Exam 16: Hierarchical and Randomized Block Analysis of Variance Models

Which one of the following is the nonparametric equivalent to the two-factor randomized block ANOVA model?

In a two-factor randomized block ANOVA, the blocking factor is often considered a nuisance variable for which the researcher wants to control through the design of the study.

Randomized block designs are also known as which of the following? Select all that apply.

Azita wants to evaluate the effects of three new types of word processors (1: MacrosoftWork; 2: ToogleDoc, 3: WordTerrific) on the employees' working efficiency. Twelve employees were randomly selected and grouped into four blocks based on the amount of their daily tasks (higher values indicate heavier work load). Within each block, each employee was randomly assigned to use one of the three word processors. Their working efficiency as measured by the number of files processed per day is listed in the table. Conduct a two-factor randomized block ANOVA ( $\alpha$ = .05) and Bonferroni MCPs using SPSS to determine the results of the study. Subject Word Processor Workload Number of files processed 1 1 1 8 2 1 2 13 3 1 3 18 4 1 4 26 5 2 1 3 6 2 2 10 7 2 3 13 8 2 4 20 9 3 1 5 10 3 2 12 11 3 3 14 12 3 4 20

An experiment was conducted to compare the effect of three types of daily schedules on the employees' work performance. The schedules all contained the same amount of tasks, but the tasks were listed in different orders in each schedule. The day of the week was used as the blocking variable. The mean scores on the dependent variable, the percentage of tasks completed, are listed here for each cell. Weekday Type of schedule Monday Tuesday Wednesday Thursday Friday 1 70 89 74 85 75 2 74 94 81 90 80 3 80 98 85 96 84 Use these cell means to graph the interaction between type of schedule and the day of the week. a. Is there an interaction between type of schedule and the day of the week? b. What kind of recommendation would you make to the manager?

Questions are based on the following figure. Each cell represents one combination of factor levels. The actual experiment assigns participants only to the combinations represented by the shaded cells. It is unknown whether the levels of the factors are fixed or randomly selected. -A is a random-effects factor and B is a fixed-effects factor. Each cell has 5 observations. The F_B ratio has degrees of freedom equal to what?

Questions are based on the following figure. Each cell represents one combination of factor levels. The actual experiment assigns participants only to the combinations represented by the shaded cells. It is unknown whether the levels of the factors are fixed or randomly selected. -Both A and B are random-effects factors. Each cell has 5 observations. The F_B ratio has degrees of freedom equal to what?

Dr. Numerus wanted to examine two different methods to teach number theory. He randomly selected six instructors from the department and assigned three of them to use method 1 and three of them to use method 2. There were 20 students in each instructor's class. At the end of the semester, Dr. Numerus collected the test scores from all six classes and ran a two-factor hierarchical ANOVA. Below is the selected output generated by SPSS. Test of Between-Subjects Effects Source Type III SS df MS F 764.54 1 764.54 64.23993 () 944.22 4 236.06 19.83435 Within 1356.75 114 11.90 Total 3065.51 119 a. Identify factor A and factor B. b. For each factor, identify whether it is a fixed-effects or random-effects factor. c. Is the SPSS ANOVA summary table correct? If not, correct the erroneous part(s). d. What conclusions can you draw from the correct test results? (Use $\alpha$ = .05)

An experiment was conducted to compare the effects of four types of classroom layout on children's learning outcomes. Score on a pretest is used to form the blocks (low, middle, high). The mean scores on the dependent variable, children's score on a posttest quiz, are listed here for each cell. Type of classroom layout low middle high 1 65 75 90 2 80 85 95 3 70 80 85 4 75 85 100 Use these cell means to graph the interaction between type of classroom layout and pretest score block. a. Is there an interaction between type of classroom layout and pretest score? b. What kind of recommendation would you make to teachers?

A market researcher wanted to test three exotic flavors of cake (dragon fruit, root beer, and yam) on customers of different age groups (21-30, 31-40, 41-50, 51-60). Thus, age is a blocking variable. The dependent measure was the customer's rating on how much he/she liked the cake. There were six subjects in each cell. Complete the ANOVA summary table below, assuming a fixed-effects model where $\alpha$ = .05. Source SS df MS F Critical Value Decision Flavor () 300 - - - - - Age () - - 50 - - - Interaction () - - - - - - Within - - 25 - Total 2400 -

Questions are based on the following figure. Each cell represents one combination of factor levels. The actual experiment assigns participants only to the combinations represented by the shaded cells. It is unknown whether the levels of the factors are fixed or randomly selected. -Both A and B are fixed-effects factors. Each cell has 5 observations. The F_B ratio has degrees of freedom equal to?

Questions are based on the following figure. Each cell represents one combination of factor levels. The actual experiment assigns participants only to the combinations represented by the shaded cells. It is unknown whether the levels of the factors are fixed or randomly selected. -Which of the following best describes the design of the experiment?