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      Evaluating bifactor models: Calculating and interpreting statistical indices.

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          Abstract

          Bifactor measurement models are increasingly being applied to personality and psychopathology measures (Reise, 2012). In this work, authors generally have emphasized model fit, and their typical conclusion is that a bifactor model provides a superior fit relative to alternative subordinate models. Often unexplored, however, are important statistical indices that can substantially improve the psychometric analysis of a measure. We provide a review of the particularly valuable statistical indices one can derive from bifactor models. They include omega reliability coefficients, factor determinacy, construct reliability, explained common variance, and percentage of uncontaminated correlations. We describe how these indices can be calculated and used to inform: (a) the quality of unit-weighted total and subscale score composites, as well as factor score estimates, and (b) the specification and quality of a measurement model in structural equation modeling. (PsycINFO Database Record

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          Author and article information

          Journal
          Psychol Methods
          Psychological methods
          American Psychological Association (APA)
          1939-1463
          1082-989X
          Jun 2016
          : 21
          : 2
          Affiliations
          [1 ] Department of Psychology, University of California.
          [2 ] Department of Psychiatry, Loma Linda University.
          Article
          2015-49428-001
          10.1037/met0000045
          26523435
          35021a71-3c5b-4561-bc99-9aafdd485136
          History

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