Linked Questions

66 votes
47 answers

User Appreciation Challenge #1: Dennis ♦

I got the spontaneous idea of making a series of challenges of users that have helped and continue to help the PPCG community be an enjoyable place for everyone, or maybe just specifically for me. :P ...
hyper-neutrino's user avatar
  • 42.4k
58 votes
70 answers

Am I a Fibonacci Number?

Your Task: Write a program or function to check if a number that is inputted is a Fibonacci number. A Fibonacci number is a number contained in the Fibonacci sequence. The Fibonacci Sequence is ...
Gryphon's user avatar
  • 7,235
50 votes
92 answers

Is this number a factorial?

The Task Given a natural number as input, your task is to output a truthy or falsey value based on whether the input is a factorial of any natural number. You can assume that the input number will ...
Arjun's user avatar
  • 5,074
45 votes
77 answers

Is this number triangular?

Challenge Given a positive integer, determine whether it is a triangular number, and accordingly output one of any two constant, distinct values. Definition A triangular number is a number that can be ...
ETHproductions's user avatar
39 votes
15 answers

Maximum number of squares touched by a line segment

Consider a square grid on the plane, with unit spacing. A line segment of integer length \$L\$ is dropped at an arbitrary position with arbitrary orientation. The segment is said to "touch" ...
Luis Mendo's user avatar
  • 105k
33 votes
7 answers

Match strings whose length is a fourth power

Within the scope of this question, let us consider only strings which consist of the character x repeated arbitrary number of times. For example: ...
n̴̖̋h̷͉̃a̷̭̿h̸̡̅ẗ̵̨́d̷̰̀ĥ̷̳'s user avatar
30 votes
14 answers

Is it a Giuga number?

Giuga numbers (A007850) are composite numbers \$n\$ such that, for each prime factor \$p_i\$ of \$n\$, \$p_i \mid \left( \frac n {p_i} -1 \right)\$. That is, that for each prime factor \$p_i\$, you ...
caird coinheringaahin g's user avatar
23 votes
34 answers

Sum of two squares

Given a nonnegative integer \$n\$, determine whether \$n\$ can be expressed as the sum of two square numbers, that is \$\exists a,b\in\mathbb Z\$ such that \$n=a^2+b^2\$. ...
hakr14's user avatar
  • 4,974
22 votes
10 answers

Tips for golfing in Prolog

What general tips do you have for golfing in Prolog? I am looking for ideas that can be applied to code golf problems in general that are at least somewhat specific to Prolog (e.g. one letter ...
Fatalize's user avatar
  • 38.9k
21 votes
34 answers

Reversed Squares

Given an integer n, your task is to determine whether it is a perfect square that when reversed, is still a perfect square. You may assume n is always positive. When numbers such as 100 (10x10) are ...
Larry Bagel's user avatar
  • 4,193
20 votes
30 answers

In The Jailhouse Now

Challenge Given an integer n (where 4<=n<=10**6) as input create an ASCII art "prison door"* measuring ...
Shaggy's user avatar
  • 42.1k
19 votes
10 answers

Is this polynomial a square?

Given an integral polynomial \$p\$, determine if \$p\$ is a square of another integral polynomial. An integral polynomial is a polynomial with only integers as coefficients. For example, \$x^2+2x+1\$ ...
alephalpha's user avatar
  • 48.5k
12 votes
19 answers

Find a Rocco number

I was asked this question in an interview but I was unable to figure out any solution. I don't know whether the question was right or not. I tried a lot but couldn't reach any solution. Honestly ...
vijayscode's user avatar
-4 votes
15 answers

Perfect Squares below \$n\$

A perfect square is an integer that is the square of an integer; in other words, it is the product of some integer with itself. Calculate the number of perfect squares below a number \$n\$ where \$...
Agile_Eagle's user avatar