Ordnung ganzer Zahlen
Betrachte den Wortsalat. [br]Bringe die Wörter in die richtige Reihenfolge. [br][br]Zahlengerade - die - der - Auf - kleiner - größer. - links - rechts - und - nach - nach - werden - Zahlen
Welche der gegebenen Zahlen sind kleiner als 0? [br][br][img]data:image/png;base64,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[/img]
Welche der gegebenen Zahlen sind größer als -4? [br][br][img]data:image/png;base64,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[/img]
Gib eine ganze Zahl an, die kleiner ist als -2.[br]
Welcher Satzteil fehlt? [br]Der Nachfolger einer Zahl ist um ____ als die Zahl. [br][img]data:image/png;base64,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[/img]
Welcher Satzteil fehlt?[br]Der Vorgänger einer Zahl ist um ____ als die Zahl. 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[/img]
☆ Welche ist die kleinste positive ganze Zahl? [br][br][img]data:image/png;base64,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[/img]
☆ Welche ist die größte negative ganze Zahl? [br][br][img]data:image/png;base64,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[/img]
☆ Welche ist die kleinste einstellige ganze Zahl? [br][br][img]data:image/png;base64,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[/img][br]