Welches Vergleichszeichen fehlt? [color=#1e84cc][br][b]-9[/b] [/color]____[b] [color=#ff7700]-[/color][color=#ff7700]6[/color][/b][br][br][img]data:image/png;base64,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Welches Vergleichszeichen fehlt? [b][br][color=#1e84cc]3[/color][/b]____[b][color=#ff7700]-[/color][/b][b][color=#ff7700]2[/color][/b][br][br][img]data:image/png;base64,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[/img]

Welches Vergleichszeichen fehlt? [b][br]1 ____ -[/b][b]4[/b][br][br][img]data:image/png;base64,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[/img]

Welches Vergleichszeichen fehlt? [b][br]-5 ____ [/b][b]-[/b][b]7[/b]

Welches Vergleichszeichen fehlt? [b][br]-8 ____ [/b][b]-[/b][b]6[/b]

Gib eine ganze Zahl an, sodass der Vergleich stimmt. [br][b]____ > [/b][b]-[/b][b]4[br][br][/b][img]data:image/png;base64,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[/img]

Gib eine ganze Zahl an, sodass der Vergleich stimmt. [br][b]-[/b][b]2 > ____[br][br][/b][img]data:image/png;base64,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[/img]

☆ Marius behauptet, dass -5 größer ist als -2, weil 5 größer ist als 2."[br]Begründe, warum Marius nicht recht hat.