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Section 6.5 The Unit Circle (TR5)

Subsection 6.5.1 Activities

Remark 6.5.1.

In Section 6.4, we learned how to find the exact values of the six trigonometric ratios for the special acute angles 30, 45, and 60. In this section, we will use that knowledge and expand to finding the exact trig values of any multiple of those angles.

Definition 6.5.2.

The unit circle is the circle of radius 1 centered at the origin on the coordinate plane.
Unit circle
Figure 6.5.3.

Activity 6.5.4.

Let θ be the angle shown below in standard form. Notice that the terminal side intersects with the unit circle. (Note: We will assume a circle drawn in this context is the unit circle unless told otherwise.) We will label that point of intersection as (x,y).
(a)
What is the length of line segment r, whose endpoints are the origin and the point (x,y) ?
  1. 1
  2. 2
  3. 3
  4. cannot be determined
Answer.
A
(b)
We will now create a right triangle using the previous line segment r as the hypotenuse. Draw in a line segment of length x and another of length y to create such a triangle.
Answer.
(c)
Using the triangle you’ve just created, find cosθ.
  1. xy
  2. 1x
  3. x1
  4. 1y
  5. y1
Answer.
C
(d)
Using that same triangle, find sinθ.
  1. xy
  2. 1x
  3. x1
  4. 1y
  5. y1
Answer.
E
(e)
Solve for x in one of the equations you’ve found above to determine an expression for the x-value of the point (x,y) .
  1. ycosθ
  2. ysinθ
  3. cosθ
  4. sinθ
  5. 1cosθ
  6. 1sinθ
Answer.
C
(f)
Solve for y in one of the equations you’ve found above to determine an expression for the y-value of the point (x,y) .
  1. ycosθ
  2. ysinθ
  3. cosθ
  4. sinθ
  5. 1cosθ
  6. 1sinθ
Answer.
D

Remark 6.5.5.

From the previous activity, we have found a connection between the sine and cosine values of an angle θ and the coordinates (x,y) of the point at which that angle intersects the unit circle. Namely,
x=cosθ and y=sinθ

Activity 6.5.6.

Consider each angle θ given below. Find the coordinates (x,y) for the point at which θ intersects the unit circle.
(a)
θ=π4
  1. (12,32)
  2. (22,22)
  3. (32,12)
  4. (0,1)
  5. (1,0)
Answer.
B
(b)
θ=30
  1. (12,32)
  2. (22,22)
  3. (32,12)
  4. (0,1)
  5. (1,0)
Answer.
C
(c)
θ=π3
  1. (12,32)
  2. (22,22)
  3. (32,12)
  4. (0,1)
  5. (1,0)
Answer.
A
(d)
θ=0
  1. (12,32)
  2. (22,22)
  3. (32,12)
  4. (0,1)
  5. (1,0)
Answer.
E
(e)
θ=π2
  1. (12,32)
  2. (22,22)
  3. (32,12)
  4. (0,1)
  5. (1,0)
Answer.
D

Remark 6.5.7.

In Activity 6.5.6, we found (x,y)-coordinates (and thus the sine and cosine values) for angles that terminated either in Quadrant 1 or on an axis adjacent to Quadrant 1. We’ll now expand to angles that terminate elsewhere, using our knowledge of the cosine and sine values of angles in the first quadrant along with how reflections over the x and y axes affect the signs of the coordinates. (See Section 2.4 for a reminder on how these reflections work.)

Activity 6.5.8.

Let’s consider the angle θ=150, drawn below with the unit circle.
(a)
The angle below represents the reference angle for θ=150, which is the smallest angle between the terminal side of θ and the x-axis. What is the measure of this reference angle?
  1. 0
  2. 30
  3. 45
  4. 60
  5. 75
Answer.
B
(b)
We can find the sine and cosines values of our original angle, θ=150, by using the reference angle to help. Find the point (x1,y1), where the terminal side of the 30 angle intersects the unit circle.
  1. (12,32)
  2. (32,12)
  3. (22,22)
  4. (32,12)
  5. (22,22)
Answer.
B
(c)
How does the point you’ve just found compare with the point (x,y), where the terminal edge of θ=150 intersects the unit circle?
  1. The x-values and the y-values are switched with each other.
  2. The x-values will be the same, but the y-values will have opposite signs.
  3. The y-values will be the same, but the x-values will have opposite signs.
  4. The x-values and the y-values will both have opposite signs.
Answer.
C
(d)
What are the sine and cosine of θ=150?
  1. sin150=12 and cos150=32
  2. sin150=32 and cos150=12
  3. sin150=32 and cos150=12
  4. sin150=12 and cos150=32
  5. sin150=12 and cos150=32
Answer.
D

Activity 6.5.9.

