Why are there 2 pi radians in a circle?

Question

Why are there 2 pi radians in a circle?

1 Answer

Impact of this question

33568 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2015-08-30T19:28:16

It is not arbitrary, but it is because of the definition of radian measure.

Explanation:

One definition says the radian measure of angle $θ$ $theta$ is the ratio of arc length $s$ $s$ to radius $r$ $r$ when $θ$ $theta$ is made central in a circle of radius $r$ $r$ .

The arc length of the whole circle is its circumference $2 π r$ $2pir$ , so the angle that goes once around the circle has radian measure $\frac{C}{r} = \frac{2 π r}{r} = 2 π$ $C/r = (2pir)/r = 2pi$

This definition is the reason that we have the formula for arc length $s = r θ$ $s = r theta$ as long as we measure $θ$ $theta$ in radians

Note that whatever unit are used to measure $r$ $r$ and $s$ $s$ , in the definition of radian measure they cancel. We say that radian measure is dimesionless.

Also note that some teachers introduce radian measure without discussing the 'official' definition as a ratio of lengths. They simply announce that once around the circle is $2 π$ $2pi$ radians. (Some say $360^{\circ}$ $360^@$ is the same as $2 π$ $2pi$ radians.)
This makes it look arbitrary when it is not arbitrary at all.

Science

Math

Humanities

... and beyond

Why are there 2 pi radians in a circle?

1 Answer

Explanation:

Related questions

Impact of this question