Step-by-step explanation:
Here, the total number of technicians in the lab = 15
The total number of chemists in the lab = 11
So, the total members in the lab = 15 + 11 = 26
So, there are total 26 eligible candidates in the lab from which committee of 5 people has to be made.
Now, since there is no restrictions on the choice, so the committee can be formed in nay way, such that:
It may or may not have any technician.
It may or may not have may chemists.
So, the number of ways 5 member can randomly be chosen from a committee of 26 people = [tex]^{26} C_5[/tex]
[tex]^{26} C_5[/tex] = [tex]^{26} C_5 = \frac{26!}{5! \times 21!} = 65,780[/tex]
Hence, there are a total 65,780 ways in which the committee can be made of 5 members.
