Arcminute to Degree Converter

How do I convert degrees to radians?

Formula: radians = degrees × (π/180) = degrees × 0.01745

Examples:

• 30° = 0.524 rad = π/6
• 45° = 0.785 rad = π/4
• 90° = 1.571 rad = π/2
• 180° = 3.142 rad = π
• 360° = 6.283 rad = 2π

Degree to Radian converter →

How do I convert degrees to gradians?

Formula: gradians = degrees × (400/360) = degrees × 1.111

Examples:

• 90° = 100ᵍ
• 45° = 50ᵍ
• 180° = 200ᵍ
• 360° = 400ᵍ

Degree to Gradian converter →

What's the difference between arcminutes and arcseconds?

• Arcminute ('): 1/60 of a degree (used in surveying, astronomy)
• Arcsecond ("): 1/60 of an arcminute = 1/3600 of a degree (used in precise astronomy)
• Example: The Moon appears to be about 0.5° (30 arcminutes) across from Earth

Finer subdivisions exist but are rarely used outside specialized fields.

Why do we use 360 degrees instead of 100?

Historical reasons primarily:

• Ancient Babylonian sexagesimal system (base-60) was established 4,000+ years ago
• 360 is highly divisible: Can divide evenly by 2, 3, 4, 5, 6, 8, 9, 10, 12, 15, 18, 20, 24, 30, 36, 40, 45, 60, 72, 90, 120, 180
• 100 is less convenient: Divides nicely by 2, 4, 5, 10, 20, 25, 50—fewer options
• Maritime/Aviation Inertia: Centuries of tradition in navigation instruments
• Attempted Reform: The metric system proposed gradians (400 per circle) but never gained traction

The degree persists because it's deeply embedded in global infrastructure.

Can I use decimal degrees in navigation?

Yes, but with caveats:

• GPS Systems: Use decimal degrees by default (e.g., 40.7128°N, 74.0060°W)
• Maps: Modern digital maps support decimal degrees
• Precision Issue: Decimal notation can be confusing for precision
  • 0.001° ≈ 111 meters (at equator)
  • 0.00001° ≈ 1.1 meters
• Traditional Navigation: Mariners still prefer DMS (degrees/minutes/seconds) for clarity

What angle is a compass bearing of "N 30°E"?

It's 30° clockwise from north, or simply 30° on a standard compass.

• N 0°E = 0° (due North)
• N 30°E = 30° (northeast-ish)
• N 90°E = 90° (due East, but written as simply "E")
• S 30°E = 150° (southeastish)
• S 30°W = 210° (southwestish)

This notation is common in surveying and maritime contexts.

What is the latitude/longitude coordinate system?

• Latitude: Angle north (+) or south (-) of the Equator
  • Equator = 0°
  • North Pole = 90°N
  • South Pole = 90°S
  • Lines of latitude run east-west
• Longitude: Angle east (+) or west (-) of the Prime Meridian (Greenwich)
  • Prime Meridian = 0°
  • International Date Line ≈ 180°
  • Lines of longitude run north-south

Distance Approximations:

• 1° latitude ≈ 111 km everywhere
• 1° longitude ≈ 111 km × cos(latitude)
  • At equator: 111 km
  • At 45°: 78.5 km
  • At poles: approaches 0 km

How precise is GPS in degrees?

| Decimal Places | Precision | Application | |---|---|---| | 0 | ±111 km | Continental scale | | 1 | ±11 km | Country scale | | 2 | ±1.1 km | City scale | | 3 | ±111 meters | Building scale | | 4 | ±11 meters | Street address | | 5 | ±1.1 meters | Tree in forest | | 6 | ±0.11 meters | Surveying | | 7 | ±1.1 cm | Precision surveying | | 8 | ±1.1 mm | Scientific research |

Consumer GPS typically achieves 4-6 decimal places (11m - 1.1m accuracy).

What's the relationship between degrees and percentage grades?

• Grade (%) = tan(angle) × 100
• Examples:
  • 5° slope ≈ 8.7% grade (rise 100 feet, run ~1,150 feet)
  • 10° slope ≈ 17.6% grade
  • 45° slope ≈ 100% grade (equal rise and run)

This is why wheelchair ramps (≤4.76° or ≤8.3% grade) are so gradual—they spread distance to minimize slope.

• 180° = 3.142 rad = π

Degrees to Radians converter →

How many degrees in a circle?

360 degrees = 1 full circle

Also:

• 90° = quarter circle (right angle)
• 180° = half circle (straight angle)
• 270° = three-quarters circle

Why 360 degrees in a circle?

Ancient Babylonians used base 60 mathematics. 360 has many divisors (2, 3, 4, 5, 6, 8, 9, 10, 12, 15, 18, 20, 24, 30, 36, 40, 45, 60, 72, 90, 120, 180) making calculations easier. Also approximates 365 days in a year.