ș = arccos (adjacent / hypotenuse)

ș = arctan (opposite / adjacent)

Often written: siní^1 , cosí^1 , taní^1

If the tangent of ș is 1, what is ș?

ș = arctangent(1) = 45°

1.13 - Radians

Radian measure: A measurement of angles

based on a ratio of lengths.

Angles are often measured or specified in degrees, but another unit, the radian, is

useful in many computations. The radian measure of an angle is the ratio of two lengths

on a circle. The angle and lengths are perhaps most easily understood by looking at the

diagram in Equation 1 on the right. The arc length is the length of the arc on the

circumference cut off by the angle when it is placed at the circle’s center. The other

length is the radius of the circle. The radian measure of the angle equals the arc length

divided by the radius.

A360° angle equals 2 ʌ radians. Why is this so? The angle 360° describes an entire

circle. The arc length in this case equals the circumference ( 2 ʌr) of a circle divided by

the radius r of the circle. The radius factor cancels out, leaving 2 ʌ as the result.

Radians are dimensionless numbers. Why? Since a radian is a ratio of two lengths, the

length units cancel out. However, we follow a radian measure with "rad" so it is clear

what is meant.

Radian measure

Angle = arc length / radius = s/r

360° = 2ʌ rad

·Radians are dimensionless

·Units: radians (rad)

What is the angle's measure in

radians?

Angle = arc length / radius

ș = (ʌ/2 m)/(2 m)

ș = ʌ/4 rad

(^16) Copyright 2000-2007 Kinetic Books Co. Chapter 01