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Prozentanteil, Grundwert und Prozentsatz

FLINK-Team, Nov 21, 2021

Entdecken
1. Prozentanteil berechnen
2. Magische Prozentanteile
3. Grundwert berechnen
4. Prozentsatz berechnen
5. Herleitung der Formel (Prozentanteil)
6. Faule Prozentanteile
Üben
1. Prozentanteile im Kopf berechnen
2. Prozentanteil berechnen
3. Grundwert berechnen
4. Prozentsatz berechnen
5. Gemischte Textaufgaben
6. Trixis Aufgabenchaos
7. ☆ Prozentsätze im Kopf berechnen
8. Prozentanteile mit Faktoren berechnen

Entdecken

1. Prozentanteil berechnen
2. Magische Prozentanteile
3. Grundwert berechnen
4. Prozentsatz berechnen
5. Herleitung der Formel (Prozentanteil)
6. Faule Prozentanteile

Prozentanteil berechnen

Berechne 1 % von 240.

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[/img][br][br]1 % von 240 = 2,4.

Cora bekommt 20 € Taschengeld. [br]Davon spart sie 35 %. [br][br]Berechne, wie viele Euro das sind.

[br]Cora spart 6 €. [br][br][img]data:image/png;base64,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[/img]

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

Üben

1. Prozentanteile im Kopf berechnen
2. Prozentanteil berechnen
3. Grundwert berechnen
4. Prozentsatz berechnen
5. Gemischte Textaufgaben
6. Trixis Aufgabenchaos
7. ☆ Prozentsätze im Kopf berechnen
8. Prozentanteile mit Faktoren berechnen

2.1.

Prozentanteile im Kopf berechnen

[color=#ffffff]FLINKe Grüße[/color]

0

Prozentanteil, Grundwert und Prozentsatz

Table of Contents

1.

Entdecken

1.1.

Prozentanteil berechnen

1.2.

1.3.

1.4.

1.5.

1.6.

2.

Üben

2.1.

Prozentanteile im Kopf berechnen

2.2.

2.3.

2.4.

2.5.

2.6.

2.7.

2.8.

Information