A while back I wrote a simple python program to brute-force the single solution for the drive ya nuts puzzle.

The puzzle consists of 7 hexagons with the numbers 1-6 on them, and all pieces must be aligned so that each number is adjacent to the same number on the next piece.

The puzzle has `~1.4G`

non-unique possibilities: you have `7!`

options to sort the pieces by order (for example, `center=0`

, `top=1`

, continuing in clockwise order...). After you sorted the pieces, you can rotate each piece in 6 ways (each piece is a hexagon), so you get `6**7`

possible rotations for a given permutation of the 7 pieces. Totalling: `7!*(6**7)=~1.4G`

possibilities. The following python code generates these possible solutions:

```
def rotations(p):
for i in range(len(p)):
yield p[i:] + p[:i]
def permutations(l):
if len(l)<=1:
yield l
else:
for perm in permutations(l[1:]):
for i in range(len(perm)+1):
yield perm[:i] + l[0:1] + perm[i:]
def constructs(l):
for p in permutations(l):
for c in product(*(rotations(x) for x in p)):
yield c
```

However, note that the puzzle has only `~0.2G`

**unique** possible solutions, as you must divide the total number of possibilities by 6 since each possible solution is equivalent to 5 other solutions (simply rotate the entire puzzle by 1/6 a turn).

Is there a better way to generate **only the unique possibilities** for this puzzle?