GEOMETRYCircleMathematics Calculator

Sector Area

A sector is a 'pie slice' of a circle—bounded by two radii and the arc between them. Sector area = (θ/360°) × πr²; arc length = rθ (radians). Used in pizza slices, pie charts, and windshield wipers.

Concept Fundamentals
A = (θ/360°) × πr²
Sector area
L = r × θ (rad)
Arc length
c = 2r sin(θ/2)
Chord length
A_sector − A_triangle
Segment area
Start CalculatingEnter radius and central angle to get sector area and related properties

Why This Mathematical Concept Matters

Why: Sectors appear in pizza slices (45°), pie charts (proportional angles), windshield wipers, radar sweeps, and sprinkler coverage. Sector area is a fraction of the full circle.

How: Use A = (θ/360°) × πr² for degrees, or A = ½r²θ for radians. Arc length L = rθ (radians). Chord c = 2r sin(θ/2). Segment = sector minus triangle.

  • A standard pizza slice is typically 45° (1/8 of a circle).
  • Pie charts use sectors—25% of data = 90° angle.
  • Sector perimeter = 2r + arc length (includes both radii).
Sources:Khan Academy - Sector AreaWolfram MathWorld - Circular Sector
SECTOR GEOMETRY

Sector Area, Arc Length & Segment Calculator

Enter radius and central angle (degrees or radians) to get sector area, arc length, chord length, segment area, and sector perimeter.

Circle →Semicircle →Arc Length →

◔ Real-World Sector Examples — Click to Load

Input Dimensions

sector_calc.sh
CALCULATED
$ calculate_sector --radius=10 --angle=90 degrees --unit=cm
Radius
10
cm
Sector Area
78.54
cm²
Arc Length
15.71
cm
Chord Length
14.14
cm
Segment Area
28.54
cm²
Sector Perimeter
35.71
cm
Central Angle
90°
degrees
Full Circle Area
314.16
cm²
Share:
Sector Calculation
r = 10 cm | θ = 90°
78.54 cm² sector area
Arc = 15.71Chord = 14.14Segment = 28.54 cm²
numbervibe.com/calculators/mathematics/circle/sector-area

Sector Properties Radar

Property Comparison

Sector vs Full Circle

Step-by-Step Breakdown

INPUT
Given radius
r = 10 cm
INPUT
Central angle
90°
RESULT
Sector Area
78.5398 cm²
A = (θ/360°) × πr² = (90/360) × π × 10²
RESULT
Arc Length
15.708 cm
L = θ_rad × r = (90π/180) × 10
DERIVED
Chord Length
14.1421 cm
c = 2r × sin(θ/2)
DERIVED
Segment Area
28.5398 cm²
A_seg = A_sector - A_triangle
DERIVED
Sector Perimeter
35.708 cm
P = 2r + arc = 2 × 10 + 15.708
COMPARISON
Full Circle Area (comparison)
314.1593 cm²
πr² = 78.5398 × (360/90)

⚠️For educational and informational purposes only. Verify with a qualified professional.

🧮 Fascinating Math Facts

Sector area = (θ/360°) × πr² — a fraction of the full circle.

— Formula

Chord length = 2r sin(θ/2). For 180°, chord = diameter.

— Geometry

Key Takeaways

  • Sector area = (θ/360°) × πr² — a fraction of the full circle
  • Arc length = r × θ (radians) — the curved edge of the sector
  • Chord length = 2r × sin(θ/2) — the straight line between arc endpoints
  • Segment area = sector area − triangle area — the "cap" between arc and chord
  • Real-world sectors: pizza slices, pie charts, windshield wipers, radar sweeps, sprinkler coverage

Did You Know?

🍕A standard pizza slice is typically 45° (1/8 of a circle) — sector math helps pizzerias calculate slice sizes and cheese coverageSource: Food Industry
📊Pie charts use sectors to represent data — each slice's angle is proportional to its percentage (e.g., 25% = 90°)Source: Data Visualization
🚗Windshield wipers sweep a sector — engineers use sector area to design wiper coverage and blade lengthSource: Automotive Engineering
📡Radar antennas sweep sectors — the beam width in degrees determines coverage area via sector geometrySource: Telecommunications
💧Sprinklers often cover 90°, 180°, or 360° sectors — landscape designers use sector area for irrigation planningSource: Landscape Design
🕐Clock hands form sectors — each hour is 30°, so the minute hand sweeps 6° per minuteSource: Khan Academy

How Sector Calculations Work

A circle sector is a "pie slice" bounded by two radii and the arc between them. All properties derive from the radius (r) and central angle (θ).

Sector Area

A = (θ/360°) × πr². The sector is a fraction of the full circle — if θ = 90°, you get 1/4 of the circle area. In radians: A = ½r²θ.

Arc Length

L = r × θ (radians). The arc is the curved edge. In degrees: L = (θ/360°) × 2πr. The arc length grows linearly with the angle.

Segment vs Sector

The segment is the region between the arc and the chord. Segment area = sector area − triangle area (formed by the two radii and chord). The chord length is c = 2r × sin(θ/2).

Expert Tips for Sector Problems

Use Radians for Calculus

In calculus, arc length and sector area formulas are simpler in radians: L = rθ, A = ½r²θ. Convert degrees to radians: θ_rad = θ_deg × π/180.

Sector vs Segment

Sector includes the center; segment does not. For θ < 180°, the segment is the "cap" above the chord. For θ = 180°, segment area = semicircle − triangle.

Sector Perimeter

Sector perimeter = 2r + arc length. It includes both radii and the curved arc. Not to be confused with the full circle circumference.

Special Angles

90° = quarter circle; 180° = semicircle; 360° = full circle. For 90°, sector area = πr²/4 and arc length = πr/2.

Sector vs Full Circle Comparison

PropertySector (θ)Full CircleRelationship
Area(θ/360°) × πr²πr²Fraction θ/360°
Arc Lengthr × θ (rad)2πrFraction θ/(2π)
Chord2r × sin(θ/2)0 (degenerate)N/A
Perimeter2r + arc2πrDifferent (includes radii)

Frequently Asked Questions

What is the area of a sector?

A = (θ/360°) × πr², where θ is the central angle in degrees. In radians: A = ½r²θ. The sector is a fraction of the full circle area.

What is the difference between sector and segment?

A sector is bounded by two radii and the arc (like a pizza slice). A segment is bounded by the arc and the chord — it does not include the center. Segment area = sector area − triangle area.

How do I convert degrees to radians?

Multiply by π/180. So 90° = π/2 rad, 180° = π rad, 360° = 2π rad. To convert radians to degrees, multiply by 180/π.

What is the arc length formula?

Arc length = r × θ (when θ is in radians). In degrees: L = (θ/360°) × 2πr. The arc is the curved portion of the sector.

What is the chord length?

Chord length = 2r × sin(θ/2). It is the straight line connecting the two endpoints of the arc. For θ = 180°, chord = 2r (the diameter).

What are real-world sector examples?

Pizza slices, pie charts, windshield wipers, radar sweeps, sprinkler coverage, clock hands, protractor arcs, and any circular "slice" shape.

Sector by the Numbers

θ/360°
Area Fraction
Arc (radians)
2r sin(θ/2)
Chord Length
2r + L
Sector Perimeter

Disclaimer: This calculator provides mathematically precise results based on standard geometric formulas. Results are limited by floating-point precision (~15 significant digits). For critical engineering or architectural applications, verify with domain-specific tools. Not a substitute for professional analysis.

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