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Problem #6: Applying Routh's Criterion, assume you have a gain K that you can tune for...
Problem #4: Applying Routh's Criterion, use the following transfer function to compute the closed-loop system from applying a unity feedback. K(s +4) Gis)- NS D(s) (s+0.4s+4)(s+1)s + 0.5)] a) Find the range of K that makes the system stable? Show your work. You are free to use MATLAB to help with the computation to get to your end results.
Consider the plant P(s) = (s3)(s22s + 17) in a feedback loop with a gain K > 0. Sketch the root locus. By applying Routh's criterion to the system in Problem 1, find the range of K > 0 such that the system is asymptotically stable. Sketch the approximate Bode plot for the plant in Problem 1. (Please exaggerate the features so that it is clear if you have understood the procedure.) Sketch the Nyquist plot for the plant in...
2. Given a unity feedback system with open-loop transfer function s+40s-I) a) For K-1, derive the expressions for the real and imaginary parts of G(jo). b) What happen to the real and imaginary parts of G(jo) for ω 0 and for Are there values of ω that either the real or imaginary part goes to zero? If not, compute Gijo) for some ovalue, say,, or 2, to help you sketch the Polar plot of Gja). c) d) Use Matlab to...
please do part D only the matlab. thank you
3. Consider the following system s(s2 +4s 13) (a) Draw the root locus. b) Use Routh's criterion to find the range of the gain K for which the closed-loop system is stable. (continued on next page) (c) The range of K for which the system is stable can also be obtained by finding a point of the root locus that crosses the Imaginary axis. When you have an Im-axis crossing, the...
2:50 PM Sun May 12 89%- X 2012 Spring All Exams.pdf 5. (30 pts) A unity feedback system has the loop transfer function shown below. a) Draw the complete Nyquist HG(s)-plane plot for both small K and large K. Use the Nyquist Path which encloses the pole of HG(s) that is at the origin. No other path will be accepted. b) Determine whether the closed loop system is stable for both small K and large Argue in terms of the...
Problem 5: Suppose that you are to design a unity gain feedback controller for a first order plant. The plant and controller respectively take the form ,s+ p where K> 0, p. z are parameters to be specified. (a) Using root-locus methods, specify some p and z for which it is possible to make the closed-loop system strictly stable. Include a sketch of the closed-loop root locus, as well as the corresponding range of gains K for which the system...
Problem 4. For the following system determine the following: Refer to Lecture 7/16/19 | Geel K (s) - (5-6)(8 +2) H(s) 1 a) How many poles does G(S) = G(S)Gp(s)H(s) have? b) If K = 1 will the closed loop system be stable? Hint: Can do this with matlab with sys = tf([1],conv([1-6], [1 2])); closed_loop_sys = sys/(1+ sys); then use the function roots([1 ... ) on the coefficients of the denominator of closed_loop_sys c) Repeat part (b) for K=...
solve completely
Routh Stability Criterion, Steady State Tracking Performance, Feedforward Control, Simulation of DC Motors Problem 1: Consider the following control system: RIS) Y G() cs) Con traller Process The process transfer function is G(s) = Y(s) _ s* +3s' +30s2 + 30s + 200 s+6s s6s +200 U(s) 1.1. Are there any zeros of G(s) in RHP? How many? Use Routh table 1.2. Are there any poles of G(s) in RHP? How many? Use Routh table. Is G(s) stable?...
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Abdul-Rahim Taysir
Objective: is to test your understanding of the root locus sketch, and to see how MATLAB can help you Plot the root-locus for the following unity-feedback systems. You should apply the 10 Rules we dis- cussed in class; you should find breakaway/break-in points, angle of departures, asymptotes, jw-axis crossings, and range of K such that the system is stable. You should also verify your...
Can someone help me with problem 4? You dont need to find the
answers for problem 6. Just use the transfer function from problem
6 to do problem 4.
6. Given the unity feedback system with the forward transfer function KG)H(s + 2)(s + 10) a) b) c) d) e) Sketch the root locus Find the breakaway point Find the gain at the breakaway point If one of the poles of the closed-loop system is at s--11, find the other...