Applications of Derivatives 151Letr, hbe the radius and height of the cone respectively.Sinceh= 3 r, the volume of the coneV=1
3
πr^2 h=1
3
πr^2 ( 3 r)=πr^3.V=πr^3 ;
dV
dt= 3 πr^2
dr
dt.
When
dV
dt= 12
dr
dt,12
dr
dt
= 3 πr^2
dr
dt
⇒ 4 =πr^2 ⇒r=2
√
π.
Thus,V=πr^3 =π(
2
√
π) 3
=π(
8
π√
π)
=8
√
π.
TIP • Go with your first instinct if you are unsure. Usually that is the correct one.
Inverted Cone (Water Tank) Problem
A water tank is in the shape of an inverted cone. The height of the cone is 10 meters and the
diameter of the base is 8 meters as shown in Figure 8.1-1. Water is being pumped into the
tank at the rate of 2 m^3 /min. How fast is the water level rising when the water is 5 meters
deep? (See Figure 8.1-1.)10m
5m8mFigure 8.1-1
Solution:
Step 1: Define the variables. LetVbe the volume of water in the tank;hbe the height of
the water level attminutes;rbe the radius of surface of the water attminutes;
andtbe the time in minutes.Step 2: Given:
dV
dt
=2m^3 /min. Height=10 m, diameter=8m.Find:
dh
dt
ath=5.Step 3: Set up an equation:V=1
3
πr^2 h.Using similar triangles, you have4
10
=
r
h
⇒ 4 h = 10 r;orr =
2 h
5. (See
Figure 8.1-2.)