calculate the inverse laplace of \(\displaystyle{F}{\left({s}\right)}={e}^{{-{3}{s}}}{\frac{{{1}+{s}}}{{{s}^{{3}}+{2}{s}^{{2}}+{2}{s}}}}\)

Charity Barr

Charity Barr

Answered question

2022-03-16

calculate the inverse laplace of F(s)=e3s1+ss3+2s2+2s

Answer & Explanation

Evandassy8yp

Evandassy8yp

Beginner2022-03-17Added 3 answers

The inverse Laplace transform considered is
F(s)=e3s1+ss3+2s2+2s
and can be reduced as follows. First notice that
F(s)=e3sss+1(s+1)2+1=f1(s)f2(s)
where
f1(s)=e3ssf2(s)=s+1(s+1)2+1
The inverses of f1,2(s) are
f1(t)=H(t3)f2(t)=etcost
Now by the convolution theorem the inverse desired is
F(t)=0tH(u3)e(u3)cos(u3)du
=3te(u3)cos(u3)du
=0t3excosxdx
=12[ex(sinxcosx)]0t3
=12[1+e(t3)(sin(t3)cos(t3))]

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Differential Equations

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?