Eine Gerade im IR³ lässt sich durch …

Der Stützvektor einer Geraden …

Der Richtungsvektor einer Geraden …

Zwei Vektoren sind kollinear, wenn …

[img]data:image/png;base64,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[/img]

Was untersucht man mit der [i]Punktprobe[/i]?

Welcher Ausdruck ist KEINE Geradengleichung?

Eine Gerade ist eindeutig bestimmt durch …

Wann sind zwei Geraden [b]echt parallel[/b]?

Der Unterschied zwischen "parallel" und "echt parallel" ist:

Wie kann man rechnerisch überprüfen, ob zwei Richtungsvektoren kollinear sind?

Wenn zwei Geraden identisch sind, gilt:

Welche Aussage ist korrekt?

Wie viele Schnittpunkte haben zwei sich schneidende Geraden im IR³?

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pQ2+toAE3fbY9q1TPoa/9sLJHtoRBA7fF18f36F/TmdSYCcvELIM3eBbqYg8T1AXmFe5ucVswmrF6ssFKYrOx2GoP2RGOz/ShcmHZCpSUiliKzuvv2SYn/2aErqOyRU6M+YECQI9DxR+1OBhQ81aoWFkmG7ixj+sDklCqsXqe+MWeE7Yek97LAte+7ImROnRMm5W9N3SKjAFROSNfTvZJVf6pqVEHkEQRYv6JgQBEGQUIFbeQiCIEioQMeEIAiChAp0TAiCIEioQMeEIAiChAp0TAiCIEioQMeEIAiChAiA/wPeR3vrSqgJ6gAAAABJRU5ErkJggg==[/img]