljCkfiKP7H8kf6HfXdtjovmeYv5NmtRvvH60lfTezj2MbmWbnVLL/j5t0vIR1lthhx9UPX8DVy0vra+jMltKHAOGHQqfQjqDViqN5pcVzKLiJ2t7tfuzx9fow/iHsaLSjtqBeorPtNQk+0Cyv0WK7xlSv3Jh6r/UdRWhVJpgFFFFMAoprukcbSSMqIoyzMcACqWJtRGSZILM9APlklHv3Vf1PtSbtsBJLfosrQwRvczLwyR4wv+8x4H8/ak8m+n5muUt1/uW65P/fTf0AqzFFHBEsUSKka9FUYAp9Kze4FGTSLKcf6TE1z/wBfDtIPyJx+lJaaJpP/AAkegxDS7Ly3vtrL5C4YeVIcEY6cCr9Fp/yM/h7/AK//AP2lJWVeEVSlp0Y1uehf8Ih4dEnmR6LYwy/89IIRG/8A30uDUp0iaHmx1O7hPZJW89Pybn8mFatFfMGxkHUNQsTjUbLzYf8An5swWA/3o/vD8N1aNtdW95As9tMk0TdHRsipqy7rSP8ASGvdOkFrenliBmOb2kXv9RyPXtQBqUVQsNSF07288Zt72IZkgY54/vKf4lPr+eDxV+gAooooAKKKKACiiigAooooAKKKKACiisXxFezxW0On2L7b+/fyYW/55jGXk/4CuT9cUAVLot4ov5bCNiNHtn23bqcfaZB/yyB/uj+L16etdHHGkcaoihUUAKqjAA9BUGn2FvpmnwWVqm2GFdqjufc+pPUmrNABRRRQAVy3xF/5ETUfrD/6NSuprlviL/yImo/WH/0ala0P4sfVCexxrfeP1pKVvvH60lfUmIUUUUAV72yiv7cxS5GDuR1OGRh0YHsag0+7ld5LK8wLyEAkjgSr2cf19DV+s7VraRo4722Gbu1JdB/fX+JPxH64qJK3vIDRoqK2uI7q2iuITmORQyn2NV77NxIlgpI80FpiDyIx1H/Ajx9M03LS4DUA1KUTNzZo2Yl7SsP4z/sjsPx9Kv0gAUBVAAAwAOgFLTSsAUUUUwCi0/5Gfw9/1/8A/tKSii0/5Gfw9/1//wDtKSsq/wDCl6Ma3PXKKKK+WNgooooAo6lpwvUR438m7hJaCcDlG9D6qehHf8jS6bf/AG2F1lTyrqFtk8OfuN7eqkcg9wau1j6sn2C4j1mMHEQ8u7A/jhz1+qE7vpuHegDYopAQQCDke1LQAUUUUAFFFFABRRRQAUUUUAFc/pY/tLxNqWptzHaf6Db+2MNIfxbA/wCA1t3U62tpNcN92KNnP0AzWX4UgaDwzYlx+8mj8+Q+rOd5/nQBs0UUUAFFFFABXLfEX/kRNR+sP/o1K6muW+Iv/Iiaj9Yf/RqVrQ/ix9UJ7HGt94/Wkqg+qRjxB/Zu+D7u3G7975u0uBjpt2j8zV+vqdVuYhRRRQAUUUUAZemD7Jf3mndEVhPCPRX6j8Gz+dT6f++E16etw/ye0a8L/U/jVDXZTZ3NtdpwzxyW34sMr+orZiiWCFIVHyxqEH0AxWUd+XsMfRRRWogooooAKLT/AJGfw9/1/wD/ALSkootP+Rn8Pf8AX/8A+0pKyr/wpejGtz1yivPfDfjHWdT1awiu44jb3kkyf8eUkITZuxslZispO3oAO57V6CK+brUJ0Zcs9/6RqncWiiishhTXRZEZHUMjAhlI4Ip1FAGVoTNFaSae5JexkMAJ6lMAof8Avkr+INatZS/uPE7gABbq03H/AHo2x/Jx+VR2fiS2vrqOOG1vfIlYpFdmD9zIRnoc5xwcEgA9jQBs0UUUAFFFFABRRRQAUUUUAY/iuQx+E9VYcH7K6/mMf1rStEEVnBGowFjVR+ArO8UxmXwpqqKMn7LIQPoM/wBK0LKQTWNvKpyrxKw/EUAT0UUUAFFFFABXnfxe8U2Gh+F/7OuBI91qDL5McYHAR1ZiSeg7fU16JXHfELwlpPifR4n1GJzLayL5UsT7WUM6qw+hH8q6MLKlGtGVa/KnrbcUr20PPrXxDod9aJOl7aoksn2jy5ZgrLJnOSM5BBGPpx0qf+29J/6Cll/4EL/jXrGm+H9K0jTbfT7OxhS3gQIgKhjj3J5J96t/YLP/AJ9IP+/YrveZxT92OnqRyHjv9t6T/wBBSy/8CF/xo/tvSf8AoKWX/gQv+NexfYLP/n0g/wC/Yo+wWf8Az6Qf9+xR/av938f+AHIeO/23pP8A0FLL/wACF/xpP7b0n/oKWX/gQv8AjXsf2Cz/AOfSD/v2KPsFn/z6Qf8Afsf4Uf2p/d/H/gByHg3iHVNLntrLZqNo5S+gYhZlOAG579K1zrek5/5Cll/4EL/jXdeN4LSCy0jbawgvq9oDiMfd8wE/oK6j7BZ/8+kH/fsf4VKzOzb5fxHyHjv9t6T/ANBSy/8AAhf8aP7b0n/oKWX/AIEL/jXsX2Cz/wCfSD/v2KPsFn/z6Qf9+xVf2r/d/H/gC5Dx3+29J/6Cll/4EL/jR/bek/8AQUsv/Ahf8a9i+wWf/PpB/wB+xR9gs/8An0g/79ij+1f7v4/8AOQ8c/tvSf8AoKWX/gQn+NZN7450fR/EWjStI10ltcC4ma2KuFXY69c8n5s49K95+wWf/PpB/wB+x/hXMeJPhp4a8U31veahaOk0K7Cbd/LEi5ztbHXqfQ89aunmVGb5a8Xyu+z1BwfQTR9P8IWkltqFnqSOqhpbZZtQZ0i35JKIzYUkMe3c10X9taV/0E7L/v8Ar/jU0VhaQQpDFbQpHGoVVCDAA4Ap/wBmt/8AnhF/3wK8ipUlUd5O/qWlYrf21pX/AEE7P/v+v+NH9taV/wBBOz/7/r/jVn7Nb/8APCL/AL4FH2a3/wCeEX/fAqBlb+2tK/6Cdn/3/X/Gj+2tK/6Cdn/3/X/GrP2a3/54Rf8AfAo+zW//ADwi/wC+BQByus+LNAtPE2jQTapb75RKh2tuVQwAG5hwuWAHNU7fS7WK/wBO3+IdO+y6cVEDJLtmaNc4jb59pHPXbk4rX1bQ9LvfFGizT6fbyTQiWRXKDI2gY+vLA8963/s1v/zwi/74FAFb+2tK/wCgnZ/9/wBf8aP7a0r/AKCdn/3/AF/xqz9mt/8AnhF/3wKPs1v/AM8Iv++BQBW/trSv+gnZ/wDf9f8AGirP2a3/AOeEX/fAooAlooooAKKKKAI7iFbi3lgf7siFD9CMVk+E5ml8NWcbn97bqbaQejRkof5VtVz9gf7M8V31g3EN+v2yD03jCyL9fut+JoA6CiiigAooooAKy/EP/IFl/wCukX/oxa1Ky/EP/IFl/wCukX/oxaANSiiigAooooAKKKD0oA5TxVbtquqWemxcvDbzXhA7MF2x/wDjzH8q6SzuUvLKC6j+5NGsg/EZrF8PH+0b3UtcP+ruJBBbH1hjyMj2LFj9MVa0Y/ZJbvSzx9nk8yIesTklcfQ7l/4CKANeiiigAooooAKKKKACiiigAooooAKKKZNKkELzSsEjjUszHoABkmgDNj/0jxPM4OVtLUR/8Ckbcf0RfzrVrL0KNzYteTKVmvZDcMrdVBwFU/RQo+ua1KACiiigAooooAKKKKACiiigArI8QafNd2cdxZY/tCzfz7bPG5h1Q+zDI/GteigCnpepQatp0N7b5CSDlW4ZGHBUjsQcg1crnL+KXw/qEur2kbSWE5zf26DJU/8APZB64+8O456it63uIbq3jnt5VlikUMjochge4NAEtFFFABWX4h/5Asv/AF0i/wDRi1qVl+If+QLL/wBdIv8A0YtAGpRRRQAUUUUAFYXiK7llEOiWTlb2/BBdf+WMI+/Ifw4HuRVzV9Xh0m2VmRpriVtlvbx/fmf0H9T0AqLRdLltPOvb51l1O7w07r91AOka/wCyv6nJ70AaFrbQ2dpDbW6BIYUCIo7ADAqhrEclu8Oq26M8lqCJUUZMkJ+8B6kYDD6Y71q0UAMhmjuIUmicPHIoZGU5DA8gin1iE/2BcEtxpUz5z2tXJ7+iE/8Af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ahora, con la herramienta [b]Polígono [/b]dibujamos el polígono EFGH, ocultando las circunferencias.