No. 5 (6 points) Consider a system equation s+s +5s3+s1+2s+10-0. (1) Using Routh Table to determine...
1. Use the Routh-Hurwitz test to determine if the system described by the following transfer function is stable. If the system is unstable, how many poles are outside the LHP? Use Matlab to check your answers. C() 10-8) R(s) s2 +7s +28 2. Repeat problem 1) above for the system with transfer function C (s) R(5s +Bs+ 40 s2 +2s+4 3. Use the Routh-Hurwitz test to determine if the system described by the following characteristic equation is stable. If the...
The open loop transfer function of a unity feedback system is 1. G(s)32 2s4 +5s3+s2 +2s Using Routh - Hurwitz criteria, (i) (ii) Determine the stability of the system. Find how many roots are lying in the left hand side and right hand side of the s-plane.
2. Applying the Routh-Hurwitz criterion can obtain the number of the roots of f (s) 0 with a positive real part. The Routh-Hurwitz criterion can also be applied to find that how many roots have a real part greater than -a. This principle is exercised in this problem Given a characteristic equation: f(s) 3 4s2 3s10 0 Eq(1) By substituting sı = s + α (i.e., s = sı-α) into Eq (1) and apply the Routh-Hurwitz criterion on f(s) 0,...
(20 pts) System Design Using Routh-Hurwitz Criterion: one of the reasons we learn Routh-Hurwitz Criterion is that it can help us select the system parameters to make the system stable. In this problem, we will go over this process. Considering a system with the following transfer function: 1. s +2 G(s) = s4 +5s3 2s2 +s + K 1.1 Work out the Routh-Hurwitz table. Note in this case, you will have the unknown parameter K in the table. 1.2 Based...
control systems
1) Using Routh Hurwitz Stability Criteria, determine whether the following system of equation is stable or not. a) S4+253+3S2+45+5=0 2) Using the Routh Hurwitz stability criterion, determine the range of K for stability of the following characteristic equation. a) s4+2s8+(4+K)s2+9s+25=0 3)Sketch the root-locus of the following systems a) G(s)H(s) = s(s+1)(s+2) b) G(s)H(s) = 52(8+3.6) K(5+1)
Enter your answer 13 ss 1 2 1.5 3 2 s -1/3 s1 10 2 The following figure shows the first column of a Routh table, How many roots of the corresponding characteristic equation are in left half s-plane?* (5 Points) Enter your answer
4) Using the Routh-Hurwitz Criterion, determine whether the following Polynomials are Stable or Unstable. Please Show Supporting Work: 1) H(s) = s? + 10s + 5 = 0 Stable Unstable 11) H(s) = s4 +53 + 5s2 + 20s + 10 = 0 Stable Unstable 111) H(s) = 83 + 4Ks2 + (5 + K)s + 10 = 0 The Range of K for a Stable System is: a. b. K > 0.46 K< 0.46 0<K <0.46 Unstable for all...
PROBLEM 1 Consider the transfer function T(S) =s5 +2s4 + 2s3 + 4s2 + s + 2 a) Using the Routh-Hurwitz method, determine whether the system is stable. If it is not stable, how many poles are in the right-half plane? b) Using MATLAB, compute the poles of T(s) and verify the result in part a) c) Plot the unit step response and discuss the results. (Report should include: Code, Figure 1.Unit step response, answers and conclusion)
PROBLEM 1 Consider...
Consider the system shown in Figure 1. Using the Routh-Hurwitz Criterion, determine the range of K for which the system is stable. R(s) Figure 1
Q2 (a) List down THREE (3) important requirements to design a control system. (3 marks) State the possible consequence when a physical system becomes unstable. (2 marks) (6) (c) Consider the following characteristic Equation shown below: P(s) = 55 +683 + 582 +8s + 20 (1) Construct Routh table for the characteristic Equation. (6 marks) (ii) Using the Routh – Hurwitz criterion, determine the stability of the system. (2 marks) (ii) Determine the numbers of roots on the right half-plane,...