The solution is:
a) time to reach s = 288 ft is 3 sec
b) Total time of the fly is 9 sec
a) The height s = - 16×t² + v₀×t
At a height of 288 ft with v₀ = 144 ft/sec
288 = -16t² + 144×t or 16×t² - 144×t + 288 = 0
Simplifying dividing by 16 t² - 9×t + 18 = 0
We got a second degree equation, solving for t
t₁,₂ = [ 9 ±√81 - 72 ]/2
t₁ = (9 + 3)/2 t₁ = 6 sec and t₂ = ( 9 - 3 ) /2 t₂ = 3 sec
we got 2 possible solution, we will examine s maximum
when s is maximum ds/dt = 0 then
s = - 16×t² + v₀×t tacking derivatives on both sides of the equation
ds/dt = - 32× t + v₀ ds/dt = 0 = - 32× t + 144
- 32×t + 144 = 0 t = 144/32 t = 4,5 sec
And s max = - 16 ×( 4,5)² + 144 ( 4,5)
s maximum is s = - 324 + 648 s max = 324 ft
Then if s maximum will occurs at 4,5 sec and it was 324 ft, it is obviuos that time to get 288 ft was with t₂ = 3 sec.
b) As the time to get s maximum is 4,5 sec, by symmetry total time is 9 sec