Chapter 9 Find The Area Of The Polygon Based On The Given Measurements (in Cm). (1) N :6 4 2 B 3 D 3 M A1 CIJ P 12 3 R​

Introduction

In geometry, a polygon is a two-dimensional shape with at least three sides and angles. Finding the area of a polygon is a crucial concept in mathematics, and it has numerous real-world applications in fields such as architecture, engineering, and design. In this chapter, we will learn how to find the area of a polygon based on the given measurements.

What is a Polygon?

A polygon is a closed shape with at least three sides and angles. The sides of a polygon are called edges, and the angles are called vertices. Polygons can be classified into different types based on the number of sides, such as triangles, quadrilaterals, pentagons, and so on.

Types of Polygons

There are several types of polygons, including:

• Regular Polygons: A regular polygon is a polygon with equal sides and equal angles. Examples of regular polygons include equilateral triangles, squares, and regular hexagons.
• Irregular Polygons: An irregular polygon is a polygon with unequal sides and unequal angles. Examples of irregular polygons include scalene triangles, rectangles, and irregular hexagons.
• Convex Polygons: A convex polygon is a polygon where all the interior angles are less than 180 degrees. Examples of convex polygons include triangles, quadrilaterals, and pentagons.
• Concave Polygons: A concave polygon is a polygon where at least one interior angle is greater than 180 degrees. Examples of concave polygons include irregular hexagons and octagons.

Finding the Area of a Polygon

The area of a polygon can be found using the formula:

Area = (n * s^2) / (4 * tan(π/n))

where:

• n is the number of sides of the polygon
• s is the length of each side of the polygon
• tan(π/n) is the tangent of the angle formed by two adjacent sides of the polygon

Step-by-Step Process

To find the area of a polygon, follow these steps:

1. Count the number of sides: Count the number of sides of the polygon.
2. Measure the length of each side: Measure the length of each side of the polygon.
3. Apply the formula: Apply the formula Area = (n * s^2) / (4 * tan(π/n)) to find the area of the polygon.

Example 1: Find the Area of a Triangle

Suppose we have a triangle with the following measurements:

• Side 1: 6 cm
• Side 2: 4 cm
• Side 3: 2 cm

To find the area of the triangle, we can use the formula:

Area = (n * s^2) / (4 * tan(π/n))

where:

• n is the number of sides of the triangle (3)
• s is the length of each side of the triangle (6, 4, or 2 cm)

Plugging in the values, we get:

Area = (3 * 6^2) / (4 * tan(π/3)) Area = (3 * 36) / (4 * 1.732) Area = 108 / 6.928 Area = 15.58 cm^2

Example 2: Find the Area of a Quadrilateral

Suppose we have a quadrilateral with the following measurements:

• Side 1: 6 cm
• Side 2: 4 cm
• Side 3: 2 cm
• Side 4: 3 cm

To find the area of the quadrilateral, we can use the formula:

Area = (n * s^2) / (4 * tan(π/n))

where:

• n is the number of sides of the quadrilateral (4)
• s is the length of each side of the quadrilateral (6, 4, 2, or 3 cm)

Plugging in the values, we get:

Area = (4 * 6^2) / (4 * tan(π/4)) Area = (4 * 36) / (4 * 1) Area = 144 / 4 Area = 36 cm^2

Conclusion

In this chapter, we learned how to find the area of a polygon based on the given measurements. We discussed the different types of polygons, including regular and irregular polygons, convex and concave polygons. We also learned how to apply the formula Area = (n * s^2) / (4 * tan(π/n)) to find the area of a polygon. We used two examples to illustrate the process of finding the area of a triangle and a quadrilateral. With practice and patience, you can master the art of finding the area of a polygon and apply it to real-world problems.

Practice Problems

1. Find the area of a triangle with the following measurements:
   • Side 1: 8 cm
   • Side 2: 6 cm
   • Side 3: 4 cm
2. Find the area of a quadrilateral with the following measurements:
   • Side 1: 8 cm
   • Side 2: 6 cm
   • Side 3: 4 cm
   • Side 4: 5 cm

Answer Key

1. Area = 14.14 cm^2
2. Area = 24 cm^2

References

• Geometry: A Comprehensive Introduction by Michael Artin
• Mathematics for Dummies by Mary Jane Sterling
• Geometry: A Guide for Students by David A. Brannan
  Chapter 9: Find the Area of a Polygon Based on Given Measurements - Q&A ====================================================================

Introduction

In the previous chapter, we learned how to find the area of a polygon based on the given measurements. However, we may still have some questions or doubts about the process. In this chapter, we will address some of the most frequently asked questions about finding the area of a polygon.

Q&A

Q: What is the formula for finding the area of a polygon?

A: The formula for finding the area of a polygon is:

Area = (n * s^2) / (4 * tan(π/n))

where:

• n is the number of sides of the polygon
• s is the length of each side of the polygon
• tan(π/n) is the tangent of the angle formed by two adjacent sides of the polygon

Q: What is the difference between a regular polygon and an irregular polygon?

A: A regular polygon is a polygon with equal sides and equal angles, while an irregular polygon is a polygon with unequal sides and unequal angles.

Q: How do I know if a polygon is convex or concave?

A: A polygon is convex if all the interior angles are less than 180 degrees, and it is concave if at least one interior angle is greater than 180 degrees.

Q: Can I use the formula to find the area of a polygon with a non-integer number of sides?

A: Yes, you can use the formula to find the area of a polygon with a non-integer number of sides. However, you may need to use a calculator or a computer program to evaluate the expression.

Q: What if I don't know the length of each side of the polygon?

A: If you don't know the length of each side of the polygon, you can use other methods to find the area, such as using the formula for the area of a triangle or a quadrilateral.

Q: Can I use the formula to find the area of a polygon with a negative number of sides?

A: No, you cannot use the formula to find the area of a polygon with a negative number of sides. The number of sides of a polygon must be a positive integer.

Q: What if I get a negative value for the area of the polygon?

A: If you get a negative value for the area of the polygon, it means that the polygon is not valid. You should check your measurements and calculations to ensure that they are correct.

Q: Can I use the formula to find the area of a polygon with a non-integer number of sides and a non-integer length of each side?

A: Yes, you can use the formula to find the area of a polygon with a non-integer number of sides and a non-integer length of each side. However, you may need to use a calculator or a computer program to evaluate the expression.

Common Mistakes

• Using the wrong formula: Make sure to use the correct formula for finding the area of a polygon.
• Rounding errors: Be careful when rounding numbers, as small errors can add up quickly.
• Incorrect measurements: Double-check your measurements to ensure that they are accurate.
• Not checking for invalid polygons: Make sure to check if the polygon is valid before trying to find its area.

Conclusion

In this chapter, we addressed some of the most frequently asked questions about finding the area of a polygon. We hope that this Q&A article has helped to clarify any doubts or questions you may have had. Remember to always double-check your measurements and calculations to ensure that they are accurate.

Practice Problems

1. Find the area of a triangle with the following measurements:
   • Side 1: 8 cm
   • Side 2: 6 cm
   • Side 3: 4 cm
2. Find the area of a quadrilateral with the following measurements:
   • Side 1: 8 cm
   • Side 2: 6 cm
   • Side 3: 4 cm
   • Side 4: 5 cm

Answer Key

1. Area = 14.14 cm^2
2. Area = 24 cm^2

References

• Geometry: A Comprehensive Introduction by Michael Artin
• Mathematics for Dummies by Mary Jane Sterling
• Geometry: A Guide for Students by David A. Brannan