Howtosignalprocessing
What is ROC in 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 is ROC in z-transform?
Region of convergence. The region of convergence (ROC) is the set of points in the complex plane for which the Z-transform summation converges.
What is ROC in Laplace?
Region of Convergence (ROC) is defined as the set of points in s-plane for which the Laplace transform of a function x(t) converges. In other words, the range of Re(s) (i.e.,σ) for which the function X(s) converges is called the region of convergence.
