Difference between revisions of "Limit of Scattering Angle Theta in Lab Frame"
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− | <center><math> | + | <center><math>(11000\ MeV)(5500\ MeV)(1 - \cos \theta_{1\ 2^{'}})=(53\ MeV)^{*2}</math></center> |
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+ | <center><math>(1 - \cos \theta_{1\ 2^{'}})=\frac{(53\ MeV)^{*2}}{(11000\ MeV)(5500\ MeV)}</math></center> |
Revision as of 17:04, 15 March 2018
The quantity is known as the
In the CM Frame
where and is the angle between the before and after momentum in the CM frame
Using the relativistic relation
this reduces to
For , by symmetry this implies
This can be rewritten again using the relativistic energy relation
In the Lab Frame
with
and
Maximum Moller Scattering Angle Theta in Lab Frame
Since u is invariant between frames
with
for
As found earlier, the Moller electron has a maximum energy possible of:
Using the relativistic energy relation,
Rewriting the expression relating the terms
Solving for the angle theta