698 C H A P T E R 11: Introduction to the Design of Discrete Filters
FIGURE 11.31
(a) Cascade and (b) parallel realizations of IIR
filters.Hi(z) first- or second-order direct form II realizationx[n] H 1 (z) H 2 (z) ··· HN(z) y[n]···
x[n] + y[n]G 1 (z)G 2 (z)GM(z)Gi(z) first- or second-order direct form II realization
(b)(a)SolutionThe transfer functionH(z)is not proper rational, in either positive or negative powers ofz, and the
poles arez=−0.5 andz=0.4. Thus, the transfer function can be expanded asH(z)=A 1 +A 2
1 +0.5z−^1+
A 3
1 −0.4z−^1In this case we needA 1 because the numerator, in positive as well as in negative powers ofz, is of
the same order as the denominator. We then haveA 1 =H(z)|z= 0 =− 3A 2 =H(z)( 1 +0.5z−^1 )|z− (^1) =− 2 =− 1
A 3 =H(z)( 1 −0.4z−^1 )|z− (^1) =2.5= 7
Letting
H 1 (z)=
− 1
1 +0.5z−^1H 2 (z)=7
1 −0.4z−^1we obtain the parallel realization forH(z)shown in Figure 11.32. n