Table of Content

• What is Exterior Angle?
• What is Exterior Angle Theorem?
• Proof of Exterior Angle Theorem
• Exterior Angle Inequality Theorem
• Interior and Exterior Angles in a Triangle
• Applications of the Exterior Angle Theorem
• How to Find the Unknown Exterior Angles of Triangle?
• How to Find the Unknown Interior Angles of Triangle?
• FAQs

Type of Angle	Definition	Measurement
Interior Angle	An angle formed inside a triangle between two sides	Sum of all interior angles in a triangle is always 180°.  For an equilateral triangle, each angle in a triangle is 180° divided by 3 i.e., 60 ° or varying in other types of triangles.
Exterior Angle	An angle formed outside a triangle when one side is extended	Sum of an exterior angle and the adjacent interior angle is always 180 °.  The measurement of an exterior angle is equal to the sum of the measurements of the two non-adjacent interior angles.

Applications of the Exterior Angle Theorem

The applications of the exterior angle theorem are:

• To Find the Unknown Exterior Angles of Triangle
• To Find the Unknown Interior Angles of Triangle

Let’s discuss these cases in detail with the help of examples.

How to Find the Unknown Exterior Angles of Triangle?

To find the unknown exterior angle of the triangle we use the exterior angle theorem. If the value of two remote interior angles are given we can easily find the value of exterior angles.

Example: Given a triangle with an exterior angle and remote interior angles. The value of the two remote interior angles are 30° and 65°. Find the value of the exterior angle.

Solution:

By the exterior angle theorem

Exterior angle = sum of remote interior angles. ∠e = ∠i1 + ∠i2

⇒ The value of exterior angle = 30° + 65°

⇒ The value of exterior angle = 95°

How to Find the Unknown Interior Angles of Triangle?

To find the unknown exterior angle of the triangle we use the exterior angle theorem. If the value of two remote interior angles are given we can easily find the value of exterior angles.

Example: Given a triangle with an exterior angle and remote interior angles. The value of the one of the remote interior angles and exterior angle is are 80° and 165°. Find the value of the other remote interior angle.

Solution:

By the exterior angle theorem

Exterior angle = Sum of Remote Interior Angles.

⇒ ∠e = ∠i₁ + ∠i₂

⇒ 165° = 80° + ∠i₂

⇒ ∠i₂ = 165° – 80°

The value of other interior angle = 85°

Read More,

• Triangles in Geometry
• Types of Triangles
• Area of Triangle
• Triangle Inequality Theorem
• Congruence of Triangles
• Types of Angles

Solved Examples on Exterior Angle Theorem

Example 1: Find the value of the exterior angle from the below figure:

Solution:

By the exterior angle theorem

∠ABC + ∠BAC = ∠ACD

⇒ e = 50° + 67°

⇒ e = 117°

Example 2: Find the value of i using the information from the following figure:

Solution:

By the exterior angle theorem

∠ABC + ∠BAC = ∠ACD

⇒ 40° + i = 170°

⇒ i = 170° – 40°

⇒ i = 130°

Example 3: Find the value of x

Solution:

By exterior angle theorem

∠ABC + ∠BAC = ∠ACD

⇒ 4x + 6x = 110°

⇒ 10x = 110°

⇒ x = 11°

Example 4: Find the value of x

Solution:

Since the exterior angle and adjacent interior has linear property

∠ACB + ∠ACD = 180°

⇒ x + 130° = 180°

⇒ x = 180°- 130°

⇒ x = 50°

Example 5: Find the values of interior angles.

Solution:

By the exterior angle theorem

∠ACD = ∠A + ∠B

⇒ 130 = y + 2 + y + 10

⇒ 2y + 12 = 130

⇒ 2y = 118

⇒ y = 59°

The interior angles are 61° and 69°

Practice Problems on Exterior Angle Theorem

Problem 1: In a triangle, one of the exterior angles measures 110 degrees and both remote angles are equal. What are the measures of the two remote interior angles?

Problem 2: If the measure of one of the remote interior angles of a triangle is 45° and other is 70° then what is the measure of the corresponding exterior angle?

Problem 3: In a triangle, the measure of all exterior angles is 120°. Find the measures of the interior angles.

Problem 4: A triangle has exterior angles measuring 70°, 80°, and 110°. Find the measures of the three corresponding interior angles.

Problem 5: Two angles of a triangle measure 40° and 65°. Find the measure of the third angle and corresponding Exterior Angle as well.

Exterior Angle Theorem – FAQs

Define Exterior Angle.

The angle outside the polygon is called the exterior angle.

What is an Exterior Angle of a Triangle?

The exterior angle of a triangle is the angle obtained by extending one side of the triangle and the adjacent side.

What are Remote Interior Angles?

The two interior angles in a triangle that are opposite to the respected exterior angles are called as remote interior angles.

Write Statement of Exterior Angle Theorem.

The Exterior angle theorem states that the exterior angle of a triangle is equal to the sum of remote interior angles.

Can the Exterior Angle Theorem be applied to all types of triangles?

Yes, the exterior angle theorem can be applied to all types of triangles. The only condition for this theorem to apply is that the geometric shape under consideration must be a triangle.

Are there any special cases or exceptions to the Exterior Angle Theorem?

No, the exterior angle theorem is applicable to all triangles. Therefore, there are no exceptions for this theorem.

How is the Exterior Angle Theorem expressed Mathematically?

If in a triangle x be the exterior angle of the triangle and y and z are remote interior angles, then the exterior angle theorem is expressed mathematically as:

∠x = ∠y + ∠z

Can the Exterior Angle Theorem be Extended to Polygons with more than Three Sides?

No, exterior angle theorem can’t be extended to any other polygons as the exterior angle theorem explicitly states that a geometric object needs to be a triangle for this theorem to hold.