Grundwert berechnen

Mascha berechnet das Ergebnis ebenfalls mit der Tabelle, kommt aber auf andere Zwischenergebnisse. [br]Vervollständige die Tabelle und überprüfe, ob du mit Maschas Vorgehensweise auch auf das richtig Ergebnis kommst.[br][br][img]data:image/png;base64,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[/img]

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[/img][br][br]Ich kann mit Maschas Vorgehensweise auch auf das richtige Ergebnis kommen.

Berechne: 9 € sind 2 % von ____ €.

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[/img][br][br]9 € sind 2 % von 450 €.[br]

Nick versucht, die folgende Aufgabe zu lösen:[br][br][i]24 sind 20 % vom Grundwert G. Berechne G.[/i][br][br][img]data:image/png;base64,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[/img][br][br]Betrachte die Rechnung. Welchen Fehler hat Nick gemacht?

[br]Im zweiten Schritt in der Tabelle hat Nick die Dezimalzahl gerundet. Das Ergebnis wird dadurch zu ungenau.[br]Wenn man an Stelle von Dezimalzahlen mit Brüchen rechnet, kann man Runden vermeiden.[br][br][img]data:image/png;base64,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[/img]

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