with one question only one part is allowed.
2. Given a continuous control system in the following figure, the plant G(o)d the controller C(s)-41.7(s...
-2IH yes, what is K ? 2. (25pts)Given a continuous control system in the following Sgure, the plant G)ad s( +2) the controller C(a) the controlleCla) 41.7 +441) s + 18.4 41.7(s +4.41) s 18.4 s(x +2) a). Sketch the Bode magnitude plots of the plant G(), the controller C(o), and the controlled plant G(o)C() What kind of controller C(a) is ? For a sampling period T, obtained the discretized controller in Z - transform by applying the Generalized Bilinear...
Please solve the question below: Required are the Bode Magnitude Plots for G(s), C(s) and G(s)C(s) AND the discretized controller in Z-transform (using Generalized Bilinear Transformation) AND Derive the Euler and Tustin discretization 2.Given a continuous control system in the following figure, the plant ()-+2) plant G(s)- and +2) the controller Ca-il.7(s +4.41) 8 + 18.4 41.7(s4.41) 18.4 4 s( 2) a). Sketch the Bode magnitude plots of the plant G(s), the controller C(s), and the controlled plant G(s)C( b)....
6 and controller C(s), as shown in the Consider a unity-feedback control system with plant G(s)- following figure. Reference Error Controller Plant r(t) e(t) u(t) y(t) C(s) G(s) [5] (a) Determine the poles, zeros, order, type, relative degree, and de gain of the plant G(s) and show [5] (b) Can a P controller C(s)Kp stabilize the plant G(s)? If so, find the values of Kp that are [4] (c) Show using the Final Value Theorem that the system with the...
Consider a unity-feedback control system with a PI controller Gpr(s) and a plant G(s) in cascade. In particular, the plant transfer function is given as 2. G(s) = s+4, and the PI controller transfer function is of the forrm KI p and Ki are the proportional and integral controller gains, respectively where K Design numerical values for Kp and Ki such that the closed-loop control system has a step- response settling time T, 0.5 seconds with a damping ratio of...
PROBLEM 4 A unity feedback closed loop control system is displayed in Figure 4 (a) Assume that the controller is given by G (s)-2. Based on the lsim function of MATLAB, calculate and obtain the graph of the response for 0,(1)-a. Here a ; 0.5%, Find the height error after 10 seconds, (b) In order to reduce the steady-state error, substitute G. (s) with the following controller: K2 This is a Proportional-Integral (PI) controller. Repeat part (a) in the presence...
7.16C). Given the control system shown in Figure P7.16 where the plant transfer function G(o) is given by 2.0 design a PID controller for this system. Cis) R(s) 2.0 sis+ 1)(s+3) Plant PID controller FIGURE P7.16 7.16C). Given the control system shown in Figure P7.16 where the plant transfer function G(o) is given by 2.0 design a PID controller for this system. Cis) R(s) 2.0 sis+ 1)(s+3) Plant PID controller FIGURE P7.16
QUICK UPVOTE: As a control system engineer you have been asked to design a controller that would improve the error and the transient response for the unity feedback system below. The proposed solution must be cost-effective, so consider a passive network-based compensator. The transient response of the closed-loop transfer function to a ramp input has a 30% overshoot (%OS = 30) and a settling time Ts= 2.73 seconds. You need to decrease the peak time by a factor of 2,...
For the closed-loop system shown, and given +3.57s+3 Sref 2out G(s) C(s) control plant Part A-Controller Design Find the proportional gain (ie C(s) Kp)that would result in a rise time of t0.43 s 4.9 Previous Answers Request Answer Submit Incorrect, Try Again
Question 6 The open-loop transfer function G(s) of a control system is given as G(8)- s(s+2)(s +5) A proportional controller is used to control the system as shown in Figure 6 below: Y(s) R(s) + G(s) Figure 6: A control system with a proportional controller a) Assume Hp(s) is a proportional controller with the transfer function H,(s) kp. Determine, using the Routh-Hurwitz Stability Criterion, the value of kp for which the closed-loop system in Figure 6 is marginally stable. (6...
PROBLEMA: (25%) A closed-loop control system is shown below Ds) T(O) U(A) C(s) (a) Show that a proportional controller (C(s)-kp) will never make the closed-loop system stable. (8%) (Hint: you need to calculate the closed-loop pole locations and make discussion for the two possible cases.) (Medim) (b) When a PD controller is used (C(s)kp+ kps), calculate the steady state tracking error when both R(s) and D(s) are unit steps. (8%) (Easy) (e) Suppose R(s) is a unit step and D(s)...