6.2. Exterior Angles in Convex Polygons http://www.ck12.org
TABLE6.3:(continued)
Statement Reason
2.x◦nand y◦nare a linear pair Definition of a linear pair
3.x◦nand y◦nare supplementary Linear Pair Postulate
4.x◦n+y◦n= 180 ◦ Definition of supplementary angles
5.(x◦ 1 +x 2 ◦+...+x◦n)+(y◦ 1 +y◦ 2 +...+y◦n) = 180 ◦n Sum of all interior and exterior angles in ann−gon
6.(n− 2 ) 180 ◦= (x◦ 1 +x◦ 2 +...+x◦n) Polygon Sum Formula- 180◦n= (n− 2 ) 180 ◦+(y◦ 1 +y◦ 2 +...+y◦n) Substitution PoE
- 180◦n= 180 ◦n− 360 ◦+(y◦ 1 +y◦ 2 +...+y◦n) Distributive PoE
- 360◦= (y◦ 1 +y◦ 2 +...+y◦n) Subtraction PoE
Example A
What isy?
yis an exterior angle, as well as all the other given angle measures. Exterior angles add up to 360◦, so set up an
equation.
70 ◦+ 60 ◦+ 65 ◦+ 40 ◦+y= 360 ◦
y= 125 ◦Example B
What is the measure of each exterior angle of a regular heptagon?
Because the polygon is regular, each interior angle is equal. This also means that all the exterior angles are equal.
The exterior angles add up to 360◦, so each angle is^360
◦
7 ≈^51.^43
◦.
Example C
What is the sum of the exterior angles in a regular 15-gon?
The sum of the exterior angles in any convex polygon, including a regular 15-gon, is 360◦.
Watch this video for help with the Examples above.