Difference between revisions of "Differential Cross-Section"

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In the Ultra-relativistic limit as <math> E \approx p</math>
 
In the Ultra-relativistic limit as <math> E \approx p</math>
  
<center><math>\frac{d\sigma}{d\Omega}=\frac{\alpha ^2}{4E^{*2}p^{*4}\sin^4{\theta}}\left( p^{*4}\cos^4{\theta}+2p^{*4}\cos^2{\theta}+p^{*4}+4p^{*2}p^{*2}+4p^{*2}p^{*2}\cos^2{\theta}+4p^{*4}\right) </math></center>
+
<center><math>\frac{d\sigma}{d\Omega}=\frac{\alpha ^2}{4E^{*2}\sin^4{\theta}}\left( \cos^4{\theta}+2\cos^2{\theta}+1+4+4\cos^2{\theta}+4\right) </math></center>
 
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Revision as of 18:26, 1 January 2019

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Differential Cross-Section


Working in the center of mass frame


Determining the scattering amplitude in the center of mass frame







Using the fine structure constant ()



In the center of mass frame the Mandelstam variables are given by:





Calculating the parts to have common denominators:












Combing like terms further,





Expressing this as the differential cross-section



In the Ultra-relativistic limit as

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