10.12: Area of Regular Polygons
What if you were asked to find the distance across The Pentagon in Arlington, VA? The Pentagon, which also houses the Department of Defense, is composed of two regular pentagons with the same center. The entire area of the building is 29 acres (40,000 square feet in an acre), with an additional 5 acre courtyard in the center. The length of each outer wall is 921 feet. What is the total distance across the pentagon? Round your answer to the nearest hundredth. After completing this Concept, you'll be able to answer questions like this.
Watch This
CK12 Foundation: Chapter10AreaofRegularPolygonsA
Learn more about the area of regular polygons by watching the video at this link.
Guidance
A regular polygon is a polygon with congruent sides and angles. Recall that the perimeter of a square is 4 times the length of a side because each side is congruent. We can extend this concept to any regular polygon.
Perimeter of a Regular Polygon: If the length of a side is
In order to find the area of a regular polygon, we need to define some new terminology. First, all regular polygons can be inscribed in a circle. So, regular polygons have a center and radius, which are the center and radius of the circumscribed circle. Also like a circle, a regular polygon will have a central angle formed. In a regular polygon, however, the central angle is the angle formed by two radii drawn to consecutive vertices of the polygon. In the picture below, the central angle is
The area of each triangle is
Area of a Regular Polygon: If there are
Example A
What is the perimeter of a regular octagon with 4 inch sides?
If each side is 4 inches and there are 8 sides, that means the perimeter is 8(4 in) = 32 inches.
Example B
The perimeter of a regular heptagon is 35 cm. What is the length of each side?
If
Example C
Find the length of the apothem in the regular octagon. Round your answer to the nearest hundredth.
To find the length of the apothem,
To find
Watch this video for help with the Examples above.
CK12 Foundation: Chapter10AreaofRegularPolygonsB
Concept Problem Revisited
From the picture below, we can see that the total distance across the Pentagon is the length of the apothem plus the length of the radius. If the total area of the Pentagon is 34 acres, that is 2,720,000 square feet. Therefore, the area equation is
Therefore, the total distance across is
Vocabulary
Perimeter is the distance around a shape. The perimeter of any figure must have a unit of measurement attached to it. If no specific units are given (feet, inches, centimeters, etc), write “units.” Area is the amount of space inside a figure. Area is measured in square units. The center and radius of a regular polygon is the center and radius of the circumscribed circle. An apothem is a line segment drawn from the center of a regular polygon to the midpoint of one of its sides.
Guided Practice
1. Find the area of the regular octagon in Example C.
2. Find the area of the regular polygon with radius 4.
3. The area of a regular hexagon is
Answers:
1. The octagon can be split into 8 congruent triangles. So, if we find the area of one triangle and multiply it by 8, we will have the area of the entire octagon.
2. In this problem we need to find the apothem and the length of the side before we can find the area of the entire polygon. Each central angle for a regular pentagon is
Using these two pieces of information, we can now find the area.
3. Plug in what you know into both the area and the perimeter formulas to solve for the length of a side and the apothem.
Practice
Use the regular hexagon below to answer the following questions. Each side is 10 cm long.
 Each dashed line segment is
a(n) ________________.  The red line segment is
a(n) __________________.  There are _____ congruent triangles in a regular hexagon.
 In a regular hexagon, all the triangles are _________________.
 Find the radius of this hexagon.
 Find the apothem.
 Find the perimeter.
 Find the area.
Find the area and perimeter of each of the following regular polygons. Round your answer to the nearest hundredth.
 If the perimeter of a regular decagon is 65, what is the length of each side?
 A regular polygon has a perimeter of 132 and the sides are 11 units long. How many sides does the polygon have?
 The area of a regular pentagon is
440.44 in2 and the perimeter is 80 in. Find the length of the apothem of the pentagon.  The area of a regular octagon is
695.3 cm2 and the sides are 12 cm. What is the length of the apothem?
A regular 20gon and a regular 40gon are inscribed in a circle with a radius of 15 units.

Challenge Derive a formula for the area of a regular hexagon with sides of length
s . Your only variable will bes . HINT: Use 306090 triangle ratios. 
Challenge in the following steps you will derive an alternate formula for finding the area of a regular polygon with
n sides. We are going to start by thinking of a polygon with \begin{align*}n\end{align*} sides as \begin{align*}n\end{align*} congruent isosceles triangles. We will find the sum of the areas of these triangles using trigonometry. First, the area of a triangle is \begin{align*}\frac{1}{2} bh\end{align*}. In the diagram to the right, this area formula would be \begin{align*}\frac{1}{2} sa\end{align*}, where \begin{align*}s\end{align*} is the length of a side and \begin{align*}a\end{align*} is the length of the apothem. In the diagram, \begin{align*}x\end{align*} represents the measure of the vertex angle of each isosceles triangle. The apothem, \begin{align*}a\end{align*}, divides the triangle into two congruent right triangles. The top angle in each is \begin{align*}\frac{x^\circ}{2}\end{align*}. Find \begin{align*}\sin \left( \frac{x^\circ}{2} \right)\end{align*} and \begin{align*}\cos \left( \frac{x^\circ}{2} \right)\end{align*}.
 Solve your \begin{align*}\sin\end{align*} equation to find an expression for \begin{align*}s\end{align*} in terms of \begin{align*}r\end{align*} and \begin{align*}x\end{align*}.
 Solve your \begin{align*}\cos\end{align*} equation to find an expression for \begin{align*}a\end{align*} in terms of \begin{align*}r\end{align*} and \begin{align*}x\end{align*}.
 Substitute these expressions into the equation for the area of one of the triangles, \begin{align*}\frac{1}{2} sa\end{align*}.
 Since there will be \begin{align*}n\end{align*} triangles in an ngon, you need to multiply your expression from part d by \begin{align*}n\end{align*} to get the total area.
 How would you tell someone to find the value of \begin{align*}x\end{align*} for a regular ngon?
Use the formula you derived in problem 18 to find the area of the regular polygons described in problems 1922. Round your answers to the nearest hundredth.
 Decagon with radius 12 cm.
 20gon with radius 5 in.
 15gon with radius length 8 cm.
 45gon with radius length 7 in.
Image Attributions
Description
Learning Objectives
Here you'll learn how to calculate the area and perimeter of a regular polygon.