TESTING IF TWO MEASURING PROCEDURES MEASURE THE SAME PSYCHOLOGICAL DIMENSION*

Abstract

ETS Research Bulletin SeriesVolume 1971, Issue 2 p. i-9 ArticleFree Access TESTING IF TWO MEASURING PROCEDURES MEASURE THE SAME PSYCHOLOGICAL DIMENSION* Frederic M. Lord, Frederic M. LordSearch for more papers by this author Frederic M. Lord, Frederic M. LordSearch for more papers by this author First published: December 1971 https://doi.org/10.1002/j.2333-8504.1971.tb00609.xCitations: 2 * This research was sponsored in part by the Personnel and Training Research Programs, Psychological Sciences Division, Office of Naval Research, under Contract No. N00014-69-C-0017, Contract Authority Identification Number, NR No. 150-303, and Educational Testing Service. Reproduction in whole or in part is permitted for any purpose of the United States Government. AboutPDF ToolsRequest permissionExport citationAdd to favoritesTrack citation ShareShare Give accessShare full text accessShare full-text accessPlease review our Terms and Conditions of Use and check box below to share full-text version of article.I have read and accept the Wiley Online Library Terms and Conditions of UseShareable LinkUse the link below to share a full-text version of this article with your friends and colleagues. Learn more.Copy URL Share a linkShare onFacebookTwitterLinkedInRedditWechat REFERENCES 1Forsyth, R. A., & Feldt, L. S. An investigation of empirical sampling distributions of correlation coefficients corrected for attenuation. Educational and Psychological Measurement, 1969, 29, 61– 72. 2Forsyth, R. A., & Feldt, L. S. Some theoretical and empirical results related to McNemar's test that the population correlation coefficient corrected for attenuation equals 1.0. American Educational Research Journal, 1970, 7, 197– 207. 3Lord, F. M. A significance test for the hypothesis that two variables measure the same trait except for errors of measurement. Psychometrika, 1957, 22, 207– 220. 4McNemar, Q. Attenuation and interaction. Psychometrika, 1958, 23, 259– 266. 5Tukey, J. W. Components in regression. Biometrics, 1951, 7, 33– 69. 6Villegas, C. Confidence region for a linear relation. The Annals of Mathematical Statistics, 1964, 35, 780– 788. Citing Literature Volume1971, Issue2December 1971Pages i-9 ReferencesRelatedInformation