Section 9.2 Polygons

1. Section 9.2Polygons

2. What You Will Learn • Polygons • Similar Figures • Congruent Figures

3. Polygons • A polygon is a closed figure in a plane determined by three or more straight line segments.

4. Polygons • The straight line segments that form the polygon are called its sides, and a point where two sides meet is called a vertex (plural, vertices). • The union of the sides of a polygon and its interior is called a polygonal region. • A regular polygon is one whose sides are all the same length and whose interior angles all have the same measure.

5. Number of Sides Name Number of Sides Name 3 Triangle 8 Octagon 4 Quadrilateral 9 Nonagon 5 Pentagon 10 Decagon 6 Hexagon 12 Dodecagon 7 Heptagon 20 Icosagon Polygons • Polygons are named according to their number of sides.

6. Polygons • The sum of the measures of the interior angles of an n-sided polygon is (n – 2)180º.

7. Types of Triangles Acute Triangle All angles are acute. Obtuse Triangle One angle is obtuse.

8. Types of Triangles (continued) Right Triangle One angle is a right angle. Isosceles Triangle Two equal sides. Two equal angles.

9. Types of Triangles (continued) Equilateral Triangle Three equal sides. Three equal angles, 60º each. Scalene Triangle No two sides are equal in length.

10. 9 6 4 6 6 4 3 4.5 Similar Figures • Two figures are similar if their corresponding angles have the same measure and the lengths of their corresponding sides are in proportion.

11. Example 3: Using Similar Triangles to Find the Height of a Tree Monique Currie plans to remove a tree from her backyard. She needs to know the height of the tree. Monique is 6 ft tall and determines that when her shadow is 9 ft long, the shadow of the tree is 45 ft long (see Figure). How tall is the tree?

12. Example 3: Using Similar Triangles to Find the Height of a Tree

13. Example 3: Using Similar Triangles to Find the Height of a Tree • Solution • Let x represent the height of the tree The tree is 30 ft tall.

14. Congruent Figures • If corresponding sides of two similar figures are the same length, the figures are congruent. • Corresponding angles of congruent figures have the same measure.

15. Quadrilaterals • Quadrilaterals are four-sided polygons, the sum of whose interior angles is 360º. • Quadrilaterals may be classified according to their characteristics.

16. Quadrilaterals Trapezoid Two sides are parallel. Parallelogram Both pairs of opposite sides are parallel. Both pairs of opposite sides are equal in length.

17. Quadrilaterals Rhombus Both pairs of opposite sides are parallel. The four sides are equal in length. Rectangle Both pairs of opposite sides are parallel. Both pairs of opposite sides are equal in length. The angles are right angles.

18. Quadrilaterals Square Both pairs of opposite sides are parallel. The four sides are equal in length. The angles are right angles.

19. Example 5: Angles of a Trapezoid Trapezoid ABCD is shown. a) Determine the measure of the interior angle, x. b) Determine the measure of the exterior angle, y.

20. Example 5: Angles of a Trapezoid Solution a) Determine themeasure of theinterior angle, x.

21. Example 5: Angles of a Trapezoid Solution b) Determine themeasure of theexterior angle, y.