Open AccessA Generalization of Pythagoras's Theorem and Application to Explanations of Variance Contributions in Linear Models
Author(s) -
Carlson James E.
Publication year - 2014
Publication title -
ets research report series
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.235
H-Index - 5
ISSN - 2330-8516
DOI - 10.1002/ets2.12018
Subject(s) - generalization , variance (accounting) , mathematics , variable (mathematics) , pythagorean theorem , least squares function approximation , variables , calculus (dental) , algebra over a field , econometrics , statistics , pure mathematics , geometry , mathematical analysis , business , medicine , accounting , dentistry , estimator
Many aspects of the geometry of linear statistical models and least squares estimation are well known. Discussions of the geometry may be found in many sources. Some aspects of the geometry relating to the partitioning of variation that can be explained using a little‐known theorem of Pappus and have not been discussed previously are the topic of this report. I discuss, using the theorem, how geometric explanation helps us understand issues relating to contributions of independent variables to explanation of variance in a dependent variable. A particular concern that the theorem helps explain involves nonorthogonal linear models including correlated regressors and analysis of variance.