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In this section, you will:
  • Find function values for the sine and cosine of 30°  or  ( π 6 ) , 45°  or  ( π 4 ) and 60° or ( π 3 ) .
  • Identify the domain and range of sine and cosine functions.
  • Use reference angles to evaluate trigonometric functions.
Photo of a ferris wheel.
The Singapore Flyer is the world’s tallest Ferris wheel. (credit: “Vibin JK”/Flickr)

Looking for a thrill? Then consider a ride on the Singapore Flyer, the world’s tallest Ferris wheel. Located in Singapore, the Ferris wheel soars to a height of 541 feet—a little more than a tenth of a mile! Described as an observation wheel, riders enjoy spectacular views as they travel from the ground to the peak and down again in a repeating pattern. In this section, we will examine this type of revolving motion around a circle. To do so, we need to define the type of circle first, and then place that circle on a coordinate system. Then we can discuss circular motion in terms of the coordinate pairs.

Finding function values for the sine and cosine

To define our trigonometric functions, we begin by drawing a unit circle, a circle centered at the origin with radius 1, as shown in [link] . The angle (in radians) that t intercepts forms an arc of length s . Using the formula s = r t , and knowing that r = 1 , we see that for a unit circle    , s = t .

Recall that the x- and y- axes divide the coordinate plane into four quarters called quadrants. We label these quadrants to mimic the direction a positive angle would sweep. The four quadrants are labeled I, II, III, and IV.

For any angle t , we can label the intersection of the terminal side and the unit circle as by its coordinates, ( x , y ) . The coordinates x and y will be the outputs of the trigonometric functions f ( t ) = cos t and f ( t ) = sin t , respectively. This means x = cos t and y = sin t .

Graph of a circle with angle t, radius of 1, and an arc created by the angle with length s. The terminal side of the angle intersects the circle at the point (x,y).
Unit circle where the central angle is t radians

Unit circle

A unit circle    has a center at ( 0 , 0 ) and radius 1 . In a unit circle, the length of the intercepted arc is equal to the radian measure of the central angle 1.

Let ( x , y ) be the endpoint on the unit circle of an arc of arc length s . The ( x , y ) coordinates of this point can be described as functions of the angle.

Defining sine and cosine functions

Now that we have our unit circle labeled, we can learn how the ( x , y ) coordinates relate to the arc length    and angle    . The sine function    relates a real number t to the y -coordinate of the point where the corresponding angle intercepts the unit circle. More precisely, the sine of an angle t equals the y -value of the endpoint on the unit circle of an arc of length t . In [link] , the sine is equal to y . Like all functions, the sine function has an input and an output. Its input is the measure of the angle; its output is the y -coordinate of the corresponding point on the unit circle.

The cosine function    of an angle t equals the x -value of the endpoint on the unit circle of an arc of length t . In [link] , the cosine is equal to x .

Illustration of an angle t, with terminal side length equal to 1, and an arc created by angle with length t. The terminal side of the angle intersects the circle at the point (x,y), which is equivalent to (cos t, sin t).

Because it is understood that sine and cosine are functions, we do not always need to write them with parentheses: sin t is the same as sin ( t ) and cos t is the same as cos ( t ) . Likewise, cos 2 t is a commonly used shorthand notation for ( cos ( t ) ) 2 . Be aware that many calculators and computers do not recognize the shorthand notation. When in doubt, use the extra parentheses when entering calculations into a calculator or computer.

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Source:  OpenStax, Precalculus. OpenStax CNX. Jan 19, 2016 Download for free at https://legacy.cnx.org/content/col11667/1.6
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