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As shown in (2), <math> (k+1)^2 </math> does not get shifted. Thus, a shift made in <math> X_{k}[n] </math> does not accordingly shift <math> Y_{k}[n] </math> <br><br><br>
 
As shown in (2), <math> (k+1)^2 </math> does not get shifted. Thus, a shift made in <math> X_{k}[n] </math> does not accordingly shift <math> Y_{k}[n] </math> <br><br><br>
 
== Part (b) ==
 
== Part (b) ==
First.... The question is unclear.<br><br>
+
<br><br>
<math> X_{k}[n] = 1/(n+2)^2*u[n] </math>
+
<math> X[n] = u[n] </math><br> This would yield the expected result. <br>
 +
Since the system is linear, the input u[n] would result in u[n-1] as d[n] resulted in d[n-1]

Latest revision as of 15:51, 11 September 2008

Part (a)

No. This system is not time-invariant. The general equation of the system is as follows.

$ X_{k}[n] = d[n-k] $

$ Y_{k}[n] = (k+1)^2 d[n-(k+1)] $

Shifting $ X_{k}[n] $ by a constant "a" yields $ X_{k}[n-a] $

Shifting $ Y_{k}[n] $ by a constant "a" yields $ Y_{k}[n-a] $

$ (1) X_{k}[n-a] = d[n-k-a] $

$ (2) Y_{k}[n-a] = (k+1)^2 d[n-(k+1)-a] $

As shown in (2), $ (k+1)^2 $ does not get shifted. Thus, a shift made in $ X_{k}[n] $ does not accordingly shift $ Y_{k}[n] $


Part (b)



$ X[n] = u[n] $
This would yield the expected result.
Since the system is linear, the input u[n] would result in u[n-1] as d[n] resulted in d[n-1]

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