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?
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?
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!