It's an Arrangement of Polygonal Regions Having O

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Polygonal Region: It’s a polygon together with its interior. Tessellation: It’s an arrangement of polygonal regions having only sides in common that completely covers the plane. A triangle can be used to make a tessellation: A trapezoid can be used to make a tessellation: Regular Tessellation: It’s a tessellation that only uses a single type of regular polygonal region. 3-gon or equilateral triangle Vertex angle is 60. 4-gon or square Vertex angle is 90. 6-gon or regular hexagon Vertex angle is 120. Regular tessellations can only be formed if the measure of a vertex angle of the underlying regular polygon is a factor of 360. 5-gon or regular pentagon Vertex angle is 108, which is not a factor of 360. 7-gon or regular septagon 5 Vertex angle is 7 180 = 128. 571428 , which is not a factor of . 8-gon or regular octagon Vertex angle is 135, which is not a factor of360 . The only regular tessellations use 3-gons, 4-gons, or 6-gons. Vertex Arrangement: Tessellations are described by selecting a vertex and listing the number of sides of the polygonal regions that surround it in either a clockwise or a counterclockwise direction. This description is called a vertex arrangement. 3 3 3 3 3 3 The vertex arrangement is (333333,,,,,). 4 4 4 4 The vertex arrangement is (4444,,,). 6 6 6 The vertex arrangement is (666,,). Semiregular Tessellation: It’s a tessellation that uses two or more regular polygonal regions with congruent sides with all the vertex arrangements identical. Octagons and Squares: 4 8 8 The vertex arrangement can be described by (4,, 8 8), (8,, 8 4) or (8,, 4 8), but they’re all the same. Hexagons and Triangles: 6 3 3 6 (3 ,,, 6 3 6) or (6,,, 3 6 3) There are tessellations using two or more regular polygonal regions that don’t have the same vertex arrangement at each vertex. 3 3 4 12 3 3 3 3 3 3 Intersections of Polygons: Example: Two rectangles. 1 intersection point 2 intersection points 3 intersection points 4 intersection points 6 intersection points 5 intersection points 8 intersection points 7 intersection points .

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