Which one of the following closed-loop systems is stable and which one is unstable? (X) K(s)...
9. Plot the root locus for the following closed-loop control systems. K (s -1) (ST2)(S+4) and H(s) = 1 (a) Gle)s+2)(s (b) G(s) = K (s + 1) and H (s)-1 A formula you may need for calculating the break-in point N'(o)D(o)-N(σ)D'(o)-0
2. From the following Closed-Loop Transfer Function, find the range of Gain K that will cause the system to be stable (10 points), unstable (10 points), marginally stable (10 points), and explain why respectively Assume K>O.[Apply Routh-Hurwitz Criterion NOTE 1: You need to walk me through the solution by displaying the formula and each of the steps. NOTE 2: You should NOT assume values, unless otherwise specified by the problem.
Determine if the following systems are stable or unstable and find the range of K using the Routh-Hurwitz criterion
Consider the following closed-loop system, in which the plant model is P(s) = elave R()2-CO POTY() a) Assume C(s) = K. Determine the range of K for which the closed-loop system is stable via: (1.) the routh-hurwitz stability criteria, (ii.) the margin() command in Matlab, and (lii.) the rlocus command in Matlab. b) Assume a proportional controller of C(s) = K = 40, and a time delay T, located between the controller and plant. Determine the maximum T, value that...
Figure 1 shows a closed-loop control system in which G(S)=40/[ (S+2) (S+3)], and H(S)=1/(S+4) R(3) + E(S) Y() G(s) H(S) Figure 2 shows the Nyquist plot for the open-loop transfer function. Nywist Diagram Systems imag: 2.5606 FC-56 THVL AM On RAH System: sys Real: -0.187 Imag: 2.56e-05 Frequency: (rad/s): -5.16 Figure 2 shows the Nyquist plot for the open-loop transfer function. Nyulat Diagram 05 Systems imag: 250 os ghar Axle 5.10 05 System: sys Real: -0.187 Imag: 2.56e-05 Frequency: (rad/s):...
A2. (a) Explain how the open-loop polar plot can be used to assess closed-loop stability by applying Nyquist's stability criterion. Apply Nyquist's stability criterion to determine the stability condition for a closed-loop system that is unstable in the open-loop. [30%] = K (b) An unstable system has transfer function given by G(S) in which the gain K is S(S-2) positive. A derivative compensator H(s) = 0.5s + 1 is inserted in the negative feedback path to form a control loop....
Sketch the Bode plots for a stable three-pole amplifier with dc gain 10^5 whose poles have magnitudes 0.1 MHz, 1 MHz and 10 MHz. Find the gain margin and phase margin of the amplifier if it is connected in a feedback loop with (a) unity feedback factor; (b) feedback factor 5.623 x 10^-5; (c) closed-loop dc gain 50 dB. In each case indicate whether the closed-loop amplifier is stable or unstable. What is the minimum stable closed-loop dc gain of...
Q.3(a) Transfer function model of a plant is, G(s) The controller is Ge(s)-K, where K is a constant. Find the value of K such that steady-state error for unit ramp input is 0.1. Find the gain margin and the phase mar gin (6 marks) (b) What are the effects on gain margin, phase margin and steady-state error, if the gain K is increased? (3 marks (c) Can the closed loop be unstable if the controller of Q.3(a) is implemented digi...
Find a & b Figure 1 shows a closed-loop control system in which G(S)-40/1 (S+2) (S+3)], and H(S)-1/(S+4) Y(s) H(s) Figure 2 shows the Nyquist plot for the open-loop transfer function. System: sys Real: -0.187 Imag: 2.56e-05 Frequency: (rad/s): -5.16 Using the Nyquist criterion a) Find out the gain margin expressed in dB. Is the system stable or unstable? (25 points) b) What is the value of the gain expressed in dB that makes the system marginally stable? (25 points)
Figure 1 shows a closed-loop control system in which G(S)-40/1 (5+2) (5+3)], and H(S)-1/15+4) R(s) E(S) Y(5) G(s) H(s) Figure 2 shows the Nyquist plot for the open-loop transfer function. Systemsys Real: -0.187 Imag: 2.56e-05 Frequency: (rad/s): -5.16 Using the Nyquist criterion a) Find out the gain margin expressed in dB. Is the system stable or unstable? (25 points) b) What is the value of the gain expressed in dB that makes the system marginally stable?(25 points)