Given an integer array nums (0-indexed) and two integers target and start, find an index i such that nums[i] == target and abs(i - start) is minimized. Note that abs(x) is the absolute value of x.
Return abs(i - start).
It is guaranteed that target exists in nums.
Input: nums = [1,2,3,4,5], target = 5, start = 3 Output: 1 Explanation: nums[4] = 5 is the only value equal to target, so the answer is abs(4 - 3) = 1.
Input: nums = [1], target = 1, start = 0 Output: 0 Explanation: nums[0] = 1 is the only value equal to target, so the answer is abs(0 - 0) = 0.
Input: nums = [1,1,1,1,1,1,1,1,1,1], target = 1, start = 0 Output: 0 Explanation: Every value of nums is 1, but nums[0] minimizes abs(i - start), which is abs(0 - 0) = 0.
1 <= nums.length <= 10001 <= nums[i] <= 1040 <= start < nums.lengthtargetis innums.
impl Solution {
pub fn get_min_distance(nums: Vec<i32>, target: i32, start: i32) -> i32 {
let start = start as usize;
for i in 0..nums.len() {
if nums[(start + i).min(nums.len() - 1)] == target
|| nums[start.saturating_sub(i)] == target
{
return i as i32;
}
}
unreachable!()
}
}