Berechne das Volumen dieses Quaders:[br][img]data:image/png;base64,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[/img]

Berechne das Volumen dieses Würfels:[br][img]data:image/png;base64,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[/img]

Wie lang sind die Seiten eines Würfels mit dem Volumen 64 [math]cm^3[/math]?

Ein Schüler aus einer Klasse über dir behauptet folgendes:[br]"Wenn du die Seitenlängen eines Würfels verdoppelst, dann verdoppelt sich auch das Volumen des Würfels."[br]Stimmt das oder nicht?

Begründe deine Antwort aus der vorherigen Aufgabe.

Hat eine Buchseite ein Volumen? Begründe deine Vermutung.