Can everybody help me on solving this integral?

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The integral discussed is defined as \(\int_{2\pi} \frac{e^{-(a+b)+ae^{i\omega}+be^{-i\omega}}{1-e^{-i\omega}}e^{-i\omega}d\omega\), where \(a\) and \(b\) are real positive constants. This integral is relevant to telecommunication engineering, specifically in the context of the user's thesis. Participants in the forum are encouraged to provide assistance in solving this integral, highlighting the collaborative nature of the discussion.

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sabbagh80
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Hi everybody,
When I was analyzing a problem, I faced the following integral. Could you please help me.

The problem:

[itex]\int_{2\pi} \frac{e^{-(a+b)+ae^{i\omega}+be^{-i\omega}}}{1-e^{-i\omega}}e^{-i\omega}d\omega[/itex]

where [itex]a, b[/itex] are two real positive constants.
Thanks a lot in advance.
 
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sabbagh80 said:
Hi everybody,
When I was analyzing a problem, I faced the following integral. Could you please help me.

The problem:

[itex]\int_{2\pi} \frac{e^{-(a+b)+ae^{i\omega}+be^{-i\omega}}}{1-e^{-i\omega}}e^{-i\omega}d\omega[/itex]

where [itex]a, b[/itex] are two real positive constants.
Thanks a lot in advance.

What is the context of the problem? Is it for schoolwork?
 
berkeman said:
What is the context of the problem? Is it for schoolwork?

Off course no, don't be that much pessimistic!
my major is telecommunication engineering. it is related to my thesis. can you help?
 

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