Derive the Laplace transform of the following function sin(h(at))

Harlen Pritchard

Harlen Pritchard

Answered question

2021-02-05

Derive the Laplace transform of the following function
sin(h(at))

Answer & Explanation

okomgcae

okomgcae

Skilled2021-02-06Added 93 answers

Step 1 We have to derive the Laplace transform of function:
sin(h(at))
We know from definition of hyperbolic function,
sinhx=exex2
If x=at then,
sinhx=exex2
sinhat=eateat2
=12(eateat)
Step 2
Now finding Laplace transform,
L(sinhat)=L(12(eateat)
=12(LeatL(eat))
We know the Laplace transform of exponential function,
L(eax)=1(sa)
if a=-a then L(eax)=1(s+a)
Putting Laplace transform of exponential function, we get
12(LeatL(eat))=12((1(sa))(1(s+a))
=12(s+a(sa))(sa)(s+a)
=12(s+as+a)(s2a2) since (since(a+b)(ab)=a2b2)
=122a(s2a2)
=as2a2
Hence, Laplace transform of sinhat is a(s2a2)

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