Ein Teil von Hundert

[color=#ffffff]FLINKe Grüße[/color]

Prozentstreifen ablesen

[size=150]Löse mehrere Aufgaben richtig, um ins nächste Level zu gelangen.[br]Zeige dein Können![/size]
[color=#ffffff]Flinke Grüße[/color]

Prozente und Brüche

Die Sonne verdeckt eine Zahl. Gib an, welche.[br][img]data:image/png;base64,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[/img]
Die Erde verdeckt eine Zahl. Gib an, welche.[br][img]data:image/png;base64,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[/img][br][br]
Ein Kreis ist in 100 gleich große Teile unterteilt. 15 Teile davon sind eingefärbt.[br]Wie viel Prozent der Kreisfläche sind eingefärbt?[br]Welcher Bruchteil der Kreisfläche ist eingefärbt?
Welche Gleichung beschreibt den Zusammenhang zwischen der Prozent- und der Bruchdarstellung richtig?
Niki sagt: 10 % entsprechen [math]\frac{1}{10}[/math]. 20 % entsprechen daher [math]\frac{1}{20}[/math].[br]Hat Niki recht? Begründe deine Antwort.

Prozentanteil berechnen

Berechne 1 % von 240.
Cora bekommt 20 € Taschengeld. [br]Davon spart sie 35 %. [br][br]Berechne, wie viele Euro das sind.
☆ Elia berechnet das Ergebnis ebenfalls mit der Tabelle, kommt aber auf andere Zwischenergebnisse. [br]Vervollständige die Tabelle und überprüfe, ob du mit Elias Vorgehensweise auch auf das richtige Ergebnis kommst.[br][br][img]data:image/png;base64,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[/img][br]

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