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: 
 

756

Time Complexity: O(n)
Auxiliary Space: O(1)

Further Optimization : The above code can be optimized using faster algorithms for binomial coefficient computation.