(Periodic Signals Revisited)
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== Periodic Signals Revisited ==
 
== Periodic Signals Revisited ==
1.  By sampling at different frequencies the function <math>y=sin(x)\!</math> can appear as both periodic and non-periodic in DT.  For example:
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1.  By sampling at different frequencies the signal <math>y=sin(x)\!</math> can appear as both periodic and non-periodic in DT.  For example:
  
 
<math>y(x)=sin(x) \!</math> in CT
 
<math>y(x)=sin(x) \!</math> in CT
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The second graph has no integer value of N where y[n]=y[n+N], thus it is non-periodic.
 
The second graph has no integer value of N where y[n]=y[n+N], thus it is non-periodic.
 
The third graph clearly shows there is an integer value of N where y[n]=y[n+N], thus it is periodic.
 
The third graph clearly shows there is an integer value of N where y[n]=y[n+N], thus it is periodic.
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2.  By adding up several 10 unit cycles of the function <math>y(x)=x^2\!</math> we can turn a non-periodic signal into a periodic signal.
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[[Image:Xsquare_ECE301Fall2008mboutin.jpg]]
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[[Image:Xsquare2_ECE301Fall2008mboutin.jpg]]

Revision as of 18:28, 11 September 2008

Periodic Signals Revisited

1. By sampling at different frequencies the signal $ y=sin(x)\! $ can appear as both periodic and non-periodic in DT. For example:

$ y(x)=sin(x) \! $ in CT Sinwave ECE301Fall2008mboutin.jpg

$ y[n]=sin[n] \! $ with a sample rate of 1 Samprate1 ECE301Fall2008mboutin.jpg

$ y[n]=sin[n] \! $ with a sample rate of $ pi/4 \! $ Samprate2 ECE301Fall2008mboutin.jpg


The second graph has no integer value of N where y[n]=y[n+N], thus it is non-periodic. The third graph clearly shows there is an integer value of N where y[n]=y[n+N], thus it is periodic.



2. By adding up several 10 unit cycles of the function $ y(x)=x^2\! $ we can turn a non-periodic signal into a periodic signal.

Xsquare ECE301Fall2008mboutin.jpg Xsquare2 ECE301Fall2008mboutin.jpg

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