[i]Dibujar un cuadrilátero cuyos vértices estén sobre una circunferencia.[/i][br][br]Para iniciar una nueva construcción sobre una hoja de trabajo nueva se utilizará la[br]opción [b]Nuevo[/b] del menú [b]Archivo[/b].[br]La secuencia de herramientas que se utilizará para realizar la construcción solicitada será la siguiente:[br]Una vez dibujada la circunferencia utilizando la herramienta  [b]Circunferencia (centro, punto)  [/b][img width=32,height=32]data:image/png;base64,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[/img].[br] Seleccionamos una nueva herramienta, en este caso [b]Polígono [/b][img width=32,height=32]data:image/png;base64,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[/img] que encontramos en el bloque siguiente:[br][br][img width=148,height=135]data:image/png;base64,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[/img][br][br]Esta herramienta nos permite dibujar cualquier polígono a partir de sus vértices; por lo que una vez[br]seleccionada bastará con crear los puntos o pulsar sobre puntos previamente dibujados, para construir el polígono. Es necesario volver a pulsar sobre el vértice inicial para cerrar el polígono.[br][br][img width=282,height=170]data:image/png;base64,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[/img][br][br]Una vez seleccionada la herramienta [b]Polígono[/b], hay que acercar el puntero a la circunferencia para que al hacer clic so re ella, aparezcan los vértices del cuadrilátero. [br][br]Para finalizar, habrá que marcar de nuevo el primer vértice creado.[br][br][img 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vez creado el polígono se propone intentar modificar el tamaño y la posición de los distintos objetos para determinar cuales son dependientes y cuales independientes.[br][br]Cuando el polígono que deseamos dibujar es un polígono regular, disponemos de la correspondiente herramienta que se encuentra en el mismo bloque que la herramienta anterior.[br][br]Esta herramienta es [b]Polígono regular[/b] [url=http://wiki.geogebra.org/es/Archivo:Tool_Regular_Polygon.gif][img width=32,height=32]data:image/png;base64,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[/img][/url].[br][br]Para dibujar un polígono regular solo necesitamos un segmento que corresponde al lado y el número de lados que tendrá.[br][br]Por tanto, una vez seleccionada la herramienta, marcamos o creamos los dos puntos correspondientes al lado; aparecerá el cuadro siguiente para que indiquemos el número de lados.[br][br][img width=361,height=120]data:image/png;base64,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[/img][br][br]Por ejemplo, si introducimos el valor 6; al pulsar OK aparecerá un hexágono regular.[br][br][img width=274,height=227]data:image/png;base64,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[/img][br][br]Observamos que solo los puntos iniciales (A y B) son independientes ya que el resto dependen de la longitud de este lado que determinará el polígono regular.[br]