\begin{frame} \frametitle{Derivatives of Trigonometric Functions} \begin{exampleblock}{} Differentiate $f(x) = e^{\sin x}$. \pause\medskip We have $f = g \circ h$ where \;\;$g(x) = e^x$\;\; and \;\;$h(x) = \sin x$\;\;: \pause \begin{talign} g'(x) &\mpause[1]{= e^x } \\ \mpause[2]{h'(x) }&\mpause[3]{ = \cos x } \\ \mpause[4]{f'(x)} &\mpause[5]{ = g'(h(x)) \cdot h'(x) } \mpause[6]{ = e^{\sin x} \cdot \cos x } \end{talign} \end{exampleblock} \end{frame}