X-Git-Url: https://www.hackdaworld.org/gitweb/?a=blobdiff_plain;f=solid_state_physics%2Ftutorial%2F1_01.tex;h=5510a4f374000a0f012b48859745cc636b57a8fa;hb=caa63cd54523ca88928d8edc017f3f1a2fd0afd6;hp=b1fdabf0fe524f915c18836dff0dc8484f85a5ea;hpb=096f13b5e8f717b0db195009664db1f706fcc52c;p=lectures%2Flatex.git

diff --git a/solid_state_physics/tutorial/1_01.tex b/solid_state_physics/tutorial/1_01.tex
index b1fdabf..5510a4f 100644
--- a/solid_state_physics/tutorial/1_01.tex
+++ b/solid_state_physics/tutorial/1_01.tex
@@ -65,7 +65,7 @@ Using these approximations it is sufficient to consider a single electron locate
 Since most materials condense into almost perfect periodic arrays the periodicity should also hold for the potential style.
 
 Within this tutorial even the periodic potential is simplified.
-Consider a single particle (mass $m$) enclosed in a box (side length $L=\mathcal{V}^{1/3}$) where the potential is constant ($V_0$) inside the box and infinite at the surface.
+Consider a single particle (mass $m$) enclosed in a box (side length $L=\mathcal{V}^{1/3}$) where the potential is zero inside the box and infinite at the surface.
 
 \begin{enumerate}
  \item Write down the Schr"odinger equation and boundary conditions