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MAC 1114

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Module 1 Trigonometric Functions Rev.S08 Learning Objectives Upon completing this module, you should be able to: Use basic terms associated with angles. – PowerPoint PPT presentation

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Title: MAC 1114


1
MAC 1114
  • Module 1
  • Trigonometric Functions

Rev.S08
2
Learning Objectives
  • Upon completing this module, you should be able
    to
  • Use basic terms associated with angles.
  • Find measures of complementary and supplementary
    angles.
  • Calculate with degrees, minutes, and seconds.
  • Convert between decimal degrees and degrees,
    minutes, and seconds.
  • Identify the characteristics of an angle in
    standard position.
  • Find measures of coterminal angles.
  • Find angle measures by using geometric
    properties.
  • Apply the angle sum of a triangle property.

http//faculty.valenciacc.edu/ashaw/ Click link
to download other modules.
Rev.S08
3
Learning Objectives (Cont.)
  • Find angle measures and side lengths in similar
    triangles.
  • Solve applications involving similar triangles.
  • Learn basic concepts about trigonometric
    functions.
  • Find function values of an angle or quadrantal
    angles.
  • Decide whether a value is in the range of a
    trigonometric function
  • Use the reciprocal, Pythagorean and quotient
    identities.
  • Identify the quadrant of an angle.
  • Find other function values given one value and
    the quadrant.

http//faculty.valenciacc.edu/ashaw/ Click link
to download other modules.
Rev.S08
4
Trigonometric Functions
There are four major topics in this module
- Angles - Angle Relationships and Similar
Triangles - Trigonometric Functions - Using the
Definitions of the Trigonometric Functions
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Rev.S08
5
What are the basic terms?
  • Two distinct points determine a line called line
    AB.
  • Line segment ABa portion of the line between A
    and B, including points A and B.
  • Ray ABportion of line AB that starts at A and
    continues through B, and on past B.

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to download other modules.
Rev.S08
6
What are the basic terms? (cont.)
  • Angle-formed by rotating a ray around its
    endpoint.
  • The ray in its initial position is called the
    initial side of the angle.
  • The ray in its location after the rotation is the
    terminal side of the angle.

http//faculty.valenciacc.edu/ashaw/ Click link
to download other modules.
Rev.S08
7
How to Identify a Positive Angle and a Negative
Angle?
  • Negative angle The rotation of the terminal side
    is clockwise.
  • Positive angle The rotation of the terminal side
    of an angle counterclockwise.

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to download other modules.
Rev.S08
8
Most Common unit and Types of Angles
  • The most common unit for measuring angles is the
    degree.
  • The major types of angles are acute angle, right
    angle, obtuse angle and straight angle.

http//faculty.valenciacc.edu/ashaw/ Click link
to download other modules.
Rev.S08
9
What are Complementary Angles?
  • When the two angles form a right angle, they are
    complementary angles. Thus, we can find the
    measure of each angle in this case.

The two angles have measures of 43 20 63
and 43 - 16 27
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Rev.S08
10
What are Supplementary Angles?
  • When the two angles form a straightangle, they
    are supplementary angles. Thus, we can find the
    measure of each angle in this case too.

These angle measures are 6(19) 7 121 and
3(19) 2 59
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to download other modules.
Rev.S08
11
How to Convert a Degree to Minute or Second?
  • One minute is 1/60 of a degree.
  • One second is 1/60 of a minute.

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to download other modules.
Rev.S08
12
Example
  • Perform the calculation.
  • Since 86 60 26, the sum is written
  • Perform the calculation.
  • Write

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Rev.S08
13
Example
  • Convert 36.624
  • Convert

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Rev.S08
14
How to Determine an Angle is in Standard
Position?
  • An angle is in standard position if its vertex is
    at the origin and its initial side is along the
    positive x-axis.

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to download other modules.
Rev.S08
15
What are Quadrantal Angles?
  • Angles in standard position having their terminal
    sides along the x-axis or y-axis, such as angles
    with measures 90, 180, 270, and so on, are
    called quadrantal angles.

