How to find the inverse laplace transform of (48s+36)/(s(6s^2+11s+6))?

ubwicanyil5

ubwicanyil5

Answered question

2022-09-07

How to find the inverse laplace transform of F ( s ) = 48 s + 36 s ( 6 s 2 + 11 s + 6 ) . ?

Answer & Explanation

Azul Lang

Azul Lang

Beginner2022-09-08Added 20 answers

F ( s ) = 48 s + 36 s ( 6 s 2 + 11 s + 6 ) = 8 s + 6 s ( s α i β ) ( s α + i β ) , where  α = 11 12 ,  and  β = 23 12 = 8 s + 6 s [ ( s α ) 2 + β 2 ]
Expressing this as a partial fraction expansion:
F ( s ) = 6 s 6 ( s α ) ( s α ) 2 + β 2 + 5 / 2 ( s α ) 2 + β 2 = 6 s 6 s α ( s α ) 2 + β 2 + 30 23 β ( s α ) 2 + β 2
So
f ( x ) = L 1 { F ( s ) } = 6 e α x [ 6 cos β x 30 23 sin β x ] = 6 6 e 11 12 x [ cos ( 23 12 x ) 5 23 sin ( 23 12 x ) ] .

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