How do you solve $2cos^2x+sinx-2=0$ over the interval 0 to 2pi?

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How do you solve $2cos^2x+sinx-2=0$ over the interval 0 to 2pi?

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Answer 1 · 2016-03-31T12:23:35

I found:
$x=0, pi,2pi$
$x=pi/6,5/6pi$

Explanation:

We can use the fact that:
$cos^2(x)=1-sin^2(x)$
and write:
$2(1-sin^2(x))+sin(x)-2=0$
$cancel(2)-2sin^2(x)+sin(x)cancel(-2)=0$
solve as a normal Quadratic Equation but in $sin(x)$ instead of $x$ :
collecting $sin(x)$ :
$sin(x)[-2sin(x)+1]=0$
we get 2 solutions:
$sin(x)=0$
and:
$-2sin(x)+1=0$
so that must be:
$sin(x)=0$ when $x=0, pi,2pi$
$sin(x)=1/2$ when $x=pi/6,5/6pi$

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How do you solve $2cos^2x+sinx-2=0$ over the interval 0 to 2pi?

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How do you solve $2cos^2x+sinx-2=0$ over the interval 0 to 2pi?