Provided by: libmath-gmp-perl_2.06-1build3_amd64 bug

NAME

       Math::GMP - High speed arbitrary size integer math

SYNOPSIS

         use Math::GMP;
         my $n = new Math::GMP 2;

         $n = $n ** (256*1024);
         $n = $n - 1;
         print "n is now $n\n";

DESCRIPTION

       Math::GMP was designed to be a drop-in replacement both for Math::BigInt and for regular
       integer arithmetic.  Unlike BigInt, though, Math::GMP uses the GNU gmp library for all of
       its calculations, as opposed to straight Perl functions.  This can result in speed
       improvements.

       The downside is that this module requires a C compiler to install -- a small tradeoff in
       most cases. Also, this module is not 100% compatible to Math::BigInt.

       A Math::GMP object can be used just as a normal numeric scalar would be -- the module
       overloads most of the normal arithmetic operators to provide as seamless an interface as
       possible. However, if you need a perfect interface, you can do the following:

         use Math::GMP qw(:constant);

         $n = 2 ** (256 * 1024);
         print "n is $n\n";

       This would fail without the ':constant' since Perl would use normal doubles to compute the
       250,000 bit number, and thereby overflow it into meaninglessness (smaller exponents yield
       less accurate data due to floating point rounding).

METHODS

       Although the non-overload interface is not complete, the following functions do exist:

   new
         $x = Math::GMP->new(123);

       Creates a new Math::GMP object from the passed string or scalar.

         $x = Math::GMP->new('abcd', 36);

       Creates a new Math::GMP object from the first parameter which should be represented in the
       base specified by the second parameter.

   bfac
         $x = Math::GMP->new(5);
         $x->bfac();      # 1*2*3*4*5 = 120

       Calculates the factorial of $x and modifies $x to contain the result.

   band
         $x = Math::GMP->new(6);
         $x->band(3);      # 0b110 & 0b11 = 1

       Calculates the bit-wise AND of it's two arguments and modifies the first argument.

   bxor
         $x = Math::GMP->new(6);
         $x->bxor(3);      # 0b110 & 0b11 = 0b101

       Calculates the bit-wise XOR of it's two arguments and modifies the first argument.

   bior
         $x = Math::GMP->new(6);
         $x->bior(3);      # 0b110 & 0b11 = 0b111

       Calculates the bit-wise OR of it's two arguments and modifies the first argument.

   bgcd
         $x = Math::GMP->new(6);
         $x->bgcd(4);      # 6 / 2 = 2, 4 / 2 = 2 => 2

       Calculates the Greatest Common Divisior of it's two arguments and returns the result.

   legendre
   jacobi
   fibonacci
         $x = Math::GMP->fibonacci(16);

       Calculates the n'th number in the Fibonacci sequence.

   probab_prime
         $x = Math::GMP->new(7);
         $x->probab_prime(10);

       Probabilistically Determines if the number is a prime. Argument is the number of checks to
       perform. Returns 0 if the number is definitely not a prime, 1 if it may be, and 2 if it is
       definitely is a prime.

BUGS

       As of version 1.0, Math::GMP is mostly compatible with the old Math::BigInt version. It is
       not a full replacement for the rewritten Math::BigInt versions, though. See the SEE ALSO
       section on how to achieve to use Math::GMP and retain full compatibility to Math::BigInt.

       There are some slight incompatibilities, such as output of positive numbers not being
       prefixed by a '+' sign.  This is intentional.

       There are also some things missing, and not everything might work as expected.

SEE ALSO

       Math::BigInt has a new interface to use a different library than the default pure Perl
       implementation. You can use, for instance, Math::GMP with it:

         use Math::BigInt lib => 'GMP';

       If Math::GMP is not installed, it will fall back to it's own Perl implementation.

       See Math::BigInt and Math::BigInt::GMP or Math::BigInt::Pari or Math::BigInt::BitVect.

AUTHOR

       Chip Turner <chip@redhat.com>, based on the old Math::BigInt by Mark Biggar and Ilya
       Zakharevich.  Further extensive work provided by Tels <tels@bloodgate.com>.