TRIGONOMETRY REFERENCE
- Right triangle trigonometry
- Trigonometric identities
- The Pythagorean theorem
- Non-right triangle trigonometry
- The Law of Sines (for any triangle)
- The Law of Cosines (for any triangle)
- Trigonometric equivalencies
- Hyperbolic functions
- Contributors
Right triangle trigonometry
A right triangle is defined as having one angle precisely equal to 90o (a right angle).
Trigonometric identities
H is the Hypotenuse, always being opposite the right angle. Relative to angle x, O is the Opposite and A is the Adjacent.
"Arc" functions such as "arcsin", "arccos", and "arctan" are the complements of normal trigonometric functions. These functions return an angle for a ratio input. For example, if the tangent of 45o is equal to 1, then the "arctangent" (arctan) of 1 is 45o. "Arc" functions are useful for finding angles in a right triangle if the side lengths are known.
The Pythagorean theorem
Non-right triangle trigonometry
The Law of Sines (for any triangle)
The Law of Cosines (for any triangle)
Trigonometric equivalencies
Hyperbolic functions
Note: all angles (x) must be expressed in units of radians for these hyperbolic functions. There are 2π radians in a circle (360o).
Contributors
Contributors to this chapter are listed in chronological order of their contributions, from most recent to first. See Appendix 2 (Contributor List) for dates and contact information.Harvey Lew (??? 2003): Corrected typographical error: "tangent" should have been "cotangent".
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