1. Suppose are independent random variables each having a distribution. Let , , , and . Give the names for the distributions of each of , U, V, X and Y and use tables to find , , , , , .

2. A new process for measuring the concentration of a chemical in water is being investigated. A total of n samples are prepared in which the concentrations are the known numbers for ; the new process is used to measure the concentrations for these samples. It is thought likely that the concentrations measured by the new process, which we denote , will be related to the true concentrations via

   

   where the are independent, have mean 0 and all have the same variance which is unknown.

   1. If this model is fitted by least squares, (that is by minimizing ) show that the least squares estimate of is

      

   2. Show that the estimator in part (a) is unbiased.

   3. Compute (give a formula for) the standard error of .

   4. The error sum of squares for this model is which may be shown to have n-1 degrees of freedom. If the are the numbers 1, 2, 3 and 4, and the error sum of squares is 0.12 find a 95% confidence interval for and explain what further assumptions you must make to do so.

   5. Show that the estimator

      

      is also unbiased.

   6. Compute (give a formula for) the standard error of . Which is bigger, the standard error of or that of ?

   7. Show that the mle of in this model is , the least squares estimate, if the have normal distributions.

3. Consider the two-way layout without replicates. We have data for and . We generally fit a so-called additive model

   

   In the following questions consider the case I=2 and J=3.

   1. If we treat , , , , and as the entries in the parameter vector what is the design matrix and what is the rank of ?

   2. What is the determinant of the matrix ? Is this matrix invertible? How many solutions do the normal equations have?

   3. Usually we impose the restrictions and . Use these restrictions to eliminate and from the model equation and, for the parameter vector find the design matrix .

   4. An alternate set of restrictions is called corner point coding where we assume . With this restriction and the parameter vector what is the design matrix ?

   5. Show that the three design matrices have the same column space by finding a matrix A such that and similarly for and and for and .

   6. Use the previous part to show that the vectors of fitted values will be the same for any solution of the normal equations for any of the three design matrices.

4. From the text question 1.19, 1.23, 2.13 a and b and 2.23 a, b and c. In 2.23 c give a P-value and interpret this P-value.

DUE: Friday, 17 January.