\begin{frame} \frametitle{Inverse Trigonometric} \begin{minipage}{.49\textwidth} \begin{center} \scalebox{1}{ \begin{tikzpicture}[default,baseline=0cm] \diagram{-1.5}{1.5}{-1.1}{1.3}{1} \begin{scope}[ultra thick] \draw[cred] plot[smooth,domain=-1:1,samples=300] ({sin(\x*90)},\x); \end{scope} \diagramannotatez \diagramannotatex{1,-1} \diagramannotateyy{-1/$-\frac{\pi}{2}$,1/$\frac{\pi}{2}$} \end{tikzpicture} }\\[.5ex] {\small $\arcsin x$} \end{center} \end{minipage} \begin{minipage}{.49\textwidth} \begin{center} \scalebox{1}{ \begin{tikzpicture}[default,baseline=0cm] \diagram{-1.1}{1.3}{-.5}{2.5}{1} \begin{scope}[ultra thick] \draw[cgreen] plot[smooth,domain=0:2,samples=300] ({cos(\x*90)},\x); \end{scope} \diagramannotatez \diagramannotatex{1,-1} \diagramannotateyy{1/$\frac{\pi}{2}$,2/$\pi$} \end{tikzpicture} }\\[.5ex] {\small $\arccos x$} \end{center} \end{minipage} \pause\bigskip \begin{block}{} The domain of $\arcsin$ and $\arccos$ is \pause $[-1,1]$.\\\pause The range of $\arcsin$ is \pause $[-\frac{\pi}{2}, \frac{\pi}{2}]$ \pause and of $\arccos$ is \pause $[0,\pi]$. \end{block} \pause\bigskip \end{frame}