[br][br][img width=249,height=231]data:image/png;base64,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[/img][br][br]Para comprobar si es un cuadrado, podemos utilizar la herramienta [b]Polígono regular[/b], dibujando el cuadrado cuyo lado sea por ejemplo HG, comprobando que los otros dos vértices coincidirán con E y F.[br][br][img width=278,height=238]data:image/png;base64,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[/img][br][br]Observamos que J coincide con E y que el punto I coincide con F. Además, sus coordenadas podemos comprobar que son las mismas, tal y como aparece en la vista gráfica.[br][br][img width=164,height=206]data:image/png;base64,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[/img][br][br]También podríamos haber medido los lados del cuadrado y los ángulos para observar que son iguales y que los lados son perpendiculares.[br][br]Si observamos las áreas de los dos cuadrados, tenemos que el cuadrado inicial mide 16 u[sup]2[/sup], mientras que[br]el segundo tiene un área de 40 u[sup]2[/sup].[br][br]Con estos valores es difícil deducir qué relación hay entre ellos, pero observemos cuál es la base GH del cuadrado mayor.[br][br][br][img width=288,height=117]data:image/png;base64,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[/img][br][br]El triángulo AGH es rectángulo, por lo que se podrá aplicar el teorema de Pitágoras.[br][br]Si el lado AB del cuadrado inicial lo llamamos L y la longitud que hemos ampliado cada lado BG=AH la llamamos a, tendremos que la longitud x del  lado GH cumplirá:[br][br] Por tanto, el área del nuevo cuadrado se obtiene sumando al área del cuadrado inicial el doble del producto del lado inicial L por la ampliación a, más el cuadrado de la ampliación (a[sup]2[/sup]).[br][br]En nuestro ejemplo, el cuadrado inicial tenía un lado de 4 u y se ha ampliado 2 u. Por tanto el área del nuevo[br]cuadrado será:[br][br]A = 4[sup]2[/sup]+ 2x4x2+ 2[sup]2[/sup]=16 + 16 +4 = 40[br][br]Valor que coincide con el mostrado en la vista algebraica.[br][br][br][/i]