Z transform convergence

1. What is convergence in z-transform?
2. What will be the ROC of z-transform?
3. What is z-transform and its properties?

What is convergence in z-transform?

The region of convergence, known as the ROC, is important to understand because it defines the region where the z-transform exists. The z-transform of a sequence is defined as. X(z)=∞∑n=−∞x[n]z−n. The ROC for a given x[n], is defined as the range of z for which the z-transform converges.

What will be the ROC of z-transform?

The ROC of the Z-transform is a ring or disc in the z-plane centred at the origin. The ROC of the Z-transform cannot contain any poles. The ROC of Z-transform of an LTI stable system contains the unit circle.

What is z-transform and its properties?

Properties of ROC of Z-Transforms

If x(n) is a finite duration causal sequence or right sided sequence, then the ROC is entire z-plane except at z = 0. If x(n) is a finite duration anti-causal sequence or left sided sequence, then the ROC is entire z-plane except at z = ∞.