To solve this problem, we use the formula for binomial probability:
P = [n! / (n – r)! r!] p^r * q^(n – r)
where,
n = total number of adults = 4
r = number of adults who believe in reincarnation = 3
p = chance of believing in reincarnation = 50% = 0.50
q = 1 – p = 0.50
P = [4! / (4 – 3)! 3!] 0.50^3 * 0.50^(4 – 3)
P = 0.25 = 25%
Answer:
Answer is 0.096
Step-by-step explanation:
Here 44 adults are randomly selected.
Each adult selected is independent of the other to believe in reincarnation.
Also there are only two outcomes, probability for success in each trial = 0.50
Hence X no of adults who believe in reincarnation is binomial with n =50 and p = 0.50
[tex]a) P(X=23) = 50C23 (0.5)^{50} =0.096[/tex]
Working notes:
50C23 =108043253365600
0.5^50) = 8.8178x10^(-14)
Simplifying we get answer as 0.096
