Graphical Method of Convolution || (Hayt) || ENA 15.5(2)

ENA 15.5(2) ( Hayt)
This video explains the techniques of finding convolution by graphical method.

Here we consider a numerical example that will give us some insight into just how the convolution integral can be evaluated.

Solved example from the book "Engineering Circuit Analysis" has been explained in a simplified manner.

Here the input is a rectangular voltage pulse that starts at t = 0,
has a duration of 1 second, and is 1 V in amplitude:
x(t) = vi(t) = u(t) − u(t − 1)

Iimpulse response is known to be an exponential function of the form:
h(t) = 2e−t u(t)