Exterior Angle Formula Properties and Solved Examples for Triangles and Polygons
The concept of Exteror Angle is a crucial part of geometry, especially when studying polygons and triangles. Understanding exterior angles is fundamental for solving geometry problems in school, competitive exams like JEE and NEET, and for recognizing shapes and patterns in everyday life.
Understanding Exterior Angles
An exterior angle is formed when one side of a polygon or triangle is extended outwards. The angle between this extension and the adjacent side is known as the exterior angle. In any polygon, at each vertex, you can draw an exterior angle. Understanding the relationship between exterior and interior angles helps students confidently solve various geometry problems.
For triangles, the exterior angle is always equal to the sum of the two non-adjacent interior angles. For polygons, the sum of all exterior angles, one at each vertex, is always 360°, no matter how many sides the polygon has.
For example, in a triangle ABC, extend side BC to D. The angle CBD is the exterior angle at vertex B. This concept is widely used in geometry, construction, and even in designing everyday objects.
Formulas and Properties of Exterior Angles
Here are the key formulas associated with exterior angles:
- Exterior Angle Sum Formula (Polygons): The sum of the exterior angles of any polygon (one angle at each vertex) is always 360°.
- Exterior Angle of a Regular Polygon: Each exterior angle = \( \frac{360^\circ}{n} \), where n = number of sides.
- Exterior Angle Theorem (Triangles): The measure of an exterior angle of a triangle equals the sum of the measures of the two opposite (remote) interior angles.
These formulas make it easier to calculate missing angles, solve geometry questions, and check your work during exams.
Worked Examples
Example 1: Exterior Angle of a Triangle
In triangle ABC, side BC is extended to point D. If angle A = 40° and angle C = 60°, find the exterior angle at vertex B (angle CBD).
- Apply the Exterior Angle Theorem:
Exterior angle at B = angle A + angle C = 40° + 60° = 100°
Example 2: Exterior Angle of a Regular Hexagon
Find each exterior angle of a regular hexagon.
- There are 6 sides, so n = 6.
- Each exterior angle = \( \frac{360^\circ}{6} = 60^\circ \)
Example 3: Sum of All Exterior Angles in a Pentagon
No matter how many sides, sum of all exterior angles = 360°.
Example 4: Solving for Missing Angle
In a triangle, two interior angles are 55° and 35°. Find the exterior angle at the vertex of the remaining angle.
- Sum the two remote interior angles: 55° + 35° = 90°
- The exterior angle at the third vertex is 90°.
Practice Problems
- Find the exterior angle of a regular octagon.
- If two interior angles of a triangle are 50° and 45°, what is the exterior angle at the third vertex?
- Calculate the sum of exterior angles in a 12-sided polygon.
- If the exterior angle of a regular polygon is 30°, how many sides does the polygon have?
- In quadrilateral ABCD, find an exterior angle at A if the adjacent interior angle is 110°.
- Draw a triangle and extend one side. Measure the exterior angle and compare it to the sum of the two non-adjacent interior angles.
Common Mistakes to Avoid
- Confusing interior and exterior angles—remember, the exterior angle forms outside the polygon at the extended side.
- Forgetting that the sum of all exterior angles, one at each vertex, is always 360°, no matter the number of sides.
- Mixing up the formula for regular polygons—always divide 360° by the number of sides for one exterior angle.
- Ignoring the fact that in a triangle, the exterior angle equals the sum of the two non-adjacent interior angles, not just the adjacent one.
Real-World Applications
Exterior angles play a practical role in construction, navigation, and design. For instance, architects use the sum of exterior angles when designing polygons in floor layouts, engineers calculate angles when creating road turns or bridges, and even artists use exterior and interior angles to ensure accurate patterns in designs. By understanding these concepts, students can see the connection of geometry to real life.
At Vedantu, we simplify complex topics like exterior angles to help students build confidence and solve questions accurately. To study related concepts, explore our pages on Interior Angles of a Polygon and Angles and its Types.
In this topic, we have explored the meaning, properties, and formulas related to exterior angles, with detailed examples and practice problems. This knowledge is essential for tackling geometry questions in both school exams and competitive exams, building a strong foundation in mathematics.
FAQs on Exterior Angles in Geometry Explained Clearly
1. What is an exterior angle in geometry?
An exterior angle is the angle formed when one side of a polygon is extended outward at a vertex. It lies outside the shape and forms a linear pair with the interior angle at that vertex.
- Exterior angle + interior angle = 180° (for polygons).
- In triangles, each exterior angle equals the sum of the two remote interior angles.
- Exterior angles are commonly studied in triangles and regular polygons.
2. What is the formula for the sum of exterior angles of a polygon?
The sum of the exterior angles of any polygon, taken one at each vertex, is always 360°.
- This rule applies to all polygons—regular or irregular.
- It does not depend on the number of sides.
- Example: A pentagon’s exterior angles still add up to 360°.
3. How do you find each exterior angle of a regular polygon?
Each exterior angle of a regular polygon is calculated using the formula 360° ÷ n, where n is the number of sides.
- Step 1: Count the number of sides (n).
- Step 2: Divide 360° by n.
- Example: For a regular hexagon (n = 6), exterior angle = 360° ÷ 6 = 60°.
4. What is the exterior angle theorem in a triangle?
The exterior angle theorem states that an exterior angle of a triangle equals the sum of the two non-adjacent (remote) interior angles.
- If exterior angle = x, and remote interior angles are a and b, then x = a + b.
- This rule is useful for solving missing angles in triangles.
- Example: If remote angles are 40° and 50°, exterior angle = 90°.
5. How are interior and exterior angles related?
An interior angle and its corresponding exterior angle are supplementary, meaning they add up to 180°.
- Interior + exterior = 180°.
- If an interior angle is 120°, the exterior angle is 180° − 120° = 60°.
- This relationship applies to all polygons.
6. How do you find the number of sides using an exterior angle?
The number of sides of a regular polygon is found using n = 360° ÷ exterior angle.
- Step 1: Identify the exterior angle.
- Step 2: Divide 360° by that angle.
- Example: If each exterior angle is 45°, then n = 360° ÷ 45° = 8 sides.
7. What is an example of finding an exterior angle of a triangle?
An exterior angle of a triangle can be found by adding the two remote interior angles.
- Example: If the two opposite interior angles are 35° and 55°,
- Exterior angle = 35° + 55° = 90°.
- This follows directly from the exterior angle theorem.
8. Why do the exterior angles of any polygon add up to 360°?
The exterior angles of any polygon add up to 360° because they represent one full turn around the shape.
- As you walk around a polygon, you turn at each vertex.
- The total turning completes one full rotation.
- One full rotation equals 360°.
9. What is the difference between an interior angle and an exterior angle?
An interior angle lies inside a polygon, while an exterior angle is formed outside when a side is extended.
- Interior angles form the inside shape.
- Exterior angles form a linear pair with interior angles.
- Interior + exterior = 180° at each vertex.
10. Can an exterior angle be greater than 180°?
In standard polygon problems, an exterior angle is less than 180° because it forms a linear pair with an interior angle.
- Interior + exterior = 180°.
- If the interior angle is small, the exterior angle is large but still under 180°.
- In regular polygons, each exterior angle is always less than 180°.
