[b]Actividad 9[/b][br]Construye un icosaedro en la siguiente escena.[br]Haz [b]n=3 [/b]y escribe en barra de entrada [b]Icosaedro(A,B,C)[/b][br]Modifica aspectos visuales, grosor lineas en estilo 3, color suave y opacidad pequeña.[br][br]Selecciona la herramienta[img]data:image/png;base64,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[/img] y construye el polígono (rectángulo) que contiene los vértices de dos aristas opuestas. [br]Calcula el cociente de uno de los lados del rectángulo entre el otro. Para ello en la barra de entrada escribe el cociente de los segmentos, ej: [b]f/g[/b] si f y g son el lado mayor y menor del rectángulo que has construido. Sea h el valor obtenido al hacer el cociente anterior. Si quieres ves la expresión exacta del cociente escribe en la barra de entrada: [b]TextoIrracional(h) [/b][br]¿Qué número se obtiene? ¿ Cómo se conoce a ese número?[br]Intenta hacer un rectángulo similar con otros dos pares de aristas opuestas de forma que los rectángulos sean perpendiculares a los anteriores. Cuesta un poquito de trabajo, pero es posible.[br]La siguiente imagen puede ayudar.[br] [img]data:image/png;base64,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[/img][br][b]Los vértices de un icosaedro están situados sobre tres rectángulos áureos perpendiculares.[/b]