Calculate f*f
CLEAR SOLUTION PLEASEEE.... Thanks!
Calculate f*f CLEAR SOLUTION PLEASEEE.... Thanks! 5. Calcule f * f si f(n)-S 1 si -...
Use the equation 1 1x = Ž for 1x1 <1 1 - X n = 0 to expand the function in a power series with center c = 0. 1 f(x) 5 + x3 00 Σ n = 0 Determine the interval of convergence. (Enter your answer using interval otation.)
x[n] = { Consider the discrete sequence S (0.5)" 0<n<N-1 otherwise a) Determine the z-transform X(2)! b) Determine and plot the poles and zeros of X(2) when N = 8!
- Given the function f(x) = { 2, -1<x<i 10, otherwise find its Fourier sine transform g(a), such that f(x) g(a) sin oz da
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
Please show work! (1 point) Find the Laplace transform F(s) of f(t) { O, t<6 5 sin(at), 6<t<7 0, t> 7 F(8)
Please do by hand. Thanks in advance. 5. Let X1 and X2 have joint pdf f(x1, x2) = 4xı, for 0 < x < x2 < l; and 0 otherwise. Find the pdf of Y = X/X2. (Hint: First find the joint pdf of Y and Y2 = X1.)
Question #5 all parts thanks 5. Find the solution of the heat conduction problem for each initial condition given: 0<x <6, t> 0. (a) ux,0)-x)-4sin(x)-3sin(2x) +7sin(570:). (b) ux, 0)-x)-9t (c) In each of cases (a) and (b), find the limit of u(3,1) as t approaches oo. Are they different? Did you 45 expect them to be different?
Given the following piecewise function, evaluate f(-5). I < -4 f(x) = . 1-42 -3x (x² – 2 -4 < x < 0 0<x
Calculate where: and S is the cone portion along with the circular cap ,oriented with the normal vector in the direction of the negative y axis. Ils rot(F)as F = (x2 + 3 cos(x + 2?) + arctan(x² +1) + za?i + (z?yz + x cos(y + 2)e+93)j + (-12? + sin(z? + ln(z+1))e+P+1) = x² + x2,2 <r<6 x2 + x2 < 4, y = 2
A periodic signal f(t) is produced by periodically repeating the function alt) - S2t|t| for -1<t<1 g(t) = to otherwise over the time domain-00<t<0. Determine the Fourier series representation of f(t) in the following forms. A. f(t) = a, + acos(nw,t) + b sin(nw,t); na1 B. f(0) = { Chelmuese n -00