A polygon is a simple closed curve. A two-dimensional closed figure bounded with three or more than three straight lines is called a polygon. Triangles, square, rectangle, pentagon, hexagon, are some examples of polygons. Show The segments are referred to as the sides of the polygon. The points at which the segments meet are called vertices. Segments that share a vertex are called adjacent sides. A segment whose endpoints are nonadjacent vertices is called a diagonal. See the picture below. (Image to be added soon) The below figures show some of the examples of polygons or polygonal curves( a closed curve that is not a polygon). (Image to be added soon)(Image to be added soon)(Image to be added soon) In figure you can see that all the shapes are polygons, as all the shapes are drawn joining the straight lines only. There are no curved lines.. But in figure the shape is not a polygon because it is not fully connected and also has curved lines and such shapes that have curves are called a closed curve that is not a polygon. In this article let us study what is polygon and regular polygon formulas. Types of PolygonsAs we know what is the meaning of polygon let us understand different types of polygons. They are as follows,
Regular PolygonPolygons whose sides and angles are of equal lengths are called regular polygons. (Image to be added soon) Irregular PolygonPolygons with different sizes and different interior angles are called irregular polygons. (Image to be added soon) Convex PolygonPolygons with interior angles less than 1800 are called convex polygons. (Image to be added soon) Concave PolygonsPolygons with interior angles greater than 1800 are called concave polygons. Some Popular PolygonsHere is the list of some of the regular polygons with the number of polygon sides, shapes, and measures of its interior angles.
Regular Polygon Formulas(Image to be added soon) Some of the regular polygon formulas related to polygons are:
Sum of Interior angles of Polygon(IA) = (n-2) x 180
Exterior angle of a regular polygon(EA) = 360/n
Interior angle of a regular polygon = \[\frac{(n-2)180}{n}\]
Diagonal of Polygon = \[\frac{n(n-3)}{2}\]
Perimeter of Polygon(P) = n x s
Area of Polygon(A) = s/ 2 tan (180/n) Solved ExamplesExample 1: A polygon is an octagon and its side length is 6 cm. Calculate its perimeter and value of one interior angle. Solution: The polygon is an octagon, so we have, n = 8 Length of one side, s = 6 cm The perimeter of the octagon P = n × s P = 8 × 6 =48 cm. Now, for the interior angle, we have Interior angle of a regular polygon = \[\frac{(n-2)180}{n}\] = ( 8 - 2) x 180/ 8 = 6 x 180 /8 = 1350 Therefore the perimeter of the octagon is 48cm and the value of one of the interior angles is 1350. Example 2: Calculate the measure of one interior angle of a regular hexadecagon (16 sided polygon)? Solution: The polygon is an hexadecagon, so we have, n = 16 Interior angle of a regular polygon (IA) = \[\frac{(n-2)180}{n}\] IA = ( 16 - 2) x 180 / 16 = 14 x 180 /16 = 157.50 Therefore measure of interior angle of a regular hexagon is 157.50. Example 3: Calculate the measure of 1 exterior angle of a regular pentagon? Solution: the polygon is a pentagon , so we have n = 5 An exterior angle of a regular polygon (EA) = 360/n = 360/ 5 = 720 Therefore the measure of an exterior angle of a regular pentagon is 720. Quiz Time
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