Parallel, Real, Second-Order Sections

Figure 3.21 shows the impulse response of the real two-pole section

$\displaystyle H^r_2(z) \isdef H_2(z) + H_3(z) = \frac{0.3788 -0.2413z^{-1}}{1 - 1.4562z^{-1}+ 0.8100z^{-2}},$

and Fig.3.22 shows its frequency response. The frequency axis unnecessarily extends all the way to the sampling rate (

**Figure 3.21:** Impulse response of real two-pole section of the real partial-fraction-expansion of the example filter.
$\includegraphics[width=\twidth]{eps/arir2}$

**Figure 3.22:** Frequency response of real two-pole section .
$\includegraphics[width=\twidth]{eps/arfr2}$

Finally, Fig.3.23 gives the impulse response of the real two-pole section

$\displaystyle H^r_3(z) \isdef H_4(z) + H_5(z) = \frac{0.4555 + 0.0922z^{-1}}{1 + 0.5562z^{-1}+ 0.8100z^{-2}},$

and Fig.3.24 its frequency response.

**Figure 3.23:** Impulse response of real two-pole section of the real partial-fraction-expansion of the example filter.
$\includegraphics[width=\twidth]{eps/arir3}$

**Figure 3.24:** Frequency response of real two-pole section .
$\includegraphics[width=\twidth]{eps/arfr3}$