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A Regular Polygon with 119 sides: Area, Perimeter, Interior and Exterior Angles, Inradius, Circumradius



A regular polygon with 119 sides where the length of each side is 6 units. The units may either be inches or cm or km or miles: any unit of length.

You are given a Regular Polygon with 119 sides. What are the interior angles and exterior angles? 
If the length of each side is 6 units, what is the perimeter, area, circum-radius and in-radius of the polygon?

n = 119

Perimeter of a polygon with 119 sides = (side length) x 119 = 714 units

Area of a polygon with 119 sides = (n x Sidecot (Π/n))/4 = (n x 6cot (Π/119))/4 = 40558.85 square units

Sum of the interior angles of a polygon with 119 sides = 
 (n-2) x 180 degrees =  (119-2) x 180 degrees = 21060 degrees

Interior Angle of a polygon with 119 sides = (n-2) x 180/n degrees = (119-2) x 180/119 degrees = 176.97 degrees 

Exterior angle of a polygon with 119 sides = 180 - Interior Angle = 180 - 176.97 = 3.02 degrees

Inradius = Radius of In-circle = (side length) x cot (Π/119) = 6 x cot 1 = 227.22 units

Circumradius = Radius of Circum-circle = (side length) x cosec (Π/119) = 6 x cosec 1 degrees = 227.29 units

Symmetry Group = D119  119 rotational symmetries and 119 reflection symmetries. The "D" stands for di-hedral. 




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