If H(s)=F(s)G(s) then h(t)=L^(-1){F(s)G(s)}=int_(u=0)^t f(t−u)g(u)du. Here, I want to know if H(s)=F(P(s))G(P(s)) where P(s) is a function of s, then the inverse of H(s) i.e h(t) will be?

figoveck38

figoveck38

Answered question

2022-11-06

If H ( s ) = F ( s ) G ( s ) then
h ( t ) = L 1 { F ( s ) G ( s ) } = u = 0 t f ( t u ) g ( u ) d u
I want to know if
H ( s ) = F ( P ( s ) ) G ( P ( s ) )
where P(s) is a function of s, then the inverse of H(s) i.e h(t) will be..........?

Answer & Explanation

Deanna Sweeney

Deanna Sweeney

Beginner2022-11-07Added 14 answers

In fact you can only write to this:
h ( t ) = L s t 1 { F ( P ( s ) ) G ( P ( s ) ) } = L s t 1 { F ( P ( s ) ) } L s t 1 { G ( P ( s ) ) } = 0 t L s t u 1 { F ( P ( s ) ) } L s u 1 { G ( P ( s ) ) }   d u = 0 t L s u 1 { F ( P ( s ) ) } L s t u 1 { G ( P ( s ) ) }   d u
Note that Laplace transform has not any composite function rules.

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