Inscribed Angles - Complete Interactive Lesson
Part 1: Arcs, Central Angles & Intercepted Arcs
⭕ Inscribed Angles
Part 1 of 5 — Arcs, Central Angles & Intercepted Arcs
Topics in This Part
| Section |
|---|
| Chords, Arcs & the Language of Circles |
| Central Angles = Arc Measure |
| What an Angle "Intercepts" |
🔑 Key Concept: Every angle theorem in this lesson compares an angle to the arc it cuts off. Before we can master inscribed angles in Part 2, we have to be fluent in arcs — how they're measured and which arc a given angle "catches." That's the whole job of Part 1.
The Language of Circles
A few words appear in every problem. Lock them in now:
| Term | What it is |
|---|---|
| Center | The fixed point every point on the circle is equidistant from |
| Radius | A segment from the center to the circle |
| Chord | A segment whose endpoints both lie on the circle |
| Diameter | A chord that passes through the center (the longest chord) |
| Arc | A piece of the circle itself — the curved path between two points |
An arc is named by its endpoints, like . Two points actually split a circle into two arcs:
- a minor arc (the shorter one, less than ), and
- a major arc (the longer one, more than ).
💡 To avoid ambiguity, a major arc is usually named with three letters — — so you know which way around the circle you mean.
Circle Vocabulary 🔽
Pick the term that fits each description.
Central Angles Measure Their Arcs
A central angle has its vertex at the center of the circle. Its two sides are radii, and they cut off an arc.
So if central angle (where is the center), then the minor arc it opens onto, , is also .
Concept Check 🎯
What an Angle "Intercepts"
An angle intercepts an arc when the arc lies in the interior of the angle, with its endpoints sitting on the two sides of the angle.
Picture an angle with its vertex somewhere and its two sides slicing across the circle. The arc "trapped" between the two sides — the one you'd see looking out from the vertex — is the intercepted arc.
🔑 The single most important habit in this whole lesson: for any angle, find the arc it intercepts first. Once you can name that arc, every theorem becomes a one-step formula. We will say intercepted arc over and over — make sure you can point to it.
In Part 1 we measure arcs with central angles (vertex at the center). Starting in Part 2, the vertex moves onto the circle — and a beautiful pattern appears.
Arc Arithmetic 🧮
A circle is divided by points , , and . Use "central angle arc" and "arcs sum to ."
1) Central angle . Then degrees. Minor arc and minor arc . The remaining arc degrees. A diameter splits a circle into two arcs. Each semicircle measures degrees.
Part 2: The Inscribed Angle Theorem
⭕ Inscribed Angles
Part 2 of 5 — The Inscribed Angle Theorem
🔑 The Big Idea: Move the vertex from the center (Part 1) onto the circle itself, and the angle shrinks to exactly half of the arc it intercepts. That one fact — the Inscribed Angle Theorem — powers the rest of this lesson.
What Is an Inscribed Angle?
An inscribed angle is an angle whose:
- vertex lies ON the circle, and
- two sides are chords of the circle.
So an inscribed angle "sits" on the circle and reaches out with two chords. Those chords cut off the intercepted arc — the arc on the far side, not containing the vertex.
Part 3: Three Powerful Corollaries (same arc, Thales, right triangles)
⭕ Inscribed Angles
Part 3 of 5 — Three Powerful Corollaries
🔑 Why this part matters: Three facts fall straight out of "angle arc." Recognizing them lets you read an answer off a figure in seconds, with no arithmetic at all.
Corollary 1 — Same Arc ⇒ Equal Angles
If two (or more) inscribed angles intercept the same arc, they are congruent.
Why? Each one equals of that arc, so they must be equal.
Part 4: Inscribed (Cyclic) Quadrilaterals
⭕ Inscribed Angles
Part 4 of 5 — Inscribed (Cyclic) Quadrilaterals
🔑 Big Payoff: When all four vertices of a quadrilateral lie on a circle, its opposite angles are supplementary — they add to . This single rule cracks open a whole class of figures.
The Cyclic Quadrilateral Theorem
A cyclic (or inscribed) quadrilateral has all four vertices on one circle. Label it in order around the circle. Then:
Part 5: Tangent–Chord Angles, Mixed Practice & Mastery Check
⭕ Inscribed Angles
Part 5 of 5 — Tangent–Chord Angles, Mixed Practice & Mastery Check
You can now handle central angles, inscribed angles, the three corollaries, and cyclic quadrilaterals. One last vertex position completes the picture — the vertex right on the circle where a tangent meets a chord.
The Tangent–Chord Angle
A tangent is a line that touches the circle at exactly one point. When a tangent and a chord meet at that point of tangency, the angle they form follows the same half-the-arc rule as an inscribed angle: