Einen Prozentstreifen zeichnen

Erkläre, warum es sinnvoll ist, den Prozentstreifen 100 mm lang zu zeichnen.

Alex möchte einen weiteren Prozentstreifen mit denselben Angaben zeichnen.[br]Dieser Prozentstreifen soll jetzt aber 200 mm lang sein.[br][br]Gib an, wie viele mm die jeweiligen Kategorien (WhatsApp, Instagram, TikTok, Snapchat) im neuen Prozentstreifen lang sein müssen.[br]

In der 2a tragen 22 % der Kinder eine Brille. 78 % tragen keine Brille.[br]Stelle diesen Sachverhalt mit einem Prozentstreifen dar.[br][br]Der Prozentstreifen soll eine Länge von 10 cm haben.[br]Beschrifte den Prozentstreifen und füge eine Legende hinzu.

[br]Brille: 22 mm[br]Keine Brille: 78 mm[br][br][img]data:image/png;base64,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[/img]

☆ Jonah behauptet: [br]"In der 2b haben 52 % der Kinder ein Haustier.[br]In der 2c haben 37 % der Kinder ein Haustier.[br]Das kann ich folgendermaßen in einem Prozentstreifen darstellen."[br][br][img]data:image/png;base64,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[/img][br]Beschreibe, welcher Fehler Jonah unterlaufen ist.

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