The following program takes one or more integer arguments and determines the prime factors. It uses Perl's native numeric representation unless those numbers use floating-point representation and thus lose accuracy. Otherwise (or if the program's -b switch is used), it uses the standard Math::BigInt library, thus allowing for huge numbers. However, it only loads this library if necessary. That's why we use require
and import
instead of use
, which would unconditionally load the library at compile time instead of conditionally at run time.
This is not an efficient way to crack the huge integers used for cryptographic purposes.
Call the program with a list of numbers, and it will show you the prime factors of those numbers:
% bigfact 8 9 96 2178
8 2**3
9 3**2
96 2**5 3
2178 2 3**2 11**2
You can give it very large numbers:
% bigfact 239322000000000000000000% bigfact 25000000000000000000000000
+239322000000000000000000 2**19 3 5**18 +39887
+25000000000000000000000000 2**24 5**26
The program is shown in Example 2.1.
#!/usr/bin/perl # bigfact - calculate prime factors use strict; use integer; use vars qw{ $opt_b $opt_d }; use Getopt::Std; @ARGV && getopts('bd') or die "usage: $0 [-b] number ..."; load_biglib() if $opt_b; ARG: foreach my $orig ( @ARGV ) { my ($n, %factors, $factor); $n = $opt_b ? Math::BigInt->new($orig) : $orig; if ($n + 0 ne $n) { # don't use -w for this printf STDERR "bigfact: %s would become %s\n", $n, $n+0 if $opt_d; load_biglib(); $n = Math::BigInt->new($orig); } printf "%-10s ", $n; # Here $sqi will be the square of $i. We will take advantage # of the fact that ($i + 1) ** 2 == $i ** 2 + 2 * $i + 1. for (my ($i, $sqi) = (2, 4); $sqi <= $n; $sqi += 2 * $i ++ + 1) { while ($n % $i == 0) { $n /= $i; print STDERR "<$i>" if $opt_d; $factors {$i} ++; } } if ($n != 1 && $n != $orig) { $factors{$n}++ } if (! %factors) { print "PRIME\n"; next ARG; } for $factor ( sort { $a <=> $b } keys %factors ) { print "$factor"; if ($factors{$factor} > 1) { print "**$factors{$factor}"; } print " "; } print "\n"; } # this simulates a use, but at run time sub load_biglib { require Math::BigInt; Math::BigInt->import(); #immaterial? }
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