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1. A spring is such that a 4-lb weight stretches the spring 0.40 ft. The 4-lb weight is attached to the spring (suspended from a fixed support) and the system is allowed to reach equilibrium. Then the weight is started from equilibrium position with an imparted upward velocity of 2 ft/sec. Assume that the motion takes place in a medium that furnishes a retarding force of magnitude numerically equal to the speed, in feet per second, of the moving weight. Determine the position of the weight as a function of time. 2. Find the Laplace transform of a) t² sinkt b) tsinkt 3. Find the Inverse Laplace transform of : 5s-2 s² (s+2) (S-1) S b) (s²+²)(s²+b²) a² + b², a²b², ab 0 4. Use the Laplace Transform method to solve the given system dx dy (a) 2x - y = 6e³t, dt dt 2x-3x+ x(0) = 3, d²₂ dy dt² dt dx -x+ dt dx + 3x + - 4y + 3z = 0; dt dx x(0) = 0, (0) = 1, y(0) = 0, z(0) = 0. dt 5. Find the Fourier series to represent a function of a.) f(x) = x + 1, - 2 < x < 0, = 1, 0<x<2 in the interval (-2,2). b.) f(x) =cos cos in the interval of (-, π). (b) dy dt y(0) = 0. - 3y = 6e³t; - y = 0, dy dt dz-z = 0, dt