For purposes of studying sampling distribution, we consider a small population of N = 4 units,...
Problem 2. Suppose the population has six units: U={1,2,3,4,5,6} and samples of size 3 could be chosen from this population. For purposes of studying sampling distribution, assume that all population values are known y1 92 , y2 = 108, y3 = 154, y4 = 133, y5 = 190, y6 = 175 We are interested in yu, the population mean. One sampling plan is proposed. Sample, S (1,3,5 {1,4,6 {2,3,6 (2,4,5 P(S) Sample Number 1 0.25 2 0.2 3 0.2 0.35...
1. Consider the following population of N 5 sampling units with characteristic of interest y Sampling unit i1 2 3 4 5 6 24 18 12 30 yi (a) (2 marks). Compute the population mean μ and the population variance ? 4 marks). List all ten simple random samples of size n 3 and compute the sample mean ý and the sample variance s2 of each sample. (c) (3 marks). Verify numerically that tively. That is, verify that E(j) and...
2. [x] Suppose that Y1, Y2, Y3 denote a random sample from an exponential distribution whose pdf and cdf are given by f(y) = (1/0)e¬y/® and F(y) =1 – e-y/0, 0 > 0. It is also known that E[Y;] = 0. ', y > 0, respectively, with some unknown (a) Let X = min{Y1,Y2, Y3}. Show that X has pdf given by f(æ) = (3/0)e-3y/º. Start by thinking about 1- F(x) = Pr(min{Y1,Y2, Y3} > x) = Pr(Y1 > x,...
3. Consider a random sample Yı, ,Yn from a Uniform[0, θ]. In class we discussed the method of ,y,). We moment estimator θ-2Y and the maximum likelihood estimator θ-maxx,Yo, derived the Bias and MSE for both estimators. With the intent to correct the bias of the mle θ we proposed the following new estimator -Imax where the subscript u stands for "unbiased." (a) Find the MSE of (b) Compare the MSE of θυ to the MSE of θ, the original...
For the small population, systemically list all of the possible samples of size n=3 that can be selected by drawing 3 units from 5 with equal probability without replacement. y1 = 6 y2 = 2 y3 = 5 y4 = 12 y5 = 10
. Suppose the Y1, Y2, · · · , Yn denote a random sample from a population with Rayleigh distribution (Weibull distribution with parameters 2, θ) with density function f(y|θ) = 2y θ e −y 2/θ, θ > 0, y > 0 Consider the estimators ˆθ1 = Y(1) = min{Y1, Y2, · · · , Yn}, and ˆθ2 = 1 n Xn i=1 Y 2 i . ii) (10 points) Determine if ˆθ1 and ˆθ2 are unbiased estimators, and in...
2. Consider a random sample of size n from an exponential, X, EXPo). Define 69, x and θ,-nx /( n +1). a. What is the MSE of What is the MSE of θ2 b. what is the CRLB for the variance of unbiased estimators of θ ? Show that g is a UMVUE of θ. d. 2. Consider a random sample of size n from an exponential, X, EXPo). Define 69, x and θ,-nx /( n +1). a. What is...
Part IV: SHORT ANSWER Question 4: 6 marks) Suppose we have two estimators of the population parameter V:. Ely) = y +8/n? v (ų)= 03/13 and E(ū)= y +9/n? viņ)= 202/12 Determine the bias, if any, of each estimator. (ii) Determine the MSE. Which estimator is preferred? (iii) Determine if the estimators are consistent. Explain.
Please show all steps! I need help showing . How do you do the mgf We were unable to transcribe this imageEXAMPLE 9.5 Suppose that Yı, Y2, ..., Yn is a random sample from a normal distribution with mean u and variance o2. Two unbiased estimators of o2 are 1 (Y1 – Y2) -1 2 1 3 = sº Ž«, – }? and ô] = {(- n i=1 Find the efficiency of ô{ relative to ô2.
In a population with N-6 the values of y are 8, 3, 1, 11, 4, and 7. Draw all possible unordered sam ples of size 4 from this population without replacement. (i) Find P(s) for each sample point (ii) Find T, for each unit. (ii) Find the sampling distribution of v. (iv) Is y an unbiased estimator of ? Justify your answer. ()Is V(F)- (1- Justify your answer. 72 () Is r an unbiased estimator of s? Justify your answer.