1. h(n) is the product of the even numbers from 2 to n, inclusive, and p is the least prime factor of h(100)+1. What is the range of p? Answer: h(100)=2*4*6*...*100, h(100)…
User Guide for version 3.10. The beamer class \begin{frame} \frametitle{There Is No Largest Prime Number} \framesubtitle{The proof uses \textit{reductio ad absurdum}.} \begin{theorem}…
Junior Problem Seminar Dr. David A. SANTOS March 27, 2007Version Contents Preface 1 Essential Techniques 1.1 Reductio ad Absurdum Practice . . . . . . . . . . . 1.2 Pigeonhole…
User Guide for version 3.10. The beamer class \begin{frame} \frametitle{There Is No Largest Prime Number} \framesubtitle{The proof uses \textit{reductio ad absurdum}.} \begin{theorem}…
User Guide for version 3.10. The beamer class \begin{frame} \frametitle{There Is No Largest Prime Number} \framesubtitle{The proof uses \textit{reductio ad absurdum}.} \begin{theorem}…
The beamer class Manual for version 3.07. \begin{frame} \frametitle{There Is No Largest Prime Number} \framesubtitle{The proof uses \textit{reductio ad absurdum}.} \begin{theorem}…
User Guide for version 3.10. The beamer class \begin{frame} \frametitle{There Is No Largest Prime Number} \framesubtitle{The proof uses \textit{reductio ad absurdum}.} \begin{theorem}…
User Guide for version 3.10. The beamer class \begin{frame} \frametitle{There Is No Largest Prime Number} \framesubtitle{The proof uses \textit{reductio ad absurdum}.} \begin{theorem}…
User Guide for version 3.09. The beamer class \begin{frame} \frametitle{There Is No Largest Prime Number} \framesubtitle{The proof uses \textit{reductio ad absurdum}.} \begin{theorem}…