Laplace transform applied to differential equations (original) (raw)

The use of Laplace transform makes it much easier to solve linear differential equations.

First consider the folowing relations :

Suppose we want to solve the given differential equation:

this equation is equivalent to :

which is equivalent to :

note that the are initial conditions.

Then all we need to find f(t) is to apply the Laplace inverse transform to

An example

We want to solve :

with initial conditions f(0) = 0 and f ′(0)=0

we note :

and we get :

so this is equivalent to :

we deduce :

So we apply the Laplace inverse transform and get

f(t)=\\frac{1}{8}\\sin(2t)-\\frac{t}{4}\\cos(2t)