Answer: The required probability that no girls and 3 boys will be chosen is [tex]\dfrac{1}{55}.[/tex]
Step-by-step explanation: Given that a family has 8 girls and 4 boys. a total of 3 children must be chosen to speak on behalf of their family at a local benefit.
We are to find the probability that no girls and 3 boys will be chosen.
Let, S denotes the sample space for the experiment of choosing 3 children and E be the event that no girls and 3 boys will be chosen.
Then, we have
[tex]n(S)=^{8+4}C_3=^{12}C^3=\dfrac{12!}{3!(12-3)!}=\dfrac{12\times11\times10\times9!}{3\times2\times1\times9!}=4\times5\times11=220,\\\\\\n(E)=^4C_3=\dfrac{4!}{3!(4-3)!}=\dfrac{4\times3!}{3!\times1}=4.[/tex]
Therefore, the probability of event E will be
[tex]P(E)=\dfrac{n(E)}{n(S)}=\dfrac{4}{220}=\dfrac{1}{55}.[/tex]
Thus, the required probability that no girls and 3 boys will be chosen is [tex]\dfrac{1}{55}.[/tex]
