solve the next ecuation with laplace transformation (find y(t))
solve the next ecuation with laplace transformation (find y(t)) u(e– cm = ['etyle – 7) dt.
Use Laplace transformation to solve differential
equation.
*+ 4y = e', y(0) = druge dt - dºg(0)
Solve the IVP using laplace transformation
y”+3y=(t-2)u(t-1)
y(0)=-1
y’(0)=2
Solve the IVP usiag laplace transformahbn 3y (t-2) u (t-1) (0) 2 yo)-1
Solve the IVP usiag laplace transformahbn 3y (t-2) u (t-1) (0) 2 yo)-1
Find the general solucion of the next diferential ecuation
y"+y' - 2y = 2+e".
3. Solve the following integral equations using Laplace transforms. (a) (t)= te! - 2e x(u)e"du (b) y(t) 1 - sinht +(1+T)y(t - T)dT. netions
3. Solve the following integral equations using Laplace transforms. (a) (t)= te! - 2e x(u)e"du (b) y(t) 1 - sinht +(1+T)y(t - T)dT. netions
slove the system eqution: d^3y(t)/dt^3 - 2 d^2y(t)/dt^2 - 5 dy(t)/dt +6 y(t) = 2 d^2u(t)/dt^2 +du(t)/dt +u(t) A) compute the transfer function Y(s)/U(s)? B)Find inverse Laplace for y(t) and x(t)? C) find the final value of the system? D)find the initial value of the system? Please solve clearly with steps.
Use the Laplace transform to solve dy cost + So y(t) cos(t – t)dt, y(0) = 1 dt
3). Use the Laplace transform to solve for y(t) for t20. y(0 +) = 5, dt dt dt Initially relaxed dtdt
Solve the system of differential equations using Laplace transformation dx dy dt - x = 0, + y = 1, x(0) = -1, y(0) = 1. dt You may use the attached Laplace Table (Click on here to open the table) Paragraph В І
Determine the system response y(t) for h(t)=u(t)+u(t-2) and x(t)=u(t). [Hint: use Laplace Transform multiplication: L[x(t)h(t)) = x(s)H(s). Useful Formula: Fourier Transform: F[f(t)] = F(w) sof(t)e-jw dt Inverse Fourier Transform: F-1[F(w)] = f (t) = 24., F(w)ejwidw Time Transformation property of Fourier Transform: f(at – to). FC)e=itoch Laplace Transform: L[f(t)] = F(s) = $© f(t)e-st dt Shifting property: L[f(t – to)u(t – to)] = e-toSF(s) e [tuce) = 1 and c [u(e) = )
7.(9pts) Solve the initial value problem by the method of Laplace transform: y"+ y = u(t - 3), y(O) = 0, y'(0) = 1.