23y/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 Computational Methods
- ⚙️ Mastering:
.py,.cpp,.c,.perl,.java,.html,.css.s,.sh,.go,.rs,.sql,.sh
The function e^{-x^2} in itself is a very ugly function to integrate, but when done across the entire real line, i.e. from minus infinity to infinity, it gives a bizarrely clean answer. It is certainly not obvious at first glance that the area under the curve is the square root of pi. This formula is of extreme importance in statistics, as it represents the normal distribution.
The Gaussian IntegralImagination is more important than knowledge. For while knowledge defines all we currently know and understand, imagination points to all we might yet discover and create.
Albert Einstein
