Betrachte die Zahlengerade. [br]Welche Ordnungsketten sind richtig? [br][br][img]data:image/png;base64,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[/img]

Lies die markierten Zahlen ab und ordne sie der Größe nach.[br]Beginne mit der [b]kleinsten Zahl[/b]. [br][br][img]data:image/png;base64,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[/img]

Betrachte Zahlengerade.[br]Ergänze die fehlenden Zahlen der Ordnungskette.[br][b]____ > [color=#1e84cc]1[/color] > ____ > [/b][b][color=#cc0000]-[/color][/b][b][color=#cc0000]5[/color][/b][br][br][img]data:image/png;base64,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[/img]

Lies die markierten Zahlen ab und ordne sie der Größe nach. [br]Beginne mit der [b]größten Zahl[/b]. [br][br][img]data:image/png;base64,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[/img][br]

Ordne von der kleinsten zur größten Zahl.[br]Gib die Ordnungskette an. [br][br]8, 2, -3, 0, -7, -2

Ordne von der größten zur kleinsten Zahl. [br]Gib die Ordnungskette an.[br][br]-7, 1, -3, 2, -8, -4

Gib eine ganze Zahl an, sodass die Ordnungskette stimmt. [br]18 > 1 > ____ > -13

Gib zwei ganze Zahlen an, sodass die Ordnungskette stimmt. [br]____ < ____ < 7 < 28

☆ Ordne von der größten zur kleinsten Zahl. [br]Gib die Ordnungskette an.[br][br]Alle ganzen Zahlen, die größer sind als -3, aber kleiner als 4.

☆ Ordne von der kleinsten zur größten Zahl. [br]Gib die Ordnungskette an. [br][br]Alle negativen ganzen Zahlen, die größer sind als -7.