The ball thrown upward has height y and velocity v at time t given by
y₁ = 3 m + (24 m/s) t - 1/2 g t ²
v₁ = 24 m/s - g t
while the ball thrown downward has height and velocity
y₂ = 3 m - (24 m/s) t - 1/2 g t ²
v₂ = - 24 m/s - g t
where g = 9.80 m/s².
(a) At its highest point, the first ball has zero velocity:
24 m/s - g t = 0 → t = (24 m/s)/g ≈ 2.45 s
(b) The first ball reaches a maximum height y [max] such that
0² - (24 m/s)² = -2 g y [max] → y [max] = (24 m/s)²/(2g) ≈ 29.4 m
(c) Solve for t when y₁ = 0 and y₂ = 0, then take the absolute difference between them:
0 = 3 m + (24 m/s) t - 1/2 g t ² → t ≈ 5.02 s
0 = 3 m - (24 m/s) t - 1/2 g t ² → t ≈ 0.123 s
→ |5.02 s - 0.123 s| ≈ 5.14 s