Suppose that Y1, . . . , Yn are iid random variables from the pdf f(y...

Suppose we have a random sample Y1, . . . , Yn from a CRV with...

Suppose we have a random sample Y1, . . . , Yn from a CRV with density fY (y; θ) = θ*(y + 1)^(θ+1) where y > 0, θ > 1 Find the MME and MLE for θ.

Let Y1,Y2.....,Yn be independent ,uniformly distributed random variables on the interval[0,θ].，Y(n)=max(Y1,Y2,....,Yn)，which is considered as an estimator...

Let Y1,Y2.....,Yn be independent ,uniformly distributed random variables on the interval[0,θ].，Y(n)=max(Y1,Y2,....,Yn)，which is considered as an estimator of θ. Explain why Y is a good estimator for θ when sample size is large.

Let X1,…, Xn be a sample of iid random variables with pdf f (x; ?) =...

Let X1,…, Xn be a sample of iid random variables with pdf f (x; ?) = 3x2 /(?3) on S = (0, ?) with Θ = ℝ+. Determine i) a sufficient statistic for ?. ii) F(x). iii) f(n)(x)

Let Y1, ..., Yn be IID Poisson(λ) random variables. Argue that Y¯ , the sample mean,...

Let Y1, ..., Yn be IID Poisson(λ) random variables. Argue that Y¯ , the sample mean, is a sufficient statistic for λ by using the factorization criterion. Assuming that Y¯ is a complete sufficient statistic, explain why Y¯ is the minimum variance unbiased estimator.

Suppose Y1, . . . , Yn are independent random variables with common density fY(y) =...

Suppose Y1, . . . , Yn are independent random variables with common density fY(y) = eμ−y , y > μ 1. Find the Method of Moments Estimator for μ. 2. Find the MLE for μ. Then find the bias of the estimator

Let X1,…, Xn be a sample of iid random variables with pdf f (x ∶ ?)...

Let X1,…, Xn be a sample of iid random variables with pdf f (x ∶ ?) = 1/? for x ∈ {1, 2,…, ?} and Θ = ℕ. Determine the MLE of ?.

Let Y1, Y2, . . . , Yn denote a random sample from a uniform distribution...

Let Y1, Y2, . . . , Yn denote a random sample from a uniform distribution on the interval (0, θ). (a) (5 points)Find the MOM for θ. (b) (5 points)Find the MLE for θ.

Let Y1, ... , Yn be a random sample from the p.d.f. f(y | θ) =...

Let Y1, ... , Yn be a random sample from the p.d.f. f(y | θ) = (r/θ)yr-1exp(-yr/θ), θ > 0, y > 0, where r is a known positive constant. (1) Find the Mean Likelihood Error of θ; (2) Find the Mean Squared Error of M.L.E.

Suppose a random sample of size n is drawn from the pdf f(sub)Y(y;θ) =1/θ, 0 ≤...

Suppose a random sample of size n is drawn from the pdf f(sub)Y(y;θ) =1/θ, 0 ≤ y ≤ θ. Find a sufficient statistic for θ.

Let Y1,Y2,...,Yn denote a random sample of size n from a population with a uniform distribution...

Let Y1,Y2,...,Yn denote a random sample of size n from a population with a uniform distribution on the interval (0,θ). Let Y(n)= max(Y1,Y2,...,Yn) and U = (1/θ)Y(n) . a) Show that U has cumulative density function 0 ,u<0, Fu (u) =   un ,0≤u≤1, 1 ,u>1