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Solve for x: 2sin^2(x) -sin(x)=1 over the interval 0 to 2pi
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Solve for x: 2sin^2(x) -sin(x)=1 over the interval 0 to 2pi

User Chenghwa
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2\sin^2x-\sin x=1\ \ \ \ |subtract\ 1\ from\ both\ sides\\\\2\sin^2x-\sin x-1=0\ \  \ \ |subtitute\ \sin x=t\ where\ t\in[-1;\ 1]\\\\2t^2-t-1=0\\\\2t^2-2t+t-1=0\\\\2t(t-1)+1(t-1)=0\\\\(t-1)(2t+1)=0\iff t-1=0\ or\ 2t+1=0\\\\t=1\ or\ 2t=-1\to t=-(1)/(2)\\\\therefore\\\sin x=1\ or\ \sin x=-(1)/(2)\\\\Answer:\boxed{t\in\left\{(\pi)/(2);\ (7\pi)/(6);\ (11\pi)/(6)\right\}}
User Caelea
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