To fill a number of vacancies, an employer must hire 3 programmers from among 6 applicants and 2 managers from among 4 applicants.
What is the total number of ways in which she can make her selection?
A. 1,490
B. 132
C. 120
D. 60
E. 23
OA: C
Combinations - from PR
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This is a combination problem as you mentioned in the topic. Thus, we use the combination formula (order does not matter) to figure out what we need.
1) Programmers needed 3 out of 6 => 6! /[(6-3)! * 3!] = 120 / 6 = 20 ways
2) Managers needed 2 out of 4 => 4!/ [(4-2)! * 2!] = 12 / 2 = 6 ways
These 2 then multiplied, i.e. 20 * 6 = 120 ways of selection
1) Programmers needed 3 out of 6 => 6! /[(6-3)! * 3!] = 120 / 6 = 20 ways
2) Managers needed 2 out of 4 => 4!/ [(4-2)! * 2!] = 12 / 2 = 6 ways
These 2 then multiplied, i.e. 20 * 6 = 120 ways of selection
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This is a combination problem since the order of selecting the applicants for each job title does not matter.mleviko wrote:To fill a number of vacancies, an employer must hire 3 programmers from among 6 applicants and 2 managers from among 4 applicants. What is the total number of ways in which she can make her selection?
A. 1,490
B. 132
C. 120
D. 60
E. 23
3 programmers from 6 applicants can be hired in 6C3 ways:
6C3 = 6!/3!(6-3)! = (6 x 5 x 4)/3! = (6 x 5 x 4)/(3 x 2 x 1) = 20
2 managers from 4 applicants can be hired in 4C2 ways:
4C2 = 4!/2!(4-2)! = (4 x 3)/2! = (4 x 3)/(2 x 1) = 6
Thus, the total number of ways in which she can make her selection is 20 x 6 = 120.
Answer: C
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