Arc Length and Sector Area

Central angle

Peripheral angle

Acute angle

Obtuse angle

45 degrees

60 degrees

68 degrees

75 degrees

A sector is the area enclosed by two radii and the arc, while a segment is the area between a chord and the arc.

A sector is a part of the circle defined by a single radius, while a segment is the entire circle.

A sector is the area of the circle divided by the diameter, while a segment is the area above the chord.

A sector is the area enclosed by the circumference and a radius, while a segment is the area below the chord.

10.47 cm²

15.71 cm²

17.45 cm²

20.94 cm²

Area = (θ/360) * π * r², where θ is the central angle in degrees and r is the radius.

Area = π * r²

Area = 2 * π * r

Area = (θ/180) * π * r²

5.00 cm

7.85 cm

10.00 cm

15.70 cm

Degrees = Radians * (180/π)

Degrees = Radians * (360/π)

Degrees = Radians * (180/2π)

Degrees = Radians * (90/π)

15 cm

20 cm

25 cm

30 cm

Arc Length = (θ/360) * 2πr, where θ is the central angle in degrees and r is the radius.

Arc Length = θ * r, where θ is in radians.

Arc Length = 2πr, where r is the radius.

Arc Length = (θ/180) * πr, where θ is the central angle in degrees.

The arc length is inversely proportional to the central angle; as the angle increases, the arc length decreases.

The arc length is directly proportional to the central angle; as the angle increases, the arc length increases.

The arc length is independent of the central angle; changes in the angle do not affect the arc length.

The arc length is equal to the central angle; they are always the same.