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to download other modules.
Rev.S08
16
What are Coterminal Angles?
  • A complete rotation of a ray results in an angle
    measuring 360. By continuing the rotation,
    angles of measure larger than 360 can be
    produced. Such angles are called coterminal
    angles.

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Rev.S08
17
Example
  • Find the angles of smallest possible positive
    measure coterminal with each angle.
  • a) 1115 b) -187
  • Add or subtract 360 as may times as needed to
    obtain an angle with measure greater than 0 but
    less than 360.
  • a) b) -187 360 173

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Rev.S08
18
What are Vertical Angles?
  • Vertical Angles have equal measures.
  • The pair of angles NMP and RMQ are vertical
    angles.

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to download other modules.
Rev.S08
19
Parallel Lines and Transversal
  • Parallel lines are lines that lie in the same
    plane and do not intersect.
  • When a line q intersects two parallel lines, q,
    is called a transversal.

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to download other modules.
Rev.S08
20
Important Angle Relationships
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Rev.S08
21
Example of Finding Angle Measures
  • Find the measure of each marked angle, given that
    lines m and n are parallel.
  • The marked angles are alternate exterior angles,
    which are equal.
  • One angle has measure
  • 6x 4 6(21) 4 130
  • and the other has measure 10x - 80 10(21) - 80
    130

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to download other modules.
Rev.S08
22
Angle Sum of a Triangle
  • The sum of the measures of the angles of any
    triangle is 180.

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Rev.S08
23
Example of Applying the Angle Sum
  • The measures of two of the angles of a triangle
    are 52 and 65. Find the measure of the third
    angle, x.
  • Solution
  • The third angle of the triangle measures 63.

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to download other modules.
Rev.S08
24
Types of Triangles Angles
  • Note The sum of the measures of the angles of
    any triangle is 180.

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to download other modules.
Rev.S08
25
Types of Triangles Sides
  • Again, the sum of the measures of the angles of
    any triangle is 180.

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to download other modules.
Rev.S08
26
What are the Conditions for Similar Triangles?
  • Corresponding angles must have the same measure.
  • Corresponding sides must be proportional. (That
    is, their ratios must be equal.)

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to download other modules.
Rev.S08
27
Example of Finding Angle Measures
  • Triangles ABC and DEF are similar. Find the
    measures of angles D and E.
  • Since the triangles are similar, corresponding
    angles have the same measure.
  • Angle D corresponds to angle A which 35
  • Angle E corresponds to angle B which 33

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to download other modules.
Rev.S08
28
Example of Finding Side Lengths
  • Triangles ABC and DEF are similar. Find the
    lengths of the unknown sides in triangle DEF.
  • To find side DE.
  • To find side FE.

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to download other modules.
Rev.S08
29
Example of Application
  • The two triangles are similar, so corresponding
    sides are in proportion.
  • The lighthouse is 48 m high.
  • A lighthouse casts a shadow 64 m long. At the
    same time, the shadow cast by a mailbox 3 feet
    high is 4 m long. Find the height of the
    lighthouse.

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to download other modules.
Rev.S08
30
The Six Trigonometric Functions
  • Let (x, y) be a point other the origin on the
    terminal side of an angle ? in standard position.
    The distance from the point to the origin is
  • The six trigonometric functions of ? are defined
    as follows.

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to download other modules.
Rev.S08
31
Example of Finding Function Values
  • The terminal side of angle ? in standard position
    passes through the point (12, 16). Find the
    values of the six trigonometric functions of
    angle ?.

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to download other modules.
Rev.S08
32
Example of Finding Function Values (cont.)
  • Since x 12, y 16, and r 20, we have

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Rev.S08
33
Another Example
  • Find the six trigonometric function values of the
    angle ? in standard position, if the terminal
    side of ? is defined byx 2y 0, x 0.
  • We can use any point on the terminal side of ?
    to find the trigonometric function values.

