Pentagon
A pentagon is a polygon with five sides and five angles
A pentagon is a polygon with five sides and five angles. The word “pentagon” comes from the Greek words “penta” meaning five and “gonia” meaning angle. Each angle in a regular pentagon measures 108 degrees.
There are two types of pentagons – regular pentagons and irregular pentagons. A regular pentagon has equal side lengths and equal interior angles. All the angles in a regular pentagon are 108 degrees. On the other hand, an irregular pentagon has different side lengths and different interior angles.
To determine the interior angles of an irregular pentagon, you can use the formula: (n-2) * 180 degrees, where n represents the number of sides. So, for a pentagon, it would be (5-2) * 180 = 540 degrees. To find the measure of each angle, you divide the sum of the interior angles by 5 (the number of angles) in this case: 540 / 5 = 108 degrees.
Pentagons have various properties and characteristics. Here are a few important ones:
1. Sum of Interior Angles: The sum of the interior angles in any pentagon is 540 degrees. This can be calculated using the formula mentioned earlier.
2. Sum of Exterior Angles: The sum of the exterior angles in any pentagon is always 360 degrees. Each exterior angle is found by subtracting the interior angle from 180 degrees.
3. Diagonals: A diagonal is a line segment that connects two non-adjacent vertices in a polygon. In a pentagon, there are five diagonals. The formula to find the number of diagonals in any polygon is given by (n * (n-3))/2, where n represents the number of sides. In a pentagon, this becomes (5 * (5-3))/2 = 5 diagonals.
4. Symmetry: A regular pentagon has rotational symmetry of order 5. This means that it can be rotated by an angle of 72 degrees about its center and still appear the same.
Pentagons have diverse applications in various fields, including architecture, design, and mathematics. They play a significant role in the study of geometry and are often used to create aesthetically pleasing designs due to their unique shape and symmetry.
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