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.
f(t)=(9t+20t2)2(7-20)t H(t) Find the Fourier transform of: . Your answer should be expressed as a function of w using the correct syntax Fourier transform is F(w)Skipped f(t)=(9t+20t2)2(7-20)t H(t) Find the Fourier transform of: . Your answer should be expressed as a function of w using the correct syntax Fourier transform is F(w)Skipped
(8) The velocity of a car is given by v(t) = -9t- + 16t -9. Dodo bno (a) (8pts) Find the acceleration function.in (b) (8pts) Find the position function s(t) if the initial position is s(0) = 0.
12.Find all the zeros of the polynomial function h(x) = 2x* - 9x + 16x2 - 27x + 30 a) List all possible rational zeros. b) Use synthetic division to show that is a zero of the given function. c) Find the remaining zeros.
POLYNOMIAL AND RATIONAL FUNCTIONS Using the rational zeros theorem to find all zeros of a po The function below has at least one rational zero. Use this fact to find all zeros of the function. h(x)10x3 33x28x3 If there is more than one zero, separate them with commas. Write exact values, not c Explanation Check 8 POLYNOMIAL AND RATIONAL FUNCTIONS Using the rational zeros theorem to find all zeros of a po The function below has at least one rational...
Find the arc length Lof x = f(t) = 9t + 14 y = g(t) = Si Vu – 81du where 0 < t < 16 =
Find all the zeros of the function and write the polynomial as a product of the linear factors b) Find all the zeros of the function and write the polynomial as a product of linear factors f(x) = x+ + 2x3 – x2 + 4x - 6 List all possible rational zeros. 1) Use the synthetic division to find rational zeros. remaining zeros of f(x). H HO iv) Complete the linear factorization of the function f(x).
Consider f(t) = cos(9t), g(t) = et. Proceed as in this example and find the convolution f ∗ g of the given functions.
9-8 Find the Laplace transform of f(t)=54cos(100 3sin(10t)] u(t). Locate the poles and zeros of F(s).
1 (1 point) Find the Laplace Transform of the following functions: f(t) = 2e-9t + 7++ 4t+3 F(s) = f(t) = 2e9t sin(7t) + 4ť + 3et F(s) = -9t f(t) = 2te-94 sin(7t) F(s) = Note that there is a table of Laplace transforms in Appendix C, page 1271 thru 1273 of the book.