Fourier-cosine transform of hyperbolic function
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Could you help me please with the Fourier cosine transform with respect to x variable of the following function?
tanh[b(a^2+x^2)^1/2]cos(ax)/((a^2+x^2)^1/2)
Recall, that the Fourier cosine transform of the function f(x) defines by
int(f(x),0,infinity)
1 Commento
Kevin Claytor
il 19 Lug 2012
Could you be more specific, what do you need help with?
Risposta accettata
Walter Roberson
il 19 Lug 2012
1 voto
If there is any solution at all, it would have to involve a transformation of variables. I tried a number of different representations of tanh() but none of them had an analytical solution for the fourier cosine transform.
Note: please edit existing questions instead of deleting them and re-posting.
4 Commenti
Asatur Khurshudyan
il 19 Lug 2012
Walter Roberson
il 19 Lug 2012
It could not be determined by Maple (I do not have access to the Matlab Symbolic Toolbox)
Asatur Khurshudyan
il 20 Lug 2012
Walter Roberson
il 20 Lug 2012
I would not expect so, but I cannot rule it out. There are some known cases where the MATLAB Symbolic Toolbox can integrate some things that Maple cannot, but I have only seen one such case myself, and I have seen a number of integrals that Maple can handle easily that the Symbolic Toolbox cannot.
If you do not already have the Symbolic Toolbox you could request a trial of it to test with.
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il 19 Lug 2012
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