OK, I have to make a nim game and try to find the strategy to always win with the following nim game:

21 matches, player 1 and 2 each take 1, 2, 3, 4, or 5 matches each turn, and one cannot take the same amount of matches the previous player takes. Th eplayer wins if/when they take the last match.

I have to program something for this, but I don't even understand were to start. How can i find the winning strategy with this type of nim game?

EDIT:

So I figured you'll always win when you get to 7 matches still in the middle. The other can take 2-5 and you can add up to 7 taking the last one. when the other takes 1, you take 3 (the other can't take 3 as well then) and has to pick 1 or 2 in which case you'll get the alst one and win as well.

However, going from 21 to 7 is a puzzle for me i cant figure out how you can always be the person getting to 7.

EDIT 2: ok so without the rule that you can't take the same as the previous player it is quite simple i think.

You'd make k = 5 + 1 = 6. then you should make the first move such that the matches left then % 6 = 0. So in this case take 3 first and then afterwards fill up the move of the other player to 6. However in this case that won't work because the other player can take 3 after which you can't take 3 to fill up to 6. So there is my problem. Any ideas?

EDIT3:

ok so you say I can force 7 matches. However suppose I take the same thinking to the 14-7 matches step. (it then is the other's turn)

there are two scenarios then: 1: he takes 2-5 and I fill it up to seven which let 7 there and I win. 2: he takes 1, so there are 13 left. When i take 3 as i do in the (7-0)-step it becomes 10. Then he takes 5 and i can't take 5 anymore to finish and i will loose.

Here lies the problem, where scenario 2 is no problem in the (7-0)-step it is now. How do I solve this?

YES, THE SOLUTION:

btw, na speler 1 means: after player 1's turn etc (I'm dutch).

Ok so i tried some things and i think i have the solution. You have to take 1 match as the first player first. Then the other guys can take 2-5 matches. You match (pun intended) his amount up to 7 so you'll have (21-1-7=) 13 matches left in the middle always. Then it is Player 2's turn again and there are two scenarios: player 2 takes 1,2,4,or5 matches, in which case you take as much matches that there will be 7 in the left. (as told earlier when you take matches such that there are 7 left you'll always win). The second scenario is that player 2 takes 3 matches in which case there are 10 in the middle when it is your turn. You can't take 3 to make 7 because you can't take 2 times the same amount. So you take 5 so there are 5 left. Player 2 then can't take 5 to win and has to pick 1-4 after which you can take the remaining ones and win.

This is the solution i guess. I somehow came onto it because i noticed this:

Normal Nim game with modulo etc:

```
P2 1 2 3 4 5
P1 5 4 3 2 1
------------------
6 6 6 6 6
```

But you cant do 3,3 here so it is liek this:

```
p2 1 2 3 4 5
p1 5 4 3 2 1
---------------------
7 7 7 7
```

So you can make 7 everytime and 1 is a special case. I don't know why but i intuitively took 1 as starting point as it feels like you need to take initiative to be able to control the other's moves. (one cannot do two times 1 so the other has to take 2-5 which makes you in control)

Anyway, THANKS a lot for all the help. Also for the whole program that was written. I couldn't use it because it wouldn't compile as a lack good java skills :) and i also wanted to solve it myself.

Anyway, i saw this is a wiki, good luck for people in the future trying to solve this!

per se. Unless, I suppose, you wanted to do some kind of statistical simulation and try to work out the strategy from the results of random games. But you can actually infer it through logic, with no computers involved. – Andrzej Doyle Nov 11 '10 at 15:32haveto be a program? If it's for an assignment, chances are you had a much more specific brief than "program something", so perhaps inspecting that will lead you down the right tracks. If it's your own personal choice for a project, I'm afraid you picked an unsuitable project. – Andrzej Doyle Nov 11 '10 at 15:34