<p>You are given an array <code>nums</code> consisting of <strong>non-negative</strong> integers.</p> <p>We define the score of subarray <code>nums[l..r]</code> such that <code>l <= r</code> as <code>nums[l] AND nums[l + 1] AND ... AND nums[r]</code> where <strong>AND</strong> is the bitwise <code>AND</code> operation.</p> <p>Consider splitting the array into one or more subarrays such that the following conditions are satisfied:</p> <ul> <li><strong>E</strong><strong>ach</strong> element of the array belongs to <strong>exactly</strong> one subarray.</li> <li>The sum of scores of the subarrays is the <strong>minimum</strong> possible.</li> </ul> <p>Return <em>the <strong>maximum</strong> number of subarrays in a split that satisfies the conditions above.</em></p> <p>A <strong>subarray</strong> is a contiguous part of an array.</p> <p> </p> <p><strong class="example">Example 1:</strong></p> <pre> <strong>Input:</strong> nums = [1,0,2,0,1,2] <strong>Output:</strong> 3 <strong>Explanation:</strong> We can split the array into the following subarrays: - [1,0]. The score of this subarray is 1 AND 0 = 0. - [2,0]. The score of this subarray is 2 AND 0 = 0. - [1,2]. The score of this subarray is 1 AND 2 = 0. The sum of scores is 0 + 0 + 0 = 0, which is the minimum possible score that we can obtain. It can be shown that we cannot split the array into more than 3 subarrays with a total score of 0. So we return 3. </pre> <p><strong class="example">Example 2:</strong></p> <pre> <strong>Input:</strong> nums = [5,7,1,3] <strong>Output:</strong> 1 <strong>Explanation:</strong> We can split the array into one subarray: [5,7,1,3] with a score of 1, which is the minimum possible score that we can obtain. It can be shown that we cannot split the array into more than 1 subarray with a total score of 1. So we return 1. </pre> <p> </p> <p><strong>Constraints:</strong></p> <ul> <li><code>1 <= nums.length <= 10<sup>5</sup></code></li> <li><code>0 <= nums[i] <= 10<sup>6</sup></code></li> </ul>