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The challenge involves mathematics in some central way. Also consider using more specific tags, listed in the tag wiki info.

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12 votes
9 answers
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How many ways can you make change?

The "third type of Euler Transform" takes an integer sequence that gives the number of objects of a given weight and outputs a sequences that gives the number of multisets of objects that ...
Peter Kagey's user avatar
  • 8,811
14 votes
13 answers
1k views

Calculate the sum of numbers in a rectangle

Aim Consider this infinite array of numbers: ...
Lucenaposition's user avatar
14 votes
5 answers
595 views

Sum-of-four-squares grid

Output a grid of characters visualizing the decomposition of a number into a sum of four perfect squares. Challenge Given a nonnegative integer \$0 \le n \le 2^{30}\$, output a \$2^k \times 2^k\$ ...
bb94's user avatar
  • 3,628
17 votes
18 answers
2k views

Shift right by half a trit

Shift right by half a trit This is inspired by Shift right by half a bit, but it's a little different. Motivation I was wondering if there is a function f that maps ...
AlephSquirrel's user avatar
28 votes
47 answers
2k views

Cubic Concatenation

Challenge Given three non-negative integers \$a, b\$ and \$c\$, decide if the sum of their cubes is equal to the concatenation of those numbers, aka: $$ a^{3}+b^{3}+c^{3} = a^\frown b ^\frown c $$ ...
Blue's user avatar
  • 469
6 votes
1 answer
246 views

Counterexample to Shapiro inequality

Input: A positive integer n such that n is even and greater than 12 or n is odd and greater than 23. Output: A list of non-negative integers that violates Shapiro inequality. More precisely, Let s be ...
Lucenaposition's user avatar
14 votes
16 answers
565 views

Rabinowitz-Wagon \$\pi\$ formula

In 1995, Stanley Rabinowitz and Stan Wagon found an interesting algorithm to generate the digits of \$\pi\$ one by one without storing the previous results. The algorithm is called the spigot ...
alephalpha's user avatar
  • 49.3k
10 votes
10 answers
748 views

Factoriadic Fraction Addition

Objective Given two rational numbers represented in fractional factoriadic as defined below, add them, and output the result in fractional factoriadic. Fractional factoriadic Fractional factoriadic is ...
Dannyu NDos's user avatar
  • 6,299
14 votes
16 answers
2k views

Reduce a string up to idempotency [closed]

Objective Given a string consisting of printable ASCII characters (!0x21 ― ~0x7E), treat it as an element in the free idempotent ...
Dannyu NDos's user avatar
  • 6,299
7 votes
6 answers
626 views

Compute Dickman

Input A floating point number \$x\$ between 1 and 8 inclusive. Output The Dickman function of \$x\$. The Dickman–de Bruijn function \$\rho(u)\$ is a continuous function that satisfies the delay ...
Simd's user avatar
  • 3,143
9 votes
12 answers
717 views

Minimum number of select-all/copy/paste steps for a string containing n copies of the original

This challenge is based on this Mathematics answer. Write the shortest program or function that, when given some natural number \$n\$, outputs \$S(n)\$, which is the minimum number of steps for ...
bigyihsuan's user avatar
  • 10.4k
16 votes
3 answers
2k views

Find 10 float64s that give the least accurate sum

Input Integer \$n > 1\$ Output Ten 64 bit floating point numbers between \$-n\$ and \$n\$, inclusive, whose sum is the least accurate. Details and examples. These examples are not claimed to be ...
Simd's user avatar
  • 3,143
13 votes
9 answers
1k views

Sum of square roots (as an algebraic number)

An algebraic number is a number that is a root of a non-zero polynomial with integer coefficients. It is well-known that the sum of two algebraic numbers is algebraic. In particular, the sum of a list ...
alephalpha's user avatar
  • 49.3k
3 votes
7 answers
351 views

Find the most isolated point

Given two non-empty sets of points \$P,T = \{(x,y)\ |\ x,y \in \mathbb{Z} \}\$, find the point \$p \in P\$ such that it is the "most isolated" from all points in \$T\$. The "most ...
bigyihsuan's user avatar
  • 10.4k
13 votes
13 answers
2k views

Compute the degree of a string

The input is a string made of the letters a,b,c only. The output is an integer representing the degree of the sequence. The degree of a sequence is computed as follows: Assume that each of the ...
Erel Segal-Halevi's user avatar
8 votes
4 answers
485 views

How far are you?

Write a program that gets coordinates of two objects on Earth, and calculates how far they are from each other directly in space (a straight line through Earth) and on the surface (through the ...
George Glebov's user avatar
13 votes
11 answers
804 views

*Trivial* near-repdigit perfect powers

Task Output the sequence that precisely consists of the following integers in increasing order: the 2nd and higher powers of 10 (\$10^i\$ where \$i \ge 2\$), the squares of powers of 10 times 2 or 3 (...
Bubbler's user avatar
  • 78.2k
17 votes
21 answers
1k views

Infer pluses and minuses

The problem Consider an equation such as      "3 ± 2 ± 4 ± 1 = 4"      and determine if there exists a sequence of pluses and minuses that makes it arithmetically correct. If it exists, ...
Nicola Sap's user avatar
  • 3,694
26 votes
15 answers
2k views

Is it a cartesian product?

