Nim Game(Easy)

You are playing the following Nim Game with your friend: There is a heap of stones on the table, each time one of you take turns to remove 1 to 3 stones.

The one who removes the last stone will be the winner. You will take the first turn to remove the stones.

Both of you are very clever and have optimal strategies for the game. Write a function to determine whether you can win the game given the number of stones in the heap.

For example, if there are 4 stones in the heap, then you will never win the game: no matter 1, 2, or 3 stones you remove, the last stone will always be removed by your friend.

Nim游戏的解题关键是寻找“必胜态”。

根据题设条件： 当n∈[1,3]时，先手必胜。

当n == 4时，无论先手第一轮如何选取，下一轮都会转化为n∈[1,3]的情形，此时先手必负。

当n∈[5,7]时，先手必胜，先手分别通过取走[1,3]颗石头，可将状态转化为n == 4时的情形，此时后手必负。

当n == 8时，无论先手第一轮如何选取，下一轮都会转化为n∈[5,7]的情形，此时先手必负。

# 以此类推，可以得出结论：

当n % 4 != 0时，先手必胜；否则先手必负。

Java代码

public static boolean canWinNim(int n) {
    if (n % 4 == 0)
        return false;
    else
        return true;
}

OR

public boolean canWinNim(int n) {
  return (n & 0b11) != 0;
}