Answer:
It takes 2.8 seconds for the ball to fall 215 ft.
Step-by-step explanation:
We are given a position function s(t) where s stands for the number of feet the ball has fallen, so we have to replace s with the given value of 215 ft and solve for the time t.
Setting up the equation.
The motion equation is given by
[tex]s(t) =16t^2+32t[/tex]
We can replace there s = 215 ft to get
[tex]215=16t^2+32t[/tex]
Solving for the time t.
From the previous equation we can move all terms in one side to get
[tex]16t^2+32t-215=0[/tex]
At this point we can solve for t using quadratic formula.
[tex]t = \cfrac{-b\pm \sqrt{b^2-4ac}}{2a}[/tex]
where a, b and c are the coefficients of the quadratic equation
[tex]at^2+bt+c=0[/tex]
So we get
[tex]a=16\\b=32\\c=-215[/tex]
Replacing on the quadratic formula we get
[tex]t = \cfrac{-32\pm \sqrt{32^2-4(16)(-215)}}{2(16)}[/tex]
Using a calculator we get
[tex]t=-4.8 , t = 2.8[/tex]
Physically speaking the only result that makes sense is to move forward in time that give us t = 2.8 seconds.
We can conclude that it takes 2.8 seconds for the ball to fall 215 ft.
