Brute-force based on hints II
Yeah for this problem I wanted to know if it was possible to go with a brute-force approach. So I looked at the hints, and sure enough, it says that brute-force is OK, so that's what I did. Brute-forcing it with backtracking. Code is below, cheers, ACC.
Maximum Compatibility Score Sum - LeetCode
There is a survey that consists of n questions where each question's answer is either 0 (no) or 1 (yes).
The survey was given to m students numbered from 0 to m - 1 and m mentors numbered from 0 to m - 1. The answers of the students are represented by a 2D integer array students where students[i] is an integer array that contains the answers of the ith student (0-indexed). The answers of the mentors are represented by a 2D integer array mentors where mentors[j] is an integer array that contains the answers of the jth mentor (0-indexed).
Each student will be assigned to one mentor, and each mentor will have one student assigned to them. The compatibility score of a student-mentor pair is the number of answers that are the same for both the student and the mentor.
- For example, if the student's answers were
[1, 0, 1]and the mentor's answers were[0, 0, 1], then their compatibility score is 2 because only the second and the third answers are the same.
You are tasked with finding the optimal student-mentor pairings to maximize the sum of the compatibility scores.
Given students and mentors, return the maximum compatibility score sum that can be achieved.
Example 1:
Input: students = [[1,1,0],[1,0,1],[0,0,1]], mentors = [[1,0,0],[0,0,1],[1,1,0]] Output: 8 Explanation: We assign students to mentors in the following way: - student 0 to mentor 2 with a compatibility score of 3. - student 1 to mentor 0 with a compatibility score of 2. - student 2 to mentor 1 with a compatibility score of 3. The compatibility score sum is 3 + 2 + 3 = 8.
Example 2:
Input: students = [[0,0],[0,0],[0,0]], mentors = [[1,1],[1,1],[1,1]] Output: 0 Explanation: The compatibility score of any student-mentor pair is 0.
Constraints:
m == students.length == mentors.lengthn == students[i].length == mentors[j].length1 <= m, n <= 8students[i][k]is either0or1.mentors[j][k]is either0or1.
public int MaxCompatibilitySum(int[][] students, int[][] mentors)
{
int bestSum = 0;
MaxCompatibilitySum(students, mentors, 0, new Hashtable(), 0, ref bestSum);
return bestSum;
}
private void MaxCompatibilitySum(int[][] students,
int[][] mentors,
int studendIndex,
Hashtable mentorIndexUsed,
int currentSum,
ref int bestSum)
{
if (studendIndex >= students.Length)
{
bestSum = Math.Max(bestSum, currentSum);
return;
}
for (int mentorIndex = 0; mentorIndex < mentors.Length; mentorIndex++)
{
if (!mentorIndexUsed.ContainsKey(mentorIndex))
{
int localSum = 0;
for (int col = 0; col < students[studendIndex].Length; col++)
{
localSum += (students[studendIndex][col] == mentors[mentorIndex][col]) ? 1 : 0;
}
//Console.WriteLine("({0}, {1}) ==> {2}", studendIndex, mentorIndex, localSum);
mentorIndexUsed.Add(mentorIndex, true);
MaxCompatibilitySum(students, mentors, studendIndex + 1, mentorIndexUsed, currentSum + localSum, ref bestSum);
mentorIndexUsed.Remove(mentorIndex);
}
}
}
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