Internal Angles of Regular Polygon

Theorem
The size $A$ of each internal angle of a regular $n$-gon is given by:
 * $A = \dfrac {\left({n - 2}\right) 180^\circ} n$

Proof
From Sum of Internal Angles of Polygon, we have that the sum $S$ of all internal angles of a $n$-gon is:
 * $S = \left({n - 2}\right) 180^\circ$

From the definition of a regular polygon, all the internal angles of a regular polygon are equal.

Therefore, the size $A$ of each internal angle of a regular polygon with $n$ sides is:
 * $A = \dfrac {\left({n - 2}\right) 180^\circ} n$

Also presented as
This formula can also be seen presented as:
 * $A = 180^\circ - \dfrac {360^\circ} n$