Beschreibe die geometrische Lage der Geraden [color=#0c343d][b]g[/b][/color] und [color=#ff0000][b]h[/b][/color] zueinander. [br]Gibt es einen Schnittpunkt?[br][img]data:image/png;base64,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[/img]

Beschreibe die geometrische Lage der Geraden [b][color=#0c343d]g[/color][/b] und [b][color=#0000ff]f[/color][/b] zueinander. [br]Gibt es einen Schnittpunkt?[br][img]data:image/png;base64,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[/img]

Beschreibe die geometrische Lage der Geraden [color=#0c343d][b]g[/b][/color] und [color=#00ff00][b]k[/b][/color] zueinander. [br]Gibt es einen Schnittpunkt?[br][img]data:image/png;base64,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[/img]

[br][b]Kreuze die drei richtigen Aussagen[/b] zur Lösbarkeit eines Systems linearer Gleichungen an.