# Circle Sector and Segment

## Slices

There are two main "slices" of a circle:

• The "pizza" slice is called a Sector.
• And the Segment, which is cut from the circle by a "chord" (a line between two points on the circle).

Sector Segment

## Common Sectors

The Quadrant and Semicircle are two special types of Sector:

Half a circle is
a Semicircle.

Quarter of a circle is
a Quadrant.

## Area of a Sector

You can work out the Area of a Sector by comparing its angle to the angle of a full circle.

Note: we are using radians for the angles.

This is the reasoning:

 A circle has an angle of 2π and an Area of: πr2 A Sector with an angle of θ (instead of 2π) has an Area of: (θ/2π) × πr2 Which can be simplified to: (θ/2) × r2

Area of Sector = θ 2 × r2   (when θ is in radians)

Area of Sector = θ × π 360 × r2 (when θ is in degrees)

## Area of Segment

The Area of a Segment is the area of a sector minus the triangular piece (shown in light blue here).

There is a lengthy reason, but the result is a slight modification of the Sector formula:

Area of Segment = θ − sin(θ) 2 × r2   (when θ is in radians)

Area of Segment = ( θ 360 × πsin(θ)2 ) × r2   (when θ is in degrees)

## Arc Length

The arc length (of a Sector or Segment) is:

L = θ × r   (when θ is in radians)

L = (θ × π/180) × r   (when θ is in degrees)