It seems like a pathfinding problem on states.

You can represent each vertex with a binary vector of size `n`

+ an indentifier - where which room you are in at the moment [`n`

is the number of rooms].

`G=(V,E)`

where `V = {all binary vectors of size n and a recored for which room you are in}`

and `E = {(u,v) | you can switch from binary vector u to v by clicking a button in the room you are in, or move to adjacent lights on room }`

Now you only need to run a search algorithm on the possible paths.

**Possible search algorithms:**

**BFS** - simplest to program, though slowest run time
**bi - directional** BFS - since there is only one target node,
a bi-directional search will work here, it is expected to be much
faster then BFS
**A*** - find an admissible heurstic function and run
informed A* on the problem. It is harder to program it then the rest - but if you find a good heurisitc, it will most likely perform much better.

(*) All of the above are both **complete** [will find a solution if one exists] and **optimal** [will find the shortest solution, if one exists]

(*) This solution runs in exponential time on the number of rooms, but it should end up for `d <= 10`

as indicated in the problem in reasonable time.