A ball kicked from the ground at an angle of b above the horizontal with an initial speed of \(\displaystyle V_0\) feet per second reaches a height of \(\displaystyle \L h(t) = V_0 \cdot t \cdot sin(b) - \frac{1}{2} \cdot g \cdot t^{2}\)
gravity = g = 32 feet per second
angle = b = 30 degrees
The ball reaches a max height of 16 feet.
What was the initial velocity?
\(\displaystyle \L h(t) = V_0 \cdot t \cdot sin(\frac{\pi}{6}) - \frac{1}{2} \cdot 32 \cdot t^{2}\)
\(\displaystyle \L h(t) = \frac{1}{2}\cdot V_0 \cdot t - 16t^2\)
Now I know that when h(t) = 16 that the derivitive of the function has slope = 0, because it's at the vertex... but I'm just not sure how to find the initial velocity and time with that one equation.
I should know this from high school physics
gravity = g = 32 feet per second
angle = b = 30 degrees
The ball reaches a max height of 16 feet.
What was the initial velocity?
\(\displaystyle \L h(t) = V_0 \cdot t \cdot sin(\frac{\pi}{6}) - \frac{1}{2} \cdot 32 \cdot t^{2}\)
\(\displaystyle \L h(t) = \frac{1}{2}\cdot V_0 \cdot t - 16t^2\)
Now I know that when h(t) = 16 that the derivitive of the function has slope = 0, because it's at the vertex... but I'm just not sure how to find the initial velocity and time with that one equation.
I should know this from high school physics