Proporciones notables

El objetivo de este taller es la construcción de rectángulos cuyos lados estén en una proporción dada. Para hay que encontrar la manera de dividir un segmento en dos trozos de manera que mantengan esa proporción. En ese caso, bastará con doblar en ángulo recto por el punto de división para conseguir el rectángulo.[br][img]data:image/png;base64,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[/img][br][br]El siguiente applet te muestra cómo dividir un segmento en un determinado número de partes iguales. El deslizador del punto rojo permite dividir el segmento AB en el número de partes que indique.[br]Pero si se quiere conseguir dividir el segmento AB en la proporción que se indica arriba, ¿en cuántas partes tendrás que dividir el segmento? Cuando ya sepas en qué punto naranja habría que doblar para tener un rectángulo de esas proporciones, pincha sobre él, se pondrá azul y aparecerá el rectángulo con la proporción que has señalado. Esa será tu solución. Si te equivocas el botón borrar lo dejará de nuevo naranja y podrás cambiar tu elección.
Procedimiento
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Information: Proporciones notables