Central & Inscribed Angles

TipLearning Objectives
  • Relate central angles, inscribed angles, and intercepted arcs.
  • Find arc measures using angle relationships.
  • Apply central and inscribed angle rules in circle diagrams.

Key Ideas

Central Angle

A central angle has its vertex at the center of the circle.

The measure of a central angle equals the measure of its intercepted arc.

\[ m(\angle_{\text{central}}) = m(\text{intercepted arc}) \]

Inscribed Angle

An inscribed angle has its vertex on the circle.

The measure of an inscribed angle equals half the measure of its intercepted arc.

\[ m(\angle_{\text{inscribed}}) = \frac12 m(\text{intercepted arc}) \]

Central vs. Inscribed Angles

If a central angle and an inscribed angle intercept the same arc, then the central angle is twice the inscribed angle.

\[ m(\angle_{\text{central}}) = 2m(\angle_{\text{inscribed}}) \]

Equivalently,

\[ m(\angle_{\text{inscribed}}) = \frac12 m(\angle_{\text{central}}) \]

Central angle and inscribed angle intercepting the same arc.

Common Problem Types

Central Angle from Arc

Use direct equality.

If the intercepted arc is \(120^\circ\), then the central angle is also \(120^\circ\).

Inscribed Angle from Arc

Use the half-rule.

If the intercepted arc is \(80^\circ\), then the inscribed angle is:

\[ \frac12(80^\circ)=40^\circ \]

Arc from Inscribed Angle

Double the inscribed angle.

If the inscribed angle is \(35^\circ\), then the intercepted arc is:

\[ 2(35^\circ)=70^\circ \]

Inscribed Angle from Central Angle

If both angles intercept the same arc, the inscribed angle is half the central angle.

If the central angle is \(100^\circ\), then the inscribed angle is:

\[ \frac12(100^\circ)=50^\circ \]

Special Cases

  • An angle inscribed in a semicircle is \(90^\circ\).
  • Opposite angles of a cyclic quadrilateral sum to \(180^\circ\).

Strategies

  • Identify whether the angle is central or inscribed.
  • Trace the intercepted arc carefully.
  • If two angles intercept the same arc, compare them directly:
    • central angle = twice the inscribed angle
    • inscribed angle = half the central angle
  • For semicircles, use \(180^\circ\) arc \(\rightarrow\) inscribed angle \(=90^\circ\).

Worked Examples

Example 1

An inscribed angle intercepts an arc measuring \(80^\circ\). Find the measure of the inscribed angle.

Since an inscribed angle is half the measure of its intercepted arc:

\[ \frac12(80^\circ)=40^\circ \]

So the inscribed angle measures:

\[ 40^\circ \]

Example 2

An inscribed angle measures \(35^\circ\). Find the measure of its intercepted arc.

Since the intercepted arc is twice the inscribed angle:

\[ 2(35^\circ)=70^\circ \]

So the intercepted arc measures:

\[ 70^\circ \]

Example 3

A central angle and an inscribed angle intercept the same arc. The central angle measures \(110^\circ\). Find the measure of the inscribed angle.

Since the inscribed angle is half the central angle:

\[ \frac12(110^\circ)=55^\circ \]

So the inscribed angle measures:

\[ 55^\circ \]


WarningCommon Mistakes
  • Using the half-rule on central angles.
  • Saying an inscribed angle is half the arc length instead of half the arc measure.
  • Mixing up which arc an angle intercepts.
  • Forgetting that a central angle is twice an inscribed angle when both intercept the same arc.
  • Forgetting the semicircle rule when a diameter is present.

Practice Problems

  1. A central angle measures \(110^\circ\). What is the measure of its intercepted arc?
  2. An inscribed angle measures \(25^\circ\). What is the measure of its intercepted arc?
  3. An angle is inscribed in a semicircle. What is the measure of the angle?
  4. A central angle and an inscribed angle intercept the same arc. If the central angle is \(96^\circ\), what is the inscribed angle?
  5. A central angle and an inscribed angle intercept the same arc. If the inscribed angle is \(42^\circ\), what is the central angle?
  1. A central angle equals the measure of its intercepted arc.

\[ 110^\circ \]

  1. The intercepted arc is twice the inscribed angle.

\[ 2(25^\circ)=50^\circ \]

  1. An angle inscribed in a semicircle is a right angle.

\[ 90^\circ \]

  1. The inscribed angle is half the central angle.

\[ \frac12(96^\circ)=48^\circ \]

  1. The central angle is twice the inscribed angle.

\[ 2(42^\circ)=84^\circ \]

Summary

  • Central angle = intercepted arc measure.
  • Inscribed angle = half the intercepted arc measure.
  • If both intercept the same arc, central angle = twice the inscribed angle.
  • Semicircle \(\rightarrow\) inscribed angle \(=90^\circ\).
  • If the vertex is at the center, use direct equality.
  • If the vertex is on the circle, use the half-rule.
  • If a central and inscribed angle intercept the same arc, compare them directly.