Suppose that water is pouring into a swimming pool in the shape of a right circular cylinder at a constant rate of 9 cubic feet per minute. If the pool has radius 3 feet and height 11 feet, what is the rate of change of the height of the water in the pool when the depth of the water in the pool is 9 feet?

Question

Tom · Accepted Answer

The above answer is incorrect.. everything is right except v=9pi(h) differentiate both sides. gives you... dv/dt=9pi dh/dt 9/9pi= dh/dt. dh/dt= 1/pi

Reiny · Answer

Let the height of water be h ft Volume of water = π(3^2)h = 9πh dV/dt = 18π dh/dt 9/(18π) = dh/dt dh/dt = 1/(2π) , a constant no matter what the height is