4. Consider the balanced one-way ANOVA model with I treatment groups, and J observations for each...
Problem 2. Consider the one-way layout ANOVA model, where we assume that Yij = μί-cij,に1, . . . , I and J 1, . . . ,J, where μί's are fixed unknown with zero mean treatment means and eiy's are random errors , al such that Σ-lai -0 and E[Yj-μ + ai,1- Show that there exists unique numbers μ, ai, a. b. Show that the null hypothesis Ho : μ,-...- μι is equivalent to Ho : 01 ,-. . .-a1-0...
Problem 2. Consider the one-way layout ANOVA model, where we assume that Yij = μί-cij,に1, . . . , I and J 1, . . . ,J, where μί's are fixed unknown with zero mean treatment means and eiy's are random errors , al such that Σ-lai -0 and E[Yj-μ + ai,1- Show that there exists unique numbers μ, ai, a. b. Show that the null hypothesis Ho : μ,-...- μι is equivalent to Ho : 01 ,-. . .-a1-0
Question: 1 Part A: There are several assumptions that are made in the one-way ANOVA model. Which one in the list is NOT one of the assumptions? a. The populations means are all equal if Ho is true. b. The variances within each treatment group are statistically equal. c. The mean of the observations, in at least one treatment group, is statistically significantly different from the mean of the observations in any one of the other treatment groups. d. All...
6. Below is a one-way ANOVA model for comparing three treatments with ni patients receiving treatment i, i 1, 2, 3. Let Yij denote the response of the jth patient receiving the ith treatment, u be the overall mean response, ai the treatment effect and eij the error term. Then, Yg=u a+Eij where, i 1, 2, 3 and j 1,... depends on the subscripts i and j, ni with nl 25, n2 - 30 and n3 20. The response 5if...
9. Consider the following hidden Markov model (HMM) (This is the same HMM as in the previous HMM problem): ·X=(x, ,x,Je {0,1)、[i.e., X is a binary sequence of length n] and Y-(Y Rt [i.e. Y is a sequence of n real numbers.) ·X1~" Bernoulli(1/2) ,%) E Ip is the switching probability; when p is small the Markov chain likes to stay in the same state] . conditioned on X, the random variables Yı , . . . , y, are...
Just b) please 7. Consider the one-way analysis of variance model where €ij ~ N(0,02) are independent. Let rni Tm 1 Xs, and X= where n Σ.nl n (a) Show that rn i-1 (b) Show that n-m is an unbiased estimator of σ2. (Recall that if W ~ χ2(r) then E(W)-r). [4]
Problem 4. Show that the MLE's İ,ai,A, of the parameters of the two-way layout ANOVA model with one observation per cell are unbiased estimators of μ,ai,ßi's, respectively. Then show that I-1 Var(ái) IJ Problem 4. Show that the MLE's İ,ai,A, of the parameters of the two-way layout ANOVA model with one observation per cell are unbiased estimators of μ,ai,ßi's, respectively. Then show that I-1 Var(ái) IJ
Please help! (a) Let us consider a full model of a balanced (all t treatments have equal number of observations r) CRD design with t treatments and r replications of each treatment, hence having n-rt observations. 2. i. Minimizing sum of square error Δfull (μ'Ti) -Σι-1 Σ-1 (Vi,- μ-Ti)2 with respect to μ and Ti find the least square estimators of μ and Ti as μ and Ti. Hint: Take derivative of the objective function with respect to μ and...
9. Consider the ANOVA model where Xij ~ N(μί,02). Then show that SSE (a) the random variable-O-~ χ2(1(J-1), and (b) the statistics SSE and SSTr are independent. Further, if the null hypothesis Ho : μ.-μ2-...-μι-, μ is true, then SSTr (c) the random variable-"K2(1-1) MSTr MSE (e) the random variable ~ χ2(U-1). (d) the statistics MsF), and
2. (a) Let us consider a full model of a balanced (all t treatments have equal number of observations r) CRD design with t treatments and r replications of each treatment, hence having n-rt observations i. Minimizing sum of square error Δfull(μ, Tỉ)-Σι-12jai (Vij-l-ri)2 with respect to μ and Ti find the least square estimators of μ and Te as μ and Ti Hint: Take derivative of the objective function with respect to u and Ti and equate then to...