(New page: Category:ECE301Spring2011Boutin Category:problem solving = Practice Question on Time Invariance of a System= The input x[n] and the output y[n] of a system are related by the equat...)
 
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===Answer 1===
 
===Answer 1===
Write it here.
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No, this system is time variant.
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<math>x[n] \to \Bigg[ time\ delay\ n_0 \Bigg] \to y[n]=x[n-n_0] \to \Bigg[ system \Bigg] \to z[n]=y[n-1]+y[1-n]=x[(n-1)-n_0]+x[(1-n)-n_0]</math>
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<math>x[n] \to \Bigg[ system \Bigg] \to y[n]=x[n-1]+x[1-n] \to \Bigg[ time\ delay\ n_0 \Bigg] \to z[n]=y[n-n_0]=x[(n-n_0)-1]+x[1-(n-n_0)]</math>
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<math>=x[n-1-n_0]+x[1-n+n_0]</math>
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The second term in the last equation has a factor of <math>+n_0</math>, so the two are not equal, therefore this system is time variant.
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--[[User:Cmcmican|Cmcmican]] 19:07, 26 January 2011 (UTC)
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===Answer 2===
 
===Answer 2===
 
Write it here.
 
Write it here.

Revision as of 14:07, 26 January 2011

Practice Question on Time Invariance of a System

The input x[n] and the output y[n] of a system are related by the equation

$ y[n]=x[n-1]+x[1-n]. $

Is the system time invariant (yes/no)? Justify your answer.


Share your answers below

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Answer 1

No, this system is time variant. $ x[n] \to \Bigg[ time\ delay\ n_0 \Bigg] \to y[n]=x[n-n_0] \to \Bigg[ system \Bigg] \to z[n]=y[n-1]+y[1-n]=x[(n-1)-n_0]+x[(1-n)-n_0] $

$ x[n] \to \Bigg[ system \Bigg] \to y[n]=x[n-1]+x[1-n] \to \Bigg[ time\ delay\ n_0 \Bigg] \to z[n]=y[n-n_0]=x[(n-n_0)-1]+x[1-(n-n_0)] $

$ =x[n-1-n_0]+x[1-n+n_0] $

The second term in the last equation has a factor of $ +n_0 $, so the two are not equal, therefore this system is time variant.

--Cmcmican 19:07, 26 January 2011 (UTC)

Answer 2

Write it here.

Answer 3

Write it here.


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