Reference no: EM13347031

1. Let X₁, · · · ,X_n be n (≥ 2) independent random variables, where each X_i has the exponential distribution with parameter λ_i > 0. Let Y_n = X₁ + · · · + X_n.

(a) Find the probability density function of Y₂.

(b) Assume now that all λ_i are the same, say λ_i = λ_, for i = 1, · · · , n. Show, by induction, that Y_n is a Gamma(n, λ) random variable.

2. A die has its six faces painted in six different colours. You throw it repeatedly. Let N be the minimum number of throws required for all six colours to have appeared at least once. For i = 1, · · · , 6, let Ni be the number of throws you make until the i^th colour appears after i-1 different colours have already appeared.

Clearly, N₁ = 1 and N₂,N₃ · · · ,N₆ are mutually independent random variables.

(a) For each i = 2, · · · , 6, determine the probability mass function of N_i.

(b) Find the mean and variance of N_i for i = 2, · · · , 6.

(c) By expressing N in terms of N₁, · · · ,N₆, show that

3. If X is a positive random quantity with probability density function f_X(x) = αβx^β-1 exp(-αx^β), x ≥ 0, where α and β are two positive constants, show that Y = X^β has an exponential distribution and ?nd its parameter.