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The steps to evaluate the six trigonometric functions (sin, cos, tan, cot, sec, and csc) for an angle θ in standard position, given that tan θ = 2/3 and θ lies in quadrant i. The solution involves calculating the value of r and using the given definitions and quadrant information to determine the values of each trigonometric function.
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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 5.
Determine the value of the six trigonometric functions of the angle, θ.
tan θ =
; θ lies in quadrant I
Solution Step 1:
First, find the value of r. Since tan θ =
y
x
r =
x^2 + y^2
=
Solution Step 2:
Since θ lies in quadrant I, all of the trigonometric functions are positive.
Using this fact and the information above, we can determine the value of the
six trigonometric functions of θ.
sin θ=
y
r
cos θ=
x
r
sin θ=
cos θ=
sin θ=
cos θ=
tan θ=
y
x
, x 6 = 0 cot θ=
x
y
, y 6 = 0
tan θ=
cot θ=
sec θ=
r
x
, x 6 = 0 csc θ=
r
y
, y 6 = 0
sec θ=
csc θ=