Answer:
1). 0.903547
2). 0.275617
Step-by-step explanation:
It is given :
K people in a party with the following :
i). k = 5 with the probability of [tex]$\frac{1}{4}$[/tex]
ii). k = 10 with the probability of [tex]$\frac{1}{4}$[/tex]
iii). k = 10 with the probability [tex]$\frac{1}{2}$[/tex]
So the probability of at least two person out of the 'n' born people in same month is = 1 - P (none of the n born in the same month)
= 1 - P (choosing the n different months out of 365 days) = [tex]1-\frac{_{n}^{12}\textrm{P}}{12^2}[/tex]
1). Hence P(at least 2 born in the same month)=P(k=5 and at least 2 born in the same month)+P(k=10 and at least 2 born in the same month)+P(k=15 and at least 2 born in the same month)
= [tex]\frac{1}{4}\times (1-\frac{_{5}^{12}\textrm{P}}{12^5})+\frac{1}{4}\times (1-\frac{_{10}^{12}\textrm{P}}{12^{10}})+\frac{1}{2}\times (1-\frac{_{15}^{12}\textrm{P}}{12^{15}})[/tex]
= [tex]0.25 \times 0.618056 + 0.25 \times 0.996132 + 0.5 \times 1[/tex]
= 0.903547
2).P( k = 10|at least 2 share their birthday in same month)
=P(k=10 and at least 2 born in the same month)/P(at least 2 share their birthday in same month)
= [tex]$0.25 \times \frac{0.996132}{0.903547}$[/tex]
= 0.0.275617
