Evaluating Trig Functions with Quadrant Info: sin, cos, tan, cot, sec, csc, Study notes of Trigonometry

The definitions and instructions for evaluating the six trigonometric functions (sin, cos, tan, cot, sec, and csc) based on an angle's position in the standard position and its corresponding point (x, y) on the terminal side. The figure illustrates the quadrants and their corresponding trigonometric function signs. A problem-solving example is included.

Typology: Study notes

Pre 2010

Uploaded on 07/30/2009

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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 4.
Give the quadrant in which θlies.
csc θ=37
6
tan θ=6
Solution Step 1:
Are csc θand tan θpositive or negative? Each will be true in two quad-
rants. Find the quadrant that is true for both. You will get:
quadrant II

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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 4.

Give the quadrant in which θ lies.

csc θ =

tan θ = − 6

Solution Step 1:

Are csc θ and tan θ positive or negative? Each will be true in two quad-

rants. Find the quadrant that is true for both. You will get:

quadrant II