基于能力组隶属度后验概率的项目拟合统计。

IF 1 4区心理学 Q4 PSYCHOLOGY, MATHEMATICAL

Applied Psychological Measurement Pub Date : 2022-09-01 DOI:10.1177/01466216221108061

Bartosz Kondratek

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引用次数: 3

摘要

提出了一种基于渐近检验的项目拟合分析新方法。新的检验统计量χ w 2比较了一组能力箱上的伪观察和预期项目平均得分。项目平均得分以加权平均数计算，权重基于考生在bin中的后验能力密度。本文探讨了单维IRT模型中二分类得分项目的χ w 2的性质。通过蒙特卡罗实验对χ w2的性能进行了分析。χ w 2的I型误差可接受地接近名义水平，其功率大于Orlando和Thissen的S - x2。在某些条件下，χ w 2的幂也超过了计算要求更高的Stone的χ 2 *所报告的幂。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Item-Fit Statistic Based on Posterior Probabilities of Membership in Ability Groups.

A novel approach to item-fit analysis based on an asymptotic test is proposed. The new test statistic, $χ_{w}^{2}$ , compares pseudo-observed and expected item mean scores over a set of ability bins. The item mean scores are computed as weighted means with weights based on test-takers' a posteriori density of ability within the bin. This article explores the properties of $χ_{w}^{2}$ in case of dichotomously scored items for unidimensional IRT models. Monte Carlo experiments were conducted to analyze the performance of $χ_{w}^{2}$ . Type I error of $χ_{w}^{2}$ was acceptably close to the nominal level and it had greater power than Orlando and Thissen's $S - x^{2}$ . Under some conditions, power of $χ_{w}^{2}$ also exceeded the one reported for the computationally more demanding Stone's $χ^{2 *}$ .

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来源期刊

Applied Psychological Measurement Multiple-

CiteScore

2.30

自引率

8.30%

发文量

期刊介绍： Applied Psychological Measurement publishes empirical research on the application of techniques of psychological measurement to substantive problems in all areas of psychology and related disciplines.