Verschieben[br]Geben Sie den Vektor an, durch den das Dreieck ABC auf das Dreieck A`B`C` abgebildet wird.[br][img 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[/img]

Was ist ein Vektor ?[br]Markieren Sie die richtigen Aussagen.

Geben Sie die Koordinatendarstellung des abgebildeten Vektors an, wenn ein großes Kästchen die Längeneinheit 1 hat.[br][img]data:image/png;base64,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[/img]

Vektor zwischen zwei Punkten - Verbindungsvektor[br][br]Geben sind die Punkte A(-1|2) und B(2|4). Geben Sie [math]\begin{matrix}\rightarrow\\AB\end{matrix}[/math] an.