The velocity v and maximum height h of the water being pumped into the air are related by the equation
v= [tex] \sqrt{2gh} [/tex]
where g = 32
(a) To find the equation that will give the maximum height of the water , solve the equation for h
v= [tex] \sqrt{2gh} [/tex]
Take square root on both sides
[tex] v^2 [/tex] = 2gh
Divide by 2g on both sides
[tex] \frac{v^2}{2g} [/tex] = h
So maximum height of the water h = [tex] \frac{v^2}{2g} [/tex]
(b) Maximum height h= 80
velocity v= 75 ft/sec
Given g = 32
h = [tex] \frac{v^2}{2g} [/tex]
h = [tex] \frac{75^2}{2*32} [/tex]
h= 87.89 ft
The pump withe the velocity of 75 ft/sec reaches the maximum height of 87.89 feet. 87.86 is greater than the maximum height 80 feet.
So the pump will meet the fire department needs.
