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1 vote
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Integration and expansion of hypergeometric function

This is not the answer to your question, only solution for integral: $\int _0^1\int _0^1((1-\beta ) \beta )^{-\frac{3}{2}+\frac{\epsilon }{2}} \, _2F_1\left(\frac{3}{2}-\frac{\epsilon }{2},-\frac{1}{2}...
Mariusz Iwaniuk's user avatar
3 votes
Accepted

Solve cannot find solutions if integer parameters are assumed

I commented that the assumption BesselI[(m \[Pi])/a, (a n \[Pi])/L] != 0 works, but I wonder what should be considered a workaround. For instance, this seems an ...
Michael E2's user avatar
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3 votes

Solve cannot find solutions if integer parameters are assumed

Adding assumption BesselI[(m Pi)/a, (a n Pi)/L] != 0 solves the problem. ...
azerbajdzan's user avatar
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3 votes
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Same integral giving different results

This is not surprising. ...
A. Kato's user avatar
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1 vote

Same integral giving different results

One way to confirm there is no difference in the two results when q=p is like this: Simplify[Limit[result1-result2,q->p],Element[p,Integers]] (* 0 *)
LouisB's user avatar
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2 votes

Iteration Limit for expression involving Gamma functions

After having looked in the documentation, this can be fixed in 14.1 on Windows 10 as follows. ...
user64494's user avatar
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4 votes
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Iteration Limit for expression involving Gamma functions

...
Bob Hanlon's user avatar
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7 votes
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An integral using Mathematica or otherwise

Using: $$\sum _{\alpha =0}^{-A} \binom{-A}{\alpha } (u v w x y)^{\alpha } (1-w)^{-A-\alpha }=(1-w+u v w x y)^{-A}$$ where: A=2 Then: ...
Mariusz Iwaniuk's user avatar
5 votes

An integral using Mathematica or otherwise

I tried it with 2 and 3 variables ...
Vaclav Kotesovec's user avatar

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