~ 3.7 ~

Let’s investigate the areas of circles.

The circumference C of a circle is proportional to the diameter d, and we can write this relationship as C = π d. The circumference is also proportional to the radius of the circle, and the constant of proportionality is 2 ⋅ π because the diameter is twice as long as the radius. However, the area of a circle is not proportional to the diameter (or the radius).

The area of a circle with radius r is a little more than 3 times the area of a square with side r so the area of a circle of radius r is approximately 3r². We saw earlier that the circumference of a circle of radius r is 2 π r. If we write C for the circumference of a circle, this proportional relationship can be written C = 2 π r.

The area A of a circle with radius r is approximately 3r². Unlike the circumference, the area is not proportional to the radius because 3r² cannot be written in the form kr for a number k. We will investigate and refine the relationship between the area and the radius of a circle in future lessons.