tresnonagintagonal

Tresnonagintagonal refers to a polygon with ninety-three sides. The term is derived from Latin, with "tres" meaning three, "nonaginta" meaning ninety, and "agonal" relating to angles or sides. Therefore, a tresnonagintagonal polygon is a closed geometric figure that has exactly ninety-three straight sides and ninety-three vertices. In a simple, convex tresnonagintagonal polygon, all interior angles are less than 180 degrees, and all vertices point outwards. The sum of the interior angles of any simple polygon, including a tresnonagintagonal one, can be calculated using the formula (n-2) * 180 degrees, where 'n' represents the number of sides. For a tresnonagintagonal polygon, this sum would be (93-2) * 180 = 91 * 180 = 16,380 degrees. The measure of each interior angle in a regular tresnonagintagonal polygon, where all sides and angles are equal, would be 16,380 degrees divided by 93, which is approximately 176.13 degrees. Due to its high number of sides, a tresnonagintagonal polygon would appear very close to a circle when drawn.