For Exercises 52–55, refer to the following. Maybe some trees could grow to a mile high, but they just don’t live long enough to have the chance. In this problem, we try to determine how fast the height of a tree increases. We can measure indirectly how much mass the tree adds in a year by the area of the annual tree ring added. Here are two relevant facts:
Now, if we assume that the bulk of the mass of the tree is in the trunk, and if we model the trunk either as a long cylinder or as a thin cone, the mass is proportional to the volume, so . Then
so . In other words, the tree grows in height as the fourth root of its age.
54. Giant sequoias can reach 100 m after about 1000 years. If it could keep on growing at the same rate of its addition of mass, how long would it take a giant sequoia 100 m tall to grow to 200 m?