We solve the problem using only conservation of energy and momentum. Lets work inunits in
whichc= 1 for now. We’ll put thecback in at the end. Assume the photon is initially moving in
thezdirection with energy E and that it scatters in theyzplane so thatpx= 0.Conservation of
momentumgives
E=E′cosθ+pecosφ
and
E′sinθ=pesinφ.
Conservation of energygives
E+m=E′+√
p^2 e+m^2Our goal is to solve forE′in terms of cosθso lets make sure we eliminate theφ. Continuing from
the energy equation
E−E′+m=
√
p^2 e+m^2squaring and calculatingp^2 efrom the components
E^2 +E′^2 +m^2 − 2 EE′+ 2mE− 2 mE′= (E−E′cosθ)^2 + (E′sinθ)^2 +m^2and writing out the squares on the right side
E^2 +E′^2 +m^2 − 2 EE′+ 2mE− 2 mE′=E^2 +E′^2 − 2 EE′cosθ+m^2and removing things that appear on both sides
− 2 EE′+ 2mE− 2 mE′=− 2 EE′cosθand grouping
m(E−E′) = EE′(1−cosθ)
(E−E′)
EE′=
(1−cosθ)
m
1
E′−
1
E
=
(1−cosθ)
m