Difference between revisions of "NucPhys I HomeworkProblems"

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# In your own words, describe what the "Standard Model" of physics is using 2 to 5 paragraphs.  Your paragraphs should include the concepts of the 4 fundamental forces of physics, QED, and QCD at a minimum.  Any sentences in which a string of 5 or more words match a sentence that is  found on the internet will be evidence of cheating.
 
# In your own words, describe what the "Standard Model" of physics is using 2 to 5 paragraphs.  Your paragraphs should include the concepts of the 4 fundamental forces of physics, QED, and QCD at a minimum.  Any sentences in which a string of 5 or more words match a sentence that is  found on the internet will be evidence of cheating.
 
#Solve the Schrodinger equation for the following potential:
 
#Solve the Schrodinger equation for the following potential:
 
 
:<math>V(x) = \infty \;\; x<a</math>
 
:<math>V(x) = \infty \;\; x<a</math>
 
:<math>V(x) =\left \{  {-V_0 \;\;\;\; 0<x <a \atop 0 \;\;\;\; x>a} \right .</math>
 
:<math>V(x) =\left \{  {-V_0 \;\;\;\; 0<x <a \atop 0 \;\;\;\; x>a} \right .</math>
 
 
 
 
V_0 > 0 and E>0.  Assume particles are incident from <math>x = -\infty</math>, don't try to normalize but do express the wave function in terms of one coefficient.
 
V_0 > 0 and E>0.  Assume particles are incident from <math>x = -\infty</math>, don't try to normalize but do express the wave function in terms of one coefficient.
#
+
#adasdf
  
 
[http://www.iac.isu.edu/mediawiki/index.php/Forest_NucPhys_I Go Back]
 
[http://www.iac.isu.edu/mediawiki/index.php/Forest_NucPhys_I Go Back]

Revision as of 19:56, 25 January 2008

Chapter 2

  1. In your own words, describe what the "Standard Model" of physics is using 2 to 5 paragraphs. Your paragraphs should include the concepts of the 4 fundamental forces of physics, QED, and QCD at a minimum. Any sentences in which a string of 5 or more words match a sentence that is found on the internet will be evidence of cheating.
  2. Solve the Schrodinger equation for the following potential:
[math]V(x) = \infty \;\; x\lt a[/math]
[math]V(x) =\left \{ {-V_0 \;\;\;\; 0\lt x \lt a \atop 0 \;\;\;\; x\gt a} \right .[/math]

V_0 > 0 and E>0. Assume particles are incident from [math]x = -\infty[/math], don't try to normalize but do express the wave function in terms of one coefficient.

  1. adasdf

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