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Count triplets with sum smaller than a given value

Given an array of distinct integers and a sum value. Find count of triplets with sum smaller than given sum value. The expected Time Complexity is O(n2).
Examples: 
 

Input : arr[] = {-2, 0, 1, 3}
        sum = 2.
Output : 2
Explanation :  Below are triplets with sum less than 2
               (-2, 0, 1) and (-2, 0, 3) 

Input : arr[] = {5, 1, 3, 4, 7}
        sum = 12.
Output : 4
Explanation :  Below are triplets with sum less than 12
               (1, 3, 4), (1, 3, 5), (1, 3, 7) and 
               (1, 4, 5)

 

A Simple Solution is to run three loops to consider all triplets one by one. For every triplet, compare the sums and increment count if the triplet sum is smaller than the given sum. 
 




// A Simple C++ program to count triplets with sum smaller
// than a given value
#include <bits/stdc++.h>
using namespace std;
  
int countTriplets(int arr[], int n, int sum)
{
    // Initialize result
    int ans = 0;
  
    // Fix the first element as A[i]
    for (int i = 0; i < n - 2; i++) {
        // Fix the second element as A[j]
        for (int j = i + 1; j < n - 1; j++) {
            // Now look for the third number
            for (int k = j + 1; k < n; k++)
                if (arr[i] + arr[j] + arr[k] < sum)
                    ans++;
        }
    }
    return ans;
}
  
// Driver program
int main()
{
    int arr[] = { 5, 1, 3, 4, 7 };
    int n = sizeof arr / sizeof arr[0];
    int sum = 12;
    cout << countTriplets(arr, n, sum) << endl;
    return 0;
}
  
// This code is contributed by Aditya Kumar (adityakumar129)




// A Simple C program to count triplets with sum smaller
// than a given value
#include <stdio.h>
  
int countTriplets(int arr[], int n, int sum)
{
    // Initialize result
    int ans = 0;
  
    // Fix the first element as A[i]
    for (int i = 0; i < n - 2; i++) {
        // Fix the second element as A[j]
        for (int j = i + 1; j < n - 1; j++) {
            // Now look for the third number
            for (int k = j + 1; k < n; k++)
                if (arr[i] + arr[j] + arr[k] < sum)
                    ans++;
        }
    }
    return ans;
}
  
// Driver program
int main()
{
    int arr[] = { 5, 1, 3, 4, 7 };
    int n = sizeof arr / sizeof arr[0];
    int sum = 12;
    printf("%d\n", countTriplets(arr, n, sum));
    return 0;
}
  
// This code is contributed by Aditya Kumar (adityakumar129)




// A Simple Java program to count triplets with sum smaller
// than a given value
  
class Test
{
    static int arr[] = new int[]{5, 1, 3, 4, 7};
      
    static int countTriplets(int n, int sum)
    {
        // Initialize result
        int ans = 0;
       
        // Fix the first element as A[i]
        for (int i = 0; i < n-2; i++)
        {
           // Fix the second element as A[j]
           for (int j = i+1; j < n-1; j++)
           {
               // Now look for the third number
               for (int k = j+1; k < n; k++)
                   if (arr[i] + arr[j] + arr[k] < sum)
                       ans++;
           }
        }
       
        return ans;
    }
      
    // Driver method to test the above function
    public static void main(String[] args) 
    {
        int sum = 12
        System.out.println(countTriplets(arr.length, sum));
    }
}




# A Simple Python 3 program to count triplets with sum smaller
# than a given value
#include<bits/stdc++.h>
def countTriplets(arr, n, sum):
  
    # Initialize result
    ans = 0
  
    # Fix the first element as A[i]
    for i in range( 0 ,n-2):
      
        # Fix the second element as A[j]
        for j in range( i+1 ,n-1):
      
            # Now look for the third number
            for k in range( j+1, n):
                if (arr[i] + arr[j] + arr[k] < sum):
                    ans+=1
      
    return ans
  
# Driver program
arr = [5, 1, 3, 4, 7]
n = len(arr)
sum = 12
print(countTriplets(arr, n, sum))
  
#Contributed by Smitha




// A Simple C# program to count triplets with sum smaller
// than a given value
   
using System;
class Test
{
    static int[] arr = new int[]{5, 1, 3, 4, 7};
       
    static int countTriplets(int n, int sum)
    {
        // Initialize result
        int ans = 0;
        