The cartesian product of two multisets \$A\$ and \$B\$ is the multiset of all ordered pairs consisting of an element of \$A\$ and an element of \$B\$. For example, the cartesian product of \$\{1, 2, 7,...
emanresu A's user avatar
  • 41.6k
5 votes
1 answer
311 views

Dishonest dungeon staff

This is a joint post with https://puzzling.stackexchange.com/questions/126255/dishonest-dungeon-staff You are faced with the difficult task to set up a dungeon for adventurers. However you made a deal ...
Fluorine's user avatar
  • 151
10 votes
4 answers
2k views

Output a 1-2-3-5-7... sequence

Follow-up of my previous challenge, inspired by @emanresu A's question, and proven possible by @att (Mathematica solution linked) For the purposes of this challenge, a 1-2-3-5-7... sequence is an ...
Tbw's user avatar
  • 2,123
21 votes
15 answers
2k views

Output a 1-2-3 sequence

For the purposes of this challenge, a 1-2-3 sequence is an infinite sequence of increasing positive integers such that for any positive integer \$n\$, exactly one of \$n, 2n,\$ and \$3n\$ appears in ...
Tbw's user avatar
  • 2,123
19 votes
5 answers
3k views

Draw a Fibonacci Swoosh

Title courtesy of Greg Martin For this challenge, I'll define an arc of size \$k\$ as a single piece of a sine wave with a length of \$k\$ units and an height of \$\frac{k}{4}\$ units: And I'll ...
emanresu A's user avatar
  • 41.6k
6 votes
12 answers
957 views

Argument of a complex number (Robbers)

V1.1: Added criterion to help with tiebreakers, a bit overkill but still.V1.2: It's April 15th! Task: Crack the scrambled code for calculating the argument of a complex number \$z=x+iy\$ given two ...
CrSb0001's user avatar
  • 421
11 votes
23 answers
2k views

Argument of a complex number (Cops)

This is the cop's thread, where one should post the scrambled code. Here is the robbers' thread where the cracked source should be posted and linked to the cop's answer. NB: I am currently writing up ...
CrSb0001's user avatar
  • 421
14 votes
7 answers
2k views

How quickly can you type this unary string?

If I want to type the string aaa, the least keystrokes I can type it in is 3: a a a. But if I want to type the string ...
emanresu A's user avatar
  • 41.6k
7 votes
2 answers
270 views

Convert maximum values to bit widths

Background The newest version of the C standard, C23, adds preprocessor macros like INT_WIDTH, ULONG_WIDTH, and ...
Tavian Barnes's user avatar
12 votes
14 answers
1k views

Lattice points visible from the origin

Challenge Create a program that outputs a square grid showing visible and non-visible points \$(x, y)\$ from the origin based on their greatest common divisor (GCD). A point \$(x, y)\$ is considered ...
vengy's user avatar
  • 2,279
18 votes
26 answers
2k views

Is it a tetrate of two?

The tetration operation consists of repeated exponentiation, and it is written ↑↑. For instance, 3↑↑3 =3 ^(3^3) = 3^27 = 7,625,597,484,987 A tetrate of two is an ...
isaacg's user avatar
  • 42.1k
12 votes
6 answers
1k views

Contract a tensor

Introduction Tensor contraction is an operation that can be performed on a tensor. It is a generalization of the idea of the trace of a matrix. For example, if we have a rank-2 tensor (a matrix) and ...
Tbw's user avatar
  • 2,123
11 votes
10 answers
1k views

Egyptian fraction representations of 1 without prime denominators

Background As noted in this question, for all positive integers \$n>2\$ there exists at least one Egyptian fraction representation (EFR) of \$n\$ distinct positive integers \$a_{1} < a_{2} < \...
Max Muller's user avatar
15 votes
12 answers
828 views

Sum up snail number neighbours

Input: You are given two numbers n and m. Create the snail: Given an n >= 3, fill an <...
Philippos's user avatar
  • 2,660
14 votes
13 answers
1k views

Counting rankings

There is a competition with \$n\$ participants in total. Alice is one of the participants. The outcome of the competition is given as a ranking per participant with a possibility of ties; e.g. there ...
Bubbler's user avatar
  • 78.2k
3 votes
4 answers
686 views

Fastest count of certain hypercubes with labeled vertices

CHALLENGE This is a fastest-code challenge. Count how many n-dimensional hypercubes with n=1,2,3,4 exist, with vertices labeled with either 1 or 0, such that there does not exist any rectangle formed ...
Fabius Wiesner's user avatar
4 votes
5 answers
414 views

