Given F(s)=(2(3s^2+1))/((s^2−1)^3) and I want to find f(t) so that L(f(t))=F(s)

robbbiehu

robbbiehu

Answered question

2022-10-30

I have been given F ( s ) = 2 ( 3 s 2 + 1 ) ( s 2 1 ) 3 and I want to find f(t) so that L ( f ( t ) ) = F ( s )

Answer & Explanation

pawia6g

pawia6g

Beginner2022-10-31Added 14 answers

(1) 2 ( 3 s 2 + 1 ) ( s 2 1 ) 3 = K 1 ( s 2 1 ) 3 + K 2 ( s 2 1 ) 2 + K 3 ( s 2 1 )
To find K 1 , we multiply Eq(1) by ( s 2 1 ) 3 , we get
(2) 2 ( 3 s 2 + 1 ) = K 1 + K 2 ( s 2 1 ) + K 3 ( s 2 1 ) 2
In Eq(2), let s=−1, we obtain K 1 = 8
To isolate K 2 , we differentiate Eq(2) with respect to s, we get
(3) 2 ( 6 s ) = K 2 ( 2 s ) + K 3 4 s ( s 2 1 )
In Eq(3), let s=−1, we obtain K 2 = 6
Again, we differentiate Eq(3) with respect to s and K 2 = 6, we get
12 = ( 6 ) ( 2 ) + K 3 4 ( 3 s 2 1 ) 12 = 12 K 3 s 2 + 12 4 K 3
As a result, 12 K 3 = 0 K 3 = 0 or ( 12 4 K 3 ) = 12 K 3 = 0

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