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Given x(t) find X(f)
 
Given x(t) find X(f)
  
<math>x_(t) \,\!= \cos(\frac{\pi}{2})rect(\frac{t}{2}) \quad (1)</math>  
+
<math>x(t) \,\!= \cos(\frac{\pi t}{2})rect(\frac{t}{2}) \quad (1)</math>  
  
 
Using the convolution property
 
Using the convolution property
  
<math>X_(f) =  \mathcal{F} (cos(\frac{\pi t}{2}))* \mathcal{F}(rect(\frac{t}{2}))</math>
+
<math>X(f) =  \mathcal{F} (cos(\frac{\pi t}{2}))* \mathcal{F}(rect(\frac{t}{2}))</math>
  
 
where
 
where
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substituting the known transforms into <math>\quad (1)</math>
 
substituting the known transforms into <math>\quad (1)</math>
  
<math>X_(f) = \frac{1}{2} [\delta(f - \frac{1}{4}) + \delta(f + \frac{1}{4})] *  2 sinc( 2 f) </math>
+
<math>X(f) = \frac{1}{2} [\delta(f - \frac{1}{4}) + \delta(f + \frac{1}{4})] *  2 sinc( 2 f) </math>
  
 
Evaluating the statement ( using sifting )
 
Evaluating the statement ( using sifting )
  
<math>X_(f) =  sinc(2 (f - \frac{1}{4}) + sinc( 2(f+\frac{1}{4}))</math>
+
<math>X(f) =  sinc(2 (f - \frac{1}{4})) + sinc( 2(f+\frac{1}{4}))</math>
  
 
*<span style="color:red"> Nice and clean justification. Does anybody see a mistake?</span> --[[User:Mboutin|Mboutin]] 16:40, 9 February 2009 (UTC)
 
*<span style="color:red"> Nice and clean justification. Does anybody see a mistake?</span> --[[User:Mboutin|Mboutin]] 16:40, 9 February 2009 (UTC)
 +
 +
 +
*<span style="color:black"> Was it the missing t in equation (1)?</span>--[[User:Mlo|Mlo]] 23:11, 9 February 2009 (UTC)

Latest revision as of 18:21, 10 February 2009

1a/

Given x(t) find X(f)

$ x(t) \,\!= \cos(\frac{\pi t}{2})rect(\frac{t}{2}) \quad (1) $

Using the convolution property

$ X(f) = \mathcal{F} (cos(\frac{\pi t}{2}))* \mathcal{F}(rect(\frac{t}{2})) $

where

$ \mathcal{F} (cos(\frac{\pi t}{2})) = \frac{1}{2} [\delta(f - \frac{1}{4}) + \delta(f + \frac{1}{4})] $

and

$ \mathcal{F}(rect(\frac{t}{2})) = 2 sinc( 2 f) $

substituting the known transforms into $ \quad (1) $

$ X(f) = \frac{1}{2} [\delta(f - \frac{1}{4}) + \delta(f + \frac{1}{4})] * 2 sinc( 2 f) $

Evaluating the statement ( using sifting )

$ X(f) = sinc(2 (f - \frac{1}{4})) + sinc( 2(f+\frac{1}{4})) $

  • Nice and clean justification. Does anybody see a mistake? --Mboutin 16:40, 9 February 2009 (UTC)


  • Was it the missing t in equation (1)?--Mlo 23:11, 9 February 2009 (UTC)

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