Given an array arr[] of N integers, the task is to find the count of subarrays with positive product.
Examples:
Input: arr[] = {-1, 2, -2}
Output: 2
Subarrays with positive product are {2} and {-1, 2, -2}.
Input: arr[] = {5, -4, -3, 2, -5}
Output: 7
Approach: The approach to find the subarrays with negative product has been discussed in this article. If cntNeg is the count of negative product subarrays and total is the count of all possible subarrays of the given array then the count of positive product subarrays will be cntPos = total – cntNeg.
Below is the implementation of the above approach:
C++
// C++ implementation of the approach#include <bits/stdc++.h>using namespace std;
// Function to return the count of// subarrays with negative productint negProdSubArr(int arr[], int n)
{ int positive = 1, negative = 0;
for (int i = 0; i < n; i++) {
// Replace current element with 1
// if it is positive else replace
// it with -1 instead
if (arr[i] > 0)
arr[i] = 1;
else
arr[i] = -1;
// Take product with previous element
// to form the prefix product
if (i > 0)
arr[i] *= arr[i - 1];
// Count positive and negative elements
// in the prefix product array
if (arr[i] == 1)
positive++;
else
negative++;
}
// Return the required count of subarrays
return (positive * negative);
}// Function to return the count of// subarrays with positive productint posProdSubArr(int arr[], int n)
{ // Total subarrays possible
int total = (n * (n + 1)) / 2;
// Count to subarrays with negative product
int cntNeg = negProdSubArr(arr, n);
// Return the count of subarrays
// with positive product
return (total - cntNeg);
}// Driver codeint main()
{ int arr[] = { 5, -4, -3, 2, -5 };
int n = sizeof(arr) / sizeof(arr[0]);
cout << posProdSubArr(arr, n);
return 0;
} |
Java
// Java implementation of the approach class GFG
{ // Function to return the count of // subarrays with negative product static int negProdSubArr(int arr[], int n)
{ int positive = 1, negative = 0;
for (int i = 0; i < n; i++)
{
// Replace current element with 1
// if it is positive else replace
// it with -1 instead
if (arr[i] > 0)
arr[i] = 1;
else
arr[i] = -1;
// Take product with previous element
// to form the prefix product
if (i > 0)
arr[i] *= arr[i - 1];
// Count positive and negative elements
// in the prefix product array
if (arr[i] == 1)
positive++;
else
negative++;
}
// Return the required count of subarrays
return (positive * negative);
} // Function to return the count of // subarrays with positive product static int posProdSubArr(int arr[], int n)
{ // Total subarrays possible
int total = (n * (n + 1)) / 2;
// Count to subarrays with negative product
int cntNeg = negProdSubArr(arr, n);
// Return the count of subarrays
// with positive product
return (total - cntNeg);
} // Driver code public static void main (String[] args)
{ int arr[] = { 5, -4, -3, 2, -5 };
int n = arr.length;
System.out.println(posProdSubArr(arr, n));
}}// This code is contributed by AnkitRai01 |
Python3
# Python3 implementation of the approach # Function to return the count of # subarrays with negative product def negProdSubArr(arr, n):
positive = 1
negative = 0
for i in range(n):
# Replace current element with 1
# if it is positive else replace
# it with -1 instead
if (arr[i] > 0):
arr[i] = 1
else:
arr[i] = -1
# Take product with previous element
# to form the prefix product
if (i > 0):
arr[i] *= arr[i - 1]
# Count positive and negative elements
# in the prefix product array
if (arr[i] == 1):
positive += 1
else:
negative += 1
# Return the required count of subarrays
return (positive * negative)
# Function to return the count of# subarrays with positive productdef posProdSubArr(arr, n):
total = (n * (n + 1)) / 2;
# Count to subarrays with negative product
cntNeg = negProdSubArr(arr, n);
# Return the count of subarrays
# with positive product
return (total - cntNeg);
# Driver code arr = [5, -4, -3, 2, -5]
n = len(arr)
print(posProdSubArr(arr, n))
# This code is contributed by Mehul Bhutalia |
C#
// C# implementation of the approachusing System;
class GFG
{ // Function to return the count of // subarrays with negative product static int negProdSubArr(int []arr, int n)
{ int positive = 1, negative = 0;
for (int i = 0; i < n; i++)
{
// Replace current element with 1
// if it is positive else replace
// it with -1 instead
if (arr[i] > 0)
arr[i] = 1;
else
arr[i] = -1;
// Take product with previous element
// to form the prefix product
if (i > 0)
arr[i] *= arr[i - 1];
// Count positive and negative elements
// in the prefix product array
if (arr[i] == 1)
positive++;
else
negative++;
}
// Return the required count of subarrays
return (positive * negative);
} // Function to return the count of // subarrays with positive product static int posProdSubArr(int []arr, int n)
{ // Total subarrays possible
int total = (n * (n + 1)) / 2;
// Count to subarrays with negative product
int cntNeg = negProdSubArr(arr, n);
// Return the count of subarrays
// with positive product
return (total - cntNeg);
} // Driver code public static void Main (String[] args)
{ int []arr = { 5, -4, -3, 2, -5 };
int n = arr.Length;
Console.WriteLine(posProdSubArr(arr, n));
}}// This code is contributed by 29AjayKumar |
Javascript
<script>// Javascript implementation of the approach// Function to return the count of// subarrays with negative productfunction negProdSubArr(arr, n)
{ let positive = 1, negative = 0;
for (let i = 0; i < n; i++)
{
// Replace current element with 1
// if it is positive else replace
// it with -1 instead
if (arr[i] > 0)
arr[i] = 1;
else
arr[i] = -1;
// Take product with previous element
// to form the prefix product
if (i > 0)
arr[i] *= arr[i - 1];
// Count positive and negative elements
// in the prefix product array
if (arr[i] == 1)
positive++;
else
negative++;
}
// Return the required count of subarrays
return (positive * negative);
}// Function to return the count of// subarrays with positive productfunction posProdSubArr(arr, n)
{ // Total subarrays possible
let total = parseInt((n * (n + 1)) / 2);
// Count to subarrays with negative product
let cntNeg = negProdSubArr(arr, n);
// Return the count of subarrays
// with positive product
return (total - cntNeg);
}// Driver code let arr = [ 5, -4, -3, 2, -5 ];
let n = arr.length;
document.write(posProdSubArr(arr, n));
// This code is contributed by rishavmahato348.</script> |
Output:
7
Time Complexity: O(n)
Auxiliary Space: O(1), since no extra space has been taken.