5.2 Unit circle: sine and cosine functions (Page 4/12)

Precalculus

Page 4 / 12

From the Pythagorean Theorem, we get

x^{2} + y^{2} = 1

Substituting $x = \frac{1}{2},$ we get

{(\frac{1}{2})}^{2} + y^{2} = 1

Solving for $y,$ we get

\begin{array}{l} \frac{1}{4} + y^{2} = 1 \\ y^{2} = 1 - \frac{1}{4} \\ y^{2} = \frac{3}{4} \\ y = \pm \frac{\sqrt{3}}{2} \end{array}

Since $t = \frac{π}{3}$ has the terminal side in quadrant I where the y- coordinate is positive, we choose $y = \frac{\sqrt{3}}{2},$ the positive value.

At $t = \frac{π}{3}$ (60°), the $(x, y)$ coordinates for the point on a circle of radius $1$ at an angle of $60°$ are $(\frac{1}{2}, \frac{\sqrt{3}}{2}),$ so we can find the sine and cosine.

\begin{array}{l} (x, y) = (\frac{1}{2}, \frac{\sqrt{3}}{2}) \\ x = \frac{1}{2}, y = \frac{\sqrt{3}}{2} \\ \cos t = \frac{1}{2}, \sin t = \frac{\sqrt{3}}{2} \end{array}

We have now found the cosine and sine values for all of the most commonly encountered angles in the first quadrant of the unit circle. [link] summarizes these values.

Angle	0	$\frac{π}{6},$ or 30	$\frac{π}{4},$ or 45°	$\frac{π}{3},$ or 60°	$\frac{π}{2},$ or 90°
Cosine	1	$\frac{\sqrt{3}}{2}$	$\frac{\sqrt{2}}{2}$	$\frac{1}{2}$	0
Sine	0	$\frac{1}{2}$	$\frac{\sqrt{2}}{2}$	$\frac{\sqrt{3}}{2}$	1

[link] shows the common angles in the first quadrant of the unit circle.

Graph of a quarter circle with angles of 0, 30, 45, 60, and 90 degrees inscribed. Equivalence of angles in radians shown. Points along circle are marked.

Using a calculator to find sine and cosine

To find the cosine and sine of angles other than the special angles , we turn to a computer or calculator. Be aware : Most calculators can be set into “degree” or “radian” mode, which tells the calculator the units for the input value. When we evaluate $\cos (30)$ on our calculator, it will evaluate it as the cosine of 30 degrees if the calculator is in degree mode, or the cosine of 30 radians if the calculator is in radian mode.

How To

Given an angle in radians, use a graphing calculator to find the cosine.

If the calculator has degree mode and radian mode, set it to radian mode.
Press the COS key.
Enter the radian value of the angle and press the close-parentheses key ")".
Press ENTER.

Using a graphing calculator to find sine and cosine

Evaluate $\cos (\frac{5 π}{3})$ using a graphing calculator or computer.

Enter the following keystrokes:

$COS (5 \times π \div 3 ) ENTER$

\cos (\frac{5 π}{3}) = 0.5

Got questions? Get instant answers now!

Try It

Evaluate $\sin (\frac{π}{3}) .$

approximately 0.866025403

Got questions? Get instant answers now!

Identifying the domain and range of sine and cosine functions

Now that we can find the sine and cosine of an angle, we need to discuss their domains and ranges. What are the domains of the sine and cosine functions? That is, what are the smallest and largest numbers that can be inputs of the functions? Because angles smaller than 0 and angles larger than $2 π$ can still be graphed on the unit circle and have real values of $x, y,$ and $r,$ there is no lower or upper limit to the angles that can be inputs to the sine and cosine functions. The input to the sine and cosine functions is the rotation from the positive x -axis, and that may be any real number.

What are the ranges of the sine and cosine functions? What are the least and greatest possible values for their output? We can see the answers by examining the unit circle , as shown in [link] . The bounds of the x -coordinate are $[−1, 1] .$ The bounds of the y -coordinate are also $[−1, 1] .$ Therefore, the range of both the sine and cosine functions is $[−1, 1] .$

Finding reference angles

We have discussed finding the sine and cosine for angles in the first quadrant, but what if our angle is in another quadrant? For any given angle in the first quadrant, there is an angle in the second quadrant with the same sine value. Because the sine value is the y -coordinate on the unit circle, the other angle with the same sine will share the same y -value, but have the opposite x -value. Therefore, its cosine value will be the opposite of the first angle’s cosine value.

Questions & Answers

for the "hiking" mix, there are 1,000 pieces in the mix, containing 390.8 g of fat, and 165 g of protein. if there is the same amount of almonds as cashews, how many of each item is in the trail mix?

ADNAN Reply

linear speed of an object

Melissa Reply

an object is traveling around a circle with a radius of 13 meters .if in 20 seconds a central angle of 1/7 Radian is swept out what are the linear and angular speed of the object

Melissa

test

Matrix

how to find domain

Mohamed Reply

like this: (2)/(2-x) the aim is to see what will not be compatible with this rational expression. If x= 0 then the fraction is undefined since we cannot divide by zero. Therefore, the domain consist of all real numbers except 2.

Dan

define the term of domain

Moha

if a>0 then the graph is concave

Angel Reply

if a<0 then the graph is concave blank

Angel

what's a domain

Kamogelo Reply

The set of all values you can use as input into a function su h that the output each time will be defined, meaningful and real.

Spiro

how fast can i understand functions without much difficulty

Joe Reply

what is inequalities

Nathaniel

functions can be understood without a lot of difficulty. Observe the following: f(2) 2x - x 2(2)-2= 2 now observe this: (2,f(2)) ( 2, -2) 2(-x)+2 = -2 -4+2=-2

Dan

what is set?

Kelvin Reply

a colony of bacteria is growing exponentially doubling in size every 100 minutes. how much minutes will it take for the colony of bacteria to triple in size

Divya Reply

I got 300 minutes. is it right?

Patience

no. should be about 150 minutes.

Jason

It should be 158.5 minutes.

ok, thanks

Patience

100•3=300 300=50•2^x 6=2^x x=log_2(6) =2.5849625 so, 300=50•2^2.5849625 and, so, the # of bacteria will double every (100•2.5849625) = 258.49625 minutes

Thomas

158.5 This number can be developed by using algebra and logarithms. Begin by moving log(2) to the right hand side of the equation like this: t/100 log(2)= log(3) step 1: divide each side by log(2) t/100=1.58496250072 step 2: multiply each side by 100 to isolate t. t=158.49

Dan

what is the importance knowing the graph of circular functions?

Arabella Reply

can get some help basic precalculus

ismail Reply

What do you need help with?

Andrew

how to convert general to standard form with not perfect trinomial

Camalia Reply

can get some help inverse function

ismail

Rectangle coordinate

Asma Reply

how to find for x

Jhon Reply

it depends on the equation

Robert

yeah, it does. why do we attempt to gain all of them one side or the other?

Melissa

how to find x: 12x = 144 notice how 12 is being multiplied by x. Therefore division is needed to isolate x and whatever we do to one side of the equation we must do to the other. That develops this: x= 144/12 divide 144 by 12 to get x. addition: 12+x= 14 subtract 12 by each side. x =2

Dan

whats a domain

mike Reply

The domain of a function is the set of all input on which the function is defined. For example all real numbers are the Domain of any Polynomial function.

Spiro

Spiro; thanks for putting it out there like that, 😁

Melissa

foci (–7,–17) and (–7,17), the absolute value of the differenceof the distances of any point from the foci is 24.

Churlene Reply

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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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