Explain step by step this integration Integration over these velocity space variables would then take the form[d³on(r, v.1)= [ do v² ²*do* dð sin On(r,v,,1)dEde- de fdân(r. E.Â.1)where we have identified the differential solid angle dŵ = sin 0d0 do. One

Given : integration in terms of velocity variables , And our task to write the given integration in…

Integration over these velocity space variables would then take the form de [d³on(r, v.1)= [ do v² ²*do* do sin On(r,v,,1) - de fdân(r. E.Â.1) S²º° dE where we have identified the differential solid angle dŷ = sin 0d0 do. One

Integration over these velocity space variables would then take the form de [d³on(r, v.1)= [ do v² ²do do sin On(r,v,,1) - de fdân(r. E.Â.1) S²º° dE where we have identified the differential solid angle dŷ = sin 0d0 do. One

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Explain step by step this integration

Integration over these velocity space variables would then take the form
[d³on(r, v.1)= [ do v² ²*do* dð sin On(r,v,,1)
dE
de
- de fdân(r. E.Â.1)
where we have identified the differential solid angle dŵ = sin 0d0 do. One

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