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[[Category:ECE438Fall2009mboutin]]
 
CTFT ( Continuous Time Fourier Transform )
 
CTFT ( Continuous Time Fourier Transform )
  
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*<math>X(w) = \int{x(t)*e^{-jwt} dt }</math>
 
*<math>X(w) = \int{x(t)*e^{-jwt} dt }</math>
 
** <span style="color:green">Careful here: the symbol <math>~_*</math> is for convolution, not multiplication.</span>--[[User:Mboutin|Mboutin]] 20:18, 1 September 2009 (UTC)
 
** <span style="color:green">Careful here: the symbol <math>~_*</math> is for convolution, not multiplication.</span>--[[User:Mboutin|Mboutin]] 20:18, 1 September 2009 (UTC)
*<math>x(t) = (1/2pi)\int{X(w)*e^{jwt} dw }</math>
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*<math>x(t) = \frac{1}{2\pi}\int{X(w)*e^{jwt} dw }</math>
  
 
Duality Property
 
Duality Property
 
* <math>'''{x(t)\stackrel{\text{CTFT}}{\longrightarrow}X(f)}'''</math>
 
* <math>'''{x(t)\stackrel{\text{CTFT}}{\longrightarrow}X(f)}'''</math>
* <math>'''{X(t)-CTFT->x(-f)}'''</math>
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* <math>'''{X(t)\stackrel{\text{CTFT}}{\longrightarrow}x(-f)}'''</math>
  
 
Example
 
Example
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Cosine and Sine Functions
 
Cosine and Sine Functions
*<math>cos(t) = 0.5 . ( delta(f - f0) + delta(f + f0) )</math>
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*<math>\cos(t) = 0.5 . ( \delta(f - f0) + \delta(f + f0) )</math>
 
*<math>sin(t) = 0.5 i .( delta(f + f0) - delta(f - f0))</math>
 
*<math>sin(t) = 0.5 i .( delta(f + f0) - delta(f - f0))</math>
  
 
Rept and Comb Functions
 
Rept and Comb Functions
* <math>Rept(x(t)) = x(t) * sum(delta(t-kT))</math>
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* <math>Rept(x(t)) = x(t) * \sum_{k=-\infty}^\infty(\delta(t-kT))</math>
 
*<math>Comb(x(t)) = x(t) . sum(delta(t-kT))</math>
 
*<math>Comb(x(t)) = x(t) . sum(delta(t-kT))</math>
  
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I will add more later.
 
I will add more later.
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TA comments: Hamad did a very good job to lead the first recitation. He especially had deep understanding in Duality property of the CTFT/DTFT. He used it to easily solve the CTFT of rect(t) and sinc(t). Furthermore, he handled well with the rept/comb function. This recitation impressed me very much. Thanks, Hamad.
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I think this is a pretty good beginning. But in preparation for the test, I would like students to go even further and try to understand the relationship between the CT and the DT Fourier transforms. More precisely, given a CT signal and a discretization of this signal,  "how do their respective Fourier transforms compare?" and "What should the DT Fourier transform look like if the discretization represents the CT signal well?".  Should we organize another recitation on that topic?--[[User:Mboutin|Mboutin]] 08:11, 3 September 2009 (UTC)
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[[ECE438_(BoutinFall2009)|Back to ECE438 course page]]

Latest revision as of 03:11, 3 September 2009

CTFT ( Continuous Time Fourier Transform )

Equations**

  • $ X(w) = \int{x(t)*e^{-jwt} dt } $
    • Careful here: the symbol $ ~_* $ is for convolution, not multiplication.--Mboutin 20:18, 1 September 2009 (UTC)
  • $ x(t) = \frac{1}{2\pi}\int{X(w)*e^{jwt} dw } $

Duality Property

  • $ '''{x(t)\stackrel{\text{CTFT}}{\longrightarrow}X(f)}''' $
  • $ '''{X(t)\stackrel{\text{CTFT}}{\longrightarrow}x(-f)}''' $

Example

  • $ delta(t-t0) ->CTFT-> exp(-j2pi.f.t0) $
  • $ exp(j.2pi.f0t) -> CTFT -> delta(f-f0) $

Another Example:

  • $ rect(t) -> CTFT -> sinc(f) $
  • $ sinc(t) -> CTFT -> (rect(-f) = rect(f)) $

Cosine and Sine Functions

  • $ \cos(t) = 0.5 . ( \delta(f - f0) + \delta(f + f0) ) $
  • $ sin(t) = 0.5 i .( delta(f + f0) - delta(f - f0)) $

Rept and Comb Functions

  • $ Rept(x(t)) = x(t) * \sum_{k=-\infty}^\infty(\delta(t-kT)) $
  • $ Comb(x(t)) = x(t) . sum(delta(t-kT)) $



DTFT ( Discrete Time Fourier Transform )

  • $ X(w) = \sum{x(n)*exp(-jwn) dn } $
  • $ x(t) = (1/2pi)\int{X(w)*exp(jwt) dw } $
  • Note that x[n] is always periodic with 2pi

I will add more later.


TA comments: Hamad did a very good job to lead the first recitation. He especially had deep understanding in Duality property of the CTFT/DTFT. He used it to easily solve the CTFT of rect(t) and sinc(t). Furthermore, he handled well with the rept/comb function. This recitation impressed me very much. Thanks, Hamad.


I think this is a pretty good beginning. But in preparation for the test, I would like students to go even further and try to understand the relationship between the CT and the DT Fourier transforms. More precisely, given a CT signal and a discretization of this signal, "how do their respective Fourier transforms compare?" and "What should the DT Fourier transform look like if the discretization represents the CT signal well?". Should we organize another recitation on that topic?--Mboutin 08:11, 3 September 2009 (UTC)


Back to ECE438 course page

Alumni Liaison

has a message for current ECE438 students.

Sean Hu, ECE PhD 2009