Find the sum of the measures of the exterior angles of a convex 39-gon?
good but you can do better
mariel are you a baddie fr
(180(n-2))/n is the formula for calculating the interior angle of a polygon, where n is the number of sides. so, 180 * 37 /39 = 170.769230769 about.
the exterior angle is 180 - 170.769230769 = 9.23076923 about.
Multiply that by the number of angles, 39, to get 9.23076923 * 39 exactly 360 degrees. I know its long but it is how to pound it out. Good luck
hi
To find the sum of the measures of the exterior angles of a convex polygon, you can use the formula:
Sum of exterior angles = 360 degrees
For any convex polygon, regardless of the number of sides, the sum of the measures of the exterior angles will always be 360 degrees.
Therefore, in the case of a convex 39-gon, the sum of the measures of its exterior angles will also be 360 degrees.