Alternative Formula (Degrees)

Simplified version of the degree formula, mathematically equivalent

Given Information:

• Radius (r) = 10 cm
• Central Angle (θ) = 60°
• Need to find: Arc Length (L)

Solution Steps:

Result: The arc length is approximately 10.47 cm. This represents 1/6 of the circle's circumference (since 60° is 1/6 of 360°).

Using Degrees

Most common in everyday measurements:

• Full circle = 360°
• Half circle = 180°
• Quarter circle = 90°
• Formula: L = (θ/360) × 2πr

Using Radians

Preferred in mathematics and calculus:

• Full circle = 2π rad ≈ 6.28 rad
• Half circle = π rad ≈ 3.14 rad
• Quarter circle = π/2 rad ≈ 1.57 rad
• Formula: L = rθ (simplest!)

Conversion Formulas

What is arc length?

Arc length is the distance along the curved line that makes up the arc. It is a portion of the circumference of a circle. For a circle with radius r and central angle θ, arc length L = rθ (in radians) or L = (θ/360) × 2πr (in degrees). For example, a quarter circle (90°) has an arc length equal to one-fourth of the circumference.

How do you calculate arc length?

To calculate arc length: 1) If angle is in radians, use L = rθ where r is radius and θ is central angle, 2) If angle is in degrees, use L = (θ/360) × 2πr or L = (πrθ)/180. For example, an arc with radius 10 cm and angle 60° has length L = (60/360) × 2π(10) = (1/6) × 20π ≈ 10.47 cm.

What is the formula for arc length?

The arc length formula depends on angle units. For radians: L = rθ (simplest form - multiply radius by angle). For degrees: L = (θ/360) × 2πr or L = (πrθ)/180. Where L is arc length, r is radius, and θ is the central angle. The radian formula is simpler, which is why radians are preferred in mathematics.

How to find arc length without angle?

To find arc length without the angle, you need the chord length c and radius r. First calculate the central angle using: θ = 2 × arcsin(c/2r) in radians. Then use the arc length formula L = rθ. Alternatively, if you know the sector area A and radius r, find the angle first: θ = 2A/r² (radians), then calculate L = rθ.

What is the difference between arc length and circumference?

Circumference is the total distance around the entire circle, calculated as C = 2πr. Arc length is only a portion of the circumference corresponding to a specific central angle. Arc length is a fraction of circumference: L = (θ/360°) × C when θ is in degrees. A full circle (360°) has arc length equal to circumference.

Why use radians instead of degrees for arc length?

Radians simplify the arc length formula to L = rθ, making calculations easier and more intuitive. In radians, the arc length equals radius times angle directly. Radians are also natural units for circular motion - one radian is the angle where arc length equals radius. This simplicity is why calculus, physics, and engineering prefer radians.

How do you find radius from arc length?

To find radius from arc length, rearrange the arc length formula. If angle is in radians: r = L/θ. If angle is in degrees: r = 180L/(πθ) or r = 360L/(2πθ). For example, if arc length is 15 cm and angle is 90° (π/2 radians): r = L/θ = 15/(π/2) = 30/π ≈ 9.55 cm.

What is the relationship between arc length and sector area?

Arc length and sector area are related through the radius. If you know arc length L and radius r, sector area A = (1/2) × L × r. Alternatively, both depend on the central angle: L = rθ and A = (1/2)r²θ (in radians). Therefore, A = (L × r)/2, showing area equals half the product of arc length and radius.