Sinus- und Cosinussatz

Frage 1
In einem allgemeinen Dreieck sind 3 Grössen gegeben (s für Seite, w [br]für Winkel). Beurteilen Sie ob die Aussagen unten korrekt sind.[br][table][tr][td]sss [img width=108,height=57]https://www.istest2.ch/useruploads/u359596/images/f_359596_673df19e08f0e.png[/img][/td][td]ssw [img width=108,height=57]https://www.istest2.ch/useruploads/u359596/images/f_359596_673df1a5dacd6.png[/img][/td][td]wsw [img width=107,height=57]https://www.istest2.ch/useruploads/u359596/images/f_359596_673df1bf6f29a.png[/img][/td][/tr][tr][td]wws [img width=107,height=57]https://www.istest2.ch/useruploads/u359596/images/f_359596_673df1cf8d46a.png[/img][/td][td]wss  [img width=108,height=57]https://www.istest2.ch/useruploads/u359596/images/f_359596_673df77844bdb.png[/img][/td][td]sws[br][img width=107,height=57]https://www.istest2.ch/useruploads/u359596/images/f_359596_673df1dbd871d.png[/img] [br][/td][/tr][/table]
Frage 2
Wie viele Lösungen gibt es im Intervall [math]x\in\left[-\frac{3}{2}\pi,2\pi\right][/math] für die Gleichung:[br][br][math]sin\left(x\right)=0.75[/math]
Frage 3
Welche Strecke entspricht [math]\text{sin(45°)}[/math]:[br] [br][img]data:image/png;base64,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[/img]
Frage 1
In einem allgemeinen Dreieck sind 3 Grössen gegeben (s für Seite, w [br]für Winkel). Beurteilen Sie ob die Aussagen unten korrekt sind.[br][table][tr][td]sss [img width=108,height=57]https://www.istest2.ch/useruploads/u359596/images/f_359596_673df19e08f0e.png[/img][/td][td]ssw [img width=108,height=57]https://www.istest2.ch/useruploads/u359596/images/f_359596_673df1a5dacd6.png[/img][/td][td]wsw [img width=107,height=57]https://www.istest2.ch/useruploads/u359596/images/f_359596_673df1bf6f29a.png[/img][/td][/tr][tr][td]wws [img width=107,height=57]https://www.istest2.ch/useruploads/u359596/images/f_359596_673df1cf8d46a.png[/img][/td][td]wss  [img width=108,height=57]https://www.istest2.ch/useruploads/u359596/images/f_359596_673df77844bdb.png[/img][/td][td]sws[br][img width=107,height=57]https://www.istest2.ch/useruploads/u359596/images/f_359596_673df1dbd871d.png[/img] [br][/td][/tr][/table]
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Patricia Heckendorn

Information: Sinus- und Cosinussatz