Ehab the Xorcist
Description
Given 2 integers $u$ and $v$, find the shortest array such that bitwise-xor of its elements is $u$, and the sum of its elements is $v$.
The only line contains 2 integers $u$ and $v$ $(0 \le u,v \le 10^{18})$.
If there's no array that satisfies the condition, print "-1". Otherwise:
The first line should contain one integer, $n$, representing the length of the desired array. The next line should contain $n$ positive integers, the array itself. If there are multiple possible answers, print any.
Input
The only line contains 2 integers $u$ and $v$ $(0 \le u,v \le 10^{18})$.
Output
If there's no array that satisfies the condition, print "-1". Otherwise:
The first line should contain one integer, $n$, representing the length of the desired array. The next line should contain $n$ positive integers, the array itself. If there are multiple possible answers, print any.
Samples
2 4
2
3 1
1 3
3
1 1 1
8 5
-1
0 0
0
Note
In the first sample, $3\oplus 1 = 2$ and $3 + 1 = 4$. There is no valid array of smaller length.
Notice that in the fourth sample the array is empty.