Prove that L^{-1}\left(\frac{s^2}{s^4+4a^4}\right)=\frac{1}{2a}(\cos (h)at \sin at+\sin (h)at \cos at)

Jerold

Jerold

Answered question

2021-09-16

Prove that L1(s2s4+4a4)=12a(cos(h)atsinat+sin(h)atcosat)

Answer & Explanation

Lacey-May Snyder

Lacey-May Snyder

Skilled2021-09-17Added 88 answers

Step 1
As we know that the Laplace transform of:
L{eat}1sa
L{cosat}ss2+a2
L{sinat}as2+a2
L{eatf(t)}F(sa)
Step 2
Given that
L1{s2s4+4a4}
take the partial fraction \Rightarrow
s2s4+4a4=s4a(s22as+a2)s4a(s2+2as+a2)
14a[L1{s(sa)2+a2}L1{s(s+a)2+a2}]
14a[L1{sa(sa)2+a2+a(sa)2+a2}L1{s+a(s+a)2+a2a(s+a)2+a2}]
14a(eatcos(at)+eatsinateatcosat+eatsinat)
12a(cos(at)(eateat2)+sinat(eat+eat2))
cos(h)at=eat+eat2
sin(h)at=eateat2
12a(cosatsin(h)at+sinatcos(h)at)

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