Respuesta :
Answer:
The value of E (W) = 1.0909 and the value of E (W²) = 1.6363.
Step-by-step explanation:
The number of men and women at a party are 5 and 6 respectively.
The total number of ways to select 2 party guests is,
[tex]{11\choose 2}=\frac{11!}{2!(11-2)!} =55[/tex] ways.
The two guests can be selected as follows:
S = {(M, M), (W, M) or (W, W)}
The probability of selecting 0 women:
[tex]P(W=0)=\frac{{6\choose 0}{5\choose 2}}{{11\choose 2}}=\frac{1\times10}{55}=0.1818[/tex]
The probability of selecting 1 women:
[tex]P(W=1)=\frac{{6\choose 1}{5\choose 1}}{{11\choose 2}}=\frac{6\times5}{55}=0.5455[/tex]
The probability of selecting 2 women:
[tex]P(W=2)=\frac{{6\choose 2}{5\choose 0}}{{11\choose 2}}=\frac{15\times1}{55}=0.2727[/tex]
Compute the expected value of the number of women selected as follows:
[tex]E(W)=\sum wP(W=w)\\=[0\times P(W=0)]+[1\times P(W=1)]+[2\times P(W=2)]\\=[0\times0.1818]+[1\times0.5455]+[2\times0.2727]\\=1.0909[/tex]
The value of E (W²) is:
[tex]E(W^{2})=\sum w^{2}P(W=w)\\=[0^{2}\times P(W=0)]+[1^{2}\times P(W=1)]+[2^{2}\times P(W=2)]\\=[0\times0.1818]+[1\times0.5455]+[4\times0.2727]\\=1.6363[/tex]
Thus, the value of E (W) = 1.0909 and the value of E (W²) = 1.6363.