Generate a sequence of \$n\$ consecutive composite numbers

Definitions The common methods to generate consecutive composites are $$\overbrace{(n+1)! + 2, \ (n+1)! + 3, \ \ldots, \ (n+1)! + (n+1)}^{\text{n composites}}$$ $$\overbrace{n!+2,n!+3,...,n!+n}^{\text{...
vengy's user avatar
  • 2,279
1 vote
8 answers
304 views

Alternating Random Series Sum To \$N\$ [closed]

Challenge Given a positive integer \$N \ge 3\$, generate an alternating series of \$N\$ random numbers within the range \$[1, N]\$, such that their sum equals \$N\$. Expressed mathematically as $$N = ...
vengy's user avatar
  • 2,279
-3 votes
8 answers
1k views

Number of cigarettes that can be made from a given number of butts

Assumption A cigarette can be made by combining four cigarette butts. Cigarette butts last infinitely until smoked. Explanation Say you have 31 butts. That means, you can make 7 cigarettes from 28 ...
Siddharth Singh's user avatar
13 votes
20 answers
1k views

Modular Equivalence

Given two numbers \$x,y > 2, x≠y \$ output all integers \$m\$ such that $$ x + y \equiv x \cdot y \pmod m $$ $$ x \cdot y > m > 2 $$ Input Two integers Output A list of integers Test cases <...
pacman256's user avatar
  • 4,225
13 votes
19 answers
1k views

The TAK function (easy mode)

The TAK function is defined as follows for integers \$x\$, \$y\$, \$z\$: $$ t(x, y, z) = \begin{cases} y, & \text{if $x \le y$} \\ t(t(x-1,y,z), t(y-1,z,x), t(z-1,x,y)), & \text{otherwise} \...
Bubbler's user avatar
  • 78.2k
18 votes
7 answers
1k views

The TAK function

The TAK function is defined as follows for integers \$x\$, \$y\$, \$z\$: $$ t(x, y, z) = \begin{cases} y, & \text{if $x \le y$} \\ t(t(x-1,y,z), t(y-1,z,x), t(z-1,x,y)), & \text{otherwise} \...
Bubbler's user avatar
  • 78.2k
13 votes
20 answers
2k views

Complete a Mystery Sequence

Given a sequence of three integers, determine if the sequence is arithmetic (of the form [a, a+d, a+2*d]) or geometric (of the form ...
nyxbird's user avatar
  • 475
7 votes
10 answers
974 views

Make 1's and 2's composite

Input An integer k composed of 1 and 2, with at least 3 digits and at most 200 digits. ...
Sny's user avatar
  • 439
3 votes
28 answers
2k views

Consecutive Composite Numbers

Challenge Generate \$n-1\$ consecutive composite numbers using this prime gap formula $$n!+2,n!+3,...,n!+n$$ Input An integer \$n\$ such that \$3 \leq n \leq 50 \$. Output Sequence of \$n-1\$ ...
vengy's user avatar
  • 2,279
17 votes
19 answers
1k views

Ellipse Lattice Point Counter

Challenge Determine how many integer lattice points there are in an ellipse $$\frac{x^2}{a^2} + \frac{y^2}{b^2} \leq 1$$ centered at the origin with width \$2a\$ and height \$2b\$ where integers \$a, ...
vengy's user avatar
  • 2,279
-6 votes
1 answer
187 views

Where to stand to throw circles over sticks

Consider a horizontal line with vertical lines centered on the x-axis and placed at gaps of \$\sqrt{2}/2\$. For a positive integer \$n \geq 3\$, the first half of the lines have lengths \$0, \sqrt{2},...
Simd's user avatar
  • 3,143
17 votes
22 answers
2k views

Divmod continuously until the remainder is 1 or 0, then get the remainder

The task is simple, divide, get the quotient and the remainder, and if the remainder isn't 1 or 0, do the same thing (quotient divmod remainder) until the remainder is 1 or 0, then get the remainder. ...
Fmbalbuena's user avatar
  • 4,215
10 votes
12 answers
1k views

Counting Collinear Points

Given two points \$(x_1, y_1)\$ and \$(x_2, y_2)\$ with integer coordinates, calculate the number of integer points (excluding the given points) that lie on the straight line segment joining these two ...
vengy's user avatar
  • 2,279
1 vote
1 answer
562 views

Where to put a circle?

Consider an \$n \times n\$ grid of integers which is part of an infinite grid. The top left coordinate of the \$n \times n\$ grid of integers is \$(0, 0)\$. The task is to find a circle which when ...
Simd's user avatar
  • 3,143
12 votes
20 answers
5k views

Calculate 500 digits of e [duplicate]

Write a program to calculate the first 500 digits of the mathematical constant e, meeting the rules below: It cannot include "e", "math.e" or similar e constants, nor may it call ...
Simd's user avatar
  • 3,143
9 votes
3 answers
480 views

Coin sequence probability

Given two strings containing only 0 and 1, decide the probability that first appears earlier as a consecutive substring in an ...
l4m2's user avatar
  • 26k

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