Find the Laplace Transform of the function. f(x)=\sin h(ax)

aflacatn

aflacatn

Answered question

2021-09-10

Find the Laplace Transform of the function.
f(x)=sinh(ax)

Answer & Explanation

Arnold Odonnell

Arnold Odonnell

Skilled2021-09-11Added 109 answers

f(x)=sinh(ax)
f(x)=eaxeax2;sinh(ax)=eaxeax2
Taking Laplace transform on both sides , we get
L{f(x)}=L{eaxeax2}
=12[L{eax}L{eax}] : using linearity property
We have
L{eax}=1sa;s>a, then
L{f(x)}=12[1sa1s(a)];s>a,s>a
L{f(x)}=12[1sa1s+a]
=12[(s+a)(sa)(sa)(s+a)]
=12[s+as+as2a2].(bc)(b+c)=b2c2
L{f(x)}=12×2as2a2
L{f(x)}=as2a2;s>a,s>a or s>|a|
Hence , we get
L{f(x)}=L{sinh(ax)}=as2a2;s>|a|

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Differential Equations

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?