My question is in the image. Can you please go over my answers and make sure that they are correct?

5. A mass weighing 8 pounds stretches a spring 3 in. The mass is initially released from a point 6 inches below the
equilibrium position with an upward velocity of 2 ft/s.
a) Find the equation of motion. (Use the convention that displacements measured below the equilibrium position
are positive.)           y .5cos(8√(2)t)-1/(4√(2))sin(8√(2)t)

b) The equation of motion from part (a) should have the form y(t) = C₁cos(ωt) + C₂sin(ωt). Write the equation of
motion in the from y(t) = Asin(ωt + φ), where A = √((C₁)² + (C₂)²) and tan(φ) = C₁/C₂        y=√(128.25)sin(8√(2)t+2.53)

c) What is the velocity of the mass when t = 3π/2 seconds? In which direction is the mass heading at this instant?   71.9 ft/s heading up

Transcribed Image Text:

5. A mass weighing 8 pounds stretches a spring 3 in. The mass is initially released from a point 6 inches below the equilibrium position with an upward velocity of 2 ft/s. (a) Find the equation of motion. (Use the convention that displacements measured below the equilibrium position are positive.) y: 5 los (gva ) – a ) sin(8v5 t) (b) The equation of motion from part (a) should have the form y(t) = C, cos(wt) + Cz sin(wt). Write the equation of motion in the from y(t) = Asin (wt + 6), where A = V(C)? + (C2)² and tan(ø) = C2 3x seconds? In which direction is the mass heading at this instant? (c) What is the velocity of the mass whent = head up f%4 ע.ול