Determine the $x$-coordinates of all points on the curve $y = \sin 2 x - 2 \sin x$ at which the tangent line is horizontal.
$
\begin{equation}
\begin{aligned}
y' = m =& \frac{d}{dx} (\sin 2 x - 2 \sin)
&& \text{Where $m = 0$ because tangent line is horizontal}
\\
\\
m =& \frac{d}{dx} (\sin 2 x) - 2 \frac{d}{dx} \sin
&&
\\
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m =& \cos 2 x \cdot \frac{d}{dx} (2x) - 2 \cos x
&&
\\
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m =& (\cos 2x) (2) - 2 \cos x
&&
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0 =& 2 \cos 2x - 2 \cos x
&&
\\
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2 \cos 2x =& 2 \cos x
&&
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\frac{\cancel{2} \cos 2x}{\cancel{2}} =& \frac{\cancel{2} \cos x}{\cancel{2}}
&&
\end{aligned}
\end{equation}
$
$
\begin{equation}
\begin{aligned}
& \cos 2 x = \cos x
&& \text{Using Double Angle Formula $(\cos 2x = 2 \cos^2 x - 1)$}
\\
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& 2 \cos^2 x - 1 = \cos x
&&
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& 2 \cos ^2 x - \cos x - 1 = 0
&&
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& 2 \cos ^2 x - 2 \cos x + \cos x - 1 = 0
&& \text{We let $- \cos x = -2 \cos x + \cos x$ to have a complete factor}
\\
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& 2 \cos x (\cos x - 1) + 1 (\cos x - 1) = 0
&&
\\
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& (2 \cos x + 1) (\cos x - 1) = 0
&&
\end{aligned}
\end{equation}
$
$\displaystyle \cos x = \frac{-1}{2} || \cos x = 1$
Based from the graph and unit circle diagram
$\displaystyle x = 2 \pi n, \frac{\pi n}{2} \pm \frac{\pi}{3} \qquad $ (where $n$ is any integer)
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