22y/o Software Developer and Data Scientist with interests in fields like Cybersecurity, Quantum Computing, and Mathematics.
// Fermat's last problem x^n+y^n=z^n
#!/usr/bin/perl
use strict;
use warnings;
sub fermat {
my ($n) = @_;
for (my $x = 0; $x < 100; $x++) {
for (my $y = 0; $y < $x+1; $y++) {
for (my $z = 0; $z < ($x**$n)+($y**$n) +1; $z++) {
if (($x**$n)+($y**$n) == ($z**$n)) {
print "$x^$n + $y^$n == $z^$n\n";
}
}
}
}
my $e = fermat(5);
- 🔭 Bachelor's degree in Computer Science
- 🌱 I’m currently learning Topology
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The factorial function is commonly defined as n! = n(n-1)(n-2)…1, but this definition only "works" for positive integers. The integral equation makes factorial work for fractions and decimals as well. And negative numbers, and complex numbers…
The same integral for n-1 is defined as the gamma function.</p>
The Analytic Continuation of the Factorial
Great ideas often receive violent opposition from mediocre minds.
Albert Einstein
