Understanding how to calculate angles in polygons is essential in geometry. A polygon is a two-dimensional shape with straight sides. Polygons can be regular (all sides and angles are equal) or irregular (sides and angles are not equal).
Interior Angles
Sum of Interior Angles
The sum of the interior angles of a polygon can be calculated using the formula:
$(n – 2) times 180$
where $n$ is the number of sides in the polygon. For example, a hexagon has 6 sides, so the sum of its interior angles is:
$(6 – 2) times 180 = 720^text{°}$
Individual Interior Angle (Regular Polygons)
For regular polygons, you can find the measure of each individual interior angle by dividing the sum of the interior angles by the number of sides:
$text{Individual Interior Angle} = frac{(n – 2) times 180}{n}$
For example, for a regular pentagon (5 sides):
$frac{(5 – 2) times 180}{5} = frac{540}{5} = 108^text{°}$
Exterior Angles
Sum of Exterior Angles
The sum of the exterior angles of any polygon is always $360^text{°}$, regardless of the number of sides.
Individual Exterior Angle (Regular Polygons)
For regular polygons, the measure of each exterior angle can be found by dividing $360^text{°}$ by the number of sides:
$text{Individual Exterior Angle} = frac{360}{n}$
For example, for a regular octagon (8 sides):
$frac{360}{8} = 45^text{°}$
Examples
Example 1: Calculating Angles in a Regular Hexagon
A regular hexagon has 6 sides. First, find the sum of the interior angles:
$(6 – 2) times 180 = 720^text{°}$
Then, calculate each interior angle:
$frac{720}{6} = 120^text{°}$
Each exterior angle is:
$frac{360}{6} = 60^text{°}$
Example 2: Calculating Angles in an Irregular Quadrilateral
For an irregular quadrilateral (4 sides), the sum of the interior angles is:
$(4 – 2) times 180 = 360^text{°}$
If you know three of the interior angles, you can find the fourth by subtracting their sum from $360^text{°}$. For instance, if the three known angles are $80^text{°}$, $90^text{°}$, and $100^text{°}$, the fourth angle is:
$360 – (80 + 90 + 100) = 90^text{°}$
Conclusion
Knowing how to calculate angles in polygons is crucial for solving many geometric problems. Whether dealing with regular or irregular polygons, the formulas for interior and exterior angles provide a straightforward way to find the measures you need.
3. BBC Bitesize – Angles in Polygons