[b][size=150][size=100]Löse die Gleichung. Gib das Winkelmaß α an.[/size] [/size][/b]([math]\alpha \in \left[0°;360°\right][/math])[br][br][math]\bold{sin\,\alpha=\frac{1}{2}\sqrt{2}}[/math]

[b][size=150][size=100][b]Löse die Gleichung. [/b]Gib das Winkelmaß α an.[/size] [/size][/b]([math]\alpha \in \left[0°;360°\right][/math])[br][br][math]\bold{cos\,\alpha=\frac{1}{2}}[/math]

[b][size=150][size=100][b]Löse die Gleichung. [/b]Gib das Winkelmaß α an.[/size] [/size][/b]([math]\alpha \in \left[0°;360°\right][/math])[br][br][math]\bold{tan\,\alpha=\sqrt{3}}[/math]

[b][size=150][size=100][b]Löse die Gleichung. [/b]Gib das Winkelmaß α an.[/size] [/size][/b]([math]\alpha \in \left[0°;360°\right][/math])[br][br][math]\bold{sin\,(\alpha + 10°)=0,5\sqrt{3}}[/math]

[b][size=150][size=100][b]Löse die Gleichung. [/b]Gib das Winkelmaß α an.[/size] [/size][/b]([math]\alpha \in \left[0°;360°\right][/math])[br][br][math]\bold{cos\,(\alpha - 15°)=\frac{1}{2}\sqrt{3}}[/math][br] [br][i][color=#666666][size=85]Gib nur die Maßzahlen der Lösung an, z.B.: 25;50[/size][/color][/i]

[b][size=150][size=100][b]Löse die Gleichung. [/b]Gib das Winkelmaß α an.[/size] [/size][/b]([math]\alpha \in \left[0°;360°\right][/math])[br][br][math]\bold{sin^2\,\alpha + 0,5 \cdot sin\, \alpha - 0,5=0}[/math][br] [br][i][color=#666666][size=85]Gib nur die Maßzahlen der Lösung an, z.B.: 25;50[/size][/color][/i]

[b]Berechne die Länge c der Seite [/b][math]\overline{AB}[/math][b].[/b][br][br][img]data:image/png;base64,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[/img][br][br][i][color=#666666][size=85]Gib nur die Maßzahl der Lösung mithilfe einer Wurzel an, z.B. [math]\sqrt {15}[/math][/size][/color][/i]

[b]Berechne die Länge b der Seite [/b][math]\overline{AC}[/math][b].[/b][br][br][img]data:image/png;base64,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[/img][br][br][i][color=#666666][size=85]Gib die Lösung so an: b=9,5cm[/size][/color][/i]

[b]Unter den Streckenlängen [/b][math]|\overline{AB_n}|=\frac{4,8\,cm}{sin\, (\alpha + 37°)}[/math][b] gibt es eine minimale Streckenlänge [/b][math]|\overline{AB_0}|[/math][b]. [br]Berechne den zugehörigen Wert für [/b][math]\alpha[/math][b]. [/b] ([math]\alpha \in \left[0°;90°\right][/math])[br] [br][i][color=#666666][size=85]Gib nur die Maßzahlen der Lösung an, z.B.: 33[/size][/color][/i]

[b]Gegeben sind die Punkte [math]\bold{B_n (0,2\,sin\,\alpha\,-2\mid2 \, cos^2\alpha)}[/math] mit [math]\alpha \in \left[0°;360°\right][/math].[br]Berechne die Gleichung des Trägergraphen der Punkte B[sub]n[/sub]. ([math]x,y\in\mathbb{R}[/math])[/b]