Testing the assumption of sample invariance of item difficulty parameters in the Rasch rating scale model
Joseph Curtin; George Engelhard Jr.
Rasch is a mathematical model that allows researchers to compare data that measure a unidimensional trait or ability (Bond & Fox, 2007). When data fit the Rasch model, it is mathematically proven that the item difficulty estimates are independent of the sample of respondents. The purpose of this study was to test the robustness of the Rasch model with regards to its ability to maintain invariant item difficulty estimates when real (data that does not perfectly fit the Rasch model), polytomous scored data is used. The data used in this study comes from a university alumni questionnaire that was collected over a period of five years. The analysis tests for significant variation between (a) small samples taken from a larger sample, (b) a base sample and subsequent (longitudinal) samples and (c) variation over time with confounding variables. The confounding variables studied include (a) the...
Joseph Curtin & George Engelhard Jr. (2007). Testing the assumption of sample invariance of item difficulty parameters in the Rasch rating scale model. ScholarsArchive (Brigham Young University). https://scholarsarchive.byu.edu/etd/1168