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

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

Suppose that Y1, . . . , Yn are iid random variables from the pdf f(y | θ) = 6y^5/(θ^6) I(0 ≤ y ≤ θ). (a) Prove that Y(n) = max (Y1, . . . , Yn) is sufficient for θ. (b) Find the MLE of θ

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 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 denote a random sample from the exponential density function given by...

. Let Y1, ..., Yn denote a random sample from the exponential density function given by f(y|θ) = (1/θ)e-y/θ when, y > 0 Find an MVUE of V (Yi)

1. (a) Y1,Y2,...,Yn form a random sample from a probability distribution with cumulative distribution function FY...

1. (a) Y1,Y2,...,Yn form a random sample from a probability distribution with cumulative distribution function FY (y) and probability density function fY (y). Let Y(1) = min{Y1,Y2,...,Yn}. Write the cumulative distribution function for Y(1) in terms of FY (y) and hence show that the probability density function for Y(1) is fY(1)(y) = n{1−FY (y)}n−1fY (y). [8 marks] (b) An engineering system consists of 5 components connected in series, so, if one components fails, the system fails. The lifetimes (measured in...

Let Y1, Y2, . . ., Yn be a random sample from a Laplace distribution with...

Let Y1, Y2, . . ., Yn be a random sample from a Laplace distribution with density function f(y|θ) = (1/2θ)e-|y|/θ for -∞ < y < ∞ where θ > 0. The first two moments of the distribution are E(Y) = 0 and E(Y2) = 2θ2. a) Find the likelihood function of the sample. b) What is a sufficient statistic for θ? c) Find the maximum likelihood estimator of θ. d) Find the maximum likelihood estimator of the standard deviation...

Let Y1, Y2, ... Yn be a random sample of an exponential population with parameter θ....

Let Y1, Y2, ... Yn be a random sample of an exponential population with parameter θ. Find the density function of the minimum of the sample Y(1) = min⁡(Y1, Y2, ..., Yn).

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

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

Let Y1, Y2, . . ., Yn be a random sample from a uniform distribution on the interval (θ - λ, θ + λ) where -∞ < θ < ∞ and λ > 0. Find the method of moments estimators of θ and λ.

Suppose Y1,··· ,Yn is a sample from a exponential distribution with mean θ, and let Y(1),···...

Suppose Y1,··· ,Yn is a sample from a exponential distribution with mean θ, and let Y(1),··· ,Y(n) denote the order statistics of the sample. (a) Find the constant c so that cY(1) is an unbiased estimator of θ. (b) Find the sufficient statistic for θ and MVUE for θ.