Prozentstreifen

Der gesamte Balken entspricht immer _____ %.
Niki zeichnet einen Prozentstreifen mit einer Balkenlänge von 100 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[/img]
☆ Ayla zeichnet einen Prozentstreifen mit einer Balkenlänge von 50 mm.[br][img]data:image/png;base64,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[/img]
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