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I made a tic tac toe A.I. Given each board state, my A.I. will return 1 exact place to move. (Even if moves are equally correct, it chooses same one every time, it does not pick a random one)

I also made a function that loops though all possible plays made with the A.I.

So it's a recursive function that lets the A.I. make a move for a given board, then lets the other play make all possible moves and calls the recursive function in it self with a new board for each possible move.

I do this for when the A.I goes first, and when the other one goes first... and add these together. I end up with 418 possible wins and 115 possible ties, and 0 possible loses.

But now my problem is, how do I maximize the amount of wins? I need to compare this statistic to something, but I can't figure out what to compare it to.

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Make it play itself. – Jakob Bowyer Dec 1 '12 at 23:38
@JakobBowyer: – hammar Dec 1 '12 at 23:52
@hammar – Jakob Bowyer Dec 2 '12 at 0:10
If it's perfect, it can never loose if it starts. – GolezTrol Dec 2 '12 at 0:35
@GolezTrol No, you're wrong. That does not prove it's perfect, only that it's good. For it to be perfect, if has to has win at all possibilities. It could be that my AI ties at some of them instead of wins. – Volatile Dec 2 '12 at 0:46
up vote 5 down vote accepted

Did you read article on wikipedia? link

Number of terminal positions

When considering only the state of the board, and after taking into account board symmetries (i.e. rotations and reflections), there are only 138 terminal board positions. Assuming that X makes the first move every time:

  • 91 unique positions are won by (X)
  • 44 unique positions are won by (O)
  • 3 unique positions are drawn

Number of possible games

Without taking symmetries into account, the number of possible games can be determined by hand with an exact formula that leads to 255,168 possible games. Assuming that X makes the first move every time:

  • 131,184 finished games are won by (X)
  • 77,904 finished games are won by (O)
  • 46,080 finished games are drawn

You may generate 138 terminal board positions from first paragraph


Yo may run enough tests on random fields and compare your results with statistics from here link

Win in 5 moves    1440     0.6%
Win in 6 moves    5328     2.1%
Win in 7 moves    47952   18.8%
Win in 8 moves    72576   28.4%
Win in 9 moves    81792   32.1%
Draw              46080   18.1%    
Total             255168 100.0%
share|improve this answer
how do you compare 131,184 wins to 418 wins? How do u compare these statistics to my results, that is my question. – Volatile Dec 1 '12 at 23:54
make 91+44+3=138 board setups from first paragraph. Run AI. Compare wins/losses/drawn count. – akaRem Dec 1 '12 at 23:58
how does one make 138 board set ups...... – Volatile Dec 2 '12 at 0:02
@BlazArt you may generate them: direct search + some restrictions on symmetry and field rotation. Or you still make it brut force and compare to this (link from wikipedia) – akaRem Dec 2 '12 at 0:18
@BlazArt i've updated answer. – akaRem Dec 2 '12 at 0:33

You could actually brute force the game, and prove that every time there is a winning strategy, your A.I. picks the correct move. Then, you could prove that for every position, your A.I. picks the move which maximizes the chances of having a winning strategy, assuming the other player is playing randomly. There are not that many possibilities, so you should be able to eliminate all of them.

You could also significantly diminish the space of possibilities by assuming the other player is actually slightly intelligent, e.g. always tries to block a move which results in immediate victory.

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255168 games. Ok. You have some results, f.e. 51% wins, 40% losses, 9% draw. Is it good or bad? – akaRem Dec 2 '12 at 0:00

One issue with akaRem's answer is that an optimal player shouldn't look like the overall distribution. For example, a player that I just wrote wins about 90% of the time against someone playing randomly and ties 10% of the time. You should only expect akaRem's statistics to match if you have two players against each other playing randomly. Two optimal players would always result in a tie.

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