Polygons On Basis of Boundaries
Polygons can be categorized based on the nature of their boundaries into two primary types:
- Simple Polygon
- Complex Polygon
Simple Polygon
A Simple Polygon is characterized by a singular, non-intersecting boundary. In other words, it does not cross itself, and it consists of one boundary.
Complex Polygon
On the other hand, a Complex Polygon is defined by intersect itself. It consists of more than one boundary within its structure. In Complex polygons boundary intersects, creating multiple distinct regions within the polygon.
Read More about Types of Polygons.
Polygon – Shape, Formula, Types, and Examples
Polygon in Maths is a two-dimensional shape made up of straight lines that form a closed polygonal chain. The word “polygon” comes from the words “poly” and “gon”, which mean “many” and “sides”.
Polygons can be simple or self-intersecting. A simple polygon does not intersect itself, except at the shared endpoints of consecutive segments. A polygonal chain that crosses over itself creates a self-intersecting polygon. Polygons can also be classified as concave or convex.
In this article, we have mentioned in detail about Polygons and their types, formulas, and examples.
Important Facts about Polygons |
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Sum of Interior Angles of Polygon |
(n–2) × 180° |
Number of Diagonals in Polygon |
n(n–3)/2 |
Interior Angle of Regular Polygon |
{(n–2) × 180°}/n |
Exterior Angle of Regular polygon |
360°/n |
Table of Content
- What are Polygons?
- Polygon Definition
- Polygon Chart based on Number of Sides
- Properties of Polygons
- Polygon Shapes
- Types of Polygons
- Polygons on the Basis of Sides
- Polygons On Basis of Angles
- Polygons On Basis of Boundaries
- Polygon Formulas
- Area of Polygons
- Perimeter of Polygons
- Angles in Polygons
- FAQs
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