# Question

Solve the integrodifferential equations using Laplace transforms.

dy (t)/dt + 2y (t)+ſy(χ)dχ =1-e-2t, y(0) = 0,t>0

dy (t)/dt + 2y (t)+ſy(χ)dχ =1-e-2t, y(0) = 0,t>0

## Answer to relevant Questions

Determine the y (t) in the following equation if all initial conditions are zero. D3y (t)/dt3 + 4 x d2y (t)/dt2 +3dy (t)/dt =10e-2tFind the final values of the time function f (t) if F(s) is given as F(s) = 10(s + 1) / (s + 2) (s + 3) F(s) = 10 / s2 + 4s + 4The output function of a network is expressed using Laplace transforms in the following form. V0 (s) = 12 / s(s + 1)(s + 2) Find the output as a function of time v0(t).For the network shown in fig 13.5 find Vo(t),t>0.Use loop equations to find Vo(t),t>0 in the network shown in fig.Post your question

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