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\title{There Is No Largest Prime Number}
\date[ISPN ’80]{27th International Symposium of Prime Numbers}
\author[Euclid]{Euclid of Alexandria \texttt{euclid@alexandria.edu}}

\usetheme{Akatsuki}

\begin{document}

\begin{frame}
\titlepage
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%\begin{frame} 
%\frametitle{There Is No Largest Prime Number} 
%\framesubtitle{The proof uses \textit{reductio ad absurdum}.} 
%\begin{theorem}
%  There is no largest prime number.
%\end{theorem} 
%\begin{enumerate} 
%\item<1-| alert@1> Suppose $p$ were the largest prime number. 
%\item<2-> Let $q$ be the product of the first $p$ numbers. 
%\item<3-> Then $q+1$ is not divisible by any of them. 
%\item<1-> But $q + 1$ is greater than $1$, thus divisible by some prime
%number not in the first $p$ numbers.
%\end{enumerate}
%\end{frame}
%
%\begin{frame}{A longer title}
%\begin{itemize}
%\item one
%\item two
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\end{document}