Problem #2: Transform the following characteristic equations into the bilinear plane and use the Routh Array...
2. (30)Use Routh-Hurwitz criterion to determine the stability fo characteristic equations. a) (15) 2s6+4s5+2s4-s42s-2-0 b) (15) s3+2s2+s+2-0 2. (30)Use Routh-Hurwitz criterion to determine the stability fo characteristic equations. a) (15) 2s6+4s5+2s4-s42s-2-0 b) (15) s3+2s2+s+2-0
Problem # 1 . Topics: Bilinear Transform Assuming parameter k-1.2 and using the Bilinear Transform, map the following poles in the s-plane to the z-plane. Give z-plane. magnitude and angle for the corresponding poles in the S=-0.5 +0.5j → z=
Construct Routh array and determine the stability of the system whose characteristic equation is s6 +2s5 8s12s3 +20s2 +16s16 0. Also, determine the number of roots lying on right half of s-plane, left half of s-plane and on imaginary axis. 11) com
2. (30)Use Routh-Hurwitz criterion to determine the stability fo characteristic equations. a) (15) 2s6+4s5+2s4-s42s-2-0 b) (15) s3+2s2+s+2-0
1. For the characteristic polynomials given below: Construct a Routh array for each polynomial and determine the number of right-hand-plane and left-hand-plane poles as well as the number of poles on the imaginary axis. Comment on the stability. i. D(s)-1s5 +8s4 +29s3+61s2 +72s +45 ii. D(s) s+8s25s+37s2 +16s-15 ii. D(s)-+6s+18s'+60s+89s2+54s+72
2. (25 points) Consider the following characteristic equation: $4 +253 + (4 +K)s2 +95 + 25 = 0 Using the Routh stability criterion, determine the range of K for stability.
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...
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)
1. Use Routh criteria to determine the stability of G(s) $*+$3+25+1 2. Use Routh Criteria to determine the values of Kp and Ky such that the negative feedback CLTF is stable, R(S) 1 S3 + S2 + S + 1 X(s) Kp + KDS
NASC NESSARY & sufficient criterior Use the Routh - Hurwitz technique for the Derive the N.A.S.C. for a 5th order system with arbitrary coefficients {an.... a3 (n=5). Clearly state the conditions on the a.). - Assess the stability and state the N.A.S.C. for each system in #p6ol, page 405 (also shown on Canvas in Files Homewor. of the text. Note: This problem has parte "a)" through "g). [Routh- Hurwitz is optional for 3.] - For a system given as: y...