Difference between revisions of "Inverse Z transform" - Rhea

Revision as of 04:29, 23 September 2009

                                                  Inverse Z-transform

 $x[n] = \oint_C {X(Z)}{Z ^ (n-1)} , dZ \$ 
where C is a closed counterwise countour inside the ROC of the Z- transform and around the origin.

             $= \sum_{poles a_i} Residue ( X(Z) Z ^ (n-1)) \$

Revision as of 04:28, 23 September 2009 (view source) Ssaxena (Talk \| contribs) ← Older edit		Revision as of 04:29, 23 September 2009 (view source) Ssaxena (Talk \| contribs) Newer edit →
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	where C is a closed counterwise countour inside the ROC of the Z- transform and around the origin.		where C is a closed counterwise countour inside the ROC of the Z- transform and around the origin.

−	<math> = \sum_{poles a_i} ~~Residue_a_i~~ ( X(Z) Z ^ (n-1)) \ </math>	+	<math> = \sum_{poles a_i} Residue ( X(Z) Z ^ (n-1)) \ </math>