Verminderten Grundwert berechnen

Der verminderte Grundwert G[sup]-[/sup] entspricht in der obigen Aufgabe ...

... dem Preis des Fahrrads nach der Verminderung. ... der Differenz der Preise des Fahrrads vor und nach der Verminderung. ... dem Preis des Fahrrads vor der Verminderung.

Jonas berechnet das obige Beispiel mit dem Fahrradpreis anders als Cora.[br]Jonas erhält mit seiner Rechenvariante auch das richtige Ergebnis. 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[/img][br][br]Beschreibe, wie Jonas bei seiner Rechenvariante vorgegangen ist.

In Coras Bücherregal befinden sich 125 Bücher.[br]Mit einer Spende an die Bücherei vermindert Cora ihren Buchbestand um 44 %.[br]Berechne, wie viele Bücher in Coras Bücherregal beliben.

[br]Ursprüngliche Bücheranzahl: 125 (100 %)[br]Verminderung (44 %)[br]Verminderte Bücheranzahl (56 %)[br][br][b]1. Rechenvariante[/b][br]Die verminderte Bücheranzahl kann mit dem Prozentanteil: 56 % von 125 berechnet werden.[br][br][img]data:image/png;base64,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[/img][br][br][b]2. Rechenvariante[br][/b]Die verminderte Bücheranzahl kann als Differenz der ursprünglichen Bücheranzahl (125 Bücher) und des Prozentanteils (44 % von 125 Büchern) berechnet werden.[br][br][img]data:image/png;base64,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[/img]

Auf welche Arten kann der um p % verminderte Grundwert G[sup]-[/sup] berechnet werden?

den Prozentanteil p % berechnen und diesen zum ursprünglichen Grundwert G hinzuaddieren den Prozentanteil (100 + p) % berechnen den Prozentanteil (100 - p) % berechnen den Prozentsatz p % vom ursprünglichen Grundwert subtrahieren den Prozentanteil p % berechnen und diesen vom ursprünglichen Grundwert G subtrahieren den Prozentsatz p % zum ursprünglichen Grundwert hinzuaddieren

Information: Verminderten Grundwert berechnen