Using Table 2.1 Convolve the following X(t) = 15e-3tu(t) h(t) = u(t) + 3e-9tu(t)
use Fourier Transforms to convolve f(t) = e-2t u(t-2) and h (t) = e-4t u(t-3). Check your answer by performing the time-domain convolution.
use Fourier Transforms to convolve f(t) = e-2t u(t-2) and h (t) = e-4t u(t-3). Check your answer by performing the time-domain convolution.
Problem 4. Convolve the following input X(t) with the system impulse response h(t) and plot the system output y(t). h(t) Problem 5. Construct a Bode plot of the input impedance DMM 100nF zin - 300F CM 500 ohms
1. Solve the following for y(oO-xOho 2. Convolve the following (t) x(t) b) ふ(t) c) e 3 t xlt) 融) a) 3. Find the response of a system to an input of x()-2u(t-10) if h(t)-sin(2t)u(t).
this problems in signals...
For each of the following five cases, convolve (t) and ht). Attempt ai(t) problem hi(t) as your pre- x, t h, t) 녜
For each of the following five cases, convolve (t) and ht). Attempt ai(t) problem hi(t) as your pre- x, t h, t) 녜
Convolve the following functions
»i)(3pts)x(n) (i) u(n) and hn) -(G)u(n) »ii) (4pts)x(n) -(G) u(n -3) and h(n) - ()u(n-5) xiv) (Spts)x(n) -u(n) and h(n) -(u(n- 1)-() u(n-3)(Note that u(n), is unit step function, this is step response). xv)(Spts)x(n)- () u(n) and hn) -(G)un-1)-(j) u(n-3) xvi) (Spts)xn) G)u(n - 4) and hn) -(u(n-4)
Prove the following: Using Convolution, determine y(t) when x(t) = 4u(t) and h(t) = e-2t u(t) for t > 0 answer: y(t) = 2[1-e-2t]
1. Let x(t)-u(t-1) _ u(t-3) + δ(t-2) and h(t)-u(t) _ u(t-1) + u(t-3)-u(t-5) a. Find and sketch x(t-t) and h(t). (Hint: Break x(t) into two signals) b. Find and sketch y(t) - x(t)*h(t) using the quasi-graphical method. Label and show every step (drawings and calculations)
Prob. 5 (a) Let x(t) = u(t) and h(t) = e-looor u(t) + e-lotu(t). -00 <t< oo using graphical convolution(s). Determine y(t) = h(t) * x(t) for Prob. 5 (cont.) (b) Let zln] = uln] and h[n]-G)nuln] + (-))' hnnDetermine vinl -h) rin) for -00n< oo using graphical convolution(s)
Prob. 5 (a) Let x(t) = u(t) and h(t) = e-looor u(t) + e-lotu(t). -00
8. (a) Find the Fourier transform of the signal by direct integration. f(t) = ((t-5)+e-Y(-5))u(t-5) (5 points) (b) Use the convolution theorem of Fourier transform, find the convolution of the following signals: (5 points) x(t) = 5e-4tu(t) and h(t) = 7e-3tu(t)
1. Write a Matlab function to convolve two sequences objects: function y = conv(x, h) % CONV Convolve two finite-length Matlab sequence objects, x and h % returning sequence object, y. When you convolve x[n] and h[n] , you may not use MATLAB's numerical conv routine. 2. write a second convolution function, conv_rt, in Matlab that basically implements a real-time convolu- tion strategy: function y = conv_rt(x, h) % Convolve two finite-length arrays, x and h % returning array, y...