Answer:
The average velocity for the time period beginning when t=1 and lasting 0.1 seconds = 16.40 ft/s.
Explanation:
Given that the height of the ball at time t is
[tex]\rm h(t) = (50 t-16t^2)\ ft.[/tex]
The average velocity of an object is defined as the total displacement covered by the particle divided by the total time taken in covering that displacement.
If [tex]\rm h_1,\ h_2[/tex] are the heights of the ball at time [tex]\rm t_1[/tex] and [tex]\rm t_2[/tex], then the total displacement covered by the ball from time [tex]\rm t_2[/tex] to [tex]\rm t_1[/tex] is [tex]\rm h_2-h_1[/tex].
Thus, the average velocity of the ball for the time interval [tex]\rm t_2-t_1[/tex] is given by
[tex]\rm v_{av}=\dfrac{h_2-h_1}{t_2-t_1}.[/tex]
For the time interval, beginning when t = 1 second and lasting 0.1 seconds,
[tex]\rm t_1=1\ sec.\\t_2 = 1\sec + 0.1\ sec = 1.1\ sec.\\\\h_1=50\times 1-16\times 1^2=34\ ft.\\h_2=50\times 1.1-16\times 1.1^2=35.64\\\\Therefore,\\\\v_{av} = \dfrac{35.64-34}{1.1-1}=16.40\ ft/s.[/tex]
