Al dibujar cualquier polígono regular o no, su área aparecerá en la [b]Vista algebraica[/b].[br][br][img 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que además del área que figura junto al nombre del polígono, también aparecen las coordenadas de los vértices con respecto a los ejes de coordenadas que tenemos ocultos y las medidas de los lados.[br][img 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[/img]    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[/img][br][br]Para obtener el perímetro del polígono podemos sumar todos sus lados aprovechando las posibilidades que ofrece la línea de entrada como una calculadora. Para ello, bastará escribir los nombres de los[br]lados, no sus valores, para que al cambiar el polígono, su valor se actualice.[br][br][img width=198,height=36]data:image/png;base64,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[/img][br][br]Al pulsar [b]Enter[/b], aparece como número la suma de los lados y por tanto, tendremos el valor del perímetro del polígono.[br][br][img width=170,height=78]data:image/png;base64,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[/img][br][br]Como era de esperar, GeoGebra dispone de una herramienta que nos devolverá de manera directa el perímetro de un polígono. Esta herramienta se encuentra en el bloque de [b]Medidas[/b].[br][br][img 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[/img][br][br]Esta   herramienta   es   [b]Distancia   o  Longitud    [/b][b][img width=22,height=20]data:image/png;base64,R0lGODlhFgAUAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAAAAAAWABQAgAAAAAAAAAIxBGKXy4uvUDMB0jtpvTKyCmbisY2TZX5p1q2O27SwMicyfLu5WdahD9qxejNi7WgoAAA7[/img][/b], que una vez seleccionada, bastará con pulsar[br]sobre el interior del polígono para obtener su perímetro, tal y como aparece en la imagen siguiente:[br][br][br][img width=358,height=140]data:image/png;base64,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[/img][br][br]Hay que tener cuidado al pulsar sobre el polígono, ya que si se hace clic sobre uno de sus lados, lo que devolverá es la longitud de ese lado que ya teníamos en la vista algebraica.[br][br]Por ejemplo si pulsamos sobre el lado AE aparecerá su medida, tal y como se muestra en la imagen siguiente:[br][br][br][img width=404,height=157]data:image/png;base64,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