(New page: Going through the system first and then the time shift: x[n] -> y[n] = (k + 1)^2x[n-(k+1)] y[n] -> z[n] = y[n-1] = (k+1)^2x[n-1-(k+1)] Going through the time shift first and then th...)
 
 
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== A ==
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Going through the system first and then the time shift:
 
Going through the system first and then the time shift:
  
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Since the two results are the same, the system is time invariant.
 
Since the two results are the same, the system is time invariant.
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== B ==
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The input would have to be u[n]

Latest revision as of 13:44, 12 September 2008

A

Going through the system first and then the time shift:

x[n] -> y[n] = (k + 1)^2x[n-(k+1)]

y[n] -> z[n] = y[n-1]

 = (k+1)^2x[n-1-(k+1)]


Going through the time shift first and then the system:

x[n] -> y[n] = x[n-1]

y[n] -> z[n] = (k+1)^2y[n-(k+1)]

 = (k+1)^2x[n-1-(k+1)]

Since the two results are the same, the system is time invariant.


B

The input would have to be u[n]

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