About Biological Scaling

Physicists like to explain a broad range of phenomena with a few simple mathematical laws. For example, Newton’s laws explain how objects fall on Earth, how the planets move in the solar system, and how stars move around the center of their galaxies. Armed with this approach, and an array of sophisticated mathematical tools, physicists sometimes tackle problems in unexpected areas—including biodiversity and the characteristics of large and small organisms.

Heart Rates for Various Mammals (beats/minute)
Whale	20
Horse	45
Human	70
Cat	150
Hamster	330
Shrew	600

This graph shows the relationship between the total metabolic rate of various mammals and their body mass. (Graph courtesy of Knut Schmidt-Nielsen, from Scaling: Why is Animal Size So Important?)

A long-standing puzzle in biology has been the relationship between the size of an organism and various characteristics related to its consumption of energy. As a simple example, the table shows how the heart rate of various organisms changes with their body mass.

A more general approach is to compare the metabolic rate—how rapidly the organism consumes energy—with the body mass, and the graph shows the relationship. Note that both axes of the graph are laid off as log scales. On this kind of graph, organisms from the mouse to the elephant all lie on the same straight line, which immediately suggests that there ought to be some explanation that would apply across the tremendous range of sizes shown, about a factor of 100,000 from smallest to largest.

There’s an old joke about physicists: Ask a physicist to think about a dairy farm, and the she or he will say, “Consider a spherical cow.” The idea here is that the physicist has chosen, for openers, the simplest possible model, and if that produces a theory that agrees with observation, then the physicist must be on the right track.

Suppose all animals were spherical. Then, according to solid geometry, their radii, areas, and volumes would be related like this:

• Surface area is proportional to the radius squared.
• Volume is proportional to the radius cubed.

The amount of heat the animal produces is proportional to its volume—to the number of cells. The rate of heat loss is proportional to its area, since heat escapes at the surface.

Now let’s compare large and small animals. As animal size increases, the volume goes up faster than its area (the radius cubed increases faster than the radius squared). This means that a bigger animal loses less heat, in proportion to its volume, than a smaller one. This explains the fact that larger animals tend to live further from the equator. However, it does not explain the relationship shown in the graph above, a mystery that has stymied generations of biologists.