Let independent random samples, each of size n, be taken from the k normal distributions with...
12 marks Let independent random samples of sizes n and n2 be taken respectively from two normal distributions with unknown means 1 and 2 and unknown variances oand o. Denote the two samples by . . ,Jn, and y,... , yn2: Which have means T and T, and sample variances s and s2, respectively (a) 4 marks Show that when of = o2, the likelihood ratio test statistic for testing Ho 12 against H 2 can be written as T2...
Let the independent normal random variables Y1,Y2, . . . ,Yn have the respective distributions N(μ, γ 2x2i ), i = 1, 2, . . . , n, where x1, x2, . . . , xn are known but not all the same and no one of which is equal to zero. Find the maximum likelihood estimators for μ and γ 2.
Consider independent random samples of size n, and n, from respective normal distributions, Xi ~ Nuh, σ ) and Y, ~ Num σ ). 30 (a) Derive the GLR test of Ho : σ|-σ1 against H. σ. σ1, assuming that and μ2 are known. (b) Rework (a) assuming that andHa are unknown.
Consider independent random samples of size n, and n, from respective normal distributions, Xi ~ Nuh, σ ) and Y, ~ Num σ ). 30 (a) Derive the...
7.70. Let X,...,x,; Y,., Y,; Z,..,Z, be respective independent random samples from three normal distributions N(u,a+ B, a) N(4-B+y,a), N(= a + y , a'). Find a point estimator for B that is based on X, Y, Z. Is this estimator unique? Why? If a is unknown, explain how to find a confidence interval for B.
7.70. Let X,...,x,; Y,., Y,; Z,..,Z, be respective independent random samples from three normal distributions N(u,a+ B, a) N(4-B+y,a), N(= a + y ,...
25. Independent random samples o n from k normal w variances are to be used to test the hu σί against the alternati ations with unknown means and . . alternative that these variances are not all equal. (a) Show that under the nul hypothesis i the variances likelihood estimates of the means ,41 an and the va are (ni-1)si /n に1 σ2 anded eel. while σ,-are where n Σ ni, while with out restrictions the maximum likelihood estimates of...
25. Independent random samples o n from k normal w variances are to be used to test the hu σί against the alternati ations with unknown means and . . alternative that these variances are not all equal. (a) Show that under the nul hypothesis i the variances likelihood estimates of the means ,41 an and the va are (ni-1)si /n に1 σ2 anded eel. while σ,-are where n Σ ni, while with out restrictions the maximum likelihood estimates of...
- Suppose a random sample of size n is taken from the following distribution with a known positive parameter a. f(x;0,-) = a20 V 27797z exp 0; ; 0<x<00,0< < 0,0 < 8 < 00 elsewhere For this distruttore, the formats for mye or and x-a are respectively, Myo (1) = exp v{(1 - V1 –24*70)} for 1 < 2112 and exp{}(-VT - 2/0)} My-- (1) for 1 < ✓1 - 2t/0 2 Find the maximum likelihood estimators, 0 and...
Suppose that independent samples of sizes n1, n2, . . . , nk are taken from each of k normally distributed populations with means μ1,μ2, . . . , μk and common variances, all equal to σ 2. Let Yi j denote the j th observation from population i, for j = 1, 2, . . . , ni and i = 1, 2, . . . , k, and let n = n1 + n2 + ··· + nk...
15. Multiple Choice Question Consider two independent normal populations. A random sample of size n = 16 is selected from the first normal population with mean 75 and variance 288. A second random sample of size m - 9 is selected from the second normal population with mean 80 and variance 162. Assume that the random samples are independent. Let X, and X, be the respective sample means. Find the probability that X1 + X, is larger than 156.5. A....
Independent random samples of n = 16 observations each are drawn from normal populations. The parameters of these populations are: Population 1: u = 279 and o = 25 Population 2: j = 268 and o = 29 Find the probability that the mean of sample 1 is greater than the mean of sample 2 by more than 16. Probability =