Given the systems below, sketch the root locus: R(S) K C(s) s(s+2)(s+5)
Given the systems below, sketch the root locus: a. (35pts) R(S) C(s) K(+1) s(s+2)(s+5)
Theroot-locus design method (d) Gos)H(s)2) 5.5 Complex poles and zeros. For the systems with an open-loop transfer function given below, sketch the root locus plot. Find the asymptotes and their angles. the break-away or break-in points, the angle of arrival or departure for the complex poles and zeros, respectively, and the range of k for closed-loop stability 5 10ん k(s+21 (d) Gos)H(s)2) 5.5 Complex poles and zeros. For the systems with an open-loop transfer function given below, sketch the root...
sketch the root locus of the system whose open loop transfer function is given by C(s)/ R(s)=k/(s(s+4)(s2+s+1)+k)
sketch the root locus of the system whose open loop transfer function is given by C(s)/ R(s)=k/(s(s+4)(s2+s+1)+k)
for eqn 1+ K/(s^2(s+1)(s+5)) =0 a) draw real axis of root locus b) sketch asymptote for k to infinity c) sketch locus
B3. Sketch the root locus of the control system shown in the figure below K s(s? + 65 +25)
For the feedback configuration shown below compute all the parameters of the root locus and sketch it for each of the systems given. a) P(s) = 1/(s +1+3j)(s +1−3j) , C(s) = K(s +2)/(s +8) b) P(s) = (s +3+4j)(s +3−4j)/s(s +1+2j)(s +1−2j) , C(s) = K(1+3s) Problem 1 For the feedback configuration shown below compute all the parameters of the root locus and sketch it for each of the systems given C(s) C(s)-KY S +8 a) P(s)= (s +3+4j(s...
7. a) Sketch the root-locus Ris) C(s) diagram for the system S(5+) shown in figure when Ge=1. 6) Design phare- lead be compensator such that the system time constant is 0,25 see and != 0,45. Assume compensator at s=-4. Sketch the root-locus diagram of compensated system. c) Find the unit step responses of COMPENSATED and WN COMPENSATED systems and plot these responses. zero
Sketch the root-locus diagram for the closed-loop poles of the system 1+K 4. -0 with given s(s2 +3s+4) characteristic equations as K varies from 0 to infinity Sketch the root-locus diagram for the closed-loop poles of the system 1+K 4. -0 with given s(s2 +3s+4) characteristic equations as K varies from 0 to infinity
Problem #5 For the following system, K(s 3) (s2 +2)(s- 2)(s+5) R(s)+ C(s) (a) Sketch the root locus. (b) Find the range of K such that the system has only two right-half plane closed-loop poles