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to download other modules.
Rev.S08
34
Another Example (cont.)
  • Choose x 2
  • The point (2, -1) lies on the terminal side, and
    the corresponding value of r is
  • Use the definitions

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Rev.S08
35
Example of Finding Function Values with
Quadrantal Angles
  • Find the values of the six trigonometric
    functions for an angle of 270.
  • First, we select any point on the terminal side
    of a 270 angle. We choose (0, -1). Here x 0, y
    -1 and r 1.

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to download other modules.
Rev.S08
36
Undefined Function Values
  • If the terminal side of a quadrantal angle lies
    along the y-axis, then the tangent and secant
    functions are undefined.
  • If it lies along the x-axis, then the cotangent
    and cosecant functions are undefined.

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to download other modules.
Rev.S08
37
What are the Commonly Used Function Values?
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to download other modules.
Rev.S08
38
Reciprocal Identities
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Rev.S08
39
Example of Finding Function ValuesUsing
Reciprocal Identities
  • Find cos ? if sec ?
  • Since cos ? is the reciprocal of sec ?
  • Find sin ? if csc ?

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to download other modules.
Rev.S08
40
Signs of Function Values at Different Quadrants
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Rev.S08
41
Identify the Quadrant
  • Identify the quadrant (or quadrants) of any angle
    ? that satisfies tan ? gt 0 and cot ? gt 0.
  • tan ? gt 0 in quadrants I and III
  • cot ? gt 0 in quadrants I and III
  • so, the answer is quadrants I and III

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to download other modules.
Rev.S08
42
Ranges of Trigonometric Functions
  • For any angle ? for which the indicated functions
    exist
  • 1. -1 sin ? 1 and -1 cos ? 1
  • 2. tan ? and cot ? can equal any real number
  • 3. sec ? -1 or sec ? 1 and
  • csc ? -1 or csc ? 1.
  • (Notice that sec ? and csc ? are never between
    -1 and 1.)

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to download other modules.
Rev.S08
43
Pythagorean Identities
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to download other modules.
Rev.S08
44
Quotient Identities
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to download other modules.
Rev.S08
45
Example of Other Function Values
  • Find sin ? and cos ? if tan ? 4/3 and ? is in
    quadrant III.
  • Since ? is in quadrant III, sin ? and cos ? will
    both be negative.
  • sin ? and cos ? must be in the interval -1, 1.

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to download other modules.
Rev.S08
46
Example of Other Function Values (cont.)
  • We use the identity

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to download other modules.
Rev.S08
47
What have we learned?
  • We have learned to
  • Use basic terms associated with angles.
  • Find measures of complementary and supplementary
    angles.
  • Calculate with degrees, minutes, and seconds.
  • Convert between decimal degrees and degrees,
    minutes, and seconds.
  • Identify the characteristics of an angle in
    standard position.
  • Find measures of coterminal angles.
  • Find angle measures by using geometric
    properties.
  • Apply the angle sum of a triangle property.

http//faculty.valenciacc.edu/ashaw/ Click link
to download other modules.
Rev.S08
48
What have we learned? (Cont.)
  1. Find angle measures and side lengths in similar
    triangles.
  2. Solve applications involving similar triangles.
  3. Learn basic concepts about trigonometric
    functions.
  4. Find function values of an angle or quadrantal
    angles.
  5. Decide whether a value is in the range of a
    trigonometric function
  6. Use the reciprocal, Pythagorean and quotient
    identities.
  7. Identify the quadrant of an angle.
  8. Find other function values given one value and
    the quadrant.

http//faculty.valenciacc.edu/ashaw/ Click link
to download other modules.
Rev.S08
49
Credit
  • Some of these slides have been adapted/modified
    in part/whole from the slides of the following
    textbook
  • Margaret L. Lial, John Hornsby, David I.
    Schneider, Trigonometry, 8th Edition

http//faculty.valenciacc.edu/ashaw/ Click link
to download other modules.
Rev.S08
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