Find the INVERSE Laplace transform: F(s)=\frac{2s+16}{s^2+4s+19}

Sinead Mcgee

Sinead Mcgee

Answered question

2021-09-11

Find the INVERSE Laplace transform: F(s)=2s+16s2+4s+19

Answer & Explanation

Raheem Donnelly

Raheem Donnelly

Skilled2021-09-12Added 75 answers

Step 1
Given,
F(s)=2s+16s2+4s+19
This transform can be written as,
F(s)=2s+16s2+4s+19
=2s+16(s+2)2+15
=2s+4(s+2)2+15+12(s+2)2+15
=2(s+2)(s+2)2+15+12(s+2)2+15
Step 2
Taking inverse Laplace transform of both sides,
f(t)=L1[2(s+2)(s+2)2+15]+L1[12(s+2)2+15]
=2L1[(s+2)(s+2)2+(15)2]+12L1[1(s+2)2+(15)2]
Using the formula,
L1[F(s)]=f(t)L1[F(sa)]=eatf(t)
L1[ss2+a2]=cos(at)
L1[as2+a2]=sin(at)
Step 3
Therefore,
f(t)=2L1[(s+2)(s+2)2+(15)2]+1215L1[15(s+2)2+(15)2

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