角度
About Angle Conversion
An angle measures the rotation between two rays sharing a common endpoint—a fundamental concept that underpins geometry, trigonometry, and virtually every field involving spatial relationships. Angles are essential in mathematics, navigation, engineering, astronomy, and countless everyday applications from construction to photography. Navigators have used angle measurements for millennia to chart courses across oceans, while modern GPS systems still rely on angular calculations for precise positioning.
The most common unit is the degree (°), dividing a full rotation into 360 parts—a system inherited from ancient Babylonian mathematics. Scientists and mathematicians often prefer radians because they simplify calculus and trigonometric formulas. Surveyors and civil engineers may use gradians (also called gons), which divide a right angle into 100 parts for easier calculations with metric measurements. For extremely precise work like telescope positioning and celestial navigation, arcminutes and arcseconds allow measurements of tiny angular distances.
Our angle converter handles all standard units for any application, from academic calculations to professional surveying and navigation work.
Common Angle Conversions
| From | To | Multiply By |
|---|---|---|
| Degrees | Radians | 0.0174533 (π/180) |
| Radians | Degrees | 57.2958 (180/π) |
| Degrees | Gradians | 1.11111 (10/9) |
| Gradians | Degrees | 0.9 (9/10) |
| Radians | Gradians | 63.662 (200/π) |
| Degrees | Arcminutes | 60 |
| Degrees | Arcseconds | 3,600 |
| Arcminutes | Arcseconds | 60 |
| Revolutions | Degrees | 360 |
| Revolutions | Radians | 6.28319 (2π) |
Angle Unit Reference
Degree (°) – The most common angle unit, dividing a full rotation into 360 equal parts. This system originated in ancient Babylon around 2000 BCE, where base-60 mathematics was prevalent. The number 360 was chosen partly because it's highly divisible and approximates the days in a year. Used universally in everyday contexts, navigation, education, and most engineering applications.
Radian (rad) – The SI unit of angle, defined mathematically rather than arbitrarily. One radian is the angle subtended when the arc length equals the radius of the circle. A full circle = 2π radians ≈ 6.283 rad. Radians are essential in calculus because they simplify derivatives of trigonometric functions and appear naturally in physics equations.
Gradian (gon, grad) – Divides a right angle into 100 parts, making a full circle 400 gradians. Developed during the French Revolution as part of the metric system, gradians simplify calculations involving percentages of a right angle. Used primarily in surveying, particularly in France, Germany, and other European countries.
Arcminute (') – 1/60 of a degree, allowing finer precision than degrees alone. Essential in navigation (one arcminute of latitude equals one nautical mile), astronomy, cartography, and ophthalmology for measuring visual acuity.
Arcsecond (") – 1/60 of an arcminute or 1/3600 of a degree. Critical for astronomy—stellar parallax and proper motion are measured in arcseconds or milliarcseconds. Also used in geodesy for precise land surveying and GPS coordinates.
Revolution (turn) – One complete rotation = 360° = 2π radians = 400 gradians. Commonly used in rotational mechanics, engineering (RPM), and angular velocity calculations. Also called a cycle or full rotation.
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