La función y = ent(x) se defíne así en Geogebra:[br][br][img]data:image/png;base64,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[/img][br][br]Estos "corchetes" cerrados solo por abajo simboliza que se "redondea" al número entero más cercano por abajo. Están en el teclado virtual de Geogebra en la última pestaña:[br][br][img]data:image/png;base64,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[/img]

Introduce la función parte entera y manipula las distintas transformaciones para ver cómo afecta a la forma, tamaño e inclinación de los peldaños

A partir de la gráfica de y=Ent(x), y usando el widget anterior y haciendo las tansformaciones oportunas, encuentra las gráficas de las siguientes funciones:[br][br][img]data:image/png;base64,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[/img][br]c)[i] y= Ent (4x)[/i]   d)[i] y= Ent (x/4)[br][br][/i]e) y=3 * Ent( x)  f) [math]y=\mid Ent\left(x\right)\mid[/math]