(S3)(s4) The response of the system is given by Y(s) s(s+2)(2s 1) Find the initial value of the system output.
Find the starting magnitude and phase of the transfer
function.
3.s GH(s) 2+5s
please explain show work!!!
thanks!
Q15 Given S. 1. dx. (a) Find S4. Find the Simpson's Approximation using n = 4. (b) Find Esl. (c) Find n such that|EST < .00001
For the given system (s+25) P(s) s(s+1)(s+3000) 1. Sketch, by hand, the Bode asymptote plots for phase and magnitude. Show all your work 2. Sketch by hand the Nyquist plot of the system 3. What is the system's upward, downward gain margins?
For the given system (s+25) P(s) s(s+1)(s+3000) 1. Sketch, by hand, the Bode asymptote plots for phase and magnitude. Show all your work 2. Sketch by hand the Nyquist plot of the system 3. What is the system's...
Given a system magnitude and phase frequency response below, and an input signal x(n) = cos(2*pi*n/3), find the output y(n) from the system. (25 pts) Magnitude Response Omega pi2 atomegapi Phase Response -pv2 at omega-pl omega
Ifz-I+),22-1-j, and 3=-2, calculate the magnitude and phase (in radians) of (a) zi (b) z2 (c) z3 (d) z1 +z (e) z z3 (f) z1z2 (g) t22 (h) 을 2. 21 23 21-23 Z1
Question 1. (15 pts) Given f(x,
y) = 3x 2 + y 3 . (a) Find the gradient of f. (b) Find the
directional derivative of f at P0 = (3, 2) in the direction of u =
(5/13)i + (12/13)j.
Question 1. (15 pts) Given f(L,y) = 3x2 +y?. (a) Find the gradient of f. (b) Find the directional derivative off at P =(3,2) in the direction of u=(5/13)i + (12/13)j.
Find general equations for the magnitude and phase angle of the transfer function below: (2+ jw) H(jw) = (1+j ) (7 +jw)
find
Consider the Transfer Function Shown Below: G(S) = (s +2) s(s + 3)(s + 5)2 a. Plot the magnitude and phase plots for each element of the above transfer function. (1 b. Plot the Bode magnitude and phase plots of the system in the given logarithmic paper. Use the plotted Bode plots to estimate the gain and phase margins of the system. (10 P d. Is the system stable or not? Explain why? (5 Pts) C.
5. Find extremals for the following functionals: (b) J(y) = S. (1 + (y")2) dx, y(0) = 0, y'(0) = 1, y(1) = 1, y(1) = 1.