# Can everybody help me on solving this integral?

• sabbagh80
In summary, the speaker is seeking help with an integral problem related to their thesis in telecommunication engineering. They are asking for assistance with the following integral: \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 two real positive constants.
sabbagh80
Hi everybody,
When I was analyzing a problem, I faced the following integral. Could you please help me.

The problem:

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

where $a, b$ are two real positive constants.
Thanks a lot in advance.

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

The problem:

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

where $a, b$ 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?

## 1. What is an integral?

An integral is a mathematical concept that represents the area under a curve in a graph. It is used to solve problems related to finding the total value of a function or the rate of change.

## 2. Why is it important to solve integrals?

Solving integrals is important in many fields of science, such as physics, engineering, and economics. It allows us to calculate important values like distance, velocity, and acceleration, and helps us understand the behavior of systems.

## 3. How do I solve an integral?

To solve an integral, you can use different methods such as substitution, integration by parts, or trigonometric identities. It is important to identify the type of integral and choose the appropriate method to solve it.

## 4. Can everyone solve integrals?

Yes, anyone can learn to solve integrals with practice and understanding of the concepts. It may seem daunting at first, but with practice and guidance, anyone can become proficient in solving integrals.

## 5. Are there any resources to help me with solving integrals?

Yes, there are many resources available such as textbooks, online tutorials, and video lectures that can help you understand and solve integrals. You can also seek help from a tutor or a teacher if you are struggling with a particular integral problem.

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