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The Concept Map you are trying to access has information related to:
FIR z-Transform applied to Impulse Response, Frequency Response w-to-z transform by substituting e^(jw) = z, FIR z-Transform has Poles at Origin, FIR z-Transform has Zeros, Linear-Phase Systems has Symmetric Coefficients, Linear-Phase Systems has Zeros in Quadruples (zo,1/zo, zo*,1/zo*), Higher Order Systems into Cascaded Systems, Poles at Origin push up Frequency Response, FIR z-Transform has properties of Introducing Time Delay [multiply by z^(-no)], FIR z-Transform has properties of Linearity, Frequency Response z-to-w transform evaluating System Function on Unit Circle, Impulse Response generates System Function, Convolution into Multiplication, FIR z-Transform converts Convolution, FIR z-Transform converts Cascaded Systems, FIR z-Transform converts Higher Order Systems, FIR z-Transform converts Finite Length Sequence, FIR z-Transform of Linear-Phase Systems, Zeros on Unit Circle correspond to Frequencies at which Gain is zero, Finite Length Sequence into Polynomial in the Variable z^(-1), Zeros pull down Frequency Response, Cascaded Systems into Product of Individual System Functions