Find the inverse laplace transform of e^(-as)((1)/(s^2)-(1)/(s^2+1)) where a is a constant of-course.

charlygyloavao9

charlygyloavao9

Answered question

2022-10-09

I'm having troubles finding the inverse laplace transform of
e a s ( 1 s 2 1 s 2 + 1 )
where a is a constant of-course.

Answer & Explanation

Adelaide Kemp

Adelaide Kemp

Beginner2022-10-10Added 10 answers

You need this:
L 1 { F ( s ) e a s } = [ L 1 { F ( s ) } ] t t a U ( t a )
For example
L 1 { s e π s s 2 + 1 } = cos ( t π ) U ( t π )
seguitzla

seguitzla

Beginner2022-10-11Added 4 answers

Second Shifting Property: If   L 1 { F ( p ) } = f ( t )   , then   L 1 { F ( p )   e a p } = g ( t )   where
  g ( t ) = { f ( t a ) if       t   >   a 0                         if       t   <   a  
Here we have to find
L 1 { e a s ( 1 s 2 1 s 2 + 1 ) }
Here
F ( s ) = 1 s 2 1 s 2 + 1
So
f ( t ) = L 1 { F ( s ) } = t sin t
as   L ( t ) = 1 s 2   and   L ( sin a t ) = a a 2 + s 2  
Hence
L 1 { e a s ( 1 s 2 1 s 2 + 1 ) } = { ( t a )     sin ( t a ) if       t   >   a 0                         if       t   <   a  

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