Product of all sorted subsets of size K using elements whose index divide K completely
Given an integer array arr[] of N distinct elements and a positive integer K ( K <= N ). The task is to calculate the product of all sorted subsets of size K, from the given array, using elements whose index divide K completely.
Note: As the answer can be very large, print it modulo 10^9+7.
Examples:
Input: arr[] = {4, 7, 5, 9, 3}, K = 4
Output: 808556639
Explanation:
In this case there are 5 possible sets:
{4, 7, 5, 9} -> 180 (Sorted order {4, 5, 7, 9}: Index 1, 2 and 4 divides M, so value of set is 4 * 5 * 9 = 180)
{4, 7, 9, 3} -> 108
{4, 5, 9, 3} -> 108
{4, 7, 5, 3} -> 84
{7, 5, 9, 3} -> 135
Total value = ( 180 * 108 * 108 * 84 * 135 ) % (109+7) = 808556639Input: arr[] = {7, 8, 9}, K = 2
Output: 254016
Naive Approach:
We can find all the subsets of size K then sort the subsets and find the value of each subset and multiply it to get the final answer.
As there can be 2N subsets, this approach will not be very efficient for a large value of N.
Efficient Approach:
- The idea is not to create all the subsets to find the answer but to calculate the count of each element in all the subsets. If we find the count of each element in all subsets then the answer will be
- For finding count of the arr[i], we have to find total number of the different subsets that can be formed by placing arr[i] at every possible index that divides K completely.
- Number of sets formed by placing arr[i] at jth index( j divides K completely) will be:
( Total no. of elements smaller than arr[i] ) Cj-1 * ( Total no. of elements greater than arr[i] ) Ck-j
- As the count of any element may be very large, so for finding ( arr[i]( count of arr[i])) % ( 109 + 7 ) we have to use Fermat’s little theorem that is
{ a (p – 1) mod p = 1 } => { ( ax ) % p = ( a( x % p-1 )) % p }.
So, by using Fermat’s little theorem
( arr[i] (count of arr[i] )) % ( 109 + 7 ) => ( arr[i] (count of arr[i] % 109 + 6 )) % ( 109 + 7 ).
Below is the implementation of the above approach:
C++
// C++ implementation of the above approach #include <bits/stdc++.h> using namespace std; int p = 1000000007; // Iterative Function to calculate // (x^y)%p in O(log y) long long int power( long long int x, long long int y, long long int p) { long long int res = 1; x = x % p; while (y > 0) { // If y is odd, multiply // x with result if (y & 1) res = (res * x) % p; // y must be even now y = y >> 1; x = (x * x) % p; } return res; } // Iterative Function to calculate // (nCr)%p and save in f[n][r] void nCr( long long int n, long long int p, int f[][100], int m) { for ( long long int i = 0; i <= n; i++) { for ( long long int j = 0; j <= m; j++) { // If j>i then C(i, j) = 0 if (j > i) { f[i][j] = 0; } // If iis equal to j then // C(i, j) = 1 else if (j == 0 || j == i) { f[i][j] = 1; } else { f[i][j] = (f[i - 1][j] + f[i - 1][j - 1]) % p; } } } } // Function calculate the Final answer void ProductOfSubsets( int arr[], int n, int m) { int f[n + 1][100]; nCr(n, p - 1, f, m); sort(arr, arr + n); // Initialize ans long long int ans = 1; for ( long long int i = 0; i < n; i++) { // x is count of occurrence of arr[i] // in different set such that index // of arr[i] in those sets divides // K completely. long long int x = 0; for ( long long int j = 1; j <= m; j++) { // Finding the count of arr[i] by // placing it at index which // divides K completely if (m % j == 0) { // By Fermat's theorem x = (x + (f[n - i - 1][m - j] * f[i][j - 1]) % (p - 1)) % (p - 1); } } ans = ((ans * power(arr[i], x, p)) % p); } cout << ans << endl; } // Driver code int main() { int arr[] = { 4, 5, 7, 9, 3 }; int K = 4; int N = sizeof (arr) / sizeof (arr[0]); ProductOfSubsets(arr, N, K); return 0; } |
