i. For the transfer function s+2 T(S) - 2 +9 a. find the locations of the...
17. For each of the dynamical systems shown below (1) find the poles and the zeros (2) write an expression for the general form of the step response without solving for the inverse Laplace transform 20 c) G(s) +6S +144 d) G(s)- s +-9 e +10) (s + 5) 2
' 1. Review Question a) Name three applications for feedback control systems. b) Functionally, how do closed-loop systems differ from open-loop systems? c) Name the three major design criteria for control systems. d) Name the performance specification for first-order systems. e) Briefly describe how the zeros of the open-loop system affect the root locus and the transient response. What does the Routh-Hurwitz criterion tell us? f) 2. Given the electric network shown in Figure. a) Write the differential equation for...
4. For each of the transfer functions shown below, find the locations of the poles and zeros, plot them on the s-plane. State the nature of each response (overdamped, underdamped, etc). G(S) =515 G(s) = (s+2)(s+7) 5(s +5) G(s) = (s +15)(s +8) 15 G(S) = 52 +85 +121 G(6) 52716 G(s) = 187332
Spring 2017 Name: 1. (a) Find the transfer function, Go)- v,(s),(s), for the network shown (b) Find the shown below. e ramp response for the given system. (t1 fer function, G(S)-x (G)/F(S) of the translational mechanical system shown below x(t) f, 3. For each of transfer functions shown below, find the oestions of the potes ans Plot them on the 5-plane, Rnd then write an expression for de geterst form of me response without solving for the inverse Laplace tranform....
a continuous time causal LTI system has a transfer function: H(s)=(s+3)/(s^2 +3s +2) a) find the poles and zeros b) indicate the poles and the zeros on the s-plane indicate the region of convergence (ROC) c) write the differential equation of the system. d) determine the gain of the system at dc (ie the transfer function at w=0) e) is the system described by H(s) stable? explain f) for the system described by H(s), does the Fourier transform H(jw) exist?...
Question 1 For the circuit shown in figure 1; i. Find the transfer impedance function, H(s) = Vds(s) Find the poles and zeros for this transfer function and plot them on the s - Find the magnitude of the transfer function in decibels. [10] s-plane [8] ii [3] 2H 20 20 2 H Figure Question 2 The hybrid parameters (h-parameters) for the two -port network circuit in figure 2 are; 5 h=2 0.05 Find the equivalent impedance parameters (z-parameters) Find...
Problem 1: The impulse response ht) for a particular LTI system is shown below hit) Be5e (4 cos(3t)+ 6 sin(3t) e. u(t) 1. Plot the impulse response for h(t) directly from the above equation by creating a time vector 2. Use the residue function to determine the transfer function H(s). Determine the locations of the poles and zeros of H(s) with the roots function, and plot them in the s-plane (x for poles, o for zeros). Use the freas function...
1) Write a Matlab program for the following block diagram: a) to derive its closed-loop transfer function. b) to find and plot the poles-zeros of closed-loop transfer function. s+2s+3 R(s) → Y(s) 2s+3 2 +2s +5 15 Automatic Control Systen 1) Write a Matlab program for the following block diagram: a) to derive its closed-loop transfer function. b) to find and plot the poles-zeros of closed-loop transfer function. s+2s+3 R(s) → Y(s) 2s+3 2 +2s +5 15 Automatic Control Systen
Problem 2 110] Consider the following transfer function (5)10000s+ 1000 (s) 101, +100 i. Find the poles and zeros of the transfer function [5] ii. Draw the frequency response chart of the transfer function. Magnitude scale must be Problem 2 110] Consider the following transfer function (5)10000s+ 1000 (s) 101, +100 i. Find the poles and zeros of the transfer function [5] ii. Draw the frequency response chart of the transfer function. Magnitude scale must be
Given h(t)=(e-t+e-3t)u(t) find: A) The transfer function H(s). B) The locations of all poles and zeros. C) Determine if the system is stable or not D) Find the differential equation for this system.