Question

How do you write the area a of a circle as a function of its circumference?

Answer 1

We know:

Area of a circle = `A = (pi)r^2`

Circumference of a circle = `C = 2(pi)r`

Where pi is a constant and r is the radius of the circle.

Using these two formulas we can express A in terms of C as follows:

`C^2 = [2(pi)r]^2`

`=> C^2 = 4[(pi)^2]r^2`

`=> C^2 = 4(pi)[(pi)r^2]`

As`(pi)r^2 = A`

`=> C^2 = 4(pi)A`

Therefore:

`A = (C^2)/[4(pi)]`