(Properties of the region of convergence for Z-transform)
(Properties of the region of convergence for Z-transform)
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Property 2: The ROC does not contain any poles.
 
Property 2: The ROC does not contain any poles.
  
Property 3: If x[n] is of finite duration then the ROC is the entire z-plane except possibly z=0 and z=<math> \_inf </math>
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Property 3: If x[n] is of finite duration then the ROC is the entire z-plane except possibly z=0 and z=<math> \infty </math>
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Property 4: If x[n] is a right sided sequence and if the cirlce  |z| = ro is in the ROC then all finite values of z for which |z| >ro will also be in the ROC.
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Property 5: If x[n] is a left sided

Revision as of 15:00, 30 November 2008

Properties of the region of convergence for Z-transform

A number of properties are listed in the oppenheim willsky textbook. These properties state the insights of the z-transforms region of convergence.

Property 1: The ROC of X(z) consists of a ring in the z-plane centered about the origin.

Property 2: The ROC does not contain any poles.

Property 3: If x[n] is of finite duration then the ROC is the entire z-plane except possibly z=0 and z=$ \infty $

Property 4: If x[n] is a right sided sequence and if the cirlce |z| = ro is in the ROC then all finite values of z for which |z| >ro will also be in the ROC.

Property 5: If x[n] is a left sided

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