[i]¿Qué movimiento se debe hacer al ΔOAE para sobreponerse al ΔODG?[/i][br][br][img width=160,height=158]data:image/png;base64,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[/img][br][br]Comenzamos dibujando el cuadrado utilizando para ello la herramienta [b]Polígono regular[/b][url=https://wiki.geogebra.org/es/Herramienta_de_Pol%C3%ADgono_regular][img width=24,height=24]data:image/png;base64,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[/img][/url] .[br]A continuación, con la herramienta [b]Punto medio o centro[/b][url=https://wiki.geogebra.org/es/Herramienta_de_Medio_o_Centro][img width=24,height=24]data:image/png;base64,R0lGODlhGAAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAIAAgAUABQAhAAAAAAAAAAAKgAAPAAAOgAAPwAAOQAAOwAAPQAAIgAARgAARAAAzwAA8wAA/wAA7TcAADkAAD4AADsAADoAADUAADYAAEwAAE4AAEEAANcAANwAAP0AAP8AAAECAwECAwU4ICCOZCkOhKmSRcMY66o4zxGvy63vfO//F8wPkOF0JL+JZkMZVobQqHSIyA0fDsXPwGgUhinBLwQAOw==[/img][/url] dibujamos los puntos medios de cada uno de los lados y el punto medio de una de las diagonales.[br]Y por último, dibujamos los segmentos que unen los puntos medios de lados opuestos y las dos diagonales, procediendo a cambiar de nombre a todos los puntos, utilizando para ello la opción [b]Renombra[/b] que aparece al pulsar el botón derecho del ratón sobre cada uno de los puntos.[br][img width=136,height=155]data:image/png;base64,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[/img][br]Tendríamos la figura siguiente: [br][img 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[/img][br]En la que solo nos queda dibujar el triángulo OAE, para lo que utilizaremos la herramienta [b]Polígono[/b],[br]cambiando su color y opacidad.[br][img 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[/img][br]Deseamos aplicar un movimiento al triángulo OAE para convertirlo en el triángulo ODG, para lo que debemos rotarlo alrededor del centro un determinado ángulo.[br]La suma de todos los ángulos que confluyen en el punto O es 360⁰ ya que es una circunferencia completa, por lo que cada uno de los ocho ángulos en los que los[br]hemos dividid será [img width=68,height=28]data:image/png;base64,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[/img].[br]Por tanto, podemos rotar el triángulo OAE alrededor del punto O un ángulo de 90⁰ en sentido horario. Para ello, seleccionamos la herramienta [b]Rota alrededor de un punto[/b], hacemos clic sobre el triángulo, a[br]continuación sobre el punto O e introducimos 90⁰ como ángulo de rotación. La figura obtenida será la que aparece en la imagen siguiente:[br][img width=231,height=216]data:image/png;base64,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[/img][br]Para obtener el triángulo en la posición OGD bastará con aplicar al nuevo triángulo una simetría axial con respecto a la diagonal BD.[br]Para ello, seleccionamos la herramienta [b]Simetría axial[/b], haciendo clic sobre el nuevo triángulo y sobre el segmento BD, para obtener el triángulo en la posición deseada, ocultando el triángulo previo.[br]