Answer:
The ball will not get up to 125 ft
Step-by-step explanation:
The initial velocity of the golf ball = 85 ft/s
The function for the height, h, in feet, of the golf ball is h = -16·t² + 85·t + 1/12
Where;
t = The time in seconds of flight of the golf ball
We have at maximum height, dh/dt = 0, which gives;
dh/dt = d(-16·t² + 85·t + 1/12)/dt = 0
-32·t + 85 = 0
t = 85/32
Given that d²h/dt² = d(-32·t + 85)/dt = -32 which is negative, the obtained point, t = 85/32, above is a maximum point
Substituting the value of t at the maximum into the function for the height h, to obtain the value for the maximum height, we have;
h[tex]_{(max)}[/tex] = h(85/32) = -16 × (85/32)² + 85× (85/32) + 1/12 ≈ 112.974
The maximum height reached = h[tex]_{(max)}[/tex] = 112.974 ft.
The maximum height reached ≈ 112.974 ft
Therefore, the ball will not get up to 125 ft.
