Answer:
a) Binomial distribution with parameters p=0.85 q=0.15 n=6
b) 62.29%
c) 2.38%
d) See explanation below
Step-by-step explanation:
a)
We could model this situation with a binomial distribution
[tex]P(6;k)=\binom{6}{k}p^kq^{6-k}[/tex]
where P(6;k) is the probability of finding exactly k people out of 6 with Rh positive, p is the probability of finding one person with Rh positive and q=(1-p) the probability of finding a person with no Rh.
So
[tex]\bf P(Y=k)=\binom{6}{k}(0.85)^k(0.15)^{6-k}[/tex]
b)
The probability that Y is less than 6 is
P(Y=0)+P(Y=1)+...+P(Y=5)
Let's compute each of these terms
[tex]P(Y=0)=P(6;0)=\binom{6}{0}(0.85)^0(0.15)^{6}=1.139*10^{-5}[/tex]
[tex]P(Y=1)=P(6;1)=\binom{6}{1}(0.85)^1(0.15)^{5}=0.0000387281[/tex]
[tex]P(Y=2)=P(6;2)=\binom{6}{2}(0.85)^2(0.15)^{4}=0.005486484[/tex]
[tex]P(Y=3)=P(6;3)=\binom{6}{3}(0.85)^3(0.15)^{3}=0.041453438[/tex]
[tex]P(Y=4)=P(6;4)=\binom{6}{4}(0.85)^4(0.15)^{2}=0.176177109[/tex]
[tex]P(Y=5)=P(6;5)=\binom{6}{5}(0.85)^5(0.15)^{1}=0.399334781[/tex]
and adding up these values we have that the probability that Y is less than 6 is
[tex]\sum_{i=1}^{5}P(Y=i)=0.622850484\approx 0.6229=62.29\%[/tex]
c)
In this case is a binomial distribution with n=200 instead of 6.
p and q remain the same.
The mean of this sample would be 85% of 200 = 170.
In a binomial distribution, the standard deviation is
[tex]s = \sqrt{npq}[/tex]
In this case
[tex]\sqrt{200(0.85)(0.15)}=5.05[/tex]
Let's approximate the distribution with a normal distribution with mean 170 and standard deviation 5.05
So, the approximate probability that there are fewer than 160 persons with Rh positive blood in a sample of 200 would be the area under the normal curve to the left of 160
(see picture attached)
We can compute that area with a computer and find it is
0.0238 or 2.38%
d) In order to approximate a binomial distribution with a normal distribution we need a large sample like the one taken in c).
In general, we can do this if the sample of size n the following inequalities hold:
[tex]np\geq 5 \;and\;nq \geq 5[/tex]
in our case np = 200*0.85 = 170 and nq = 200*0.15 = 30
