Degree Converter
Convert Degree to Turn and more • 13 conversions
0
Unit Explanations
Degree°
Source UnitThe degree is a unit of angular measurement that defines the size of an angle by dividing a full rotation into 360 equal parts. Each degree can be further divided into 60 minutes, and each minute into 60 seconds, leading to precise measurements in various applications. The degree is widely used in fields such as geography, astronomy, and engineering, facilitating the specification of angles in a comprehensible format. This unit is critical for navigation, where precise angular measurements are essential for determining courses and bearings. The degree is also vital in fields like trigonometry, where it plays a crucial role in the study of angles and their relationships in geometric figures.
Current Use
Degrees are extensively used in various industries including navigation, meteorology, engineering, and architecture. In navigation, degrees help in determining the direction of travel, with the compass rose divided into 360 degrees. In meteorology, temperature is often measured in degrees Celsius or Fahrenheit, and wind direction is reported in degrees from true north. Engineers utilize degrees to define angles in design and construction, ensuring structural integrity and precision. Architects apply degree measurements in building designs, while in the realm of technology, computer graphics rely on degrees for rendering angles and rotations. Countries worldwide use degrees for educational purposes in mathematics and science, making it a fundamental unit in curricula. The degree is also prevalent in sports for measuring angles in various athletic activities.
Fun Fact
The ancient Babylonians were the first to divide the circle into 360 degrees.
Turnturn
Target UnitA turn is a unit of angular measurement that signifies a complete rotation around a point or axis, equivalent to 360 degrees or 2π radians. It is commonly used in various fields, including physics, engineering, and navigation, to describe the amount of angular displacement. In mathematical terms, a turn can also be represented as a fraction of a circle, with one turn being equal to 1 full circle. This unit is particularly useful in contexts where circular motion is involved, as it simplifies the representation of rotations. For instance, many mechanical systems, motors, and wheels are designed to operate in terms of turns, allowing for straightforward calculations of angular velocity and displacement.
Current Use
Currently, the turn is utilized across various industries such as engineering, robotics, and aviation. In mechanical engineering, turns are important for calculating the rotation of gears and wheels in machinery. Robotics often employs turns to program movements and rotations in automated systems. In aviation and navigation, pilots use turns to describe the angles of their flight paths relative to a reference. Countries like the United States, Japan, and Germany, with advanced engineering sectors, frequently incorporate turns in design and operational protocols. Additionally, the turn is used in recreational activities like sports and dancing, where rotations are fundamental to the movements involved.
Fun Fact
One turn is equivalent to 360 degrees, which is often used in navigation.
All Angle Conversions
26 convertersPopular Conversions
📐Conversion Formula
= × 1.00000How to Convert
To convert to , multiply the value by 1.00000. This conversion factor represents the ratio between these two units.
Quick Examples
💡 Pro Tip: For the reverse conversion ( → ), divide by the conversion factor instead of multiplying.
Degree
angle • Non-SI
Definition
The degree is a unit of angular measurement that defines the size of an angle by dividing a full rotation into 360 equal parts. Each degree can be further divided into 60 minutes, and each minute into 60 seconds, leading to precise measurements in various applications. The degree is widely used in fields such as geography, astronomy, and engineering, facilitating the specification of angles in a comprehensible format. This unit is critical for navigation, where precise angular measurements are essential for determining courses and bearings. The degree is also vital in fields like trigonometry, where it plays a crucial role in the study of angles and their relationships in geometric figures.
History & Origin
The degree as a unit of angle measurement dates back to ancient civilizations, particularly the Babylonians who divided the circle into 360 parts, likely due to their base-60 numerical system. The choice of 360 may also correspond to the approximate number of days in a year, making it a practical choice for astronomical observations. This division allowed for the development of a sophisticated understanding of geometry and navigation. The use of degrees was further solidified by Greek mathematicians such as Euclid, who explored the properties of angles in depth. Over time, the degree became a standard unit in various cultures and fields, cementing its place in mathematical and practical applications.
Etymology: The term 'degree' originates from the Latin word 'gradus,' meaning 'step' or 'grade,' reflecting the concept of steps in a progression or measurement.
Current Use
Degrees are extensively used in various industries including navigation, meteorology, engineering, and architecture. In navigation, degrees help in determining the direction of travel, with the compass rose divided into 360 degrees. In meteorology, temperature is often measured in degrees Celsius or Fahrenheit, and wind direction is reported in degrees from true north. Engineers utilize degrees to define angles in design and construction, ensuring structural integrity and precision. Architects apply degree measurements in building designs, while in the realm of technology, computer graphics rely on degrees for rendering angles and rotations. Countries worldwide use degrees for educational purposes in mathematics and science, making it a fundamental unit in curricula. The degree is also prevalent in sports for measuring angles in various athletic activities.
💡 Fun Facts
- •The ancient Babylonians were the first to divide the circle into 360 degrees.
- •In ancient times, the 360-degree system was linked to the number of days in a year.
- •The term 'degree' was first used in its current context in the 14th century.
📏 Real-World Examples
🔗 Related Units
Turn
angle • Non-SI
Definition
A turn is a unit of angular measurement that signifies a complete rotation around a point or axis, equivalent to 360 degrees or 2π radians. It is commonly used in various fields, including physics, engineering, and navigation, to describe the amount of angular displacement. In mathematical terms, a turn can also be represented as a fraction of a circle, with one turn being equal to 1 full circle. This unit is particularly useful in contexts where circular motion is involved, as it simplifies the representation of rotations. For instance, many mechanical systems, motors, and wheels are designed to operate in terms of turns, allowing for straightforward calculations of angular velocity and displacement.
History & Origin
The concept of a turn as a unit of angle has its roots in ancient civilizations that observed and utilized circular motions, particularly in astronomy and navigation. The Egyptians, Greeks, and Babylonians all had means to measure angles and understand circular geometry. The division of a circle into 360 degrees is believed to have originated from the Babylonians, who used a base-60 numeral system, which later influenced the way angles are measured and understood. The turn as a complete rotation can be traced back to these early mathematical concepts, which formed the foundation of modern angular measurement systems used today.
Etymology: The word 'turn' comes from the Old English 'turnian,' meaning to rotate or spin.
Current Use
Currently, the turn is utilized across various industries such as engineering, robotics, and aviation. In mechanical engineering, turns are important for calculating the rotation of gears and wheels in machinery. Robotics often employs turns to program movements and rotations in automated systems. In aviation and navigation, pilots use turns to describe the angles of their flight paths relative to a reference. Countries like the United States, Japan, and Germany, with advanced engineering sectors, frequently incorporate turns in design and operational protocols. Additionally, the turn is used in recreational activities like sports and dancing, where rotations are fundamental to the movements involved.
💡 Fun Facts
- •One turn is equivalent to 360 degrees, which is often used in navigation.
- •The term ‘turn’ is frequently used in dance to describe various spinning movements.
- •Some sports, like figure skating, involve complex turns that can be judged based on their execution.
📏 Real-World Examples
🔗 Related Units
Related Angle Conversions
Explore more angle conversions for your calculations.
Frequently Asked Questions
How do I convert to ?▼
To convert to , multiply your value by 1. For example, 10 equals 10 .
What is the formula for to conversion?▼
The formula is: = × 1. This conversion factor is based on international standards.
Is this to converter accurate?▼
Yes! MetricConv uses internationally standardized conversion factors from organizations like NIST and ISO. Our calculations support up to 15 decimal places of precision, making it suitable for scientific, engineering, and everyday calculations.
Can I convert back to ?▼
Absolutely! You can use the swap button (⇄) in the converter above to reverse the conversion direction, or visit our to converter.