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Condition based integration in MatLab

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pritha
pritha on 7 Jan 2024
Commented: pritha on 10 Jan 2024
I have an integration : Int(rp.^2.*G(r,rp)*drp) where the integration is with respect to rp and the limit is on rp : 0->inf and G(r,rp) = 1/r for r>rp and G(r,rp)=1/rp for r<rp How to implement this integral in MatLab.
  2 Comments
David Goodmanson
David Goodmanson on 7 Jan 2024
Hi pritha,
For large rp the integral goes like
Int G(r,p) rp^2 drp = Int (1/rp) rp^2 drp = Int rp drp
and unfortunately, since the upper limit for rp is infinity, this integral diverges.
pritha
pritha on 7 Jan 2024
Hi David,
Thank you for your reply. If i consider the upper limit as 15-20? How will it be constructed in MatLab?

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Accepted Answer

Torsten
Torsten on 7 Jan 2024
Moved: Torsten on 7 Jan 2024
Ran in:
syms r R rp real positive
G(r,rp) = piecewise(r<rp,1/rp,r>=rp,1/r);
int(rp^2*G(r,rp),rp,0,R)
ans = 
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Torsten
Torsten on 10 Jan 2024
Edited: Torsten on 10 Jan 2024
Ran in:
If r is fixed and R -> Inf, you see from the integration result that the second case (r<R) is the relevant one, and the result is - as already answered by @David Goodmanson - lim(R->Inf) (R^2/2-r^2/6) = Inf
syms r rp real positive
G(r,rp) = piecewise(r<rp,1/rp,r>=rp,1/r);
int(rp^2*G(r,rp),rp,0,Inf)
ans = 

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