        // Fix the first element as A[i]
        for (int i = 0; i < n-2; i++)
        {
           // Fix the second element as A[j]
           for (int j = i+1; j < n-1; j++)
           {
               // Now look for the third number
               for (int k = j+1; k < n; k++)
                   if (arr[i] + arr[j] + arr[k] < sum)
                       ans++;
           }
        }
        
        return ans;
    }
       
    // Driver method to test the above function
    public static void Main() 
    {
        int sum = 12; 
        Console.Write(countTriplets(arr.Length, sum));
    }
}




<script>
// A Simple Javascript program to count triplets with sum smaller
// than a given value
    let arr = [5, 1, 3, 4, 7];
      
    function countTriplets(n,sum)
    {
      
        // Initialize result
        let ans = 0;
         
        // Fix the first element as A[i]
        for (let i = 0; i < n-2; i++)
        {
           // Fix the second element as A[j]
           for (let j = i + 1; j < n-1; j++)
           {
               // Now look for the third number
               for (let k = j + 1; k < n; k++)
                   if (arr[i] + arr[j] + arr[k] < sum)
                       ans++;
           }
        }
        return ans;
    }
      
    // Driver method to test the above function
    let sum = 12; 
    document.write(countTriplets(arr.length, sum));
      
    // This code is contributed by avanitrachhadiya2155   
</script>

Output: 

4

Time Complexity: O(n3)
Auxiliary Space: O(1)

An Efficient Solution can count triplets in O(n2) by sorting the array first, and then using method 1 of this post in a loop.
 

1) Sort the input array in increasing order.
2) Initialize result as 0.
3) Run a loop from i = 0 to n-2.  An iteration of this loop finds all
   triplets with arr[i] as first element.
     a) Initialize other two elements as corner elements of subarray
        arr[i+1..n-1], i.e., j = i+1 and k = n-1
     b) Move j and k toward each other until they meet, i.e., while (j<k),
            (i) If arr[i] + arr[j] + arr[k] >= sum
                then k--
            // Else for current i and j, there can (k-j) possible third elements
            // that satisfy the constraint.
            (ii) Else Do ans += (k - j) followed by j++ 

Below is the implementation of the above idea. 
 




// C++ program to count triplets with sum smaller than a given value
#include<bits/stdc++.h>
using namespace std;
  
int countTriplets(int arr[], int n, int sum)
{
    // Sort input array
    sort(arr, arr+n);
  
    // Initialize result
    int ans = 0;
  
    // Every iteration of loop counts triplet with
    // first element as arr[i].
    for (int i = 0; i < n - 2; i++)
    {
        // Initialize other two elements as corner elements
        // of subarray arr[j+1..k]
        int j = i + 1, k = n - 1;
  
        // Use Meet in the Middle concept
        while (j < k)
        {
            // If sum of current triplet is more or equal,
            // move right corner to look for smaller values
            if (arr[i] + arr[j] + arr[k] >= sum)
                k--;
  
            // Else move left corner
            else
            {
                // This is important. For current i and j, there
                // can be total k-j third elements.
                ans += (k - j);
                j++;
            }
        }
    }
    return ans;
}
  
// Driver program
int main()
{
    int arr[] = {5, 1, 3, 4, 7};
    int n = sizeof arr / sizeof arr[0];
    int sum = 12;
    cout << countTriplets(arr, n, sum) << endl;
    return 0;
}




// A Simple Java program to count triplets with sum smaller
// than a given value
  
import java.util.Arrays;
  
class Test
{
    static int arr[] = new int[]{5, 1, 3, 4, 7};
      
    static int countTriplets(int n, int sum)
    {
        // Sort input array
        Arrays.sort(arr);
       
        // Initialize result
        int ans = 0;
       
        // Every iteration of loop counts triplet with
        // first element as arr[i].
        for (int i = 0; i < n - 2; i++)
        {
            // Initialize other two elements as corner elements
            // of subarray arr[j+1..k]
            int j = i + 1, k = n - 1;
       
