x[n] = 9n u[n]
h[n] = -7n u[n]
Compute the convolution y[n]=x[n]∗h[n].
Choose the answer below which corresponds to {y[0],y[1],y[2],y[3]}
x[n] = 9n u[n] h[n] = -7n u[n] Compute the convolution y[n]=x[n]∗h[n]. Choose the answer below...
Compute the convolution x[n] *h[n] for x[n] and h[n] shown below. 1. x[n] = (5[n] – 8[n – 1]), h[n] = (0.5)”.[n] 2. x[n] = {1,1,1,1,1}, h[n] = {1, 2, 3} 3. x[n] = u[n – 10), h[n] = cos(n)u[n]
pls help solve with detail explanation 27'8'16'' Compute the convolution, y(n) = x(n) * h(n), for the following signals: u(n), h(n) = u(n) u(1 – n). (a) (y(n), n = 0,1,2,3 3 3 3 3 (b) (y(), = 0,1,2,3,4) = (1,334...) (c) (y(n), n = 0,1,2,3 1 3 3 3 3 A'8'16'32' (d) (y(n), n = 0,1,2,3,4) = (e) None of the above 1'8'16
2(a). Compute and plot the convolution of ytryh)x where h(t) t)-u(t-4), x(t)u(t)-u(t-1) and zero else b). Compute and plot the convolution y(n) h(n)*x (n) where h(n)-1, for 0Sns4, x(n) 1, n 0, 1 and zero else.
how to calculate the convolution Calculate the convolution of the following sequences: x[n] (n +1 )R, [n] and h = u [n-2] Answer: Note that the convolution of any sequence with u[n] is the sum of all the components (an integrator) 2. x[n]=仁1,-2-3-4) 1 vl n | =.xln|>k 11 | n | = 〈ー1, 2(00.-1,-3.-6.-10-10. Calculate the convolution of the following sequences: x[n] (n +1 )R, [n] and h = u [n-2] Answer: Note that the convolution of any sequence...
Consider the signal x[n] and the impulse response h[n] defined below: x[n] = u[n] − u[n − 49] h[n] = u[n] − u[n − 3]. Sketch y[n] = x[n] ∗ h[n] (the convolution of x[n] and h[n]). You must justify your answer by showing some intermediate calculations and/or sketches.
DT convolution: x[n] = u[n] h[n]=(1/2)n,n≥0
Use convolution sum to compute the convolution y[n] = t[n] *h[n]. Show each computation step; use the same notation seen on lecture note exam- ples with series summation and indexes. 4 6 2 + x[1] 4 h[n] 2 -1 2 15 6 72 2 -2 -2 -4 -4 -6 Attach File Browse My Computer Browse Content Collection
2.4. Compute and plot y[n] - x[n] * h[n], where x[n] - 0, otherwise 1. 4 sn s 15 0, otherwise h[n] = 2.6. Compute and plot the convolution y[n] - x[n] * h[n], where 2.1. Let x[n] = δ[n] + 2δ[n-1]-δ[n-3] and h[n] = 2δ[n + 1] + 2δ[n-l]. Compute and plot each of the following convolutions: (a) y [n] x[n] * h[n] (c) y3 [n] x[n] * h[n + 2]
5. Compute the convolution, x[i]*u[n], when x[n] = 2* cos(+7^ )([n – 1] -u[n–6)
Compute the convolution using the CONVOLUTIONAL SUM method Problem 2.19. Compute the convolution y(n) of the signals -3< < 1 (n) = Ja". 0 . Otherwise hin) = w Si, 0<n<4 0 otherwise where a is a given parameter.