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Problem 5

An LTI system has unit impulse response $ h[n]=u[n]-u[n-2] $. Compute (a) the system's function $ H(z) $ and (b) the system's response to the input $ x[n]=\cos(\pi n) $.

Part A

First, note this is discrete time. Doing the problem in continuous time gives a very different result, as I tragically learned on the test...

$ H(z)=\sum_{k=-\infty}^{\infty}h[k]z^{-k} $

$ H(z)=1+\frac{1}{z} $ due to the two step functions.

Part B

First, recognize that $ \cos(\pi n)=(-1)^n $.


The response to the input signal $ z^n $ is $ H(z)z^n $, giving

$ (1+\frac{1}{-1})(-1)^n=0 $.

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