Find the inverse Laplace transform of the following: \(\frac{7}{2}\)\log\(\frac{s-8}{s+8}\)

Daniaal Sanchez

Daniaal Sanchez

Answered question

2021-09-15

Find the inverse Laplace transform of the following:
(72)log(s8s+8)

Answer & Explanation

casincal

casincal

Skilled2021-09-16Added 82 answers

Given:
(72)log(s8s+8)
To find : The inverse Laplace transform.
Let f(s)=(72)loge(s8s+8)
F(t)=L1{f(s)}
f(s)=72)loges8s+8
=72[loge(s8)loge(s+8)]
f(s)=72[1s81s+8]
Differentaking f(s) with respect to s is eqvivalent to multiplying F(t) by t
L{F(t)}=df(s)ds
=f(s)
tF(t)=L1{f(s)}
=72L1{1s81s+8}
=72[e8te8t]
=7(e8te8t2)
=7sinh8t
(hx=exex2)
F(t)=7sin8tt

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