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Calculating the area of a regular pentagon is a fundamental skill in geometry. A regular pentagon is a five-sided polygon where all angles and sides are equal. This geometric shape can be found in various structures, such as buildings, gardens, and even in nature. Understanding how to calculate its area is crucial for architects, mathematicians, engineers, or anyone working with polygons. By following a simple formula and employing the right techniques, determining the area of a regular pentagon becomes a straightforward task. This article will provide a comprehensive guide on how to calculate the area of a regular pentagon, exploring the formula, step-by-step instructions, and offering practical examples for easy comprehension. Whether you are a student seeking to learn or a professional aiming to refresh your knowledge, this guide will equip you with the necessary tools to confidently calculate the area of a regular pentagon.
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A pentagon is a polygon with five straight sides. Most problems in Geometry class will revolve around a regular pentagon with five equal sides. There are two common ways to calculate the area of a regular pentagon, depending on the information the problem gives.
Steps
Find the area when the side lengths and the medians are known
- Don’t confuse a midline with a radius, which is a line connecting the center to an angle (or vertex) instead of the midpoint of the edge. If the problem only shows side lengths and radiuses, move on to the next method.
- Example 1: calculate the area of a regular pentagon with a side 3 units long and a median line 2 units long.
- In example 1, the area of the triangle = ½ x 3 x 2 = 3 units of area.
- In example 1, the area of the pentagon S = 5 x S(triangle) = 5 x 3 = 15 area units.
Find the area when the side length is known
- Example 2: calculate the area of a pentagon whose side length is 7 units.
- The base of the small triangle is ½ of the side of the pentagon. In example 2, we have the base of the small triangle = ½ x 7 = 3.5 units.
- The angle of the small triangle at the center of the pentagon is always 36º. (The center of the original pentagon is 360º, we have divided it into 10 small triangles: 360 ÷ 10 = 36. So, the angle at the center of the pentagon of each small triangle is 36º.)
- In a right triangle, the tan of an angle is equal to the length of the opposite side divided by the adjacent side.
- The side opposite the 36º angle is the base of the small triangle (½ side of the pentagon). The adjacent side of the 36º angle is the height of the small triangle.
- tan(36º) = opposite/adjacent edge
- In example 2, we have tan(36º) = 3.5 / height of the small triangle
- Height of small triangle x tan(36º) = 3.5
- Small triangle height = 3.5 / tan(36º)
- The height of the small triangle is approximately 4.8 units.
- In example 2, the area of the small triangle = ½bh = ½(3,5)(4.8) = 8.4 area units.
- In example 2, the area of the entire pentagon = 8.4 x 10 = 84 area units.
Use the formula
- Area of a regular pentagon = pa /2, where p is the circumference and a is the length of the median. [2] X Research Source
- If you don’t know the perimeter, calculate from the side lengths: p = 5s, where s is the side length.
- Area of regular pentagon = (5 s 2 ) / (4tan(36º)), where s is the side length.
- tan(36º) = √(5-2√5). [4] X Research Source If the calculator cannot calculate “tan”, use the formula S = (5 s 2 ) / (4√(5-2√5)).
- Area of regular pentagon = (5/2) r 2 sin(72º), where r is the radius.
Advice
- The examples in this article use rounding values to make the problem simpler. If you are measuring actual pentagons with a given side length, the results will be different.
- Irregular pentagons or pentagons with different side lengths will be more difficult to calculate the area. The most appropriate method is to divide the pentagon into triangles and calculate the area of each figure to find the sum. Depending on the case, you may need to draw a larger shape outside the pentagon, calculate the total area and then subtract the outside area.
- If possible, solve with both geometric and formulaic methods, then compare the results to double-check that your answer is correct. The two results will differ slightly (since you don’t go through the steps and round like the geometric method, but enter all the values into the formula and calculate in one go), but the difference is negligible.
- The formulas are derived from the geometric method and the article is no exception. Try to find out how to prove these formulas. Particularly, the formula for calculating the area of a pentagon from the radius will be more difficult to prove than the other formulas. Hint: you need to rely on the double angle formula.
wikiHow is a “wiki” site, which means that many of the articles here are written by multiple authors. To create this article, 25 people, some of whom are anonymous, have edited and improved the article over time.
This article has been viewed 10,261 times.
A pentagon is a polygon with five straight sides. Most problems in Geometry class will revolve around a regular pentagon with five equal sides. There are two common ways to calculate the area of a regular pentagon, depending on the information the problem gives.
In conclusion, calculating the area of a regular pentagon requires a systematic approach and knowledge of its unique properties. By using the formula A = 1/4 * √(5 * (5 + 2√5)) * s^2, where A represents the area of the pentagon and s represents the length of its side, one can accurately determine the area of a regular pentagon. The process involves dividing the pentagon into five congruent triangles, calculating the area of one triangle using trigonometric functions, and then multiplying that value by five to obtain the total area of the pentagon. Additionally, alternate methods such as using the apothem or dividing the pentagon into smaller shapes can also be employed to calculate its area. Overall, understanding the principles and formulas for calculating the area of a regular pentagon is essential in various fields, such as architecture, engineering, and mathematics, where precise measurements and calculations are necessary.
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