19. A local brewery produces three premium lagers named Half Pint, XXX, and Dark Knight. Of its premium lagers, the brewery bottles 40% Half Pint, 40% XXX, and 20% Dark Knight. In a marketing test of a sample of 80 consumers, 26 preferred the Half Pint lager, 42 preferred the XXX lager, and 12 preferred the Dark Night lager. Using a chi-square goodness-of-fit test, test whether the production of the premium lagers matches these consumer preferences using a .05 level of significance.

19. Step 1: Which of the following is the correct set of hypotheses?A. H0: The preferences will not match production (40% Half Pint, 40% XXX, 20% Dark Knight); and H1: The preferences will match production

B. H0: \mu_{1}μ1​ = \mu_{2}μ2​ = \mu_{3}μ3​; and H1: At least one of the categories will be different than the others

C. H0: The preferences will match production (40% Half Pint, 40% XXX, 20% Dark Knight); and H1: The preferences will not match production

 

19b. Step 2: Compute the df and locate the critical values.

df =

Critical value = 

19c. Step 3: Compute the test statistic -- expected frequencies (whole numbers)

Half Pint fe =

XXX fe = 

Dark Knight fe=