T(S) 0.04 S2 + 0.02s + 0.04 The %OS for the system above is approximately ...... the correct answer is not listed 45% 85% 28%
An engineer has to find the percentage overshot, %OS for a feedback system described by T(s) = 14.65 (32 + 0.842s + 2.93)(s + 5) He decides to apply a second order estimation and finds that %OS is approximately 45%. Is this correct? Explain.
An engineer has to find the percentage overshot, %OS for a feedback system described by 14.65 T(s) = (52 +0.842s + 2.93)(s + 5) He decides to apply a second order estimation and finds that %OS is approximately 45%. Is this correct? Explain. Format Β Ι Ο A </ EQ
Question 3 Find the transfer function, G(s) s) / T(s), for the rotational mechanical system in Fig. Q3 below. The gears have inertia and bearing friction as shown. (20 marks) 3 Nm/rad 2 Nms/rad + 1 kg/m? N3 = 100 N2 = 100 T(t) N4 = 20 N = 20 0.04 Nms/rad Fig. Q3
Problem 2: Find the state space representation in phase-variable form for the following system: (52+ s+8) T(s) (s +2)(s25s +1) 1
Find the charge on the capacitor in an LRC-series circuit at t = 0.04 s when L = 0.05 h, R = 3 Ω, C = 0.02 f, E(t) = 0 V, q(0) = 7 C, and i(0) = 0 A. (Round your answer to four decimal places.) C Determine the first time at which the charge on the capacitor is equal to zero. (Round your answer to four decimal places.) s
for the range of os os 180 find the locations of equilibrium of the system and mention in equilibrium is stable, Unstable neutral each case whether the OY 1:59 figol: Two uniform rods of mass m and length, e are attached 20 to gears
2. Nise (9.3) For a unity feedback system with 10% OS: KG(s) Ts)- 1+ KGS) G(s) (s +2)(s +3) (s +7) NOTE: the 10% overshoot line is 126.16" with a 7-59. a. Find the K value of the system at 10% OS if this corresponds to a point on the root locus of s-1.87+j2.56 NOTE: use the fact that 1 + KG(6) -0 at all points on the root locus,so K -() convert your G(s) to a exponential magnitude to...
show all math Question 3 For the following first order system, G(S) = (0.02s + 1) 1- Find the time constant 2- Find the settling time 3- Find the rise time
Find the charge on the capacitor in an LRC-series circuit at t = 0.04 s when L = 0.05 h, R = 2 Ω, C = 0.04 f, E(t) = 0 V, q(0) = 6 C, and i(0) = 0 A. (Round your answer to four decimal places.) C Determine the first time at which the charge on the capacitor is equal to zero. (Round your answer to four decimal places.) s