Right Triangle Trigonometry

Right Triangle Trigonometry

Angles Trigonometry: measurement of triangles Angle Measure

Trigonometric Functions • In this section, we will be studying special ratios of the sides of a right triangle, with respect to angle, . • These ratios are better known as our six basic trig functions: • Sine of  • Cosine of  • Tangent of  • Cosecant of  • Secant of  • Cotangent of 

Hypotenuse Side opposite  Side adjacent to  The sides of a right triangle Take a look at the right triangle, with an acute angle, , in the figure below. Notice how the three sides are labeled in reference to .

Definitions of the Six Trigonometric Functions

Definitions of the Six Trigonometric Functions To remember the definitions of Sine, Cosine and Tangent, we use the acronym : “SOH CAH TOA”

 5 9 Example Find the exact value of the six trig functions of : First find the length of the hypotenuse using the Pythagorean Theorem.

 5 9 Example (cont) So the six trig functions are:

Example Given that  is an acute angle and , find the exact value of the six trig functions of .

Example Find the value of sin  given cot  = 0.387, where  is an acute angle. Give answer to three significant digits.

45º 1 45º 1 Special Right Triangles The 45º- 45º- 90º Triangle Ratio of the sides: Find the exact values & decimal approximations (to 3 sig digits) of the six trig functions for 45 sin 45 = csc 45 = cos 45= sec 45 = tan 45 = cot 45 =

30º 2 60º 1 Special Right Triangles The 30º- 60º- 90º Triangle Ratio of the sides: Find the exact values & decimal approximations (to 3 sig digits) of the six trig functions for 30 sin 30= csc 30 = cos 30 = sec 30 = tan 30 = cot 30 =

30º 2 60º 1 Special Right Triangles The 30º- 60º- 90º Triangle Ratio of the sides: Find the exact values & decimal approximations (to 3 sig digits) of the six trig functions for 60 sin 60 = csc 60 = cos 60 = sec 60 = tan 60 = cot 60 =

Using the calculator to evaluate trig functions **Make sure the MODE is set to the correct unit of angle measure (i.e. Degree vs. Radian) Example: Findto three significant digits.

Using the calculator to evaluate trig functions For reciprocal functions, you may use the  button, but DO NOT USE THE INVERSE FUNCTIONS (e.g. SIN-1 )! Example: 1. Find2. Find (to 3 significant dig) (to 4 significant dig)

The inverse trig functions give the measure of the angle if we know the value of the function. Notation:The inverse sine function is denoted as sin-1x. It means “the angle whose sine is x”. The inverse cosine function is denoted as cos-1x. It means “the angle whose cosine is x”. The inverse tangent function is denoted as tan-1x. It means “the angle whose tangent is x”.

Examples Evaluate the following inverse trig functions using the calculator. Give answer in degrees.

Angles and Accuracy of Trigonometric Functions

Since you are looking for the side adjacent to 52º and are given the hypotenuse, you should use the _____________ function. 52º 9.6 y Example Solve for y: Solution: WARNING: Make sure your MODE is set to “Degree”

A= 40.7° b c B C a=8.2” Example Solve the right triangle with the indicated measures. Solution Answers:

A c=35 b C a=25 B Example

36° 36° 8.6 m Example 3. Find the altitude of the isosceles triangle below.

Example 4. Solve the right triangle with

Angle of Elevation and Angle of Depression The angle of elevation for a point above a horizontal line is the angle formed by the horizontal line and the line of sight of the observer at that point. The angle of depression for a point below a horizontal line is the angle formed by the horizontal line and the line of sight of the observer at that point. Horizontal line Angle of depression Angle of elevation Horizontal line

108 m y 42.3° Example A guy wire of length 108 meters runs from the top of an antenna to the ground. If the angle of elevation of the top of the antenna, sighting along the guy wire, is 42.3° then what is the height of the antenna? Give answer to three significant digits. Solution

Right Triangle Trigonometry