11-2 Areas of Regular Polygons
Holt Geometry
Warm UpWarm Up
Lesson PresentationLesson Presentation
Lesson QuizLesson Quiz
Warm UpFind the unknown side lengths in each special right triangle.
1. a 30°-60°-90° triangle with hypotenuse 2 ft
2. a 45°-45°-90° triangle with leg length 4 in.
3. a 30°-60°-90° triangle with longer leg length 3m
11.2 Areas of Regular Polygons
Develop and apply the formula for the area of a regular polygon.
Objectives
11.2 Areas of Regular Polygons
ApothemCenter of a PolygonRadius of a Polygoncentral angle of a regular polygon
Vocabulary
11.2 Areas of Regular Polygons
The center of a regular polygon is equidistant from
the vertices. The apothem is the distance from the
center to a side. A central angle of a regular
polygon has its vertex at the center, and its sides
pass through consecutive vertices. Each central
angle measure of a regular n-gon is
11.2 Areas of Regular Polygons
Regular pentagon DEFGH has a center C, apothem BC, and central angle DCE.
11.2 Areas of Regular Polygons
Finding the Area of Regular Polygons
To find the area of a regular n-gon with side length s and apothem a, divide it into n congruent isosceles triangles.
The perimeter is P = ns.
area of each triangle:
total area of the polygon:
11.2 Areas of Regular Polygons
Find the area of regular heptagon with side length 2 ft to the nearest tenth.
Example 3A: Finding the Area of a Regular Polygon
Draw a segment that bisects the central angle and the side of the polygon to form a right triangle.
Step 1 Draw the heptagon. Draw an isosceles
triangle with its vertex at the center of the
heptagon. The central angle is .
11.2 Areas of Regular Polygons
Example 3A Continued
tan 25.7 1
a
Solve for a.
The tangent of an angle is . opp. legadj. leg
Step 2 Use the tangent ratio to find the apothem.
11.2 Areas of Regular Polygons
Example 3A Continued
Step 3 Use the apothem and the given side length to find the area.
Area of a regular polygon
The perimeter is 2(7) = 14ft.
Simplify. Round to the nearest tenth.
A 14.5 ft2
11.2 Areas of Regular Polygons
The tangent of an angle in a right triangle is the ratio of the opposite leg length to the adjacent leg length. See page 525.
Remember!
11.2 Areas of Regular Polygons
Example 3B: Finding the Area of a Regular Polygon
Find the area of a regular dodecagon with side length 5 cm to the nearest tenth.
Draw a segment that bisects the central angle and the side of the polygon to form a right triangle.
Step 1 Draw the dodecagon. Draw an isosceles
triangle with its vertex at the center of the
dodecagon. The central angle is .
11.2 Areas of Regular Polygons
Example 3B Continued
Solve for a.
The tangent of an angle is . opp. legadj. leg
Step 2 Use the tangent ratio to find the apothem.
11.2 Areas of Regular Polygons
Example 3B Continued
Step 3 Use the apothem and the given side length to find the area.
Area of a regular polygon
The perimeter is 5(12) = 60 ft.
Simplify. Round to the nearest tenth.
A 279.9 cm2
11.2 Areas of Regular Polygons
Check It Out! Example 3
Find the area of a regular octagon with a side length of 4 cm.
Draw a segment that bisects the central angle and the side of the polygon to form a right triangle.
Step 1 Draw the octagon. Draw an isosceles triangle
with its vertex at the center of the octagon. The
central angle is .
11.2 Areas of Regular Polygons
Step 2 Use the tangent ratio to find the apothem
Solve for a.
Check It Out! Example 3 Continued
The tangent of an angle is . opp. legadj. leg
11.2 Areas of Regular Polygons
Step 3 Use the apothem and the given side length to find the area.
Check It Out! Example 3 Continued
Area of a regular polygon
The perimeter is 4(8) = 32cm.
Simplify. Round to the nearest tenth.
A ≈ 77.3 cm2
11.2 Areas of Regular Polygons
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