Java
// Java implementation of the above approach import java.util.*; class GFG{ static int p = 1000000007 ; // Iterative Function to calculate // (x^y)%p in O(log y) static int power( int x, int y, int p) { int res = 1 ; x = x % p; while (y > 0 ) { // If y is odd, multiply // x with result if (y % 2 == 1 ) res = (res * x) % p; // y must be even now y = y >> 1 ; x = (x * x) % p; } return res; } // Iterative Function to calculate // (nCr)%p and save in f[n][r] static void nCr( int n, int p, int f[][], int m) { for ( int i = 0 ; i <= n; i++) { for ( int j = 0 ; j <= m; j++) { // If j>i then C(i, j) = 0 if (j > i) { f[i][j] = 0 ; } // If iis equal to j then // C(i, j) = 1 else if (j == 0 || j == i) { f[i][j] = 1 ; } else { f[i][j] = (f[i - 1 ][j] + f[i - 1 ][j - 1 ]) % p; } } } } // Function calculate the Final answer static void ProductOfSubsets( int arr[], int n, int m) { int [][]f = new int [n + 1 ][ 100 ]; nCr(n, p - 1 , f, m); Arrays.sort(arr); // Initialize ans long ans = 1 ; for ( int i = 0 ; i < n; i++) { // x is count of occurrence of arr[i] // in different set such that index // of arr[i] in those sets divides // K completely. int x = 0 ; for ( int j = 1 ; j <= m; j++) { // Finding the count of arr[i] by // placing it at index which // divides K completely if (m % j == 0 ) { // By Fermat's theorem x = (x + (f[n - i - 1 ][m - j] * f[i][j - 1 ]) % (p - 1 )) % (p - 1 ); } } ans = ((ans * power(arr[i], x, p)) % p); } System.out.print(ans + "\n" ); } // Driver code public static void main(String[] args) { int arr[] = { 4 , 5 , 7 , 9 , 3 }; int K = 4 ; int N = arr.length; ProductOfSubsets(arr, N, K); } } // This code is contributed by Rajput-Ji |
Python3
# Python3 implementation of the above approach p = 1000000007 # Iterative Function to calculate # (x^y)%p in O(log y) def power(x, y, p): res = 1 x = x % p while (y > 0 ): # If y is odd, multiply # x with result if (y & 1 ): res = (res * x) % p # y must be even now y = y >> 1 x = (x * x) % p return res # Iterative Function to calculate # (nCr)%p and save in f[n][r] def nCr(n, p, f, m): for i in range (n + 1 ): for j in range (m + 1 ): # If j>i then C(i, j) = 0 if (j > i): f[i][j] = 0 # If i is equal to j then # C(i, j) = 1 elif (j = = 0 or j = = i): f[i][j] = 1 else : f[i][j] = (f[i - 1 ][j] + f[i - 1 ][j - 1 ]) % p # Function calculate the Final answer def ProductOfSubsets(arr, n, m): f = [[ 0 for i in range ( 100 )] for j in range (n + 1 )] nCr(n, p - 1 , f, m) arr.sort(reverse = False ) # Initialize ans ans = 1 for i in range (n): # x is count of occurrence of arr[i] # in different set such that index # of arr[i] in those sets divides # K completely. x = 0 for j in range ( 1 , m + 1 , 1 ): # Finding the count of arr[i] by # placing it at index which # divides K completely if (m % j = = 0 ): # By Fermat's theorem x = ((x + (f[n - i - 1 ][m - j] * f[i][j - 1 ]) % (p - 1 )) % (p - 1 )) ans = ((ans * power(arr[i], x, p)) % p) print (ans) # Driver code if __name__ = = '__main__' : arr = [ 4 , 5 , 7 , 9 , 3 ] K = 4 N = len (arr); ProductOfSubsets(arr, N, K) # This code is contributed by samarth |
C#
