11 Area of Regular Polygons and Circles

1. 11 Area of Regular Polygons and Circles 11.1 Angles in Polygons

2. Quick Review • Polygon—any closed figure with straight sides that do not cross one another • Regular Polygon—a polygon with all congruent sides and all congruent angles • Vertex—Where two sides of a polygon meet • Interior angle—angle formed on the inside of a polygon by two adjacent sides • Exterior angle—angle formed on the exterior of a polygon by a vertex and a line drawn from the vertex.

3. Angles in Polygons • Sum of Interior Angles: • (n-2)180° = Sum of Int. < • Where “n” is the number of sides in the polygon. • (the number of sides will be the same as the number of angles) • Sum of Exterior Angles • The sum of the Ext. <‘s in any polygon is 360°.

4. Example: • Find the sum of the interior angles in a convex Hexagon. • Hexagon is 6-sided. • (6-2)180 ° = 720° • How many sides does a polygon have if each exterior angle measures 45 °? • 360/45 = 8 • This is an 8-sided polygon, aka Octagon.

5. Find the measure of x • How many sides? • 6 • Sum of Interior Angles? • (6-2)180 ° = 720 ° • The sum of the given angles: • 120 +90+110+130+160=610 • 720 ° -610 ° = 110 ° • x = 110 °

6. Find the value of x and the measure of each angle. • How many sides? • 5 • Sum of Angles:? • (5-2)180 = 540 • 25x + 40 = 540 • 25x = 500 • x = 20 • 102° , 65°, 168°, 95°, 110°

7. Find the value of each interior angle in each Regular Polygon… • A Nonagon. • 9-sides • (9-2)180° = 1260° • 1260°/9 = 140° • There are 140° in each interior angle of a Nonagon. • A 15-gon • 15 sides • (15-2)180° = 2340° • 2340°/15 = 156° • There are 156° in each interior angle of a 15-gon.

8. Finding the Number of sides • If you are given one interior angle of a regular polygon, you can use that info to find the number of sides. • Int. Angle = 160° • Ext. Angle = 180 ° - 160 ° = 20° • 360 ° /20 ° = 18 • There are 18 sides in this polygon.

9. Your Turn: • Find the sum of the measures of all interior angles of the following: • Decagon— • 1440° • Heptagon— • 900° • Dodecagon— • 1800° • Find the measure of each interior angle in a Regular – • Decagon— • 144° • Heptagon— • ≈ 128.6 • Dodecagon— • 150°

10. Your Turn, Exterior Angles: • Find the Sum of the Exterior Angles in a: • Decagon • 360° • Heptagon • 360° • Dodecagon • 360° • Find the measure of each Exterior Angle of a Regular … • Decagon • 36° • Heptagon • ≈ 51.4° • Dodecagon • 30°

11. Your turn again. • How many sides does a polygon have if each interior angle has… • 165.6° • 25 sides • 162° • 20 sides • 120° • 6sides • How many sides does a regular polygon have if each exterior angle has a measure of… • 20° • 18 sides • 40° • 9 sides • 15° • 24 sides

12. Homework • Vocab: Know the names and number of sides of all the polygons from triangle to dodecagon (except the 11-gon) • Pg. 665-668 #6-25 All; 49-54 All; 58-61 All