Fourier transform: Difference between revisions

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==Fourier Transform==
What is a Fourier Transform? A Fourier Transform is a function that changes a signal or waveform from the time domain into the frequency domain. One simple way to look at it is this: Suppose you are at the beach, watching the waves. You could say that a wave hits the shore at specific times (0 second, 2 seconds, 4 seconds, etc.) that would be describing the waveform in the time domain. If, however, you were to say that the waves hit the beach every two seconds, that would be describing it in the frequency domain. So a Fourier transform would take the data given in the time domain and convert that into the frequency domain. The function that does this is: <math> X(f)=\int_{-\infty}^{\infty} x(t) e^{-j2\pi ft}\, dt </math>.

The reverse is also possible. You can take the information from the frequency domain, and convert it into the time domain using an Inverse Fourier Transform.

==From the Fourier Transform to the Inverse Fourier Transform==
==From the Fourier Transform to the Inverse Fourier Transform==
Lets start with the basic Fourier Transform:
An initially identity that is useful:
<math>
<math>


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\mathcal{F}^{-1}[\Beta(f)]=\beta(t)=\int_{-\infty}^\infty \Beta(f) e^{j2\pi fkt}\,df
\mathcal{F}^{-1}[\Beta(f)]=\beta(t)=\int_{-\infty}^\infty \Beta(f) e^{j2\pi fkt}\,df
</math>
</math>
==Some Useful Fourier Transform Identities==
{\hbox{\boldmath $\textstyle #1$}}


==Some Useful Fourier Transform Pairs==
==A Second Approach to Fourier Transforms==
<math>
\mathcal{F}[\alpha(t)]=\frac{1}{\mid \alpha \mid}f(\frac{\omega}{\alpha})
</math>
<br>
{|
|-
|<math>\mathcal{F}[c_1\alpha(t)+c_2\beta(t)]</math>
|<math>=\int_{-\infty}^{\infty} (c_1\alpha(t)+c_2\beta(t)) e^{-j2\pi ft}\, dt</math>
|-
|
|<math>=\int_{-\infty}^{\infty}c_1\alpha(t)e^{-j2\pi ft}\, dt+\int_{-\infty}^{\infty}c_2\beta(t)e^{-j2\pi ft}\, dt</math>
|-
|
|<math>=c_1\int_{-\infty}^{\infty}\alpha(t)e^{-j2\pi ft}\, dt+c_2\int_{-\infty}^{\infty}\beta(t)e^{-j2\pi ft}\, dt=c_1\Alpha(f)+c_2\Beta(f)</math>
|-
|}
<br>
<math>
\mathcal{F}[\alpha(t-\gamma)]=e^{-j2\pi f\gamma}\Alpha(f)
</math>
<br>
<math>
\mathcal{F}[\alpha(t)*\beta(t)]=\Alpha(f)\Beta(f)
</math>
<br>
<math>
\mathcal{F}[\alpha(t)\beta(t)]=\Alpha(f)*\Beta(f)
</math>
<br>
Some other usefull pairs can be found here: [[Fourier Transforms]]

==Another look at Fourier Transforms==
*[[Fourier Transforms]]

Return to [[Signals and systems|Signals and Systems]]

Latest revision as of 02:32, 13 February 2008

Fourier Transform

What is a Fourier Transform? A Fourier Transform is a function that changes a signal or waveform from the time domain into the frequency domain. One simple way to look at it is this: Suppose you are at the beach, watching the waves. You could say that a wave hits the shore at specific times (0 second, 2 seconds, 4 seconds, etc.) that would be describing the waveform in the time domain. If, however, you were to say that the waves hit the beach every two seconds, that would be describing it in the frequency domain. So a Fourier transform would take the data given in the time domain and convert that into the frequency domain. The function that does this is: .

The reverse is also possible. You can take the information from the frequency domain, and convert it into the time domain using an Inverse Fourier Transform.

From the Fourier Transform to the Inverse Fourier Transform

Lets start with the basic Fourier Transform:

Suppose that we have some function, say , that is nonperiodic and finite in duration.
This means that for some

Now let's make a periodic function by repeating with a fundamental period . Note that
The Fourier Series representation of is
where
and
can now be rewritten as
From our initial identity then, we can write as
and becomes
Now remember that and
Which means that
Which is just to say that

So we have that
Further

Some Useful Fourier Transform Pairs






Some other usefull pairs can be found here: Fourier Transforms

Another look at Fourier Transforms

Return to Signals and Systems