Question

Solve the following differential equation using Laplace transform

b'' + 4b = sin a b(0) = 0 b'(0) = 1

Answer 1

1 solution : - hiren equation és sena 6"+ 4b = with broj o bicos = . H both side of equation 14 Talling Laplace on L{6"+46} = {sena} L{b" } +42{b} = {sma} On s? L{b} - Abo) - b'(o) + 4l{b} = ehti O [we use l{b"}= $L{b} -sblos - 5'60)] + 4.1{b} = 3+1 02 SALBb} -SX0-1 un (8²+4) L{b} = On L{b} (8²+1) (5+4) L{6} slotts-] takong enverse Laplace transform, both side NOW 1."{c{t}} = ('{ $(lots) - kaj]} { ["{k}-1\{strze} i sina b(a) 11 b(a) - Ź sumage] 3

bas = Š [sena - 22 sen(2a)] Are .