Answer:
about 3.623 seconds
Step-by-step explanation:
The equation for the height can be written as ...
h(t) = -1/2gt^2 -48t +384 . . . . . where g=32
h(t) = -16t^2 -48t +384 = -16(t^2 +3t -24)
We want to find t such that h(t) = 0, so ...
0 = -16(t^2 +3t -24)
0 = t^2 +3t -24 . . . . . . divide by -16
0 = t^2 +3t +2.25 -24 -2.25 . . . . . add/subtract a constant to complete the square
0 = (t +1.5)^2 -26.25 . . . . . rewrite in vertex form
26.25 = (t +1.5)^2 . . . . . . . add 26.25; next, square root, subtract 1.5
t = √26.25 -1.5 ≈ 3.623 . . . . seconds
The ball will strike the ground in about 3.623 seconds.
