The Inscribed Angle Theorem – Explanation & Examples (2024)

The circular geometry is really vast. A circle consists of many parts and angles. These parts and angles are mutually supported by certain Theorems, e.g., the Inscribed Angle Theorem, Thales’ Theorem, and Alternate Segment Theorem.

We will go through the inscribed angle theorem, but before that, let’s have a brief overview of circles and their parts.

Circles are all around us in our world. There exists an interesting relationship among the angles of a circle. To recall, a chord of a circle is the straight line that joins two points on a circle’s circumference. Three types of angles are formed inside a circle when two chords meet at a common point known as a vertex. These angles are the central angle, intercepted arc, and the inscribed angle.

For more definitions related to circles, you need to go through the previous articles.

In this article, you will learn:

The inscribed angle and inscribed angle theorem,
we will also learn how to prove the inscribed angle theorem.

What is the Inscribed Angle?

An inscribed angle is an angle whose vertex lies on a circle, and its two sides are chords of the same circle.

On the other hand, a central angle is an angle whose vertex lies at the center of a circle, and its two radii are the sides of the angle.

The intercepted arc is an angle formed by the ends of two chords on a circle’s circumference.

Let’s take a look.

In the above illustration,

α = The central angle

θ = The inscribed angle

β = the intercepted arc.

What is the Inscribed Angle Theorem?

The inscribed angle theorem, which is also known as the arrow theorem or the central angle theorem, states that:

The size of the central angle is equal to twice the size of the inscribed angle. The inscribed angle theorem can also be stated as:

α = 2θ

The size of an inscribed angle is equal to half the size of the central angle.

θ = ½ α

Where α and θ are the central angle and inscribed angle, respectively.

How do you Prove the Inscribed Angle Theorem?

The inscribed angle theorem can be proved by considering three cases, namely:

When the inscribed angle is between a chord and the diameter of a circle.
The diameter is between the rays of the inscribed angle.
The diameter is outside the rays of the inscribed angle.

Case 1: When the inscribed angle is between a chord and the diameter of a circle:

To prove α = 2θ:

△ CBD is an isosceles triangle whereby CD = CB = the radius of the circle.
Therefore, ∠ CDB = ∠ DBC = inscribed angle = θ
The diameter AD is a straight line, so ∠BCD = (180 – α) °
By triangle sum theorem, ∠CDB + ∠DBC + ∠BCD = 180°

θ + θ + (180 – α) = 180°

FAQs

What is the inscribed angle theorem example? ›

For example, let's take our intercepted arc measure of 80°. If the inscribed angle is half of its intercepted arc, half of 80 equals 40. So, the inscribed angle equals 40°.

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What is the summary of inscribed angles? ›

In geometry, an inscribed angle is the angle formed in the interior of a circle when two chords intersect on the circle. It can also be defined as the angle subtended at a point on the circle by two given points on the circle.

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Why does the inscribed angle theorem work? ›

The inscribed angle theorem is also called the angle at the center theorem as the inscribed angle is half of the central angle. Since the endpoints are fixed, the central angle is always the same no matter where it is on the same arc between the endpoints.

What is the formula for the inscribed angle? ›

Inscribed Angle Theorem:

The measure of an inscribed angle is half the measure of the intercepted arc. That is, m ∠ A B C = 1 2 m ∠ A O C . This leads to the corollary that in a circle any two inscribed angles with the same intercepted arcs are congruent.

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What are the four theorems on inscribed angles? ›

Inscribed Angles Intercepting Arcs Theorem

Inscribed angles that intercept the same arc are congruent. Angles Inscribed in a Semicircle Theorem Angles inscribed in a semicircle are right angles. Cyclic Quadrilateral Theorem The opposite angles of a cyclic quadrilateral are supplementary.

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How to find missing inscribed angles? ›

Step 1: Determine the arc that corresponds to the inscribed angle. Step 2: Use your knowledge of circles and arc measures to determine the missing measure for the intercepted arc. Step 3: Determine the measure of the inscribed angle using the formula measure of angle = half of the measure of its intercepted arc.

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How will you know that an inscribed angle is a right angle? ›

Corollary (Inscribed Angles Conjecture III ): Any angle inscribed in a semi-circle is a right angle. Proof: The intercepted arc for an angle inscribed in a semi-circle is 180 degrees. Therefore the measure of the angle must be half of 180, or 90 degrees. In other words, the angle is a right angle.

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How to find arc length without radius? ›

Without the radius, you won't be able to calculate the arc length directly. However, if you have either the central angle or the sector area, you can use the following formulas: Using the Central Angle (θ): Arc Length =(θ360∘)×2πr. Using the Sector Area (A): Arc Length =√A×360∘π.

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How to find the measure of an arc? ›

To find the length of an arc, multiply the circle's circumference by the arc's angle, then divide by 360 (arc angle / 360). The angle of an arc is identified by its two endpoints, written as mAB.

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How to find inscribed quadrilateral angles? ›

Inscribed Quadrilateral Theorem: A quadrilateral can be inscribed in a circle if and only if the opposite angles are supplementary. If A B C D is inscribed in , then m ∠ A + m ∠ C = 180 ∘ and m ∠ B + m ∠ D = 180 ∘ . Conversely, If m ∠ A + m ∠ C = 180 ∘ and m ∠ B + m ∠ D = 180 ∘ , then A B C D is inscribed in .

How to solve inscribed angle theorem? ›

Step 1: Identify the intercepted arc of the central angle and the intercepted arc of the inscribed or circ*mscribed angle. Ensure they are the same. Step 2: For an inscribed angle, the measure of the angle is one-half of the measure of the central angle.

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Why are inscribed angles always congruent? ›

The Inscribed Angle Theorem states that the measure of an inscribed angle is half the measure of its intercepted arc. Inscribed angles that intercept the same arc are congruent. This is called the Congruent Inscribed Angles Theorem and is shown below.

What is the relationship between two inscribed angles? ›

In a circumference, the inscribed angles, which subtend arcs of equal measure, have equal measure. It is also true that if two inscribed angles are of equal measure, then the arcs that they subtend are also of equal measure.

What are examples of corresponding angle theorem? ›

What are Corresponding Angles?

Here, ∠1 and ∠5 are corresponding angles because both angles are on the corresponding corners on the left-hand side of the transversal.
Similarly, ∠2 and ∠6, ∠3 and ∠7, and ∠4 and ∠8 are pairs of corresponding angles, so.
∠1 = ∠5,
∠2 = ∠6,
∠3 = ∠7, and.
∠4 = ∠8.

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What is a real world example of an inscribed angle? ›

A real life example of an inscribed angle is a sniper target grid.

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What is an example of the side angle theorem? ›

Examples on Angle Side Angle

Example 1: Parallelogram ABCD is made up of two triangles ΔABC and ΔACD. It is given that ∠ABC is 70° and ∠BCA is 30°, which are equal to ∠CDA and ∠DAC respectively. Side BC is equal to side AD.

What is an example of congruent angles theorem? ›

For example, suppose we build a square room where all the corners are 90°. Its four corners would all have congruent angles because they are all the same measure. Similarly, we know an isosceles triangle has two angles with the same measure. These two angles are therefore congruent.