A magic square is one in which the sum of the numbers in each row, column, and both main diagonals is the same. The numbers in the magic square can only be 1 to 9.
a 3x3 magic square example:
There are 8 combinations of a 3x3 magic square.
A white Rubik's cube has 6 sides. There are 9 spaces on each side for numbers from 1 to 9, without color.
If we fill each side of a white Rubik's cube with a magic square, how many combinations can be filled on this Rubik's Cube?
A magic square is one in which the sum of the numbers in each row, column, and both main diagonals is the same. The numbers in the magic square can only be 1 to 9.
a 3x3 magic square example:
There are 8 combinations of a 3x3 magic square.
A white Rubik's cube has 6 sides. There are 9 spaces on each side for numbers from 1 to 9, without color.
If we fill each side of a white Rubik's cube with a magic square, how many combinations can be filled on this Rubik's Cube?
A magic square is one in which the sum of the numbers in each row, column, and both main diagonals is the same. The numbers in the magic square can only be 1 to 9.
a 3x3 magic square example:
There are 8 combinations of a 3x3 magic square.
A white Rubik's cube has 6 sides. There are 9 spaces on each side for numbers from 1 to 9, without color.
If we fill each side of a white Rubik's cube with a magic square, how many combinations can be filled on this Rubik's Cube?
A magic square is one in which the sum of the numbers in each row, column, and both main diagonals is the same. The numbers in the magic square can only be 1 to 9.
a 3x3 magic square example:
There are 8 combinations of a 3x3 magic square.
If we fill aA white Rubik's Cube with nocube has 6 sides. There are 9 spaces on each side for numbers from 1 to 9, without color and.
If we fill each side of a white Rubik's cube with a magic square, how many combinations can be filled on this Rubik's Cube?
What if we extend 3 to $n$?
A magic square is one in which the sum of the numbers in each row, column, and both main diagonals is the same.
a 3x3 magic square example:
There are 8 combinations of a 3x3 magic square.
If we fill a Rubik's Cube with no color and fill each side with a magic square, how many combinations can be filled on this Rubik's Cube?
What if we extend 3 to $n$?
A magic square is one in which the sum of the numbers in each row, column, and both main diagonals is the same. The numbers in the magic square can only be 1 to 9.
a 3x3 magic square example:
There are 8 combinations of a 3x3 magic square.
A white Rubik's cube has 6 sides. There are 9 spaces on each side for numbers from 1 to 9, without color.
If we fill each side of a white Rubik's cube with a magic square, how many combinations can be filled on this Rubik's Cube?
A magic square is one in which the sum of the numbers in each row, column, and both main diagonals is the same.
a 3x3 magic square example:
a 3x3 magic square example
There are 8 combinations of a 3x3 magic square.
If we fill a Rubik's Cube with no color and fill each side with a magic square, how many combinations can be filled on this Rubik's Cube?
What if we extend 3 to $n$?
A magic square is one in which the sum of the numbers in each row, column, and both main diagonals is the same. a 3x3 magic square example
There are 8 combinations of a 3x3 magic square.
If we fill a Rubik's Cube with no color and fill each side with a magic square, how many combinations can be filled on this Rubik's Cube?
What if we extend 3 to $n$?
A magic square is one in which the sum of the numbers in each row, column, and both main diagonals is the same.
a 3x3 magic square example:
There are 8 combinations of a 3x3 magic square.
If we fill a Rubik's Cube with no color and fill each side with a magic square, how many combinations can be filled on this Rubik's Cube?
What if we extend 3 to $n$?
