Welche Eigenschaften haben diese Geraden gemeinsam?

Kannst du hier alle Punkte, die auf einer Geraden g liegen, sehen?[br][img]data:image/png;base64,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[/img][br]

Hannah meint: “Eine Gerade ist unendlich lang. Ich kann sie mir nur vorstellen.” Eine Gerade wird durch zwei Punkte festgelegt. [br]Erkläre Hannah, wie sie die Gerade zeichnen kann.