Let’s consider the angle θ=4π3, drawn below with the unit circle.
(a)
The angle below represents the reference angle for θ=4π3, which is the smallest angle between the terminal side of θ and the x-axis. What is the measure of this reference angle?
  1. π2
  2. π3
  3. π4
  4. π5
  5. π6
Answer.
B
(b)
We can find the sine and cosines values of our original angle, θ=4π3, by using the reference angle to help. Find the point (x1,y1), where the terminal side of the angle π3 intersects the unit circle.
  1. (12,32)
  2. (32,12)
  3. (22,22)
  4. (32,12)
  5. (22,22)
Answer.
A
(c)
How does the point you’ve just found compare with the point (x,y), where the terminal edge of θ=4π3 intersects the unit circle?
  1. The x-values and the y-values are switched with each other.
  2. The x-values will be the same, but the y-values will have opposite signs.
  3. The y-values will be the same, but the x-values will have opposite signs.
  4. The x-values and the y-values will both have opposite signs.
Answer.
D
(d)
What are the sine and cosine of θ=4π3?
  1. sin4π3=12 and cos4π3=32
  2. sin4π3=32 and cos4π3=12
  3. sin4π3=32 and cos4π3=12
  4. sin4π3=12 and cos4π3=32
  5. sin4π3=12 and cos4π3=32
Answer.
B

Activity 6.5.10.

Find sinθ and cosθ for each angle given.
(a)
θ=π4
Answer.
sinθ=22 and cosθ=22
(b)
θ=2π3
Answer.
sinθ=32 and cosθ=12
(c)
θ=11π6
Answer.
sinθ=12 and cosθ=32
(d)
θ=135
Answer.
sinθ=22 and cosθ=22

Activity 6.5.11.

Find the following for each angle graphed below.
  • θ in radians and degrees
  • sinθ
  • cosθ
  • tanθ
  • secθ
  • cscθ
  • cotθ
(a)
Answer.
  • θ=5π6 or 150
  • sinθ=12
  • cosθ=32
  • tanθ=33 or 13
  • secθ=3
  • cscθ=233
  • cotθ=2
(b)
Answer.
  • θ=5π4 or 225
  • sinθ=22
  • cosθ=22
  • tanθ=1 or 13
  • secθ=2
  • cscθ=2
  • cotθ=1

Remark 6.5.12.

So far we’ve only dealt with angles that are part of a special right triangle (30-60-90 or 45-45-90) or are a multiple of one of these angles, but we can extend to other angles as well.

Activity 6.5.13.

A point (x,y) lies on the unit circle in Quadrant IV. Its x-coordinate is 34.
(a)
Draw a sketch of the angle θ whose terminal side intersects the unit circle as described above.
Answer.
(b)
What sign will the y-coordinate be?
  1. positive
  2. negative
Answer.
B
(c)
Find the exact value of the y-coordinate.
  1. 716
  2. 716
  3. 74
  4. 74
Answer.
D
(d)
Find sinθ, cosθ, tanθ, secθ, cscθ, and cotθ.
Answer.
  • sinθ=74
  • cosθ=34
  • tanθ=73
  • secθ=43
  • cscθ=47 or 477
  • cotθ=37 or 377

Activity 6.5.14.

Let θ be the angle whose terminal side intersects the unit circle at the point described in each situation below. Find sinθ, cosθ, tanθ, secθ, cscθ, and cotθ.
(a)
The point (45,y) that lies on the unit circle in Quadrant I.
Answer.
  • sinθ=35
  • cosθ=45
  • tanθ=34
  • secθ=54
  • cscθ=53
  • cotθ=43
(b)
The point (3537,1237).
Answer.
  • sinθ=1237
  • cosθ=3537
  • tanθ=1235
  • secθ=3735
  • cscθ=3712
  • cotθ=3512
(c)
The point (x,116) that lies on the unit circle in Quadrant III.
Answer.
  • sinθ=116
  • cosθ=56
  • tanθ=115
  • secθ=65
  • cscθ=611 or 61111
  • cotθ=511 or 51111
(d)
The point (1213,513).
Answer.
  • sinθ=513
  • cosθ=1213
  • tanθ=512
  • secθ=1312
  • cscθ=135
  • cotθ=125

Exercises 6.5.2 Exercises