This question was posed to me, and I was surprised that I could not find a solution (as I thought that all rook tours [open or closed] were possible). Starting from a8, could a rook visit every square on the board once, ending on f3?
I tried a few times, with a few different strategies, but I always ended up missing one square.
It's really easy to burn pairs of rows or columns, so the problem space could be reduced...
...but at some point (4x4), I was able to convince myself that it is impossible (at least at this size and state):
...but it might be possible that shaving off column or row pairs is also discarding a solution?
Diagonal move in top right corner?
Edit: wait actually along the whole right side
Thanks for pointing that out. That mistake was easily mendable.
I hope I havenโt blundered somewhere else.
In this context, you cannot cross a square without visiting it.
Logical proof of why it's not possible for your given rules of not being able to pass through squares.
You start in white and you can only move to black. Then you have to move to white again, then black, then white, then black and so on. For a sequence with an even number of terms you have to end on black if you start in white .Since the puzzle states you have to start and end on white it's impossible.
I don't think it's possible in that case
Mmm that's a good way of showing it, very visual and easy to follow.