Exterior Angle (Regular Polygon) – Formula Practice

Find the exterior angle of a square.

Explanation

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Statement

The exterior angle of a regular polygon is the angle formed between one side of the polygon and the extension of its neighbouring side. For any regular polygon (where all sides and angles are equal), the formula is:

\[\text{Exterior angle} = \frac{360^\circ}{n}\]

where \(n\) is the number of sides of the polygon.

Why it works

The sum of all exterior angles of any polygon is always \(360^\circ\), no matter how many sides it has.
In a regular polygon, all exterior angles are equal. So if there are \(n\) sides, then each exterior angle is \(360^\circ \div n\).
This fact also helps calculate the interior angles, since interior and exterior angles are supplementary: \[\text{Interior angle} = 180^\circ - \text{Exterior angle}\].

Recipe (Steps to Apply)

Identify the number of sides \(n\).
Apply the formula \(\text{Exterior angle} = \tfrac{360^\circ}{n}\).
If required, calculate the interior angle using \(180^\circ - \text{Exterior angle}\).

Spotting it

Use this formula when a question involves regular polygons, and you are asked to find the size of an exterior angle, or to determine the number of sides from a given angle.

Common pairings

Interior angle of a regular polygon.
Number of sides of a polygon given its angles.
Sum of interior angles: \((n-2)\times 180^\circ\).

Mini examples

Square: \(n=4\). Exterior angle = \(360^\circ / 4 = 90^\circ\).
Regular hexagon: \(n=6\). Exterior angle = \(360^\circ / 6 = 60^\circ\).

Pitfalls

Forgetting that this formula only works for regular polygons (all sides equal).
Mixing up exterior and interior angles.
Forgetting that the sum of all exterior angles is always \(360^\circ\).

Exam Strategy

If asked for number of sides, rearrange the formula: \(n = 360^\circ / \text{Exterior angle}\).
Always label whether you are calculating interior or exterior angles.
Check answers make sense (angles should be less than 180° for convex polygons).

Worked Micro Example

Find the exterior angle of a regular decagon (10 sides).

\(\tfrac{360^\circ}{10} = 36^\circ\).

So each exterior angle = \(36^\circ\).

Summary

The exterior angle of a regular polygon is found by dividing \(360^\circ\) by the number of sides. This result is fundamental in polygon geometry and is closely linked to interior angles and polygon classification.

Worked examples

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Find the exterior angle of a square.
1. \( n=4 \)
2. \( Exterior=360/4=90 \)
Answer: 90
Find the exterior angle of a regular hexagon.
1. \( n=6 \)
2. \( Exterior=360/6=60 \)
Answer: 60
Find the exterior angle of a regular octagon.
1. \( n=8 \)
2. \( Exterior=360/8=45 \)
Answer: 45
Find the exterior angle of a regular decagon (10 sides).
1. \( n=10 \)
2. \( Exterior=360/10=36 \)
Answer: 36
A regular polygon has exterior angle 120. Find the number of sides.
1. \( n=360/120=3 \)
Answer: 3
A regular polygon has exterior angle 72. Find the number of sides.
1. \( n=360/72=5 \)
Answer: 5
Find the interior angle of a regular hexagon.
1. \( Exterior=360/6=60 \)
2. \( Interior=180-60=120 \)
Answer: 120
Find the interior angle of a regular octagon.
1. \( Exterior=360/8=45 \)
2. \( Interior=180-45=135 \)
Answer: 135
A regular polygon has interior angle 150. Find number of sides.
1. \( Exterior=180-150=30 \)
2. \( n=360/30=12 \)
Answer: 12
A regular polygon has interior angle 140. Find number of sides.
1. \( Exterior=40 \)
2. \( n=360/40=9 \)
Answer: 9