Evaluating Trigonometric Functions - Notes | MATH 1060, Study notes of Trigonometry

Material Type: Notes; Class: Trigonometry; Subject: Mathematics; University: Utah State University; Term: Unknown 1989;

Typology: Study notes

Pre 2010

Uploaded on 07/30/2009

koofers-user-6d0-1
koofers-user-6d0-1 🇺🇸

5

(1)

10 documents

1 / 1

Toggle sidebar

This page cannot be seen from the preview

Don't miss anything!

bg1
Evaluating Trigonometric Functions
If we have any angle, θ, in standard position with a point (x, y) on the terminal side of θ
and r=px2+y2>0, then use the following definitions to evaluate the six trigonometric
functions:
sin θ=y
rcos θ=x
r
tan θ=y
x, x 6= 0 cot θ=x
y, y 6= 0
sec θ=r
x, x 6= 0 csc θ=r
y, y 6= 0
The following figure shows us the quadrants and will also help us to evaluate the
functions:
Quadrant II Quadrant I
sin θ: + sin θ: +
cos θ:cos θ: +
tan θ:tan θ: +
Quadrant III Quadrant IV
sin θ:sin θ:
cos θ:cos θ: +
tan θ: + tan θ:
Problem 7.
Determine the value of the six trigonometric functions of θ.
y=x;θ lies in quadrant III
Solution Step 1:
First, find a point on the line. Since y=x, any value will work as long
as we use the same value for both xand y. Let’s use (1,1) because we
are in quadrant III.

Partial preview of the text

Download Evaluating Trigonometric Functions - Notes | MATH 1060 and more Study notes Trigonometry in PDF only on Docsity!

Evaluating Trigonometric Functions

If we have any angle, θ, in standard position with a point (x, y) on the terminal side of θ

and r =

x^2 + y^2 > 0, then use the following definitions to evaluate the six trigonometric

functions:

sin θ=

y r

cos θ=

x r

tan θ=

y x

, x 6 = 0 cot θ=

x y

, y 6 = 0

sec θ=

r

x

, x 6 = 0 csc θ=

r

y

, y 6 = 0

The following figure shows us the quadrants and will also help us to evaluate the functions:

Quadrant II Quadrant I sin θ : + sin θ : + cos θ : − cos θ : + tan θ : − tan θ : +

Quadrant III Quadrant IV sin θ : − sin θ : − cos θ : − cos θ : + tan θ : + tan θ : −

Problem 7.

Determine the value of the six trigonometric functions of θ.

y = x; θ lies in quadrant III

Solution Step 1:

First, find a point on the line. Since y = x, any value will work as long

as we use the same value for both x and y. Let’s use (− 1 , −1) because we

are in quadrant III.