Ways of selecting men and women from a group to make a team
Given four integers n, w, m and k where,
- m is the total number of men.
- w is the total number of women.
- n is the total number of people that need to be selected to form the team.
- k is the minimum number of men that have to be selected.
The task is to find the number of ways in which the team can be formed.
Examples:
Input: m = 2, w = 2, n = 3, k = 1
Output: 4
There are 2 men, 2 women. We need to make a team of size 3 with at least one man and one woman. We can make the team in following ways.
m1 m2 w1
m1 w1 w2
m2 w1 w2
m1 m2 w2
Input: m = 7, w = 6, n = 5, k = 3
Output: 756
Input: m = 5, w = 6, n = 6, k = 3
Output: 281
Approach: Since, we have to take at least k men.
Totals ways = Ways when ‘k’ men are selected + Ways when ‘k+1’ men are selected + … + when ‘n’ men are selected
.
Taking the first example from above where out of 7 men and 6 women, total 5 people need to be selected with at least 3 men,
Number of ways = (7C3 x 6C2) + (7C4 x 6C1) + (7C5)
= 7 x 6 x 5 x 6 x 5 + (7C3 x 6C1) + (7C2)
= 525 + 7 x 6 x 5 x 6 + 7 x 6
= (525 + 210 + 21)
= 756
Below is the implementation of the above approach:
C++
// C++ implementation of the approach#include <bits/stdc++.h>using namespace std;// Returns factorial// of the numberint fact(int n){ int fact = 1; for (int i = 2; i <= n; i++) fact *= i; return fact;}// Function to calculate ncrint ncr(int n, int r){ int ncr = fact(n) / (fact(r) * fact(n - r)); return ncr;}// Function to calculate// the total possible waysint ways(int m, int w, int n, int k){ int ans = 0; while (m >= k) { ans += ncr(m, k) * ncr(w, n - k); k += 1; } return ans;}// Driver codeint main(){ int m, w, n, k; m = 7; w = 6; n = 5; k = 3; cout << ways(m, w, n, k);} |
Java
// Java implementation of the approachimport java.io.*;class GFG {// Returns factorial// of the numberstatic int fact(int n){ int fact = 1; for (int i = 2; i <= n; i++) fact *= i; return fact;}// Function to calculate ncrstatic int ncr(int n, int r){ int ncr = fact(n) / (fact(r) * fact(n - r)); return ncr;}// Function to calculate// the total possible waysstatic int ways(int m, int w, int n, int k){ int ans = 0; while (m >= k) { ans += ncr(m, k) * ncr(w, n - k); k += 1; } return ans;}// Driver code public static void main (String[] args) { int m, w, n, k; m = 7; w = 6; n = 5; k = 3; System.out.println( ways(m, w, n, k)); }}// This Code is contributed// by shs |
Python3
# Python 3 implementation of the approach# Returns factorial of the numberdef fact(n): fact = 1 for i in range(2, n + 1): fact *= i return fact# Function to calculate ncrdef ncr(n, r): ncr = fact(n) // (fact(r) * fact(n - r)) return ncr# Function to calculate# the total possible waysdef ways(m, w, n, k): ans = 0 while (m >= k): ans += ncr(m, k) * ncr(w, n - k) k += 1 return ans;# Driver codem = 7w = 6n = 5k = 3print(ways(m, w, n, k))# This code is contributed by sahishelangia |
C#
// C# implementation of the approachclass GFG {// Returns factorial// of the numberstatic int fact(int n){ int fact = 1; for (int i = 2; i <= n; i++) fact *= i; return fact;}// Function to calculate ncrstatic int ncr(int n, int r){ int ncr = fact(n) / (fact(r) * fact(n - r)); return ncr;}// Function to calculate// the total possible waysstatic int ways(int m, int w, int n, int k){ int ans = 0; while (m >= k) { ans += ncr(m, k) * ncr(w, n - k); k += 1; } return ans;}// Driver code static void Main () { int m, w, n, k; m = 7; w = 6; n = 5; k = 3; System.Console.WriteLine( ways(m, w, n, k)); }}// This Code is contributed by mits |
PHP
<?php// PHP implementation of the approach// Returns factorial of the numberfunction fact($n){ $fact = 1; for ($i = 2; $i <= $n; $i++) $fact *= $i; return $fact;}// Function to calculate ncrfunction ncr($n, $r){ $ncr = (int)(fact($n) / (fact($r) * fact($n - $r))); return $ncr;}// Function to calculate the total// possible waysfunction ways($m, $w, $n, $k){ $ans = 0; while ($m >= $k) { $ans += ncr($m, $k) * ncr($w, $n - $k); $k += 1; } return $ans;}// Driver code$m = 7;$w = 6;$n = 5;$k = 3;echo ways($m, $w, $n, $k);// This Code is contributed// by Mukul Singh |
Javascript
<script>// javascript implementation of the approach// Returns factorial// of the numberfunction fact(n){ var fact = 1; for (i = 2; i <= n; i++) fact *= i; return fact;}// Function to calculate ncrfunction ncr(n , r){ var ncr = fact(n) / (fact(r) * fact(n - r)); return parseInt(ncr);}// Function to calculate// the total possible waysfunction ways(m , w , n , k){ var ans = 0; while (m >= k) { ans += ncr(m, k) * ncr(w, n - k); k += 1; } return parseInt(ans);}// Driver codevar m, w, n, k;m = 7;w = 6;n = 5;k = 3;document.write( ways(m, w, n, k));// This code is contributed by 29AjayKumar.</script> |
756
Further Optimization : The above code can be optimized using faster algorithms for binomial coefficient computation.
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