There is a room with n lights which are turned on initially and 4 buttons on the wall. After performing exactly m unknown operations towards buttons, you need to return how many different kinds of status of the n lights could be.

Suppose n lights are labeled as number [1, 2, 3 ..., n], function of these 4 buttons are given below:

1. Flip all the lights.
2. Flip lights with even numbers.
3. Flip lights with odd numbers.
4. Flip lights with (3k + 1) numbers, k = 0, 1, 2, ...

Example 1:

Input: n = 1, m = 1.

Output: 2

Explanation: Status can be: [on], [off]

Example 2:

Input: n = 2, m = 1.

Output: 3

Explanation: Status can be: [on, off], [off, on], [off, off]

Example 3:

Input: n = 3, m = 1.

Output: 4

Explanation: Status can be: [off, on, off], [on, off, on], [off, off, off], [off, on, on].

Note: n and m both fit in range [0, 1000].

Runtime: 4 ms, faster than 29.00% of C++ online submissions for Bulb Switcher II.

找规律题。

class Solution {

public:

    int flipLights(int n, int m) {

      if(m == ) return ;

      if(n == ) return ;

      if(n ==  && m == ) return ;

      if(n == ) return ;

      if(m==) return ;

      if(m == ) return ;

      return ;

    }

};