Respuesta :
Answer:
(a) the mean number for new infections is equal to 1
(b) the probability that no more than 2 of the 20 children develop infections is 0.9245
Step-by-step explanation:
If all 20 have been vaccinated, the number of new infection follows a binomial distribution, so, the probability that x children develop infections is calculated as:
[tex]p(x)=nCx*p^{x}*(1-p)^{n-x}[/tex]
[tex]nCx=\frac{n!}{x!(n-x)!}[/tex]
where n is the number of children and p is the probability to develop the infection given that all 20 have been vaccinated. Additionally, the mean number E(x) of new infections is equal to:
[tex]E(x)=n*p[/tex]
Now, taking into account that all children are vaccinated, we can replace n by 20 and p by 0.05, so the mean number of new infections is:
[tex]E(x)=20*0.05=1[/tex]
Then, the probability that no more than 2 of the 20 children develop infections is calculated as:
[tex]p(x\leq 2)=p(0)+p(1)+p(2)[/tex]
where p(x) is:
[tex]p(x)=20Cx*0.05^{x}*(1-0.05)^{20-x}[/tex]
So, p(0), p(1) and p(2) are equal to:
[tex]\\p(0)=20C0*0.05^{0}*(1-0.05)^{20-0}=0.3585\\p(1)=20C1*0.05^{1}*(1-0.05)^{20-1}=0.3773\\p(2)=20C2*0.05^{2}*(1-0.05)^{20-2}=0.1887\\[/tex]
Finally, [tex]p(x\leq 2)[/tex] is equal to:
[tex]p(x\leq 2)=0.3585+0.3773+0.1887=0.9245[/tex]
