What is the effect of the delay operator Z^{-1} on a discrete-time signal x[n]?

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Multiple Choice

What is the effect of the delay operator Z^{-1} on a discrete-time signal x[n]?

Explanation:
The delay operator Z^{-1} shifts the signal forward in time by one sample. If you apply it to x[n], the result is y[n] = x[n−1], meaning each output sample is the previous input sample. In the Z-domain this is Y(z) = z^{-1} X(z), which is exactly the unit delay relationship. So the primary effect is a one-sample time delay. In frequency terms, delaying by one sample introduces a phase shift e^{-jω}, not a change in magnitude. The other options don’t match this behavior: advancing by one sample would give y[n] = x[n+1], and multiplying by z describes a different, transform-domain operation.

The delay operator Z^{-1} shifts the signal forward in time by one sample. If you apply it to x[n], the result is y[n] = x[n−1], meaning each output sample is the previous input sample. In the Z-domain this is Y(z) = z^{-1} X(z), which is exactly the unit delay relationship. So the primary effect is a one-sample time delay. In frequency terms, delaying by one sample introduces a phase shift e^{-jω}, not a change in magnitude. The other options don’t match this behavior: advancing by one sample would give y[n] = x[n+1], and multiplying by z describes a different, transform-domain operation.

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