With explain everything: Find "maximum likelihood" estimator of (?) for a random sample of size (n)...

with explain everything : If X1 and X2 constitute a random sample of size 2 from...

with explain everything : If X1 and X2 constitute a random sample of size 2 from an exponential population, find the efficiency of Y1 relative to XBAR, where Y1 is the first order statistic and 2Y1 and XBAR are both unbiased estimators of θ

For a random sample of size n from a Beta(α,β) density, find a consistent estimator of...

For a random sample of size n from a Beta(α,β) density, find a consistent estimator of (α/β). Why is this estimator consistent?

1. Find the maximum likelihood estimator (MLE) of θ based on a random sample X1, ....

1. Find the maximum likelihood estimator (MLE) of θ based on a random sample X1, . . . , Xn from each of the following distributions (a) f(x; θ) = θ(1 − θ) ^(x−1) , x = 1, 2, . . . ; 0 ≤ θ ≤ 1 (b) f(x; θ) = (θ + 1)x ^(−θ−2) , x > 1, θ > 0 (c) f(x; θ) = θ^2xe^(−θx) , x > 0, θ > 0

suppose we draw a random sample of size n from a Poisson distribution with parameter λ....

suppose we draw a random sample of size n from a Poisson distribution with parameter λ. show that the maximum likelihood estimator for λ is an efficient estimator

a. If ? ̅1 is the mean of a random sample of size n from a...

a. If ? ̅1 is the mean of a random sample of size n from a normal population with mean ? and variance ?1 2 and ? ̅2 is the mean of a random sample of size n from a normal population with mean ? and variance ?2 2, and the two samples are independent, show that ?? ̅1 + (1 − ?)? ̅2 where 0 ≤ ? ≤ 1 is an unbiased estimator of ?. b. Find the value...

Let X1, ..., Xn be a sample from an exponential population with parameter λ. (a) Find...

Let X1, ..., Xn be a sample from an exponential population with parameter λ. (a) Find the maximum likelihood estimator for λ. (NOT PI FUNCTION) (b) Is the estimator unbiased? (c) Is the estimator consistent?

Let X1,X2, . . . ,Xn be a random sample of size n from a geometric...

Let X1,X2, . . . ,Xn be a random sample of size n from a geometric distribution for which p is the probability of success. (a) Find the maximum likelihood estimator of p (don't use method of moment). (b) Explain intuitively why your estimate makes good sense. (c) Use the following data to give a point estimate of p: 3 34 7 4 19 2 1 19 43 2 22 4 19 11 7 1 2 21 15 16

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 Xl, n be a random sample from a gamma distribution with parameters a = 2...

Let Xl, n be a random sample from a gamma distribution with parameters a = 2 and p = 20.      a)         Find an estimator , using the method of maximum likelihood b) Is the estimator obtained in part a) is unbiased and consistent estimator for the parameter 0? c) Using the factorization theorem, show that the estimator found in part a) is a sufficient estimator of 0.

Use R. Generate a random sample with n=15 random observations from an exponential distribution with mean=1....

Use R. Generate a random sample with n=15 random observations from an exponential distribution with mean=1. Calculate the sample median, which is an estimator of the population median. Use bootstrap (nonparametric, with B=1000) methods to estimate the variance of the estimator for the population median. use the Monte Carlo method, e.g. generate 1000 samples of size 15 to estimate the true variance of the median estimator. Compare and comment on your results.