Section 6–8 / Lag-Lead Compensation 337The compensated system will have the open-loop transfer functionBecause of the cancellation of the (s+0.5)terms, the compensated system is a third-order system.
(Mathematically, this cancellation is exact, but practically such cancellation will not be exact be-
cause some approximations are usually involved in deriving the mathematical model of the sys-
tem and, as a result, the time constants are not precise.) The root-locus plot of the compensated
system is shown in Figure 6–56(a). An enlarged view of the root-locus plot near the origin is shown
in Figure 6–56(b). Because the angle contribution of the phase lag portion of the lag–lead
compensator is quite small, there is only a small change in the location of the dominant closed-
loop poles from the desired location, The characteristic equation for the com-
pensated system isorHence the new closed-loop poles are located atThe new damping ratio is z=0.491. Therefore the compensated system meets all the required per-
formance specifications. The third closed-loop pole of the compensated system is located at
Since this closed-loop pole is very close to the zero at the effect of this pole
on the response is small. (Note that, in general, if a pole and a zero lie close to each other on the
negative real axis near the origin, then such a pole-zero combination will yield a long tail of small
amplitude in the transient response.)s=-0.2078. s=-0.2,s=-2.4123;j4.2756=(s+2.4123+j4.2756)(s+2.4123-j4.2756)(s+0.2078)= 0s^3 +5.0325s^2 +25.1026s+5.008s(s+5.02)(s+0.01247)+25.04(s+0.2)= 0s=-2.5;j4.33.Gc(s)G(s)=25.04(s+0.2)
s(s+5.02)(s+0.01247)Root-Locus Plot of Compensated SystemImag Axis- 10 – 5 0 5 10
Real Axis
(a) - 2
2860410- 10
- 4
- 6
- 8
Root-Locus Plot of Compensated System near the OriginRealAxisImag Axis- 0.5 –0.4 –0.3 –0.2 –0.1 0
- 0.05
0.050.2- 0.15
- 0.25
0.1500.1- 0.1
0.25- 0.2
(b)Figure 6–56
(a) Root-locus plot of the compensated system; (b) root-locus plot near the origin.