The transfer function is H(s) = (1.2s+0.18)/(s³ + 0.74s² + 0.92s) and C(s) = (K(s+1))/ s

A) A disturbance input W(s) =W/s^k , where W is a constant, into the feedback
controller as shown below. We set R(s) = 0. What type of disturbance input W(s)(step, ramp, or parabola) can the
system reject (i.e., the steady-state error ess is a nonzero constant)? 
(B) Suppose you want to design the controller C(s) to produce a closed-loop response to a
reference step input that has no more than 30% maximum overshoot (Mp ≤ 0.30) and a peak time
of no more than 8 sec (tp ≤ 8). Given the specifications on Mp and tp , compute the constraints
on the damping ratio ζ and the damped natural frequency ω, assuming that the closed-loop system
is approximated as a 2nd-order underdamped system. Sketch the allowable regions in the
complex plane (the s-plane) that these constraints define, and shade in the regions where the poles
should not be placed.

Transcribed Image Text:

R(s) o C(s) W(s) H(s) - Y(s)