determine L^{-1}(F), F(s)=\frac{6}{s^2+2s+2}

Josalynn

Josalynn

Answered question

2021-09-07

determine L1(F)
F(s)=6s2+2s+2

Answer & Explanation

Nathalie Redfern

Nathalie Redfern

Skilled2021-09-08Added 99 answers

Step 1
Given that,
F(s)=6s2+2s+2
Taking inverse Laplace transform from both sides,
L1[F(s)]=L1(6s2+2s+2)
By using KL1{aF(s)}=aL1{F(s)}. a is constant
L1[F(s)]=6L1(1s2+2s+2)
L1[F(s)]=6L1(1(s+1)2+1)
L1[F(s)]=6L1(1(s(1))2+1)
Step 2
By using the formula
L1{1(sa)2+b2}=1beatsinbt
L1[F(s)]=6(11etsin1t)
L1[F(s)]=6(etsint)
L1[F(s)]=6etsint

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