1. A conical reservoir has a depth of 24 feet and a circular top of radius 12 feet. It is being filled so that the depth of water is increasing at a constant rate of 4 feet per hour. Determine the rate in cubic feet per hour at which water is entering the reservoir when the depth is 5 feet.

Question

1.	A conical reservoir has a depth of 24 feet and a circular top of radius 12 feet.  It is being filled so that the depth of water is increasing at a constant rate of 4 feet per hour.  Determine the rate in cubic feet per hour at which water is entering the reservoir when the depth is 5 feet.

Damon · Answer

dv = pi r^2 dh where r = (12/24)h = .5 h so dv = pi (.25)h^2 dh dv/dt = .25 pi h^2 dh/dt when h = 5 dv/dt = (25 pi/4 )dh/dt dv/dt = (25 pi/4)(4)