At the top of the height, the velocity is zero and acceleration is negative of acceleration due to gravity ( i.e [tex]-9.8 m/s^2[/tex]).
The time of the ball in air is 3.2 s, so ascending time is [tex]3.2/2=1.6 s[/tex].
Therefore from kinematic equation,
[tex]v = u + gt[/tex]
Substituting the values we get,
[tex]0= u - 9.8 (1.6)\\\\u=15.7 m/s[/tex], Here v = 0 at top.
Now from equation,
[tex]h=ut+\frac{1}{2} gt^2[/tex], here h is the height .
So,
[tex]h=(15.7 m/s) (1.6s)-\frac{1}{2} 9.8m/s^2(1.6)^2\\\\ h=25.12m-12.54m\\\\h=12.48 m[/tex].
Thus, the ball reached at its maximum height of 12.48 m.
