[i]Dado un polígono cualquiera, construye un polígono de un lado menos que tenga el mismo área que el polígono inicial.[/i][br][br]Comenzamos dibujando un polígono cualquiera.[br][br][img width=269,height=187]data:image/png;base64,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[/img][br][br] A continuación, aplicamos la relación expuesta anteriormente, trazando una de las diagonales del hexágono anterior. Por ejemplo, trazamos la diagonal CE.[br][br][img width=290,height=202]data:image/png;base64,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[/img][br][br]Trazamos la recta paralela a la diagonal por el vértice D y prolongamos el lado EF para obtener el punto G de corte de estas dos rectas.[br][br][img width=374,height=200]data:image/png;base64,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[/img][br][br]Aplicando lo expuesto anteriormente, los triángulos CDE y CEG tendrán el mismo área.[br][br][img width=305,height=177]data:image/png;base64,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[/img][br][br]Podemos dibujar el polígono ABCGF que tendrá la misma área que el polígono inicial, pero con un lado menos.[br][br]Área[sub]ABCDEF[/sub]=Área[sub]ABCEF[/sub]+Área[sub]CDE[/sub]= Área[sub]ABCEF[/sub]+Área[sub]CEG[/sub]= Área[sub]ABCGF[/sub][br][br][img width=376,height=201]data:image/png;base64,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[/img][br][br]