17.3 Trigonometry
Octave provides the following trigonometric functions where angles are specified in radians. To convert from degrees to radians multiply by pi/180
or use the deg2rad
function. For example, sin (30 * pi/180)
returns the sine of 30 degrees. As an alternative, Octave provides a number of trigonometric functions which work directly on an argument specified in degrees. These functions are named after the base trigonometric function with a ‘d’ suffix. As an example, sin
expects an angle in radians while sind
expects an angle in degrees.
Octave uses the C library trigonometric functions. It is expected that these functions are defined by the ISO/IEC 9899 Standard. This Standard is available at: http://www.open-std.org/jtc1/sc22/wg14/www/docs/n1124.pdf. Section F.9.1 deals with the trigonometric functions. The behavior of most of the functions is relatively straightforward. However, there are some exceptions to the standard behavior. Many of the exceptions involve the behavior for -0. The most complex case is atan2. Octave exactly implements the behavior given in the Standard. Including atan2(+- 0, 0)
returns +- pi
.
It should be noted that MATLAB uses different definitions which apparently do not distinguish -0.
- rad = deg2rad (deg)
-
Convert degrees to radians.
The input deg must be a scalar, vector, or N-dimensional array of double or single floating point values. deg may be complex in which case the real and imaginary components are converted separately.
The output rad is the same size and shape as deg with degrees converted to radians using the conversion constant
pi/180
.Example:
deg2rad ([0, 90, 180, 270, 360]) ⇒ 0.00000 1.57080 3.14159 4.71239 6.28319
See also: rad2deg.
- deg = rad2deg (rad)
-
Convert radians to degrees.
The input rad must be a scalar, vector, or N-dimensional array of double or single floating point values. rad may be complex in which case the real and imaginary components are converted separately.
The output deg is the same size and shape as rad with radians converted to degrees using the conversion constant
180/pi
.Example:
rad2deg ([0, pi/2, pi, 3/2*pi, 2*pi]) ⇒ 0 90 180 270 360
See also: deg2rad.
- sech (x)
-
Compute the hyperbolic secant of each element of x.
See also: asech.
- csch (x)
-
Compute the hyperbolic cosecant of each element of x.
See also: acsch.
- coth (x)
-
Compute the hyperbolic cotangent of each element of x.
See also: acoth.
- asinh (x)
-
Compute the inverse hyperbolic sine for each element of x.
See also: sinh.
- acosh (x)
-
Compute the inverse hyperbolic cosine for each element of x.
See also: cosh.
- atanh (x)
-
Compute the inverse hyperbolic tangent for each element of x.
See also: tanh.
- asech (x)
-
Compute the inverse hyperbolic secant of each element of x.
See also: sech.
- acsch (x)
-
Compute the inverse hyperbolic cosecant of each element of x.
See also: csch.
- acoth (x)
-
Compute the inverse hyperbolic cotangent of each element of x.
See also: coth.
- atan2 (y, x)
-
Compute atan (y / x) for corresponding elements of y and x.
y and x must match in size and orientation. The signs of elements of y and x are used to determine the quadrants of each resulting value.
This function is equivalent to
arg (complex (x, y))
.
Octave provides the following trigonometric functions where angles are specified in degrees. These functions produce true zeros at the appropriate intervals rather than the small round-off error that occurs when using radians. For example:
cosd (90) ⇒ 0 cos (pi/2) ⇒ 6.1230e-17
- sind (x)
-
Compute the sine for each element of x in degrees.
Returns zero for elements where
x/180
is an integer.
- cosd (x)
-
Compute the cosine for each element of x in degrees.
Returns zero for elements where
(x-90)/180
is an integer.
- tand (x)
-
Compute the tangent for each element of x in degrees.
Returns zero for elements where
x/180
is an integer andInf
for elements where(x-90)/180
is an integer.
- atan2d (y, x)
-
Compute atan (y / x) in degrees for corresponding elements from y and x.
© 1996–2020 John W. Eaton
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https://octave.org/doc/v5.2.0/Trigonometry.html