8.2 Non-right triangles: law of cosines (Page 2/8)

<< Chapter < Page

Precalculus

Page 2 / 8

Chapter >> Page >

Try It

Given two sides and the angle between them (SAS), find the measures of the remaining side and angles of a triangle.

Sketch the triangle. Identify the measures of the known sides and angles. Use variables to represent the measures of the unknown sides and angles.
Apply the Law of Cosines to find the length of the unknown side or angle.
Apply the Law of Sines or Cosines to find the measure of a second angle.
Compute the measure of the remaining angle.

Finding the unknown side and angles of a sas triangle

Find the unknown side and angles of the triangle in [link] .

A triangle with standard labels. Side a = 10, side c = 12, and angle beta = 30 degrees.

First, make note of what is given: two sides and the angle between them. This arrangement is classified as SAS and supplies the data needed to apply the Law of Cosines.

Each one of the three laws of cosines begins with the square of an unknown side opposite a known angle. For this example, the first side to solve for is side $b,$ as we know the measurement of the opposite angle $β .$

\begin{array}{l} b^{2} = a^{2} + c^{2} - 2 a c \cos β \\ b^{2} = 10^{2} + 12^{2} - 2 (10) (12) \cos (30^{\circ}) \begin{matrix}  \end{matrix} & Substitute the measurements for the known quantities . \\ b^{2} = 100 + 144 - 240 (\frac{\sqrt{3}}{2}) & Evaluate the cosine and begin to simplify . \\ b^{2} = 244 - 120 \sqrt{3} \\ b = \sqrt{244 - 120 \sqrt{3}} & Use the square root property . \\ b \approx 6.013 \end{array}

Because we are solving for a length, we use only the positive square root. Now that we know the length $b,$ we can use the Law of Sines to fill in the remaining angles of the triangle. Solving for angle $α,$ we have

\begin{array}{l} \frac{\sin α}{a} = \frac{\sin β}{b} \\ \frac{\sin α}{10} = \frac{\sin (30°)}{6.013} \\ \sin α = \frac{10 \sin (30°)}{6.013} & Multiply both sides of the equation by 10 . \\ α = \sin^{- 1} (\frac{10 \sin (30°)}{6.013}) \begin{matrix}  \end{matrix} & Find the inverse sine of \frac{10 \sin (30°)}{6.013} . \\ α \approx 56.3° \end{array}

The other possibility for $α$ would be $α = 180° - 56.3° \approx 123.7°.$ In the original diagram, $α$ is adjacent to the longest side, so $α$ is an acute angle and, therefore, $123.7°$ does not make sense. Notice that if we choose to apply the Law of Cosines , we arrive at a unique answer. We do not have to consider the other possibilities, as cosine is unique for angles between $0°$ and $180°.$ Proceeding with $α \approx 56.3°,$ we can then find the third angle of the triangle.

γ = 180° - 30° - 56.3° \approx 93.7°

The complete set of angles and sides is

\begin{array}{l} α \approx 56.3° \begin{matrix}  \end{matrix} & a = 10 \\ β = 30° & b \approx 6.013 \\ γ \approx 93.7° & c = 12 \end{array}

Got questions? Get instant answers now!

Try It

Find the missing side and angles of the given triangle: $α = 30°, b = 12, c = 24.$

$a \approx 14.9, β \approx 23.8°, γ \approx 126.2° .$

Got questions? Get instant answers now!

Solving for an angle of a sss triangle

Find the angle $α$ for the given triangle if side $a = 20,$ side $b = 25,$ and side $c = 18.$

For this example, we have no angles. We can solve for any angle using the Law of Cosines. To solve for angle $α,$ we have

\begin{array}{l} a^{2} = b^{2} + c^{2} −2 b c \cos α \\ 20^{2} = 25^{2} + 18^{2} −2 (25) (18) \cos α & Substitute the appropriate measurements . \\ 400 = 625 + 324 - 900 \cos α & Simplify in each step . \\ 400 = 949 - 900 \cos α \\ −549 = −900 \cos α & Isolate cos α . \\ \frac{−549}{−900} = \cos α \\ 0.61 \approx \cos α \\ \cos^{−1} (0.61) \approx α & Find the inverse cosine . \\ α \approx 52.4° \end{array}

See [link] .

A triangle with standard labels. Side b =25, side a = 20, side c = 18, and angle alpha = 52.4 degrees.

Got questions? Get instant answers now!

Try It

Given $a = 5, b = 7,$ and $c = 10,$ find the missing angles.

$α \approx 27.7°, β \approx 40.5°, γ \approx 111.8°$

Got questions? Get instant answers now!

Solving applied problems using the law of cosines

Just as the Law of Sines provided the appropriate equations to solve a number of applications, the Law of Cosines is applicable to situations in which the given data fits the cosine models. We may see these in the fields of navigation, surveying, astronomy, and geometry, just to name a few.

<< Chapter < Page Page > Chapter >>

Practice Key Terms 2

Read also:

Get Jobilize Job Search Mobile App in your pocket Now!

100% Free Mobile Applications
Receive real-time job alerts and never miss the right job again

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

Google Play and the Google Play logo are trademarks of Google Inc.

Notification Switch

Would you like to follow the 'Precalculus' conversation and receive update notifications?

Ask

	3 Using heron’s formula to find the area of a triangle By OpenStax Read Online Course
	1 Using the law of cosines to solve oblique triangles By OpenStax Read Online Course
©flickr:	The Minute Man Hose Load By Michael Pitt Start Quiz
	Summer kitchens By Heather McAvoy Start Quiz
	11 AP 11 Muscular System Essay By OpenStax Start Flashcards
	Interviewing Skills MCQ By Mary Matera Start Quiz
	19 AP Key Terms 19 Cardiovascular System Heart By OpenStax Start Key Terms
	Precalculus By OpenStax Read Online Course
©flickr: brett	Celine Dion Quiz By JavaChamp Team Start Quiz
	Art Reviewer MCQ By Edgar Delgado Start Quiz
	11 Biology 11 Meiosis Sexual Reproduction MCQ By OpenStax Start Quiz
	Music 113 By Eric Crawford Start Quiz