Clearly, the denominator of the closed-loop transfer function is a product of two lightly damped
second-order terms (the damping ratios are 0.243 and 0.102), and the two resonant frequencies are
sufficiently separated.A–7–24. Consider the system shown in Figure 7–144(a). Design a compensator such that the closed-loop
system will satisfy the requirements that the static velocity error constant=20sec–1,phase
margin=50°, and gain marginG10 dB.
Solution.To satisfy the requirements, we shall try a lead compensator Gc(s)of the form(If the lead compensator does not work, then we need to employ a compensator of different
form.) The compensated system is shown in Figure 7–144(b).
DefinewhereK=Kca. The first step in the design is to adjust the gain Kto meet the steady-state per-
formance specification or to provide the required static velocity error constant. Since the static ve-
locity error constant Kvis given as 20 sec–1, we haveor
K=2With K=2,the compensated system will satisfy the steady-state requirement.
We shall next plot the Bode diagram ofG 1 (s)=20
s(s+1)=10K= 20
=limsS 0s10K
s(s+1)=limsS 0 sTs+ 1
aTs+ 1G 1 (s)Kv=limsS 0 sGc(s)G(s)G 1 (s)=KG(s)=10K
s(s+1)=Kcs+1
T
s+1
aTGc(s)=Kc aTs+ 1
aTs+ 1548 Chapter 7 / Control Systems Analysis and Design by the Frequency-Response MethodGc(s)G(s) G(s)10
s(s+ 1)(b)10
s(s+ 1)(a)+– +–Figure 7–144
(a) Control system;
(b) compensated
system.Openmirrors.com