Find the inverse Laplace transform f(t)=L^(-1){F(s)} of the function F(s)=frac(8e^(-4s))(s^2+64)

Cabiolab

Cabiolab

Answered question

2021-09-25

Find the inverse Laplace transform f(t)=L1{F(s)} of the function F(s)=8e4ss2+64
Use h(t-c) for the Heaviside function h_c(t) if necessary.
f(t)=L1{8e4ss2+64}=

Answer & Explanation

StrycharzT

StrycharzT

Skilled2021-09-26Added 102 answers

Step 1
Consider the provided function,
F(s)=8e4ss2+64
The inverse laplace transform of F(s) is find as,
f(t)=L1(F(s))=L1(8e4ss2+64)
Apply inverse tranform rule,
if L1(F(s))=f(t) then L1(ecsF(s))=h(tc)f(tc)
where hc(t) is Heaviside funtion.
For 8e4ss2+64.F(s)=8s2+64,c=4
Step 2
Use the inverse Laplace transform table,
L1(as2+a2)=sin(at)
So, L1(8s2+64)=L1(8s2+82)=sin(8t)
Thus, f(t)=L1(8e4ss2+64)=h(t4)sin(8(t4))

Jeffrey Jordon

Jeffrey Jordon

Expert2022-01-14Added 2605 answers

Answer is given below (on video)

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