Parameter Recovery in Multidimensional Item Response Theory Models Under Complexity and Nonnormality
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- Dubravka Svetina
- Indiana University, Bloomington, IN, USA
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- Arturo Valdivia
- Indiana University, Bloomington, IN, USA
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- Stephanie Underhill
- Indiana University, Bloomington, IN, USA
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- Shenghai Dai
- Indiana University, Bloomington, IN, USA
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- Xiaolin Wang
- Indiana University, Bloomington, IN, USA
説明
<jats:p> Information about the psychometric properties of items can be highly useful in assessment development, for example, in item response theory (IRT) applications and computerized adaptive testing. Although literature on parameter recovery in unidimensional IRT abounds, less is known about parameter recovery in multidimensional IRT (MIRT), notably when tests exhibit complex structures or when latent traits are nonnormal. The current simulation study focuses on investigation of the effects of complex item structures and the shape of examinees’ latent trait distributions on item parameter recovery in compensatory MIRT models for dichotomous items. Outcome variables included bias and root mean square error. Results indicated that when latent traits were skewed, item parameter recovery was generally adversely impacted. In addition, the presence of complexity contributed to decreases in the precision of parameter recovery, particularly for discrimination parameters along one dimension when at least one latent trait was generated as skewed. </jats:p>
収録刊行物
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- Applied Psychological Measurement
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Applied Psychological Measurement 41 (7), 530-544, 2017-05-11
SAGE Publications
