Given an array arr[] of N integers and an integer K, the task is to calculate the minimum number of subsets of almost 2 elements the array can be divided such that the sum of elements in each subset is almost K.
Examples:
Input: arr[] = {1, 2, 3}, K = 3
Output: 2
Explanation: The given array can be divided into subsets as {1, 2} and {3}, and the sum of both the subsets is atmost K. Hence, the count of subsets is 2 which is the minimum possible.Input: arr[] = {3, 2, 2, 3, 1}, K = 3
Output: 4Input: arr[] = {3, 2, 2, 3, 1}, K = 2
Output: -1
Approach: The given problem can be solved using a greedy approach with the help of two pointer approach. The idea is to group together the integer with minimum value with the maximum possible value such that their sum does not exceed K. Follow the steps to solve the given problem:
- Sort the given array in non-decreasing order.
- Create two variables, i = 0 and j = N – 1, where i represents the 1st index and j represents the last index of the array.
- If the sum of arr[i] and arr[j] is almost K, increment i and decrement j. Also, increment the subset count by 1.
- If the sum of arr[i] and arr[j] is more than K, decrement j and increment the subset count.
Below is the implementation of the above approach:
C++14
// C++ program of the above approach#include <bits/stdc++.h>using namespace std;
// Function to split array into minimum// subsets of at most 2 elements with// sum of each subset at most Kint minSubsetCnt(vector<int>& arr, int K)
{ // Sort arr in increasing order
sort(arr.begin(), arr.end());
// If it is impossible
if (arr[arr.size() - 1] > K) {
return -1;
}
// Stores the count of subsets
int cnt = 0;
// Starting pointer
int i = 0;
// End pointer
int j = arr.size() - 1;
// Loop for the two
// pointer approach
while (i <= j) {
if (arr[i] + arr[j] <= K) {
cnt++;
i++;
j--;
}
else {
cnt++;
j--;
}
}
// Return Answer
return cnt;
}// Driver Codeint main()
{ vector<int> arr{ 3, 2, 2, 3, 1 };
int K = 3;
cout << minSubsetCnt(arr, K);
return 0;
} |
Java
// Java program of the above approach import java.util.*;
class GFG{
// Function to split array into minimum// subsets of at most 2 elements with// sum of each subset at most Kstatic int minSubsetCnt(int[] arr, int K)
{ // Sort arr in increasing order
Arrays.sort(arr);
// If it is impossible
if (arr[arr.length - 1] > K)
{
return -1;
}
// Stores the count of subsets
int cnt = 0;
// Starting pointer
int i = 0;
// End pointer
int j = arr.length - 1;
// Loop for the two
// pointer approach
while (i <= j)
{
if (arr[i] + arr[j] <= K)
{
cnt++;
i++;
j--;
}
else
{
cnt++;
j--;
}
}
// Return Answer
return cnt;
}// Driver Codepublic static void main(String args[])
{ int[] arr = { 3, 2, 2, 3, 1 };
int K = 3;
System.out.print(minSubsetCnt(arr, K));
}}// This code is contributed by sanjoy_62 |
Python
# Python program of the above approach# Function to split array into minimum# subsets of at most 2 elements with# sum of each subset at most Kdef minSubsetCnt(arr, K):
# Sort arr in increasing order
arr.sort()
# If it is impossible
if (arr[len(arr) - 1] > K):
return -1
# Stores the count of subsets
cnt = 0;
# Starting pointer
i = 0;
# End pointer
j = len(arr) - 1;
# Loop for the two
# pointer approach
while (i <= j):
if (arr[i] + arr[j] <= K):
cnt = cnt + 1
i = i + 1
j = j - 1
else:
cnt = cnt + 1
j = j - 1
# Return Answer
return cnt
# Driver Codearr = [ 3, 2, 2, 3, 1 ]
K = 3
print(minSubsetCnt(arr, K))
# This code is contributed by Samim Hossain Mondal. |
C#
// C# implementation for the above approachusing System;
class GFG
{ // Function to split array into minimum// subsets of at most 2 elements with// sum of each subset at most Kstatic int minSubsetCnt(int[] arr, int K)
{ // Sort arr in increasing order
Array.Sort(arr);
// If it is impossible
if (arr[arr.Length - 1] > K)
{
return -1;
}
// Stores the count of subsets
int cnt = 0;
// Starting pointer
int i = 0;
// End pointer
int j = arr.Length - 1;
// Loop for the two
// pointer approach
while (i <= j)
{
if (arr[i] + arr[j] <= K)
{
cnt++;
i++;
j--;
}
else
{
cnt++;
j--;
}
}
// Return Answer
return cnt;
}// Driver Codepublic static void Main()
{ int[] arr = { 3, 2, 2, 3, 1 };
int K = 3;
Console.Write(minSubsetCnt(arr, K));
}}// This code is contributed by Samim Hossain Mondal. |
Javascript
<script> // JavaScript code for the above approach
// Function to split array into minimum
// subsets of at most 2 elements with
// sum of each subset at most K
function minSubsetCnt(arr, K) {
// Sort arr in increasing order
arr.sort(function (a, b) { return a - b })
// If it is impossible
if (arr[arr.length - 1] > K) {
return -1;
}
// Stores the count of subsets
let cnt = 0;
// Starting pointer
let i = 0;
// End pointer
let j = arr.length - 1;
// Loop for the two
// pointer approach
while (i <= j) {
if (arr[i] + arr[j] <= K) {
cnt++;
i++;
j--;
}
else {
cnt++;
j--;
}
}
// Return Answer
return cnt;
}
// Driver Code
let arr = [3, 2, 2, 3, 1];
let K = 3;
document.write(minSubsetCnt(arr, K));
// This code is contributed by Potta Lokesh
</script>
|
Output
4
Time Complexity: O(N*log N)
Auxiliary space: O(1)