An object is propelled vertically upward from the top of a 144-foot building. The quadratic function s(t)= -16t2+192+144 models the ball's height above the ground, in feet, s(t) seconds after it was thrown. How many seconds does it take until the object finally hits the ground? Round to the nearest tenth of a second if necessary.

Question

An object is propelled vertically upward from the top of a 144-foot building. The quadratic function    s(t)= -16t2+192+144 models the ball's height above the ground, in feet, s(t) seconds after it was thrown. How many seconds does it take until the object finally hits the ground? Round to the nearest tenth of a second if necessary.
Answer
		
0.7 seconds

Reiny · Answer

when it hits the ground, s(t) = 0
-16t^2 + 192t + 144 = 0
t^2 - 12t - 9 = 0
I will complete the square rather than use the quadratic formula
t^2 - 12t + 36 = 9 + 36
(t-6)^2 = 45
t-6 = ±√45
t = 6 ± √45
= appr -.7 or 12.7

since t > 0, it will hit the ground 12.7 after it was tossed.