is there another way to do laplace inverses without resorting to a table of undoables?

Question

amistre64 · Answer

i see, so the question stays over the ask a box until its closed eh

anonymous · Answer

yes, but I think it involves contour integrals

amistre64 · Answer

contours is a name ive been coming across

anonymous · Answer

it is integrating over complex plane. that's much I know

amistre64 · Answer

so far weve laplaced, what do we do in the laplaced state inn order to revert back to an unlaplaced condition as an answer?

anonymous · Answer

may be it is like fourier transform

since 

laplace tranform is

 Int[ f(t) e^(-st) dt]

inverse laplace transform
int[f(t)e^(st)dt]

amistre64 · Answer

dt or ds?

anonymous · Answer

ds

anonymous · Answer

there might be some constant factor too

amistre64 · Answer

hmm, yeah.  i was watching a youtuber from stanford on the fourier stuff.  i keep falling asleep on it tho

anonymous · Answer

but it is sooo useful

anonymous · Answer

perhaps most useful part of math?

amistre64 · Answer

:)  yeah, i cant believe ive lived this long without it lol

anonymous · Answer

you brain has been using fourier transform to process sound

amistre64 · Answer

... thats what those things that go bump in the night have been eh