02-12-2019, 04:24 PM
I would like to declare a function say, x(t) but without saying what x(t) is.
Thus when I evaluate an integral from -infinity to infinity of dirac(τ)x(t-τ) dτ
the answer should be x(t). Now, this would work with sin(x) because there is no simplification of sin(x).
Is there a way to define such a function? And how would the syntax work to make sure x(t-tau) is functional notation, not x*(t-τ).
Thank you!
(See attachment for the integral I'm trying to evaluate.)
Thus when I evaluate an integral from -infinity to infinity of dirac(τ)x(t-τ) dτ
the answer should be x(t). Now, this would work with sin(x) because there is no simplification of sin(x).
Is there a way to define such a function? And how would the syntax work to make sure x(t-tau) is functional notation, not x*(t-τ).
Thank you!
(See attachment for the integral I'm trying to evaluate.)