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| Text File | 1997-05-18 | 5.3 KB | 227 lines | [TEXT/McPL] |
- #
- # Trigonometric functions, mostly inherited from Math::Complex.
- # -- Jarkko Hietaniemi, April 1997
- # -- Raphael Manfredi, September 1996 (indirectly: because of Math::Complex)
- #
-
- require Exporter;
- package Math::Trig;
-
- use strict;
-
- use Math::Complex qw(:trig);
-
- use vars qw($VERSION $PACKAGE
- @ISA
- @EXPORT);
-
- @ISA = qw(Exporter);
-
- $VERSION = 1.00;
-
- my @angcnv = qw(rad2deg rad2grad
- deg2rad deg2grad
- grad2rad grad2deg);
-
- @EXPORT = (@{$Math::Complex::EXPORT_TAGS{'trig'}},
- @angcnv);
-
- use constant pi2 => 2 * pi;
- use constant DR => pi2/360;
- use constant RD => 360/pi2;
- use constant DG => 400/360;
- use constant GD => 360/400;
- use constant RG => 400/pi2;
- use constant GR => pi2/400;
-
- #
- # Truncating remainder.
- #
-
- sub remt ($$) {
- # Oh yes, POSIX::fmod() would be faster. Possibly. If it is available.
- $_[0] - $_[1] * int($_[0] / $_[1]);
- }
-
- #
- # Angle conversions.
- #
-
- sub rad2deg ($) { remt(RD * $_[0], 360) }
-
- sub deg2rad ($) { remt(DR * $_[0], pi2) }
-
- sub grad2deg ($) { remt(GD * $_[0], 360) }
-
- sub deg2grad ($) { remt(DG * $_[0], 400) }
-
- sub rad2grad ($) { remt(RG * $_[0], 400) }
-
- sub grad2rad ($) { remt(GR * $_[0], pi2) }
-
- =head1 NAME
-
- Math::Trig - trigonometric functions
-
- =head1 SYNOPSIS
-
- use Math::Trig;
-
- $x = tan(0.9);
- $y = acos(3.7);
- $z = asin(2.4);
-
- $halfpi = pi/2;
-
- $rad = deg2rad(120);
-
- =head1 DESCRIPTION
-
- C<Math::Trig> defines many trigonometric functions not defined by the
- core Perl which defines only the C<sin()> and C<cos()>. The constant
- B<pi> is also defined as are a few convenience functions for angle
- conversions.
-
- =head1 TRIGONOMETRIC FUNCTIONS
-
- The tangent
-
- tan
-
- The cofunctions of the sine, cosine, and tangent (cosec/csc and cotan/cot
- are aliases)
-
- csc cosec sec cot cotan
-
- The arcus (also known as the inverse) functions of the sine, cosine,
- and tangent
-
- asin acos atan
-
- The principal value of the arc tangent of y/x
-
- atan2(y, x)
-
- The arcus cofunctions of the sine, cosine, and tangent (acosec/acsc
- and acotan/acot are aliases)
-
- acsc acosec asec acot acotan
-
- The hyperbolic sine, cosine, and tangent
-
- sinh cosh tanh
-
- The cofunctions of the hyperbolic sine, cosine, and tangent (cosech/csch
- and cotanh/coth are aliases)
-
- csch cosech sech coth cotanh
-
- The arcus (also known as the inverse) functions of the hyperbolic
- sine, cosine, and tangent
-
- asinh acosh atanh
-
- The arcus cofunctions of the hyperbolic sine, cosine, and tangent
- (acsch/acosech and acoth/acotanh are aliases)
-
- acsch acosech asech acoth acotanh
-
- The trigonometric constant B<pi> is also defined.
-
- $pi2 = 2 * pi;
-
- =head2 ERRORS DUE TO DIVISION BY ZERO
-
- The following functions
-
- tan
- sec
- csc
- cot
- asec
- acsc
- tanh
- sech
- csch
- coth
- atanh
- asech
- acsch
- acoth
-
- cannot be computed for all arguments because that would mean dividing
- by zero. These situations cause fatal runtime errors looking like this
-
- cot(0): Division by zero.
- (Because in the definition of cot(0), the divisor sin(0) is 0)
- Died at ...
-
- For the C<csc>, C<cot>, C<asec>, C<acsc>, C<csch>, C<coth>, C<asech>,
- C<acsch>, the argument cannot be C<0> (zero). For the C<atanh>,
- C<acoth>, the argument cannot be C<1> (one). For the C<tan>, C<sec>,
- C<tanh>, C<sech>, the argument cannot be I<pi/2 + k * pi>, where I<k> is
- any integer.
-
- =head2 SIMPLE (REAL) ARGUMENTS, COMPLEX RESULTS
-
- Please note that some of the trigonometric functions can break out
- from the B<real axis> into the B<complex plane>. For example
- C<asin(2)> has no definition for plain real numbers but it has
- definition for complex numbers.
-
- In Perl terms this means that supplying the usual Perl numbers (also
- known as scalars, please see L<perldata>) as input for the
- trigonometric functions might produce as output results that no more
- are simple real numbers: instead they are complex numbers.
-
- The C<Math::Trig> handles this by using the C<Math::Complex> package
- which knows how to handle complex numbers, please see L<Math::Complex>
- for more information. In practice you need not to worry about getting
- complex numbers as results because the C<Math::Complex> takes care of
- details like for example how to display complex numbers. For example:
-
- print asin(2), "\n";
-
- should produce something like this (take or leave few last decimals):
-
- 1.5707963267949-1.31695789692482i
-
- That is, a complex number with the real part of approximately C<1.571>
- and the imaginary part of approximately C<-1.317>.
-
- =head1 ANGLE CONVERSIONS
-
- (Plane, 2-dimensional) angles may be converted with the following functions.
-
- $radians = deg2rad($degrees);
- $radians = grad2rad($gradians);
-
- $degrees = rad2deg($radians);
- $degrees = grad2deg($gradians);
-
- $gradians = deg2grad($degrees);
- $gradians = rad2grad($radians);
-
- The full circle is 2 I<pi> radians or I<360> degrees or I<400> gradians.
-
- =head1 BUGS
-
- Saying C<use Math::Trig;> exports many mathematical routines in the
- caller environment and even overrides some (C<sin>, C<cos>). This is
- construed as a feature by the Authors, actually... ;-)
-
- The code is not optimized for speed, especially because we use
- C<Math::Complex> and thus go quite near complex numbers while doing
- the computations even when the arguments are not. This, however,
- cannot be completely avoided if we want things like C<asin(2)> to give
- an answer instead of giving a fatal runtime error.
-
- =head1 AUTHORS
-
- Jarkko Hietaniemi <F<jhi@iki.fi>> and
- Raphael Manfredi <F<Raphael_Manfredi@grenoble.hp.com>>.
-
- =cut
-
- # eof
-
