Transform a univariate sequence:
Transform a multivariate sequence:
Compute a typical transform:
Plot the magnitude using
Plot3D,
ContourPlot, or
DensityPlot:
Plot the complex phase:
Generate conditions for the region of convergence:
Plot the region for
:
Evaluate the transform at a point:
Plot the spectrum:
The phase:
Plot both the spectrum and the plot phase using color:
Plot the spectrum in the complex plane using
ParametricPlot3D:
ZTransform will use several properties including linearity:
Shifts:
Multiplication by exponentials:
Multiplication by polynomials:
Conjugate:
ZTransform automatically threads over lists:
Equations:
Rules:
Discrete impulses:
Discrete unit steps:
Discrete ramps:
Polynomials result in rational transforms:
Factorial polynomials:
Exponential functions:
Exponential polynomials:
Factorial exponential polynomials:
Trigonometric functions:
Trigonometric, exponential and polynomial:
Combinations of the previous input will also generate rational transforms:
Different ways of expressing piecewise defined signals:
Rational functions:
Rational exponential functions:
Hypergeometric term sequences:
The
DiscreteRatio is rational for all hypergeometric term sequences:
Many functions give hypergeometric terms:
Any products are hypergeometric terms:
Transforms of hypergeometric terms:
Holonomic sequences:
A holonomic sequence is defined by a linear difference equation:
Many special function are holonomic sequences in their index:
Special sequences:
Multivariate transforms:
Linearity:
There are several relations to the
InverseZTransform:
Shifts:
Polynomial multiplication:
Exponential multiplication:
Differences and shifts:
Sums:
Integrals:
is given by 
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EXAMPLES
Basic Examples 
Scope 