What are Radians? | Radian (Unit of Plane Angle) | Infinity Learn

Infinity Learn NEET

15 Jun 201505:40

Summary

TLDRThis video explains the concept of radians as a logical way to measure angles in relation to the radius of a circle. It starts by contrasting degrees with radians and walks through the process of converting between the two. The video also explores the relationship between radians and the circumference of a circle, showing that one full rotation equals 2π radians, which is equivalent to 360°. Key conversions like π radians = 180° and π/2 radians = 90° are derived, along with the crucial fact that one radian is approximately 57.3°. The video makes radians more accessible and connects them to real-world geometry.

Takeaways

😀 Angles are typically measured in degrees, where a full rotation is 360°, a right angle is 90°, and a straight line is 180°.
😀 The measurement of angles in degrees is somewhat arbitrary and relates to the base 60 number system.
😀 Radians provide a more logical way to measure angles by relating the angle to the radius of a circle.
😀 One radian is defined as the angle subtended at the center of a circle by an arc whose length is equal to the radius of the circle.
😀 The concept of radians revolves around the idea that the angle is directly related to the circle’s radius.
😀 Radians are more intuitive in mathematics because they tie directly to the circle's geometry, with the radius appearing in the formula.
😀 To convert between degrees and radians, the key relationship is that 360° equals 2π radians.
😀 One full rotation (360°) equals 2π radians, and understanding this conversion is crucial for working with both units.
😀 Half a rotation (180°) equals π radians, and a right angle (90°) equals π/2 radians.
😀 The exact conversion formula for one radian in degrees is approximately 57.3°, derived from the ratio 360°/2π.
😀 Knowing one of the conversion relationships (like 360° = 2π radians) allows us to derive the others easily without memorizing them all.

Q & A

What is the main concept of radians?
-Radians are a way of measuring angles based on the radius of a circle. When the length of an arc on the circle equals the radius, the angle formed is one radian.
Why is the number 360 used to measure angles in degrees?
-The number 360 is somewhat arbitrary, but it is historically linked to the base-60 number system, which was used by ancient civilizations like the Babylonians.
How is a radian defined geometrically?
-A radian is defined as the angle subtended at the center of a circle when the length of the arc equals the radius of the circle.
What is the relationship between degrees and radians?
-The full rotation of a circle equals 360° or 2π radians. This means 360° equals 2π radians, establishing the conversion factor between the two units.
How many radians are in 180°?
-180° is equal to π radians. This can be derived by dividing the 360° = 2π radians equation by 2.
What is the radian equivalent of a right angle?
-A right angle, which is 90°, is equivalent to π/2 radians.
What would 2π radians represent in degrees?
-2π radians is equal to 360°, representing one complete rotation around the circle.
What is the value of one radian in degrees?
-One radian is approximately equal to 57.3° when π is approximated as 3.14.
How do you convert from radians to degrees?
-To convert from radians to degrees, multiply the radian value by 180/π.
Why are radians considered a more logical way to measure angles than degrees?
-Radians are based on the radius of the circle, making them a more natural measurement since the angle is directly related to the geometry of the circle itself.