Pauli berechnet die Differenz:[br][br][img]data:image/png;base64,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[/img][br][br]Beschreibe, welcher Fehler Pauli unterlaufen ist. [br]Stelle die Subtraktion richtig.
[br]Pauli hat den Minuenden (1 Ganzes) nicht als uneigentlichen Bruch dargestellt. [br]Richtig ist: [br][img]data:image/png;base64,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[/img][br][br]