(Question 6a)
m (Question 6a)
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I'm assuming k is the variable representing any fo.
 
I'm assuming k is the variable representing any fo.
  
<math> X_k[n]=X_k[n] where X_k[n]=\delta[n-k] and Y_k[n]=(k+1)^2 \delta[n-(k+1)] \,</math>
+
<math> X_k[n]=X_k[n] \,</math> where <math> X_k[n]=\delta[n-k]
 +
 
 +
Y_k[n]=(k+1)^2 \delta[n-(k+1)] \,</math>
  
 
Under this assumption the following system cannot possibly be time invariant because of the <math>(k+1)^2</math> term.
 
Under this assumption the following system cannot possibly be time invariant because of the <math>(k+1)^2</math> term.

Revision as of 07:12, 11 September 2008

Question 6a

I'm assuming k is the variable representing any fo.

$ X_k[n]=X_k[n] \, $ where $ X_k[n]=\delta[n-k] Y_k[n]=(k+1)^2 \delta[n-(k+1)] \, $

Under this assumption the following system cannot possibly be time invariant because of the $ (k+1)^2 $ term.

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