[i]A partir de un cuadrado, inscribe un nuevo cuadrado, cuyo lado sea variable, en el que incruste una imagen, de manera que al cambiar el tamaño de este segundo cuadrado, la imagen se ajuste al tamaño.[/i][br][i][img 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los pasos que tenemos que realizar para obtener esta construcción.[br]En primer lugar, dibujamos el cuadrado exterior utilizando la herramienta [b]Polígono regular[/b], situando a continuación un punto en uno de sus lados.[br]La dificultad está en obtener el cuadrado inscrito; del que tenemos que pensar que la distancia PA se tiene que mantener en cada uno de los otros tres vértices.[br]Por tanto, podemos definir el segmento PA utilizando la herramienta [b]Segmento [/b]para posteriormente utilizarlo con la herramienta [b]Compás[/b].[br][img width=205,height=190]data:image/png;base64,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[/img][br]Una vez creado el segmento hemos modificado su color y su grosor para que destaque.[br]Ahora, con la herramienta [b]Compás[/b] llevamos esta medida al vértice B, obteniendo el punto Q de intersección de la circunferencia con el lado AB.[br][img width=251,height=227]data:image/png;base64,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[/img][br]El segmento PQ es el lado del cuadrado inscrito que crearemos utilizando de nuevo la herramienta [b]Polígono regular[/b].[br][img width=229,height=227]data:image/png;base64,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[/img][br]A continuación, ocultamos la circunferencia y ya solo nos queda comprobar que al mover P, el cuadrado va cambiando pero siempre mantendrá su condición de inscrito.[br][img width=205,height=190]data:image/png;base64,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[/img][br]Ahora toca incrustar la imagen en este cuadrado. Para ello, seleccionamos la herramienta [b]Imagen[/b], estableciendo el punto P como punto en el que se situará la imagen. Ocurrirá algo similar a lo que aparece en la imagen siguiente.[br][img width=251,height=227]data:image/png;base64,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[/img][br]Ya solo queda ajustar la posición de la imagen para relacionarla con los otros vértices del cuadrado inscrito.[br]Como se trata de cambiar sus propiedades, hay que hacer clic sobre la imagen con el botón derecho para acceder a [b]Propiedades de objeto[/b] o sobre cualquier objeto, seleccionando a continuación la imagen en la relación de objetos que intervienen en la construcción.[br][img width=434,height=303]data:image/png;base64,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la pestaña Posición para que aparezcan las tres esquinas que tenemos que indicar para fijar y por tanto, relacionar la imagen con los vértices de cuadrado.[br][img width=340,height=142]data:image/png;base64,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[/img][br]Podemos guiarnos por las imágenes que aparecen junto a cada esquina en la ventana anterior, para indicar que la segunda esquina será el punto P y la cuarta será el punto E.