Determine the convolution y[n] = h[n]*x[n] of the following signals:
Determine the convolution y[n] = h[n]*x[n] of the following signals:
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
8) Convolution Integral (7 points). Given the following signals x(t) and h(t), compute and plot the convolution y(t) = x(t) *h(t). x(t) = u(t+2) - u(t – 4) h(t) = 5u(t)e-2t
For x(n) = {1,2,3} and h(n) = (1,1), find the linear convolution y(n) =x(n)*h(n) using DFT and inverse DFT. Use the following formula.
Determine the output y(t) for the following pairs of input signals x(t) and impulse responses h(t) USING CONVOLUTION THEOREM ONLY: iv) x(t) = exp(2t)u(−t), h(t) = exp(−3t)u(t);
Circular vs. Linear ConvolutionConsider sequences(x[0], x[1], x[2], x[3], x[4], x[5], x[6], x[7])=(1,1,1,1,0,0,0,0)and(h[0], h[1], h[2], h[3], h[4], h[5], h[6], h[7])=(1,2,3,4,3,2,1,0)where x[n]=0 for n ∉\{0, …, 7\} and h[n]=0 for n ∉\{0, ..., 7\}.(a) Find the convolution of these two signals, and sketch the result.(b) Find the 8-point circular convolution of these two signals, and sketch the result.(c) Assume that each of the signals has been zero padded up to a length 16. Find the 16 -point circular convolution of these two...
signal and systems 9. Consider the convolution of two of the following signals : | att) ht) le(n) 力。 2.5 1015年9 L. -3-2-10 2-1012 (5 points cach). a. Determine the convolution of act) and (t) : x(t)= a(t) * b(t). b. Determine the convolution of c(n) and dén): y(n)= e(n) * dín). c. Give the MATLAB code for the convolution of e(n) and dín).
Let x[n] and y[n] be periodic signals with common period N, and let z[n] = { x[r]y[n – r) r=<N> be their period convolution. Let z[n] = sin(7") and y[n] = { . 0 <n<3 4 <n <7 Asns? be two signals that are periodic with period 8. Find the Fourier series representation for the periodic convolution of these signals.
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]}
By using convolution theorem, not laplace. !!!!!!! Determine the output y(t) for the following pairs of input signals x(t) and impulse responses h(t): (i) x(t)=u(t), h(t)=u(t): (iii) x(1) 11(1) _ 211(-1) + 11( -2), h(1) 11( 1) _ 11(-1);
Calculate the convolution integral of the following signals. Find the energy and power of the input and output signals. x(t) y(t) x(t) = cos(it)[u(t + 1) – uſt – 3)] h(t) = u(t + 2) – uſt – 1) del mes h(t) de ser LTI System