From 516f289c5ed1977a11b6c385079e931b90cda632 Mon Sep 17 00:00:00 2001
From: jeanpouget-abadie <jean.pougetabadie@gmail.com>
Date: Mon, 9 Mar 2015 11:19:28 -0400
Subject: small typos fix

---
 notes/presentation/beamer_2.tex | 4 ++--
 1 file changed, 2 insertions(+), 2 deletions(-)

(limited to 'notes/presentation/beamer_2.tex')

diff --git a/notes/presentation/beamer_2.tex b/notes/presentation/beamer_2.tex
index 2a42a3b..0066511 100644
--- a/notes/presentation/beamer_2.tex
+++ b/notes/presentation/beamer_2.tex
@@ -88,7 +88,7 @@ What do we know? What do we want to know?
 \begin{itemize}
 \item At $t=0$, the {\color{orange} orange} node is infected, and the two other nodes are susceptible. $X_0 = $({\color{orange} orange})
 \item At $t=1$, the {\color{orange}} node infects the {\color{blue} blue} node and fails to infect the {\color{green} green} node. The {\color{orange} orange} node dies. $X_1 = $({\color{blue} blue})
-\item At $t=2$, {\color{blue} blue} dies. $X_3 = \emptyset$
+\item At $t=2$, {\color{blue} blue} dies. $X_2 = \emptyset$
 \end{itemize}
 \end{block}
 
@@ -105,7 +105,7 @@ What do we know? What do we want to know?
 \end{figure}
 
 \begin{itemize}
-\item If $3$ and $4$ are {\color{blue} infected} at $t=0$, what is the probability that node $0$ is infected at $t=1$?
+\item If the {\color{orange} orange} node and the {\color{green} green} node are infected at $t=0$, what is the probability that the {\color{blue} blue} node is infected at $t=1$?
 $$1 - \mathbb{P}(\text{not infected}) = 1 - (1 - .45)(1-.04)$$
 \end{itemize}
 
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