Respuesta :
There are 47,124 different committees you can select.
Explanation:
The number of combinations of 9 teachers taken 3 at a time is given by
[tex]_9C_3=\frac{9!}{3!6!}=84[/tex]
The number of combinations of 34 students taken 2 at a time is given by
[tex]_{34}C_2=\frac{34!}{2!32!}=561[/tex]
Together this makes 84*561 = 47124 combinations.
Explanation:
The number of combinations of 9 teachers taken 3 at a time is given by
[tex]_9C_3=\frac{9!}{3!6!}=84[/tex]
The number of combinations of 34 students taken 2 at a time is given by
[tex]_{34}C_2=\frac{34!}{2!32!}=561[/tex]
Together this makes 84*561 = 47124 combinations.
Answer:
47,124 committees.
Step-by-step explanation:
We are asked to find the number of different committees that can be formed from 9 teachers and 34 students if the committee consists of 3 teachers and 2 students.
To solve our given problem we will use combination formula:
[tex]_{r}^{n}\textrm{C}=\frac{n!}{r!(n-r)!}[/tex], where,
n= Total number of items,
r = Number of items being chosen at a time.
Since we are choosing 3 teachers from 9 teachers and 2 students from 34 students, so we can represent this information as:
[tex]_{3}^{9}\textrm{C}\times _{2}^{34}\textrm{C}=\frac{9!}{3!(9-3)!}\times \frac{34!}{2!(34-2)!}[/tex]
[tex]_{3}^{9}\textrm{C}\times _{2}^{34}\textrm{C}=\frac{9!}{3!(6)!}\times \frac{34!}{2!(32)!}[/tex]
[tex]_{3}^{9}\textrm{C}\times _{2}^{34}\textrm{C}=\frac{9*8*7*6!}{3*2*1(6)!}\times \frac{34*33*32!}{2*1(32)!}[/tex]
[tex]_{3}^{9}\textrm{C}\times _{2}^{34}\textrm{C}=3*4*7\times 17*33[/tex]
[tex]_{3}^{9}\textrm{C}\times _{2}^{34}\textrm{C}=47,124[/tex]
Therefore, 47,124 different committees can be formed from 9 teachers and 34 students.
