Answer:
Step-by-step explanation:
The model [tex]N (t)[/tex], the number of planets found up to time [tex]t[/tex], as a Poisson process. So, the [tex]N (t)[/tex] has distribution of Poison distribution with parameter [tex](\lambda t)[/tex]
a)
The mean for a month is, [tex]\lambda = \frac{1}{3}[/tex] per month
[tex]E[N(t)]= \lambda t\\\\=\frac{1}{3}
(24)\\\\=8[/tex]
(Here. t = 24)
For Poisson process mean and variance are same,
[tex]Var[N (t)]= Var[N(24)]\\= E [N (24)]\\=8[/tex]
(Poisson distribution mean and variance equal)
The standard deviation of the number of planets is,
[tex]\sigma( 24 )] =\sqrt{Var[ N(24)]}=\sqrt{8}= 2.828
[/tex]
b)
For the Poisson process the intervals between events(finding a new planet) have independent exponential distribution with parameter [tex]\lambda[/tex]. The sum of [tex]K[/tex] of these independent exponential has distribution Gamma [tex](K, \lambda)[/tex].
From the given information, [tex]k = 6[/tex] and [tex]\lambda =\frac{1}{3}
[/tex]
Calculate the expected value.
[tex]E(x)=\frac{\alpha}{\beta}\\\\=\frac{K}{\lambda}
\\\\=\frac{6}{\frac{1}{3}}\\\\=18[/tex]
(Here, [tex]\alpha =k[/tex] and [tex]\beta=\lambda[/tex])
C)
Calculate the probability that she will become eligible for the prize within one year.
Here, 1 year is equal to 12 months.
P(X ≤ 12) = (1/Г (k)λ^k)(x)^(k-1).(e)^(-x/λ)
[tex]=\frac{1}{Г (6)(\frac{1}{3})^6}(12)^{6-1}e^{-36}\\\\=0.2148696\\=0.2419\\=21.49%[/tex]
Hence, the required probability is 0.2149 or 21.49%
