Find the inverse Laplace transform of the following:H(s)=\frac{2e^{-s}}{s^2(s+3)}

boitshupoO

boitshupoO

Answered question

2021-09-19

Find the inverse Laplace transform of the following:
H(s)=2ess2(s+3)

Answer & Explanation

coffentw

coffentw

Skilled2021-09-20Added 103 answers

L1{2ess2(s+3)}
Apply inverse transform rule : if L1{F(s)}=f(t) then L1{easF(s)}=H(ta)f(ta)
Where H(t) is Heaviside step function
For 2ess2(s+3):F(s)=2s2(s+3),a=1
=H(t1)L1{2s2(s+3)}(t1)
L1{2s2(s+3)}:29H(t)+2t3+29e3t
=H(t1)(29H(t1)+2(t1)3+29e3(t1))

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