![Exterior angle of a regular polygon having n sides is more than that of the polygon having n^2 side by 50^o . Find the no of the sides of each polygon. Exterior angle of a regular polygon having n sides is more than that of the polygon having n^2 side by 50^o . Find the no of the sides of each polygon.](https://haygot.s3.amazonaws.com/questions/1234916_1226802_ans_d7dca94f83bd4699a4b65dbea63e8872.jpg)
Exterior angle of a regular polygon having n sides is more than that of the polygon having n^2 side by 50^o . Find the no of the sides of each polygon.
SOLUTION: In a regular polygon each exterior angle is 150 degrees greater than each exterior. Calculate the number of sides
5.If an exterior angle of a regular polygon is 36 degrees and one of its longest diagonals is 10 centimeter, then its perimeter is equal to(in cm) (1) 100sin18degrees (2) 100sin36degrees (3) 100sin54degrees (4) 100sin72degrees
![Finding the Measures of an Interior Angle and an Exterior Angle of a Regular Polygon | Geometry | Study.com Finding the Measures of an Interior Angle and an Exterior Angle of a Regular Polygon | Geometry | Study.com](https://study.com/cimages/videopreview/videopreview-full/uc9mm7qnxn.jpg)