5.9: Multicollinearity

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Multicollinearity occurs when two or more independent variables in a regression model are highly correlated. This makes it difficult to isolate the individual effect of each predictor and can result in unstable estimates of regression coefficients.

Why Multicollinearity Matters

High multicollinearity inflates the standard errors of the coefficients, making them statistically insignificant even if they are practically important. This undermines the interpretability of the model.

How to Detect

Correlation matrix of independent variables
(NOTE: Multicollinearity is detected if the absolute value of the correlation coefficient between any two variables is greater than or equal to 0.7.)

The following video shows how to generate a correlation matrix in Excel and use Conditional Formatting (in Excel) to color-code correlation coefficients based on their values. Correlation Matrix in Excel
Variance Inflation Factor (VIF): A VIF above 5 (or 10, in some guidelines) suggests problematic multicollinearity. (NOTE: VIF is not supported in Excel.)

What to Do if Multicollinearity is Detected

Drop one of the correlated variables
Combine variables (e.g., sum or average)
Use regularized regression techniques like Ridge or Lasso (see Appendix)

Addressing multicollinearity ensures that each predictor contributes unique information to the model, resulting in more reliable coefficient estimates and clearer interpretation. However, even with a well-structured model, extreme or unusual data points—known as outliers—can disproportionately influence the regression line. Identifying and managing outliers is the next critical step in ensuring that your regression model reflects the overall data pattern rather than being skewed by a few atypical observations.

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