Given an array arr[] of size N. Find the minimum sum of the array after performing given operations any number of times:
- Select two different indices i, j (1 ≤ i < j ≤ N),
- Replace arr[i] and arr[j] with X and Y respectively (X, Y>0), such that arr[i] | arr[j] = X | Y, where | denotes the bitwise OR operation
Examples:
Input: arr[] = {1, 3, 2}
Output: 3
Explanation: arr = {1, 3, 2} {bitwise OR of array elements is 3.}, sum=6
Replace 1 and 3 with 3 and 0 as {1|3 = 3 = 3|0}.
arr = {3, 0, 2}, {bitwise OR of array elements is still 3}, sum = 5
Replace 3 and 2 with 3 and 0 as {3|2 = 3 = 3|0}
arr = {3, 0, 0} {or of all array elements is still 3), sum= 3.
This is the minimum sum possible.Input: arr[] = {3, 5, 6}
Output: 7
Approach: The solution to the problem is based on the following observation:
If (arr[i], arr[j]) is replaced with ((arr[i] | arr[j]), 0), the bitwise OR value will remain the same and the sum will be minimized.
Illustration:
Consider: arr[] = {1, 3, 2}
Initial Array sum = 6
Operation 1: Replace (1, 3) with (1|3 , 0):
-> Bitwise OR of (1, 3) = 3
-> Replacing 1 with bitwise OR value 3 and 3 with 0 respectively
-> New pair will be (3, 0), whose bitwise OR value will be 3|0 = 3 (same as original pair (1, 3)).
-> Updated Array: {3, 0, 2}
-> Updated Array sum = 5Operation 2: Similarly replace (3, 2) with (3|2 , 0):
-> Bitwise OR of (3, 2) = 3
-> Replacing 3 with bitwise OR value 3 and 2 with 0 respectively
-> New pair will be (3, 0), whose bitwise OR value will be 3|0 = 3 (same as original pair (3, 2)).
-> Updated Array: {3, 0, 0}
-> Updated Array sum = 3Now no more operations can be done and the Array sum cannot be reduced further from 3.
Therefore final minimized Array sum will be the bitwise OR of all Array elements.
Follow the steps mentioned below:
- Traverse the array from the starting.
- Calculate the bitwise OR of all the array elements.
- Return this as the answer.
Below is the implementation of the above approach,
// C++ code to implement the approach#include <bits/stdc++.h>using namespace std;
typedef long long int ll;
// Function minsum() which will calculate// the minimum sum of the given arrayll minsum(ll array[], ll n, ll sum){ for (int i = 0; i < n; i++) {
// Calculating the or of
// all the elements in the array
sum |= array[i];
}
return sum;
}// Driver codeint main()
{ ll array[] = { 1, 3, 2 };
// Calculating the size of array
ll n = sizeof(array) / sizeof(array[0]);
// Initialising a variable sum with zero
ll sum = 0;
// Function call
cout << minsum(array, n, sum) << "\n";
return 0;
} |
// JAVA code to implement the approachimport java.util.*;
class GFG
{ // Function minsum() which will calculate
// the minimum sum of the given array
public static long minsum(long array[], long n,
long sum)
{
for (int i = 0; i < n; i++) {
// Calculating the or of
// all the elements in the array
sum |= array[i];
}
return sum;
}
// Driver code
public static void main(String[] args)
{
long array[] = { 1, 3, 2 };
// Calculating the size of array
long n = array.length;
// Initialising a variable sum with zero
long sum = 0;
// Function call
System.out.println(minsum(array, n, sum));
}
}// This code is contributed by Taranpreet |
# python3 code to implement the approach# Function minsum() which will calculate# the minimum sum of the given arraydef minsum(array, n, sum):
for i in range(0, n):
# Calculating the or of
# all the elements in the array
sum |= array[i]
return sum
# Driver codeif __name__ == "__main__":
array = [1, 3, 2]
# Calculating the size of array
n = len(array)
# Initialising a variable sum with zero
sum = 0
# Function call
print(minsum(array, n, sum))
# This code is contributed by rakeshsahni |
// C# code to implement the approachusing System;
public class GFG{
// Function minsum() which will calculate
// the minimum sum of the given array
static long minsum(long[] array, long n,
long sum)
{
for (int i = 0; i < n; i++) {
// Calculating the or of
// all the elements in the array
sum |= array[i];
}
return sum;
}
// Driver code
static public void Main ()
{
long[] array = { 1, 3, 2 };
// Calculating the size of array
long n = array.Length;
// Initialising a variable sum with zero
long sum = 0;
// Function call
Console.Write(minsum(array, n, sum));
}
}// This code is contributed by hrithikgarg03188. |
<script> // JavaScript code for the above approach
// Function minsum() which will calculate
// the minimum sum of the given array
function minsum(array, n, sum) {
for (let i = 0; i < n; i++) {
// Calculating the or of
// all the elements in the array
sum |= array[i];
}
return sum;
}
// Driver code
let array = [1, 3, 2];
// Calculating the size of array
let n = array.length;
// Initialising a variable sum with zero
let sum = 0;
// Function call
document.write(minsum(array, n, sum) + "<br>");
// This code is contributed by Potta Lokesh
</script>
|
3
Time Complexity: O(N), as we are using a loop to traverse N times.
Auxiliary Space: O(1), as we are not using any extra space.