5.4 Right triangle trigonometry

Precalculus

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In this section, you will:

Use right triangles to evaluate trigonometric functions.
Find function values for $30° (\frac{π}{6}),$ $45° (\frac{π}{4}),$ and $60° (\frac{π}{3}) .$
Use cofunctions of complementary angles.
Use the deﬁnitions of trigonometric functions of any angle.
Use right triangle trigonometry to solve applied problems.

We have previously defined the sine and cosine of an angle in terms of the coordinates of a point on the unit circle intersected by the terminal side of the angle:

\begin{matrix} \cos t = x \\ \sin t = y \end{matrix}

In this section, we will see another way to define trigonometric functions using properties of right triangles .

Using right triangles to evaluate trigonometric functions

In earlier sections, we used a unit circle to define the trigonometric functions . In this section, we will extend those definitions so that we can apply them to right triangles. The value of the sine or cosine function of $t$ is its value at $t$ radians. First, we need to create our right triangle. [link] shows a point on a unit circle of radius 1. If we drop a vertical line segment from the point $(x, y)$ to the x -axis, we have a right triangle whose vertical side has length $y$ and whose horizontal side has length $x .$ We can use this right triangle to redefine sine, cosine, and the other trigonometric functions as ratios of the sides of a right triangle.

Graph of quarter circle with radius of 1 and angle of t. Point of (x,y) is at intersection of terminal side of angle and edge of circle.

We know

\cos t = \frac{x}{1} = x

Likewise, we know

\sin t = \frac{y}{1} = y

These ratios still apply to the sides of a right triangle when no unit circle is involved and when the triangle is not in standard position and is not being graphed using $(x, y)$ coordinates. To be able to use these ratios freely, we will give the sides more general names: Instead of $x,$ we will call the side between the given angle and the right angle the adjacent side to angle $t .$ (Adjacent means “next to.”) Instead of $y,$ we will call the side most distant from the given angle the opposite side from angle $t .$ And instead of $1,$ we will call the side of a right triangle opposite the right angle the hypotenuse . These sides are labeled in [link] .

A right triangle with hypotenuse, opposite, and adjacent sides labeled. — The sides of a right triangle in relation to angle $t .$

Understanding right triangle relationships

Given a right triangle with an acute angle of $t,$

\begin{array}{l} \sin (t) = \frac{opposite}{hypotenuse} \\ \cos (t) = \frac{adjacent}{hypotenuse} \\ \tan (t) = \frac{opposite}{adjacent} \end{array}

A common mnemonic for remembering these relationships is SohCahToa, formed from the first letters of “ S ine is o pposite over h ypotenuse, C osine is a djacent over h ypotenuse, T angent is o pposite over a djacent.”

How To

Given the side lengths of a right triangle and one of the acute angles, find the sine, cosine, and tangent of that angle.

Find the sine as the ratio of the opposite side to the hypotenuse.
Find the cosine as the ratio of the adjacent side to the hypotenuse.
Find the tangent is the ratio of the opposite side to the adjacent side.

Evaluating a trigonometric function of a right triangle

Given the triangle shown in [link] , find the value of $\cos α .$

A right triangle with sid lengths of 8, 15, and 17. Angle alpha also labeled.

The side adjacent to the angle is 15, and the hypotenuse of the triangle is 17, so:

\begin{array}{l} \cos (α) = \frac{adjacent}{hypotenuse} \\ = \frac{15}{17} \end{array}

Got questions? Get instant answers now!

Try It

Given the triangle shown in [link] , find the value of $sin t .$

A right triangle with sides of 7, 24, and 25. Also labeled is angle t.

$\frac{7}{25}$

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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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