You are given two distinct non-negative integers $$$x$$$ and $$$y$$$. Consider two infinite sequences $$$a_1, a_2, a_3, \ldots$$$ and $$$b_1, b_2, b_3, \ldots$$$, where

• $$$a_n = n \oplus x$$$;
• $$$b_n = n \oplus y$$$.

Here, $$$x \oplus y$$$ denotes the bitwise XOR operation of integers $$$x$$$ and $$$y$$$.

For example, with $$$x = 6$$$, the first $$$8$$$ elements of sequence $$$a$$$ will look as follows: $$$[7, 4, 5, 2, 3, 0, 1, 14, \ldots]$$$. Note that the indices of elements start with $$$1$$$.

Your task is to find the length of the longest common subsegment$$$^\dagger$$$ of sequences $$$a$$$ and $$$b$$$. In other words, find the maximum integer $$$m$$$ such that $$$a_i = b_j, a_{i + 1} = b_{j + 1}, \ldots, a_{i + m - 1} = b_{j + m - 1}$$$ for some $$$i, j \ge 1$$$.

$$$^\dagger$$$A subsegment of sequence $$$p$$$ is a sequence $$$p_l,p_{l+1},\ldots,p_r$$$, where $$$1 \le l \le r$$$.