Gegeben sind zwei parallele Geraden. [br]Erkläre, wie du vorgehen kannst, um ein Parallelogramm zu konstruieren. [br][img]data:image/png;base64,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[/img]
[br]Um ein Parallelogramm zu erhalten, wird ein weiteres Paar paralleler Geraden gezeichnet. Dieses Paar darf nicht parallel zu den vorgegebenen Geraden sein. [br][br][img]data:image/png;base64,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[/img]