Abstract
An investigator who plans to conduct an experiment with multiple independent variables must decide whether to use a complete or reduced factorial design. This article advocates a resource management perspective on making this decision, in which the investigator seeks a strategic balance between service to scientific objectives and economy. Considerations in making design decisions include whether research questions are framed as main effects or simple effects; whether and which effects are aliased (confounded) in a particular design; the number of experimental conditions that must be implemented in a particular design and the number of experimental subjects the design requires to maintain the desired level of statistical power; and the costs associated with implementing experimental conditions and obtaining experimental subjects. In this article 4 design options are compared: complete factorial, individual experiments, single factor, and fractional factorial. Complete and fractional factorial designs and single-factor designs are generally more economical than conducting individual experiments on each factor. Although relatively unfamiliar to behavioral scientists, fractional factorial designs merit serious consideration because of their economy and versatility.
Highlights
This section contains direct comparisons among the various experimental designs discussed in this article, based on artificial data generated using the same model for all the designs. This can be imagined as a situation in which after each experiment, time is turned back and the same factors are again investigated with the same experimental subjects, but using a different experimental design
No effects were aliased in the complete factorial design, which had coefficient estimates closest to the true values
The Resolution III fractional factorial design, which aliased each effect with seven other effects, had coefficient estimates somewhat farther from the true values
Summary
The difference in the aliasing structure of fractional factorial designs as compared to individual experiments and single factor designs becomes salient when the primary scientific questions that motivate an experiment require estimating main effects as opposed to simple effects, and when larger numbers of factors are involved. This is because in the single factor approach, to maintain power each mean comparison must be based on two experimental conditions including a total of N subjects. This can be imagined as a situation in which after each experiment, time is turned back and the same factors are again investigated with the same experimental subjects, but using a different experimental design
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