Answer:
a. 7.69 m/s b. 0.357 s c. initial vertical velocity component at launch u = 3.50 m/s. initial horizontal velocity component at launch u₁ = 7.69 m/s
Step-by-step explanation:
a. Let H be the distance of the board above the water = 4.50 m and h be the distance of the hoop above the ground = 1.00 m.
Using s = ut - 1/2gt² with u = 0 (the initial vertical component of the velocity), s = vertical distance dropped by ball = h - H = 1.00 - 4.50 = -3.50
s = 0 - 1/2gt² = -1/2gt²
t = √(-2s/g) = √(-2 × -3.50/9.8) = √(7.0/9.8) = √0.7143 = 0.845 s.
This is the time it takes the ball to enter the hoop.
The speed with which it covers the 6.50 m horizontal distance is in this time is
v = d/t = 6.50/0.845 = 7.69 m/s
b. The time taken for the ball to enter the horizontal hoop at a distance of 3.75 m is t₁ = d/v = 3.75/7.69 = 0.4875 s ≅ 0.488 s
The time t₂ after stepping off the board is t₂ = t - t₁ = 0.845 - 0.488 = 0.357 s
c. For the initial vertical velocity component at launch u, we use v = u - gt. Since the final vertical velocity v = 0, we have 0 = u -gt ⇒ u = gt where t = time it took for first throw on diving board = 0.357 s
u = gt = 9.8 × 0.357 = 3.4986 m/s ≅ 3.50 m/s
The initial horizontal velocity component at launch u₁ = v = 7.69 m/s