\documentclass[minion]{homework}
\usepackage{cmacros}
\usepackage{graphicx}
\usepackage[all,cmtip]{xy}
\usepackage{wf}

\newcommand{\bbB}{\mathbb{B}}
\doclabel{Math F651: Homework 8}
\docdate{Due: March 30, 2011}
\begin{document}
\begin{aproblems}

\aproblem Munkres 26.1
\aproblem Munkres 26.4
\aproblem Munkres 28.6
\aproblem Munkres 29.3
\aproblem Munkres 29.5
\aproblem Munkres 29.6
\aproblem This problem will be due on the {\bf following} homework.  It needs some thought, so I want to let you start
working on it now.  Show that if $p$ and $q$ are elements of the interior of the closed unit ball 
$$
\bbB^n=\{x\in \Reals^n:|x|\le 1\},
$$
then there is a homeomorphism $\phi:\bbB^n\ra \bbB^n$ such that $\phi(p)=q$ and such that $\phi(x)=x$ for all $x$
with $|x|=1$.  Be as rigorous as you can, but avoid writing a tome.

\end{aproblems}


\end{document}