Problem 5 on Trigonometry with Solution - Homework | MATH 1060, Assignments of Trigonometry

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

Typology: Assignments

Pre 2010

Uploaded on 08/18/2009

koofers-user-dp0
koofers-user-dp0 🇺🇸

4

(1)

8 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 5.
Determine the value of the six trigonometric functions of θ.
cot θ=1
2;θ lies in quadrant IV
Solution Step 1:
Find the value of r. Since cot θ=x
y, you will get:
r=5

Partial preview of the text

Download Problem 5 on Trigonometry with Solution - Homework | MATH 1060 and more Assignments 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 5.

Determine the value of the six trigonometric functions of θ.

cot θ = −

; θ lies in quadrant IV

Solution Step 1:

Find the value of r. Since cot θ =

x

y

, you will get:

r =