2 Question: According to the following Figure, what is the value of time response for the...
10 Question: If a first order system and its time response to a unit step are as shown below, the gain Kis: (2 Points) R(s) Y(s) + K G(s) А G(s) = H, A = 0.4 Enter your answer
7 Question: for the following block diagram find the value steady state value: 1) (2 Points) R(s) Y(s) K G(s) 고, H(s) G(s) = 52.85:8K = 10, R (s) is unit step function and H (s) = 2 Enter your answer
9 Question: If a first order system and its time response to a unit step are as shown below, the value of Ais : DS (2 points) R(s) Y(s) KG(s) А G(s) = K = 4 Enter your answer
Question three The figure below shows a unit step response of a second order system. From the graph of response find: 1- The rise timet, 2- The peak timet, 3- The maximum overshoot Mp 4- The damped natural frequency w 5. The transfer function. Hence find the damping ratio ζ and the natural frequency ah-Find also the transfer function of the system. r 4 02 15 25 35 45 Question Four For the control system shown in the figure below,...
12 Question: What is the time response for the following equations: 5 (2 Points) T (5) = ... R (s) is unit step function Enter your answer
help Consider the closed-loop system in Figure E5.19. where Gs)G 3s and H(s) -K (a) Determine the closed-loop transfer function T(s) Y(s)/R(s). (b) Determine the steady-state error of the closed-loop system response to a unit ramp input, R(s) 1/s (c) Select a value for Ka so that the steady-state error of the system response to a unit step input, R(s)1/s, is zero.
Problem 6 Model Parameters from the Transient Response The step input r(t) = Rous(t) (R(8) = Ro/s) is applied to a system whose block diagram model is given below in Figure 8.24. The corresponding step response measurement is shown in Figure 8.25. In the sten response measurement, note that peak time is to = - ( 1.96) and the peak value is ctp) = 2.2. The open-loop transfer function G(s) is of the form $(8 + a) where a and...
E. If you double the value of kp, what are the new closed-loop pole locations and [5 points] how much overshoot does the step response have? Hint: It is possible to determine the original value for kp. However, with the knowledge at this point, you can compute the pole locations without actually knowing kp (simply double the zero-order term in the denominator polyno- mial). Problem 2 You are confronted with a process that has the unknown transfer function G(s). It...
% We can couple the design of gain on the root locus with a % step-response simulation for the gain selected. We introduce the command % rlocus(G,K), which allows us to specify the range of gain, K, for plotting the root % locus. This command will help us smooth the usual root locus plot by equivalently % specifying more points via the argument, K. Notice that the first root locus % plotted without the argument K is not smooth. We...
Problem #9 Determine the values of K and k of the closed-loop system shown in Figure 9 so that the maximum overshot in unit step response is 25 % and the peak time is 2 sec. Assume that J= 1 Kg.m? R(3) - HQ C(s) Figure 9 Problem #10 The open-loop transfer function of a unity feedback system is sis +23 It is specified that the response of the system to step inpur should have a maximum overshoot of 10...