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Linearity and Time Variance

From the given equation:

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

It is clear that this is a non-time-invariant, or more simply, a time variant function because the amplitude changing $ (k+1)^2 $ term.

The inputs to this system are all shifted $ \delta $ functions, this means that if the $ X[n] $ inputs were changed to unit step functions $ u[n] $ , then the output will be a time shifted step function.

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Abstract algebra continues the conceptual developments of linear algebra, on an even grander scale.

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