5.2.1 - Vorwissenstest 2

Lagebeziehung zweier Geraden ...
[b]... und was hat das bitte mit dem Spatvolumen zu tun?[/b][br][br]Mehr als man auf den ersten Blick denkt![br][br]Das Konzept des [b]Spatvolumens[/b] liefert nicht nur spannende geometrische Einsichten, sondern kann auch dabei helfen, bei bestimmten Aufgaben den [b]Rechenaufwand deutlich zu vereinfachen[/b].[br][br]Deshalb lohnt es sich, Ihr Vorwissen hierzu noch einmal aufzufrischen.[br][br]Sind Sie bereit? Dann starten Sie jetzt den kurzen Test und finden Sie heraus, wie fit Sie schon sind!
Frage 1:
Das Kreuzprodukt [img]data:image/png;base64,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[/img] ergibt …
Frage 2:
Das Skalarprodukt [img]data:image/png;base64,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[/img] ergibt ...
Frage 3:
[img]data:image/png;base64,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[/img]
Frage 4:
Das Spatvolumen dreier Vektoren wird berechnet durch:
Frage 5:
Welcher Ausdruck ist quasi gleichbedeutend mit dem Spatvolumen?
Frage 6:
[img]data:image/png;base64,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[/img]
Frage 7:
Das Kreuzprodukt zweier paralleler Vektoren ergibt ...
Frage 8:
[img]data:image/png;base64,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[/img]
Frage 9:
[img]data:image/png;base64,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[/img]
Frage 10:
[img]data:image/png;base64,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[/img]
Frage 11:
[img]data:image/png;base64,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[/img]
Frage 12:
Welche Ausdrücke sind [b]sinnvoll zum Nachweis, dass drei Vektoren ein Volumen aufspannen[/b]?
Close

Information: 5.2.1 - Vorwissenstest 2