Compute convolution y[n]=x[n]*h[n]: x[n]={2,0,1,-1,3}; h[n]={1,2,0,1}

56 views (last 30 days)
My approach:
x=[2 0 1 -1 3];
h=[1 2 0 1];
% therefore
y=conv(x,h)
y =
2 4 1 3 1 7 -1 3
  4 Comments
Walter Roberson
Walter Roberson on 2 Dec 2023
It would depend on whether that u[n-1] is the unit step function or not.
If it is then x[n] would be 0 for n < 0, and 1 for n >= 0 -- an infinite stream of 1's. And h[n] would be 0 for n <= 1, and 0.9^n for n > 1 -- an infinite stream of non-negative numbers. You cannot express that as a finite convolution sequence.
Let us see what it would turn out like for continuous functions:
sympref('heavisideatorigin', 1)
ans = 
1
syms n integer
x(n) = heaviside(n)
x(n) = 
h(n) = (sym(9)/sym(10))^n * heaviside(n-1)
h(n) = 
syms t tau
C(t) = int(x(tau) * h(t-tau), tau, 0, t)
C(t) = 
[C(-1), C(0), C(1)]
ans = 
assume(sign(t-1) == 1)
simplify(C)
ans(t) = 
Paul
Paul on 2 Dec 2023
Edited: Paul on 3 Dec 2023
The follow-up problem posed by James can be solved for a closed form solution using symsum and the shift property of the convolution sum. Seem like a HW problem so won't show it now.

Sign in to comment.

Answers (1)

Image Analyst
Image Analyst on 2 Dec 2023
@Li Hui Chew, yes your approach is correct. Is that all you wanted - confirmation of your approach?

Categories

Find more on Mathematics in Help Center and File Exchange

Tags

Products


Release

R2020b

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!