The axis of the symmetry of a parabola is a vertical line that divides the parabola in two equal parts. The axis of the symmetry is 3/2 which represents that the maximum height (32 units) reached by the ball is after 3/2 seconds.
Given information-
The height of the ball is modeled with the function,
[tex]h(t) = -16t^2 + 48t [/tex]
Here t is the time in seconds.
The axis of the symmetry of a parabola is a vertical line that divides the parabola in two equal parts.
As the roots of the parabola divides it into the two equal part. Therefore equate the equation to the 0 for finding the roots of the equation.
[tex]\begin{aligned}\\ -16t^2 + 48t &=0\\ -16t(t-3)&=0\\ \end[/tex]
Thus one roots of the equation is,
[tex]\begin{aligned}\\ -16t&=0\\ t&=0\\ \end[/tex]
Another root,
[tex]\begin{aligned}\\ t-3&=0\\ t&=0\\ \end[/tex]
The roots of the equation are (0,3). The axis of the parabola is the half of the sum of the roots of the equation of that parabola. Thus,
[tex]t=\dfrac{0+3}{2} \\ t=\dfrac{3}{2} \\[/tex]
Put this value of t in the given equation to find the height.
[tex]h(t) = -16\times(\dfrac{3}{2}) ^2 + 48\times\dfrac{3}{2} \\ h(t) =-36+72\\ h(t)=36[/tex]
Hence the axis of the symmetry is 3/2 which represents that the maximum height (36 units) reached by the ball is after 3/2 seconds.
Learn more about the axis of symmetry here;
brainly.com/question/21589886
