4. A particle moves along x - axis and the differential equation governing the motion of the particle by Newton's Law is given by 2 d²x dt² dx dt = -8x-8- Find an expression for the position x of the particle as a function of time t if the particle is initially at rest at x = 10 units.

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1. Determine the complete solution of the given differential equation y"+y' - 2y = 2x-40cos2x. Use method of undetermined coefficients. 2. Solve the equation a. USE METHOD OF REDUCTION OF ORDER b. USE METHOD OF VARIATION OF PARAMETERS d²y dx² - y = ex 3. Find the particular solution of 4y" + 25y = 0 when x = 0, y = -2; y' = 0 4. A particle moves along x - axis and the differential equation governing the motion of the particle by Newton's Law is given by dt d²x 2 = -8x8 dt² Find an expression for the position x of the particle as a function of time t if the particle is initially at rest at x = 10 units. Use g=9.8 m/s² dx dt 5. A mass of 10 kg is suspended from a spring stretching it 0.7 m from its natural length. The mass is started in motion from the equilibrium position with an initial velocity of 1 m/s in the upward direction. Find an expression for the motion of the mass, if the force due to air resistance is - 90 N