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Find the complete solution in radians of each equation. sinθcot²θ-3sin θ=0

Find the complete solution in radians of each equation. sinθcot²θ-3sin θ=0
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Find the complete solution in radians of each equation. sinθcot²θ-3sin θ=0

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User BenM
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1 Answer

1 vote

Answer:
\theta=(\pi)/(6)+\pi n, (5\pi)/(6)+\pi n, \pi n, n \in \mathbb{Z}

Explanation:


\sin \theta(\cot^2 \theta-3)=0\\\\\sin \theta(\cot \theta-\sqrt 3)(\cot \theta+\sqrt 3)=0\\\\\therefore \sin \theta=0, \cot \theta =\pm \sqrt 3\\\\\sin \theta =0 \implies \theta=\pi n, n \in \mathbb{Z}\\\\\cot \theta=\pm \sqrt 3 \implies \tan \theta =\pm (1)/(√(3)) \implies \theta=(\pi)/(6)+\pi n, (5\pi)/(6)+\pi n, n \in \double{Z}\\\\\therefore \theta=(\pi)/(6)+\pi n, (5\pi)/(6)+\pi n, \pi n, n \in \mathbb{Z}

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User Zsuzsa
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