(a) Find the boundary and region in the kp – ki parameter space where phase margin PM > 50o . (20 pts) (b) Find the boundary and region in the kp – ki parameter space where gain margin GM > 3. (20 pts) (c) Obtain intersections of PM a

Question 1 (60%)

Consider a unity feedback control system with the time delayed plant

G(s) = 4/(S^2+2S+4) e^-0.1s

and the PI controller

C(s) = kp+ ki/s

.

(a) Find the boundary and region in the kp – ki parameter space where phase margin

PM > 50o

. (20 pts)

(b) Find the boundary and region in the kp – ki parameter space where gain margin

GM > 3. (20 pts)

(c) Obtain intersections of PM and GM bounds. Select a test point that satisfies both

requirements and show frequency domain properties (PM and GM) of the closed-loop

system for this selected point. (20 pts)

(Hint: Plot kp and ki values from 0 to 2 in order to easily visualize regions in the parameter

space).

Question 2 (20%)

Consider a sensitivity weighting function WS(s) with the following properties:

– The maximum steady state error is limited to 0.1.

– The high frequency disturbance amplification is limited to 1.6.

– The minimum transition frequency is 10 rad/sec.

Obtain frequency magnitude plot of W-1

S

(s). Show the required properties on the plot.

Question 3 (20%)

Consider a complementary sensitivity weighting function WT (s) with the following properties:

– The unstructured model error is assumed to be smaller than 5% for frequencies ? 20

rad/sec.

– It is assumed that the unstructured model error does not exceed 180% for frequencies

? 20 rad/sec.

Obtain frequency magnitude plot of WT (s) and show the required properties on the plot.

Also, plot frequency magnitude plot for WT (s)?m(s) and show the scaling effect of WT (s)

on unstructured uncertainty ?m

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