From ff05a0dbaf67fbddd34149f0be0b3c92c4ba73c5 Mon Sep 17 00:00:00 2001
From: Dane Sabo <dane.sabo@pitt.edu>
Date: Fri, 4 Oct 2024 12:25:29 -0400
Subject: [PATCH] vault backup: 2024-10-04 12:25:29

---
 .../2024-09-09 Frameworks and Review.md                         | 2 +-
 1 file changed, 1 insertion(+), 1 deletion(-)

diff --git a/300s School/ME 2016 - Nonlinear Dynamical Systems 1/2024-09-09 Frameworks and Review.md b/300s School/ME 2016 - Nonlinear Dynamical Systems 1/2024-09-09 Frameworks and Review.md
index 0b85dd5a..5936a671 100644
--- a/300s School/ME 2016 - Nonlinear Dynamical Systems 1/2024-09-09 Frameworks and Review.md	
+++ b/300s School/ME 2016 - Nonlinear Dynamical Systems 1/2024-09-09 Frameworks and Review.md	
@@ -13,7 +13,7 @@ Well, a couple of places...
 1. Geometric nonlinearities (pendulum)
 2. External fields
 3. Material properties
-So we're stuck with them. But how do we deal with noninearities?
+So we're stuck with them. Bjupyter labut how do we deal with noninearities?
 
 ## A nonlinear equation
 $$ \dot{x} = \frac{dx}{dt} = 1-2\cos x$$