Dave's Short Trig Course

Dave's Short Trig Course

Table of Contents

1. Who should take this course?
2. Trigonometry for you
3. Your background
4. How to learn trigonometry
5. Applications of trigonometry
6. Astronomy and geography
7. Engineering and physics
8. Mathematics and its applications
9. What is trigonometry?
10. Trigonometry as computational geometry
11. Angle measurement and tables
12. Background on geometry
13. The Pythagorean theorem
14. An explanation of the Pythagorean theorem
15. Similar triangles
16. Angle measurement
17. The concept of angle
18. Radians and arc length
19. Exercises, hints, and answers
20. About digits of accuracy
21. Chords
22. What is a chord?
23. Trigonometry began with chords
24. Sines
25. The relation between sines and chords
26. The word "sine"
27. Sines and right triangles
28. The standard notation for a right triangle
29. Exercises, hints, and answers
30. Cosines
31. Definition of cosine
32. Right triangles and cosines
33. The Pythagorean identity for sines and cosines
34. Sines and cosines for special common angles
35. Exercises, hints, and answers
36. Tangents and slope
37. The definition of the tangent
38. Tangent in terms of sine and cosine
39. Tangents and right triangles
40. Slopes of lines
41. Angles of elevation and depression
42. Common angles again
43. Exercises, hints, and answers
44. The trigonometry of right triangles
45. Solving right triangles
46. Inverse trig functions: arcsine, arccosine, and arctangent
47. The other three trigonometric functions: cotangent, secant, and cosecant
48. Exercises, hints, and answers
49. Pythagorean triples
50. The trigonometric functions and their inverses
51. Arbitrary angles and the unit circle
52. Sines and cosines of arbitrary angles
53. Properties of sines and cosines that follow from the definition
54. Graphs of sine and cosine functions
55. Graphs of tangent and cotangent functions
56. Graphs of secant and cosecant functions
57. Computing trigonometric functions
58. Before computers: tables
59. After computers: power series
60. The trigonometry of oblique triangles
61. Solving oblique triangles
62. The law of cosines
63. The law of sines
64. Exercises, hints, and answers
65. Demonstrations of the laws of sines and cosines
66. For the law of sines
67. For the law of cosines
68. Area of a triangle
69. Area in terms of two sides and the included angle
70. Summary of trigonometric identities
71. More important identities
72. Less important identities
73. Truly obscure identities

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Special symbols used here. Some old web browsers do not display mathematical symbols. The following table shows the mathematical symbols used here. If there are any entries in the first column that appear blank or appear as question marks, then your web browser will not display those symbols, and you will need to use a different web browser to see all the symbols.

Symbol / Description / Example
– / minus sign / x–y
± / plus or minus sign / x±y
° / degree sign / 45°
√ / square root sign / √2
3√ / cube root sign / 3√5
≠ / not equal to / x≠y
≤ / less than or equal to / x≤y
≥ / greater than or equal to / x≥y

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Started July, 1996. Copyright © 1996, 1997, 2002.

David E. Joyce
Department of Mathematics and Computer Science
Clark University Worcester, MA 01610

Dave's Short Trig Course is located at