Provided by: libmath-symbolic-perl_0.612-1_all
NAME
Math::Symbolic::AuxFunctions - Auxiliary functions for Math::Symbolic hierarchy
SYNOPSIS
use Math::Symbolic::AuxFunctions; Math::Symbolic::AuxFunctions::acos($x); # etc
DESCRIPTION
This module contains implementations of some auxiliary functions that are used within the Math::Symbolic hierarchy of modules. In particular, this module holds all trigonometric functions used for numeric evaluation of trees by Math::Symbolic::Operator. EXPORT None. On purpose. If I wished this module would pollute others' namespaces, I'd have put the functions right where they're used.
TRIGONOMETRIC FUNCTIONS
tan Computes the tangent sin(x) / cos(x). cot Computes the cotangent cos(x) / sin(x). asin Computes the arc sine asin(z) = -i log(iz + sqrt(1-z*z)). Above formula is for complex numbers. acos Computes the arc cosine acos(z) = -i log(z + sqrt(z*z-1)). Above formula is for complex numbers. atan Computes the arc tangent atan(z) = i/2 log((i+z) / (i-z)). Above formula is for complex numbers. acot Computes the arc cotangent ( atan( 1 / x ) ). asinh Computes the arc hyperbolic sine asinh(z) = log(z + sqrt(z*z+1)) acosh Computes the arc hyperbolic cosine acosh(z) = log(z + sqrt(z*z-1)).
OTHER FUNCTIONS
binomial_coeff Calculates the binomial coefficient n over k of its first two arguments (n, k). Code taken from Orwant et al, "Mastering Algorithms with Perl" bell_number The Bell numbers are defined as follows: B_0 = 1 B_n+1 = sum_k=0_to_n( B_k * binomial_coeff(n, k) ) This function uses memoization.
AUTHOR
Please send feedback, bug reports, and support requests to the Math::Symbolic support mailing list: math-symbolic-support at lists dot sourceforge dot net. Please consider letting us know how you use Math::Symbolic. Thank you. If you're interested in helping with the development or extending the module's functionality, please contact the developers' mailing list: math-symbolic-develop at lists dot sourceforge dot net. List of contributors: Steffen MXller, symbolic-module at steffen-mueller dot net Stray Toaster, mwk at users dot sourceforge dot net Oliver EbenhXh
SEE ALSO
New versions of this module can be found on http://steffen-mueller.net or CPAN. The module development takes place on Sourceforge at http://sourceforge.net/projects/math-symbolic/ Math::Symbolic