Line 4: Line 4:
 
  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 ( X(Z) Z ^ (n-1)) \ </math>
+
             <math> = \sum_{poles  a_i} ( X(Z) Z ^ (n-1)) Residue ( X(Z) Z ^ (n-1)) \ </math>
 +
            <math> = \sum_{poles  a_i}</math>

Revision as of 04:30, 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} ( X(Z) Z ^ (n-1))  Residue ( X(Z) Z ^ (n-1)) \  $
            $  = \sum_{poles  a_i} $

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