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I. OBJECTIVES. At the end of 60-minute period with 80% proficiency level, the students are expected to: a. define a polygon; b. illustrate the different classifications of polygons; and. c. appreciate the value of polygons to real-life situations. II. SUBJECT MATTER. a. Topic: Polygons. b. Competency: Illustrate polygons: (a) angles, and (b) sides.
We tend to encounter polygons mostly while we learn about geometry. In this lesson, let us learn about polygons definition, regular polygons, polygon sides, and the properties of polygons, along with polygon examples and their identification.
13 Μαρ 2012 · Jessica. This document defines and provides examples of different types of polygons. It explains that a polygon is a closed figure made of line segments that intersect exactly two others. It then defines regular and irregular polygons, as well as different types of triangles, quadrilaterals, pentagons, hexagons, and other polygons.
Introduction. This document aims to guide the reader into the world of polytopes, focusing on the familiar setting of polygons, the two-dimensional polytopes. We will assume the reader is comfortable with the Cartesian plane and ordered pairs of numbers. Let's get right into it! Intuitively, polygons are certain 2-dimensional shapes.
A polygon is a planar figure defined by a limited number of straight line segments joined to create a closed polygonal chain in geometry (or polygonal circuit). A polygon can be specified as a bounding circuit, a bounded planar area, or both. The segments are the edges or sides of a polygonal circuit.
8 Ιουν 2024 · As shown in the above image, the most basic types of polygons found in everyday life are: 1) triangle, 2) quadrilateral, 3) pentagon, 4) hexagon, 5) heptagon, 6) octagon, 7) nonagon, and 8) decagon. Given below is the list of the names of polygons with their basic properties: Types of Polygon. Others Ways of Classifying Polygons.
20 Φεβ 2023 · A few comments about polygons: The line segments that make up a polygon are called its edges and the points where they meet are called its vertices (singular: vertex). Because of properties (2) and (3) in the definition, the boundaries of polygons are not self-intersecting. Not a polygon.
