Use the theory of Exercises 24 and 26, as well as the quantities already calculated in Exercise 51 for the data of Exercise 42, to find
(a) a 99% confidence interval for the expected number of deaths in a group of 25 mice when the dosage is 9 milligrams;
(b) 99% limits of prediction of the number of deaths in a group of 25 mice when the dosage is 9 milligrams.
Exercises 24
Derive a (1 - α) 100% confidence interval for μY|x0, the mean of Y at x = x0, by solving the double inequality -tα/2, n-2 α/2, n-2 with t given by the formula of Exercise 23.
Exercise 23
Use the results of Exercises 20 and 21 and the fact that
Exercises 20
Under the assumptions of normal regression analysis, show that
(a) the least squares estimate of α in Theorem 2 can be written in the form
(b) has a normal distribution with
Theorem 2
Exercises 21
This question has been intentionally omitted for this edition.
Exercises 26
Solve the double inequality -tα/2,n-2 α/2,n-2 with t given by the formula of Exercise 25 so that the middle term is y0 and the two limits can be calculated without knowledge of y0. Note that although the resulting double inequality may be interpreted like a confidence interval, it is not designed to estimate a parameter; instead, it provides limits of prediction for a future observation of Y that corresponds to the (given or observed) value x0
Exercise 25
Use the results of Exercises 20 and 21 and the fact that
is a random variable having a normal distribution with zero mean and the variance
Exercises 20
Under the assumptions of normal regression analysis, show that
(a) the least squares estimate of α in Theorem 2 can be written in the form
(b) has a normal distribution with
Theorem 2
Exercises 21
This question has been intentionally omitted for this edition.
Exercise 51
With reference to Exercise 42, test the null hypothesis β = 1.25 against the alternative hypothesis β > 1.25 at the 0.01 level of significance.
Exercise 42
Various doses of a poisonous substance were given to groups of 25 mice and the following results were observed:
(a) Find the equation of the least squares line fit to these data.
(b) Estimate the number of deaths in a group of 25 mice that receive a 7-milligram dose of this poison.