\begin{frame} \frametitle{Antiderivatives / Integrals} \begin{block}{} Let $F' = f$ and $G' = g$. \\[1ex]\pause The following table gives examples of particular antiderivatives: \begin{center} \begin{tabular}{|c|c|} \hline Function & Antiderivative\\ \hline $c \,f(x)$ & \mpause[1]{$c\,F(x)$} \\ \hline \mpause{$f(x) + g(x)$} & \mpause{$F(x) + G(x)$} \\ \hline \mpause{$x^n$, $n\ne -1$} & \mpause{$(x^{n+1})/(n+1)$} \\ \hline \mpause{$1/x$} & \mpause{$\ln |x|$} \\ \hline \mpause{$e^x$} & \mpause{$e^x$} \\ \hline \mpause{$\cos x$} & \mpause{$\sin x$} \\ \hline \mpause{$\sin x$} & \mpause{$-\cos x$} \\ \hline \mpause{$\sec^2 x$} & \mpause{$\tan x$} \\ \hline \mpause{$\sec x \tan x$} & \mpause{$\sec x$} \\ \hline \end{tabular} \end{center} \end{block} \end{frame}