Differentiate $\displaystyle f(t) = \sin^2 (e^{\sin^2 t})$
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\begin{equation}
\begin{aligned}
f'(t) =& \frac{d}{dt} [\sin ^2 (e^{\sin ^2 t})]
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f'(t) =& \frac{d}{dt} [\sin (e^{\sin ^2 t})]^2
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f'(t) =& 2 \sin (e^{\sin ^2 t}) \frac{d}{dt} [\sin (e^{\sin ^2 t})]
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f'(t) =& 2 \sin (e^{\sin ^2 t}) \cos (e^{\sin ^2 t}) \frac{d}{dt} (e^{\sin ^2 t})
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f'(t) =& 2 \sin (e^{\sin ^2 t}) \cos (e^{\sin ^2 t}) e^{\sin ^2 t} \frac{d}{dt} (\sin ^2 t)
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f'(t) =& 2 e^{\sin ^2 t} \sin (e^{\sin ^2 t}) \cos (e^{\sin ^2 t}) (2 \sin t) \frac{d}{dt} (\sin t)
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f'(t) =& 4 e^{\sin ^2 t} \sin t \sin (e^{\sin ^2 t}) \cos (e^{\sin ^2 t}) \cos t
\end{aligned}
\end{equation}
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