Fourier Transform Properties: Difference between revisions

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so expanding we have,
so expanding we have,


<math>\mathcal{F}[sin(w_0t)g(t)] = \mathcal{F}[sin(2\pi f_0t)g(t)] = \int_{-\infty}^{\infty}cos(2\pi f_0t)g(t)e^{-j2\pi ft}dt\!</math><br>
<math>\mathcal{F}[sin(w_0t)g(t)] = \mathcal{F}[sin(2\pi f_0t)g(t)] = \int_{-\infty}^{\infty}sin(2\pi f_0t)g(t)e^{-j2\pi ft}dt\!</math><br>


Also recall
Also recall
Line 65: Line 65:
So we now have the identity,
So we now have the identity,


<math>\mathcal{F}[cos(w_0t)g(t)] = \frac{1}{j2}[G(f-f_0)+ G(f+f_0)]\!</math>
<math>\mathcal{F}[sin(w_0t)g(t)] = \frac{1}{j2}[G(f-f_0)+ G(f+f_0)]\!</math>


orr rather
or rather


<math>\mathcal{F}[cos(w_0t)g(t)] =\frac{1}{2}j[G(f-f_0)- G(f+f_0)]\!</math>
<math>\mathcal{F}[sin(w_0t)g(t)] =\frac{1}{2}j[G(f-f_0)- G(f+f_0)]\!</math>


[[Fourier Transform Property review|Reviewed by Max]]
[[Fourier Transform Property review|Reviewed by Max]]

Revision as of 19:05, 20 October 2009

Some properties to choose from if you are having difficulty....

Max Woesner

1. Find
Recall , so
Also recall ,so
Now
So

2. Find
Recall
Similarly,
So
Now

Note that

So

Someone please review these!


Nick Christman

Find

To begin, we know that

But recall that


Because of this definition, our problem has now been simplified significantly:


Therefore,



Joshua Sarris

Find


Recall ,

so expanding we have,


Also recall ,

so we can convert to exponentials.


Now integrating gives us,



So we now have the identity,

or rather

Reviewed by Max