1. What model is obtained if θ 2 = 0 in the two-term exponential model, equation 15.9? 2. Use the data in Exercise 8.8 to fit the nonlinear Mitscherlich model, equation 15.12 with δ = 0, to describe...

1. What model is obtained if θ₂
= 0 in the two-term exponential model, equation 15.9?

2. Use the data in Exercise 8.8 to fit the nonlinear Mitscherlich model, equation 15.12 with δ = 0, to describe the change in algae density with time. Allow each treatment to have its own response. Then fit reduced models to test (1) the composite hypothesis that all β_j
are equal, and (2) the composite hypothesis that all αj are equal. Summarize the results and state your conclusions.

Exercise 8.8

You are given the accompanying response data on concentration of a chemical as a function of time. The six sets of observations Y₁
to Y₆
represent different environmental conditions.

(a) Use cubic polynomial models to relate Y = concentration to X = time, where each environment is allowed to have its own intercept and response curve. Is the cubic term significant for any of the environments? [For the purposes of testing homogeneity in Part (c), retain the minimum-degree polynomial model that describes all responses.]

(b) Your knowledge of the process tells you that Y must be zero when X = 0. Test the composite null hypothesis that the six intercepts are zero using the model in Part (a) as the full model. What model do you adopt based on this test?

(c) Use the model determined from the test in Part (b) and test the homogeneity of the six response curves. State the conclusion of the test and give the model you have adopted at this stage.