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
Algorithm:
- Create a method named “fact” that takes a parameter n and returns the factorial of n.
- Create a variable named “fact” and initialize it to 1.
- Start a for loop and traverse through the range 2 to n (inclusive) and multiply each number with the “fact” variable.
- Return the value of “fact”.
- Create another method named “ncr” that takes two parameters n and r, and returns the value of nCr.
- Inside the “ncr” function, use the “fact” function to calculate the factorial of n, r, and n-r.
- Calculate nCr using the formula n! / (r! * (n-r)!).
- Return the value of nCr.
- Create another method “ways” that takes four parameters m, w, n, and k, and returns the total possible ways.
- Create a variable named “ans” and initialize it to 0.
- Start a while loop to iterate until m is greater than or equal to k.
- Inside the while loop, add the value of nCr(m, k) multiplied by nCr(w, n-k) to the “ans” variable.
- Increment k by 1 in each iteration.
- Return the value of “ans”.
Below is the implementation of the above approach:
C++
#include <bits/stdc++.h>
using namespace std;
int fact(int n)
{
int fact = 1;
for (int i = 2; i <= n; i++)
fact *= i;
return fact;
}
int ncr(int n, int r)
{
int ncr = fact(n) / (fact(r) * fact(n - r));
return ncr;
}
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;
}
int main()
{
int m, w, n, k;
m = 7;
w = 6;
n = 5;
k = 3;
cout << ways(m, w, n, k);
}
|
Java
import java.io.*;
class GFG {
static int fact(int n)
{
int fact = 1;
for (int i = 2; i <= n; i++)
fact *= i;
return fact;
}
static int ncr(int n, int r)
{
int ncr = fact(n) / (fact(r) * fact(n - r));
return ncr;
}
static 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;
}
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));
}
}
|
Python3
def fact(n):
fact = 1
for i in range(2, n + 1):
fact *= i
return fact
def ncr(n, r):
ncr = fact(n) // (fact(r) * fact(n - r))
return ncr
def ways(m, w, n, k):
ans = 0
while (m >= k):
ans += ncr(m, k) * ncr(w, n - k)
k += 1
return ans;
m = 7
w = 6
n = 5
k = 3
print(ways(m, w, n, k))
|
C#
class GFG {
static int fact(int n)
{
int fact = 1;
for (int i = 2; i <= n; i++)
fact *= i;
return fact;
}
static int ncr(int n, int r)
{
int ncr = fact(n) / (fact(r) * fact(n - r));
return ncr;
}
static 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;
}
static void Main () {
int m, w, n, k;
m = 7;
w = 6;
n = 5;
k = 3;
System.Console.WriteLine( ways(m, w, n, k));
}
}
|
PHP
<?php
function fact($n)
{
$fact = 1;
for ($i = 2; $i <= $n; $i++)
$fact *= $i;
return $fact;
}
function ncr($n, $r)
{
$ncr = (int)(fact($n) / (fact($r) *
fact($n - $r)));
return $ncr;
}
function ways($m, $w, $n, $k)
{
$ans = 0;
while ($m >= $k)
{
$ans += ncr($m, $k) *
ncr($w, $n - $k);
$k += 1;
}
return $ans;
}
$m = 7;
$w = 6;
$n = 5;
$k = 3;
echo ways($m, $w, $n, $k);
|
Javascript
<script>
function fact(n)
{
var fact = 1;
for (i = 2; i <= n; i++)
fact *= i;
return fact;
}
function ncr(n , r)
{
var ncr = fact(n) / (fact(r) * fact(n - r));
return parseInt(ncr);
}
function ways(m , w , n , k)
{
var ans = 0;
while (m >= k)
{
ans += ncr(m, k) * ncr(w, n - k);
k += 1;
}
return parseInt(ans);
}
var m, w, n, k;
m = 7;
w = 6;
n = 5;
k = 3;
document.write( ways(m, w, n, k));
</script>
|
Time Complexity: O(n)
Auxiliary Space: O(1)
Further Optimization : The above code can be optimized using faster algorithms for binomial coefficient computation.
Feeling lost in the world of random DSA topics, wasting time without progress? It's time for a change! Join our DSA course, where we'll guide you on an exciting journey to master DSA efficiently and on schedule.
Ready to dive in? Explore our Free Demo Content and join our DSA course, trusted by over 100,000 geeks!
Last Updated :
17 Mar, 2023
Like Article
Save Article