Circles | Grade 10
⭕ Parts of a Circle
🔹 Center
The fixed point at the middle of the circle, equidistant from all points on the circle.
🔹 Radius (r)
A line segment from the center to any point on the circle.
🔹 Diameter (d)
A line segment passing through the center with endpoints on the circle. It is the longest chord.
d = 2r
🔹 Chord
A line segment with both endpoints on the circle.
🔹 Arc
A curved section of the circle's circumference between two points.
• Minor Arc: The shorter arc between two points (less than 180°)
• Major Arc: The longer arc between two points (greater than 180°)
🔹 Secant
A line that intersects the circle at two points.
🔹 Tangent
A line that touches the circle at exactly one point (point of tangency).
🔹 Sector
A region bounded by two radii and an arc.
🔹 Segment
A region bounded by a chord and an arc.
📐 Central Angles and Arc Measures
What is a Central Angle?
A central angle is an angle whose vertex is at the center of the circle and whose sides are radii.
🔹 Key Property
The measure of a central angle = The measure of its intercepted arc
If central angle = 60°, then the intercepted arc = 60°
📏 Arc Length
What is Arc Length?
Arc length is the distance along the curved line of an arc.
🔹 Formula (Degrees)
Arc Length = (θ/360°) × 2πr
θ = Central angle in degrees
r = Radius of the circle
🔹 Formula (Radians)
Arc Length (s) = rθ
θ = Central angle in radians
r = Radius of the circle
🔄 Convert Between Radians and Degrees
Key Relationship
π radians = 180°
🔹 Degrees to Radians
Radians = Degrees × (π/180°)
🔹 Radians to Degrees
Degrees = Radians × (180°/π)
📐 Area of Sectors
What is a Sector?
A sector is a pie-shaped region bounded by two radii and an arc.
🔹 Formula (Degrees)
Area of Sector = (θ/360°) × πr²
θ = Central angle in degrees
r = Radius of the circle
🔹 Formula (Radians)
Area of Sector = (1/2)r²θ
θ = Central angle in radians
r = Radius of the circle
🔗 Arcs and Chords
🔹 Theorem 1
In the same circle or congruent circles, congruent chords have congruent arcs.
🔹 Theorem 2
In the same circle or congruent circles, congruent arcs have congruent chords.
🔹 Theorem 3
A perpendicular from the center of a circle to a chord bisects the chord.
📏 Tangent Lines
🔹 Tangent-Radius Theorem
A tangent line is PERPENDICULAR to the radius at the point of tangency
(Forms a 90° angle)
🔹 Two Tangent Theorem
If two tangent segments are drawn to a circle from an external point, then:
• The tangent segments are CONGRUENT (equal length)
• The angle formed by the two tangents is bisected by the line joining the external point to the center
📝 Example
If tangent segments PA and PB are drawn from point P to circle O, then PA = PB
📐 Inscribed Angles
What is an Inscribed Angle?
An inscribed angle is an angle whose vertex is on the circle and whose sides are chords of the circle.
🔹 Inscribed Angle Theorem
Inscribed Angle = (1/2) × Central Angle
OR
Inscribed Angle = (1/2) × Intercepted Arc
🔹 Corollary: Inscribed Angle in Semicircle
An angle inscribed in a semicircle is a RIGHT ANGLE (90°)
This happens when the inscribed angle intercepts a diameter
🔹 Inscribed Angles on Same Arc
All inscribed angles that intercept the same arc are CONGRUENT (have equal measures).
▭ Inscribed Quadrilaterals
What is an Inscribed Quadrilateral?
An inscribed quadrilateral (cyclic quadrilateral) is a quadrilateral with all four vertices on a circle.
🔹 Opposite Angles Theorem
Opposite angles of an inscribed quadrilateral are SUPPLEMENTARY
∠A + ∠C = 180°
∠B + ∠D = 180°
🔺 Angles Formed by Chords, Secants, and Tangents
🔹 Two Chords Intersecting INSIDE the Circle
Angle = (1/2)(Arc 1 + Arc 2)
The angle equals half the sum of the two intercepted arcs.
🔹 Two Secants Intersecting OUTSIDE the Circle
Angle = (1/2)|Arc 1 - Arc 2|
The angle equals half the difference of the two intercepted arcs.
🔹 Secant and Tangent Intersecting OUTSIDE
Angle = (1/2)|Arc 1 - Arc 2|
The angle equals half the difference of the two intercepted arcs.
🔹 Tangent and Chord at Point of Tangency
Angle = (1/2) × Intercepted Arc
The angle between a tangent and a chord equals half the intercepted arc.
📏 Segments Formed by Chords, Secants, and Tangents
Power of a Point Theorems
These theorems relate the lengths of segments formed when lines intersect circles.
🔹 Two Chords Intersecting INSIDE the Circle
a × b = c × d
If two chords intersect at point P, then (segment 1 of chord 1) × (segment 2 of chord 1) = (segment 1 of chord 2) × (segment 2 of chord 2)
🔹 Two Secants from External Point
(whole × external) = (whole × external)
PA × PB = PC × PD
(Whole secant) × (External part) = (Whole secant) × (External part)
🔹 Secant and Tangent from External Point
(Tangent)² = (whole secant) × (external part)
PT² = PA × PB
The square of the tangent segment equals the product of the secant and its external part.
📋 Complete Circle Formulas Summary
🔹 Basic Measurements
| Measurement | Formula |
|---|---|
| Diameter | d = 2r |
| Circumference | C = 2πr = πd |
| Area of Circle | A = πr² |
| Arc Length (Degrees) | L = (θ/360°) × 2πr |
| Arc Length (Radians) | s = rθ |
| Sector Area (Degrees) | A = (θ/360°) × πr² |
| Sector Area (Radians) | A = (1/2)r²θ |
🔹 Angle Relationships
| Angle Type | Formula |
|---|---|
| Central Angle | = Intercepted arc |
| Inscribed Angle | = (1/2) × Intercepted arc |
| Chords Inside Circle | = (1/2)(Arc 1 + Arc 2) |
| Secants/Tangents Outside | = (1/2)|Arc 1 - Arc 2| |
💡 Quick Reference Tips
✅ Central angle = Arc measure
✅ Inscribed angle = (1/2) Arc measure
✅ Tangent ⊥ Radius at point of tangency
✅ Inscribed angle in semicircle = 90°
✅ π radians = 180°
✅ Opposite angles in inscribed quadrilateral = 180°
✅ Chords inside: Add arcs, then divide by 2
✅ Secants outside: Subtract arcs, then divide by 2
📚 Master these circle concepts for success in Tenth Grade Geometry! 📚