// C# implementation of the above approach using System; class GFG{ static int p = 1000000007; // Iterative Function to calculate // (x^y)%p in O(log y) static int power( int x, int y, int p) { int res = 1; x = x % p; while (y > 0) { // If y is odd, multiply // x with result if (y % 2 == 1) res = (res * x) % p; // y must be even now y = y >> 1; x = (x * x) % p; } return res; } // Iterative Function to calculate // (nCr)%p and save in f[n,r] static void nCr( int n, int p, int [,]f, int m) { for ( int i = 0; i <= n; i++) { for ( int j = 0; j <= m; j++) { // If j>i then C(i, j) = 0 if (j > i) { f[i, j] = 0; } // If iis equal to j then // C(i, j) = 1 else if (j == 0 || j == i) { f[i, j] = 1; } else { f[i, j] = (f[i - 1, j] + f[i - 1, j - 1]) % p; } } } } // Function calculate the Final answer static void ProductOfSubsets( int []arr, int n, int m) { int [,]f = new int [n + 1, 100]; nCr(n, p - 1, f, m); Array.Sort(arr); // Initialize ans long ans = 1; for ( int i = 0; i < n; i++) { // x is count of occurrence of arr[i] // in different set such that index // of arr[i] in those sets divides // K completely. int x = 0; for ( int j = 1; j <= m; j++) { // Finding the count of arr[i] by // placing it at index which // divides K completely if (m % j == 0) { // By Fermat's theorem x = (x + (f[n - i - 1, m - j] * f[i, j - 1]) % (p - 1)) % (p - 1); } } ans = ((ans * power(arr[i], x, p)) % p); } Console.Write(ans + "\n" ); } // Driver code public static void Main(String[] args) { int []arr = { 4, 5, 7, 9, 3 }; int K = 4; int N = arr.Length; ProductOfSubsets(arr, N, K); } } // This code is contributed by Rajput-Ji |
Javascript
<script> // Javascript implementation // for the above approach let p = 1000000007; // Iterative Function to calculate // (x^y)%p in O(log y) function power(x, y, p) { let res = 1; x = x % p; while (y > 0) { // If y is odd, multiply // x with result if (y % 2 == 1) res = (res * x) % p; // y must be even now y = y >> 1; x = (x * x) % p; } return res; } // Iterative Function to calculate // (nCr)%p and save in f[n][r] function nCr(n, p, f, m) { for (let i = 0; i <= n; i++) { for (let j = 0; j <= m; j++) { // If j>i then C(i, j) = 0 if (j > i) { f[i][j] = 0; } // If iis equal to j then // C(i, j) = 1 else if (j == 0 || j == i) { f[i][j] = 1; } else { f[i][j] = (f[i - 1][j] + f[i - 1][j - 1]) % p; } } } } // Function calculate the Final answer function ProductOfSubsets(arr, n, m) { let f = new Array(n+1); for ( var i = 0; i < f.length; i++) { f[i] = new Array(2); } nCr(n, p - 1, f, m); arr.sort(); // Initialize ans let ans = 1; for (let i = 0; i < n; i++) { // x is count of occurrence of arr[i] // in different set such that index // of arr[i] in those sets divides // K completely. let x = 0; for (let j = 1; j <= m; j++) { // Finding the count of arr[i] by // placing it at index which // divides K completely if (m % j == 0) { // By Fermat's theorem x = (x + (f[n - i - 1][m - j] * f[i][j - 1]) % (p - 1)) % (p - 1); } } ans = ((ans * power(arr[i], x, p)) % p); } document.write(ans + "<br/>" ); } // Driver Code let arr = [ 4, 5, 7, 9, 3 ]; let K = 4; let N = arr.length; ProductOfSubsets(arr, N, K); </script> |
Output:
808556639
Time Complexity: (N * K)
Auxiliary Space: O(N * 100)
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