You are given an integer finalSum. Split it into a sum of a maximum number of unique positive even integers.
- For example, given
finalSum = 12, the following splits are valid (unique positive even integers summing up tofinalSum):(12),(2 + 10),(2 + 4 + 6), and(4 + 8). Among them,(2 + 4 + 6)contains the maximum number of integers. Note thatfinalSumcannot be split into(2 + 2 + 4 + 4)as all the numbers should be unique.
Return a list of integers that represent a valid split containing a maximum number of integers. If no valid split exists for finalSum, return an empty list. You may return the integers in any order.
Input: finalSum = 12 Output: [2,4,6] Explanation: The following are valid splits: (12), (2 + 10), (2 + 4 + 6), and (4 + 8). (2 + 4 + 6) has the maximum number of integers, which is 3. Thus, we return [2,4,6]. Note that [2,6,4], [6,2,4], etc. are also accepted.
Input: finalSum = 7 Output: [] Explanation: There are no valid splits for the given finalSum. Thus, we return an empty array.
Input: finalSum = 28 Output: [6,8,2,12] Explanation: The following are valid splits: (2 + 26), (6 + 8 + 2 + 12), and (4 + 24). (6 + 8 + 2 + 12) has the maximum number of integers, which is 4. Thus, we return [6,8,2,12]. Note that [10,2,4,12], [6,2,4,16], etc. are also accepted.
1 <= finalSum <= 1010
impl Solution {
pub fn maximum_even_split(final_sum: i64) -> Vec<i64> {
if final_sum % 2 == 1 {
return vec![];
}
let mut final_sum = final_sum;
let mut ret = vec![];
for x in (2..=final_sum).step_by(2) {
if final_sum - x <= x {
ret.push(final_sum);
break;
}
ret.push(x);
final_sum -= x;
}
ret
}
}