Fourier Transform Property review

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Revision as of 17:04, 19 October 2009 by Max.Woesner (talk | contribs) (New page: == Max Woesner == Back to my Home Page === Homework #5 - Reveiew a Fourier Transform Property === <b><u>Joshua Sarris</u></b> derived the following Four...)
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Max Woesner

Back to my Home Page

Homework #5 - Reveiew a Fourier Transform Property

Joshua Sarris derived the following Fourier Transform Property here for Homework #4.

Find


Recall ,

so expanding we have,


Also recall ,

so we can convert to exponentials.


Now integrating gives us,



So we now have the identity,

orr rather


My Review

Josh, Josh, it appears that you copied my code and forgot to change some necessary elements so it is works for your equation, such as the cosines on lines 4, 11, and 13.
Also, you forgot a in the second term of the second equation on line 9, and your identity for has a sign error. It should be:

The derivation should be as follows.

Find
Recall , so expanding we have,
Also recall , so we can convert to exponentials.

Now integrating gives us,

So we now have the identity,
Your answer looks correct, but I don't know how you got if from the equation above it. Your operator between the terms changed from a to a