From 9689548ca3286d5b4a6f651868a86f10b629516e Mon Sep 17 00:00:00 2001
From: joshuab <>
Date: Fri, 2 Jul 2010 16:50:49 +0000
Subject: changed formatting

---
 Problem Set 1.page | 4 ++--
 1 file changed, 2 insertions(+), 2 deletions(-)

diff --git a/Problem Set 1.page b/Problem Set 1.page
index 60831d3..34389c4 100644
--- a/Problem Set 1.page	
+++ b/Problem Set 1.page	
@@ -10,9 +10,9 @@
 
   You might want to use this fact in the problems below, though it's not necessary.
 
-- Write down the Cauchy-Riemann equations in polar coordinates.
+5. Write down the Cauchy-Riemann equations in polar coordinates.
 
-6. Show that the function $f(z) = \overline{z}$ is not holomorphic, despite being angle-preserving.  How does this function transform the complex plane?
+- Show that the function $f(z) = \overline{z}$ is not holomorphic, despite being angle-preserving.  How does this function transform the complex plane?
 
 - Show that the function $f(z) = z^n$ is holomorphic for any integer n (possibly negative!).  How do these functions transform the complex plane?
 
-- 
cgit v1.2.3