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Chapter 6 Section 6.1 Polygons.

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1 Chapter 6 Section 6.1 Polygons

2 180o 3x = 180 3x + 87 = 180 3x = 93 x = 31 Equilateral Equiangular

3 Examples of Polygons Identify, Name, and Describe Polygons Definition
Definition Polygon A polygon is a plane figure that is formed by three or more segments called sides, such that no two sides with a common endpoint are collinear, and each side intersects exactly two other sides, one at each endpoint. Each endpoint is called a vertex of the polygon Examples of Polygons

4 No: All sides must be straight
Identify, Name, and Describe Polygons No: All sides must be straight No: All sides must be straight Yes

5 Identify, Name, and Describe Polygons
Names Names Polygon Names A polygons name depends on the number of sides it has # of Sides Name 3 Triangle 4 Quadrilateral 5 Pentagon 6 Hexagon 7 Heptagon # of Sides Name 8 Octagon 9 Nonagon 10 Decagon 12 Dodecagon N N-gon

6 Non-Convex/Concave: A polygon that is not convex
Identify, Name, and Describe Polygons Descriptions Descriptions Describing Polygons A polygons description depends on its shape Convex: No line that contains a side of the polygon contains a point in the interior of the polygon Non-Convex/Concave: A polygon that is not convex Examples

7 Hexagon Concave Heptagon Heptagon Concave Convex
Identify, Name, and Describe Polygons Hexagon Concave Heptagon Heptagon Concave Convex

8 Identify, Name, and Describe Polygons
Heptagon BCDEFGA DEFGABC

9 Identify, Name, and Describe Polygons
C, D, E, F

10 Identify, Name, and Describe Polygons

11 Sum interior angles of a quadrilateral
Theorem Theorem 6.1 Interior Angles of a Quadrilateral The sum of the measures of the interior angles of a quadrilateral is 360o mH + mG + mF + mE = 360o

12 Sum interior angles of a quadrilateral
(x + 15) + (x + 15) + (2x) + (2x) = 360 6x + 30 = 360 6x = 330 x = 55

13 Sum interior angles of a quadrilateral
(5x - 15) + (3x - 1) + (4x + 34) + (5x - 15) = 360 17x + 3 = 360 17x = 357 x = 21

14 Sum interior angles of a quadrilateral
(4x - 15) + (5x + 11) + (6x + 19) + (5x + 5) = 360 20x + 20 = 360 20x = 340 x = 17

15 HW #66 Pg 325-328 12-20 Even, 21-23, 24-38 Even 42-52 Even

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