[b]Gib den [color=#6aa84f]Flächeninhalt des grünen Quadrats[/color] an.[br][/b][br][img]data:image/png;base64,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[/img]

[b]Berechne den [color=#ff7700]Flächeninhalt des orangen Quadrats[/color] mit der Seitenlänge a = 5 cm.[/b][br][br][img]data:image/png;base64,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[/img]