84.1 LTI Discrete-Time Systems in the Transform domain difference equation and making use or the e Applying the z-transform to both sides of the linearity and the time-invariance properties we arrive at ∑dkz-(z)=∑ PkE X() k=0 k=0 where y(z and x(z denote the z-transforms of yIn and xn with associated ROCs, respectively
§4.1 LTI Discrete-Time Systems in the Transform Domain • Applying the z-transform to both sides of the difference equation and making use of the linearity and the time-invariance properties we arrive at d z Y(z) p z X(z) M k k k N k k k = − = − = 0 0 where Y(z) and X(z) denote the z-transforms of y[n] and x[n] with associated ROCs, respectively
84.1 LTI Discrete-Time Systems in the Transform domain A more convenient form of the z-domain representation of the difiference equation is given by ∑4k=-k|y(=)=∑pk=-kX() k=0 k=0
§4.1 LTI Discrete-Time Systems in the Transform Domain • A more convenient form of the z-domain representation of the difference equation is given by d z Y(z) p z X(z) M k k k N k k k = = − = − 0 0
§4.2 The Frequency Response Most discrete-time signals encountered in practice can be represented as a linear combination of a very large, maybe infinite number of sinusoidal discrete time signals of dififerent angular frequencies Thus, knowing the response of the lti system to a single sinusoidal signal, we can determine its response to more complicated signals by making use of the superposition property
