Add to ORKGConsider a cube floating in space: how many unique ways can we color that cube with two colors uniquely? If the cube were fixed, the problem would simplify to two color choices for each face of the cube, with six faces. In other words, 2 × 2 × 2 × 2 × 2 × 2 = 26 = 64.
A framework for the detailed classification of general crystal structures, based on an arithmetic cr...
In the third clip in a series of ten from the fifth of seven interviews, 8th grader Stephanie contin...
In this research, we examine n x n grids whose individual squares are each colored with one of k dis...
AbstractStart with a collection of cubes and a palette of six colors. We paint the cubes so that eac...
Given a 3x3x3 mirror cube, we find the number of valid and distinct projections up to and including ...
The rotational symmetries of the Platonic solids are illustrated. Each face can be a different color...
Paint by Numbers is a classic logic puzzle in which the squares of a p×n grid are to be colored in s...
Euclidean Ramsey theory is examining konfigurations of points, for which there exists n such that fo...
The children’s puzzle, sometimes called the Great Tantalizer, consists of four blocks each of whose ...
AbstractThe 512 points of an 8 × 8 × 8 cubical array of lattice points in 3-space can be colored in ...
Which of two bi-colored cubes is the simpler puzzle? The differences in the coloring of the cubes cr...
This paper describes the n-queens problem on an n by n chessboard. We discuss the possible symmetrie...
The Rubik’s cube is a puzzle formed from a 3 × 3 × 3 cube and 6 different colors. The way the cube o...
Jeremiah Farrell\u27s contribution to The Mathemagician and Pied Puzzler: A Collection in Tribute t...
The Rubik\u27s cube is a solid block of twenty seven cubes, linked together so that each layer can b...
A framework for the detailed classification of general crystal structures, based on an arithmetic cr...
In the third clip in a series of ten from the fifth of seven interviews, 8th grader Stephanie contin...
In this research, we examine n x n grids whose individual squares are each colored with one of k dis...
AbstractStart with a collection of cubes and a palette of six colors. We paint the cubes so that eac...
Given a 3x3x3 mirror cube, we find the number of valid and distinct projections up to and including ...
The rotational symmetries of the Platonic solids are illustrated. Each face can be a different color...
Paint by Numbers is a classic logic puzzle in which the squares of a p×n grid are to be colored in s...
Euclidean Ramsey theory is examining konfigurations of points, for which there exists n such that fo...
The children’s puzzle, sometimes called the Great Tantalizer, consists of four blocks each of whose ...
AbstractThe 512 points of an 8 × 8 × 8 cubical array of lattice points in 3-space can be colored in ...
Which of two bi-colored cubes is the simpler puzzle? The differences in the coloring of the cubes cr...
This paper describes the n-queens problem on an n by n chessboard. We discuss the possible symmetrie...
The Rubik’s cube is a puzzle formed from a 3 × 3 × 3 cube and 6 different colors. The way the cube o...
Jeremiah Farrell\u27s contribution to The Mathemagician and Pied Puzzler: A Collection in Tribute t...
The Rubik\u27s cube is a solid block of twenty seven cubes, linked together so that each layer can b...
A framework for the detailed classification of general crystal structures, based on an arithmetic cr...
In the third clip in a series of ten from the fifth of seven interviews, 8th grader Stephanie contin...
In this research, we examine n x n grids whose individual squares are each colored with one of k dis...