Bruch in Dezimalzahl umrechnen

Rechne den Bruch [math]\frac{3}{5}[/math] in eine Dezimalzahl um.

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[/img]

Rechne den Bruch [math]\frac{3}{8}[/math] in eine Dezimalzahl um.

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[/img][br]

Melli will den Bruch [math]\frac{4}{20}[/math] in eine Dezimalzahl umrechnen. [br]Melli rechnet folgendermaßen: [br][br][img]data:image/png;base64,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[/img][br]Beschreibe, welcher Fehler Melli unterlaufen ist und stelle die Antwort richtig.

[br]Melli hat fälschlicherweise den Nenner durch den Zähler dividiert.[br](Wichtig: Dividiere nicht automatisch die große Zahl durch die kleine Zahl.) [br]Richtig wäre: [br][img]data:image/png;base64,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[/img]

Information: Bruch in Dezimalzahl umrechnen