2. Neigungswinkel zweier Ebenen

1. Definition des Neigungswinkels zwischen zwei Ebenen
Übertrage die Definition des Neigungswinkels zwischen zweier Ebenen in dein Heft (Seite 151 oberer Kasten).
2. Den Neigungswinkel findest du so:
[br][list][*]finde die Schnittgerade (rot)[/*][*]finde eine Gerade in der ersten Ebene, die auf der Schnittgeraden senkrecht steht[/*][*]finde eine Gerade in der zweiten Ebene, die auf der Schnittgeraden senkrecht steht[br][/*][/list][math]\Longrightarrow[/math] der Winkel zwischen den beiden Geraden ist der [b]Neigungswinkel[br][br][/b]Verändere in der untenstehenden Abbildung den Schiebregler und beobachte, wie sich der Neigungswinkel der Ebenen verändert.[br][br]
3. Beispiel Quader,
Zeichne den Neigungswinkel, den die Diagonalebene EFCD mit der Grundfläche ABCD einschließt, ein.[br][img]data:image/png;base64,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[/img]
4. Beispiel Quader
Berechne den Neigungswinkel, den die Diagonalebene mit der Grundfläche ABCD einschließt.
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Information: 2. Neigungswinkel zweier Ebenen