Find the Convolution integral y(t) Please give answers in written detail. Thanks Problem 4: Find the...
Problem 4. Use the convolution integral to find the response y(t) of the LTI system with impulse response h(t) to input x(t) a) x(I)-2expl_2t)u(t) , h(1)-expl-t)u(t)
Find the convolution integral of the following figure pairs: use the graph method y(t) X(t) 0 1 2 3 4
======== triple integral problem. provide full answers in detail to get upvote. thanks. Evaluate the triple integral y dV, where E is the solid that lies under the plane x+z = 1° and above the triangle with vertices at (0, 0), (2, 1), (0, 3) Evaluate the triple integral y dV, where E is the solid that lies under the plane x+z = 1° and above the triangle with vertices at (0, 0), (2, 1), (0, 3)
Problem 4: Evaluation of the convolution integral too y(t) = (f * h)(t) = f(t)h(t – 7)dt is greatly simplified when either the input f(t) or impulse response h(t) is the sum of weighted impulse functions. This fact will be used later in the semester when we study the operation of communication systems using Fourier analysis methods. a) Use the convolution integral to prove that f(t) *8(t – T) = f(t – T) and 8(t – T) *h(t) = h(t...
1. Evaluate and sketch the convolution integral (the output y(t)) for a system with input x(t) and impulse response h(t), where x(t) = u(1-2) and h(t)= "u(t) u(t) is the unit step function. Please show clearly all the necessary steps of convolution. Determine the values of the output y(t) at 1 = 0,1 = 3,1 = 00. (3 pts)
please show all work ising convolution. integral is from 0 to t Use convolution theorem and solve y'-st 0 sin(t - 2)y()dA = cost, y(0) = 1. *integral is from zero to to t I
Problem 1 Use the convolution integral to find the zero-state response for x(t)-u(t), and h(t)- eu(t)
A system has an input, x(t) and an impulse response, h(t). Using the convolution integral, find and plot the system output, y(t), for the combination given below. x(t) is P3.2(e) and h(t) is P3.2(f). 1/2 cycle of 2 cos at -2. (e)
Use DUHAMEL INTEGRAL / CONVOLUTION INTEGRAL to solve. DO NOT USE FOURIER SERIES. Problem 4- Consider a simple damped mass-spring system under a general forcing function p(t) such that: Find the solution x(t) for the periodic forcing function described below: p(t) = Fo [1-cos (? t/2to)1 for 0-t-to (0)-0 for to
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