            // Use Meet in the Middle concept
            while (j < k)
            {
                // If sum of current triplet is more or equal,
                // move right corner to look for smaller values
                if (arr[i] + arr[j] + arr[k] >= sum)
                    k--;
       
                // Else move left corner
                else
                {
                    // This is important. For current i and j, there
                    // can be total k-j third elements.
                    ans += (k - j);
                    j++;
                }
            }
        }
        return ans;
    }
      
    // Driver method to test the above function
    public static void main(String[] args) 
    {
        int sum = 12
        System.out.println(countTriplets(arr.length, sum));
    }
}




# Python3 program to count triplets with 
# sum smaller than a given value 
  
  
# Function to count triplets with sum smaller
# than a given value         
def countTriplets(arr,n,sum):
      
    # Sort input array
    arr.sort()
      
    # Initialize result 
    ans = 0
      
    # Every iteration of loop counts triplet with 
    # first element as arr[i].
    for i in range(0,n-2):
          
        # Initialize other two elements as corner elements 
        # of subarray arr[j+1..k] 
        j = i + 1
        k = n-1
  
        # Use Meet in the Middle concept 
        while(j < k):
              
            # If sum of current triplet is more or equal, 
            # move right corner to look for smaller values
            if (arr[i]+arr[j]+arr[k] >=sum):
                k = k-1
              
            # Else move left corner 
            else:
                  
                # This is important. For current i and j, there 
                # can be total k-j third elements. 
                ans += (k - j)
                j = j+1
      
    return ans
  
# Driver program 
if __name__=='__main__':
    arr = [5, 1, 3, 4, 7
    n = len(arr) 
    sum = 12
    print(countTriplets(arr, n, sum)) 
      
# This code is contributed by 
# Yatin Gupta 




// A Simple C# program to count 
// triplets with sum smaller
// than a given value
using System;
  
class GFG
{
    static int []arr = new int[]{5, 1, 3, 4, 7};
      
    static int countTriplets(int n, int sum)
    {
        // Sort input array
        Array.Sort(arr);
      
        // Initialize result
        int ans = 0;
      
        // Every iteration of loop
        // counts triplet with
        // first element as arr[i].
        for (int i = 0; i < n - 2; i++)
        {
            // Initialize other two 
            // elements as corner elements
            // of subarray arr[j+1..k]
            int j = i + 1, k = n - 1;
      
            // Use Meet in the Middle concept
            while (j < k)
            {
                // If sum of current triplet 
                // is more or equal, move right 
                // corner to look for smaller values
                if (arr[i] + arr[j] + arr[k] >= sum)
                    k--;
      
                // Else move left corner
                else
                {
                    // This is important. For 
                    // current i and j, there
                    // can be total k-j third elements.
                    ans += (k - j);
                    j++;
                }
            }
        }
        return ans;
    }
      
    // Driver Code
    public static void Main() 
    {
        int sum = 12; 
        Console.Write(countTriplets(arr.Length, sum));
    }
}
  
// This code is contributed by Smitha




<script>
// A Simple Javascript program to count triplets with sum smaller
// than a given value
    let arr = [5, 1, 3, 4, 7];
      
    function countTriplets(n,sum)
    {
      
        // Sort input array
        arr.sort(function(a,b){return b-a});
          
        // Initialize result
        let ans = 0;
          
        // Every iteration of loop counts triplet with
        // first element as arr[i].
        for (let i = 0; i < n - 2; i++)
        {
          
            // Initialize other two elements as corner elements
            // of subarray arr[j+1..k]
            let j = i + 1, k = n - 1;
        
            // Use Meet in the Middle concept
            while (j < k)
            {
                // If sum of current triplet is more or equal,
                // move right corner to look for smaller values
                if (arr[i] + arr[j] + arr[k] >= sum)
                    k--;
        
                // Else move left corner
                else
                {
                  
                    // This is important. For current i and j, there
                    // can be total k-j third elements.
                    ans += (k - j);
                    j++;
                }
            }
        }
        return ans;
    }
      
    // Driver method to test the above function
    let sum = 12;
    document.write(countTriplets(arr.length, sum));
      
    // This code is contributed by rag2127
</script>

Output: 

4

Time Complexity: O(n2)
Auxiliary Space: O(1)
 

Thanks to Gaurav Ahirwar for suggesting this solution.

 


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