A large white cube is painted red, and then cut into $27$ identical smaller cubes. These smaller cubes are shuffled randomly.
A blind man (who also cannot feel the paint) reassembles the small cubes into a large one. What is the probability that the outside of this large cube is completely red?
Best Answer
Hint: Try to find first the probability that the corner cubes are put into the corners, the face cubes into the faces and the edge cubes into the edges. Then the probability that they have the correct orientation.
Complete answer:
First, number the small cubes to make them distinguishable.
Without taking into account the orientation of the smaller cubes, there are 27! possible ways to reassemble them into a big cube.
So there are 6!8!12! correct cubes (without taking into account the orientation).
Now take such a cube.
This means that the probability of getting a red cube must be
$$\frac{6!8!12!}{27!}\left(\frac{1}{6}\right)^6\left(\frac{1}{8}\right)^8\left(\frac{1}{12}\right)^{12}$$