Answer:
approximately 1.13 seconds is when the max height is obtained
29.25 ft is the max height
Step-by-step explanation:
Maximum/minimum you should automatically go to vertex if you are dealing with a parabola or a quadratic; I'm talking about something in this form y=ax^2+bx+c.
The x-coordinate of the vertex can be found by computing -b/(2a)
Or in this case the t-coordinate.
a=-16
b=36
c=9
Plug in (you don't need c for this) -36/(2*-16)=-36/-32 (reduce)=9/8
(divide; put in calc 9 divided by 8)=1.125
t represented the seconds so we done with part A which is 1.125 seconds
Now for B, all you have to do once you found the x- (or t- in this case) coordinate, plug it into your equation that relates x (or t in this case) and y (or h in this case).
h=-16(1.125)^2+36(1.125)+9
I'm just going to put -16(1.125)^2+36(1.125)+9 into my calculator exactly as it appears which is 29.25 ft.
