# Understanding this solution to a puzzle

I was doing a puzzle in a coding competition, and I'm stuck on one question. Basically I don't understand how can someone reach this solution. The puzzle was

Alice and Bob play the following game. They choose a number N to play with. The rules are as follows:

1. Bob plays first and the two players alternate.
2. In his/her turn, a player can subtract from N any prime number (including 1) less than N. The number thus obtained is the new N.
3. The person who cannot make a move in his/her turn loses the game.

Assuming both play optimally, who wins the game?

And the given solution is

``````int main() {
long int T, N;
for(scanf("%ld", &T); T > 0; T--) {
scanf("%ld", &N);
if (N % 4 == 1) {
printf("ALICE wins\n");
} else {
printf("BOB wins\n");
}
}
``````
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What competition? Is it still on-going? It will be highly unethical to ask how to solve problems from a competition if it is still ongoing (as it is unfair for those who actually try to solve it according to the rules - by their own) – amit Nov 11 '12 at 15:49
No no, its a practice question from codechef – neel Nov 11 '12 at 15:52
I am glad to hear. You should also link to the specific question. – amit Nov 11 '12 at 15:54
It's probably not your phrasing, but I despise "a player can subtract from N any prime number (including 1) less than N." 1 isn't prime! – Joshua Green Nov 11 '12 at 16:10
– neel Nov 11 '12 at 16:56

## 1 Answer

It's sort of a Nim game. The player who finally faces `N = 1` loses. If `N % 4 != 1`, Bob can take 1, 2 or 3 to make the next `N ≡ 1 (mod 4)`, leaving Alice in a losing position. Otherwise, if `N ≡ 1 (mod 4)` at the start, Alice can counter Bob's move to leave a number `≡ 1 (mod 4)` for Bob again.

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What to do if we dont subtract prime but the divisor of number – neel Nov 11 '12 at 16:17
That's far more complicated. I don't think there is an easy way to determine from which values the beginning player can force a win with that rule, but I haven't analysed that problem deeply so far. But it sounds interesting. – Daniel Fischer Nov 11 '12 at 16:21
Actually, @neel, scratch that, it is easy. If `N` is even, the beginning player can force a win (always taking 1). From an odd `N`, the beginning player loses. If `N` is odd, each divisor is also odd, then the next player has an even (winning) number left. – Daniel Fischer Nov 11 '12 at 16:27
thanks for your help – neel Nov 11 '12 at 16:34
@neel: On the "how can someone reach this solution" part of your question: "by working backwards", as illustrated in the answer. That is, these problems are often solved by finding a small case that is a win for one of the players, and then working backwards to see how a player can force that situation. – Patricia Shanahan Nov 11 '12 at 17:33