Use the Laplace transform table and the linearity of the Laplace transform to determine the following transform L\{t^4+t^3-t^2-t+\sin \sqrt2t \}

glasskerfu

glasskerfu

Answered question

2021-09-15

Use the Laplace transform table and the linearity of the Laplace transform to determine the following transform
L{t4+t3t2t+sin2t}

Answer & Explanation

Macsen Nixon

Macsen Nixon

Skilled2021-09-16Added 117 answers

The given Laplace transform is
L{t4+t3t2t+sin2t}
By using the linearity property of Laplace transform
For Function f(t),g(t) and constant a,b:
L{af(t)+bg(t)}=aL{f(t)}+bL{g(H)}
So from eqn (1)
L{t4+t3t2t+sin2t}=L{t4}+{t3}{t2}{t}+{sin2t} (2)
By using L{tn}=n!sn+1 and
L{sin(at)}=as2+a2 we will get from eqn (2)
L{t4+t3t2t+sin2t}=4!s5+3!s42!s31s2+2s2+(2)2
L{t4+t3t2t+sin2t}=4!s5+3!s42!s31s2+2s2+(2)2

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