Residuals in Regression Analysis
In regression analysis, residuals refer to the differences between the observed and predicted values from the regression model. These residuals are crucial in evaluating the accuracy and appropriateness of the regression model.
One way to understand the role of residuals in regression analysis is by examining the types of residuals:
Type of Residual | Description |
---|---|
Standardized Residuals | Residuals divided by their standard deviation. |
Studentized Residuals | Residuals divided by their estimated standard deviation. |
Pearson Residuals | Residuals divided by the square root of their expected variance. |
- These different types of residuals provide insights into the appropriateness of the regression model and the presence of outliers or influential data points.
- Residual analysis in regression helps identify potential problems with the model, such as heteroscedasticity or nonlinearity, and guides the refinement of the model to better fit the data.
- By examining residuals, statisticians can make informed decisions about the validity and reliability of the regression analysis results, ensuring accurate interpretations and conclusions.
Residual Analysis
Residual analysis is a powerful statistical technique used to assess the accuracy of regression models. By examining the differences between observed and predicted values, residual analysis provides information about the adequacy of the model fit. Researchers and analysts need this technique to make better decisions about the validity and reliability of their statistical models.
In this article, we will learn about Residual Analysis in detail.
Table of Content
- What is Residual Analysis?
- Residuals in Regression Analysis
- Residual Plots
- Types of Residual Plots
- ANOVA Residuals
- Residual Plot Analysis
- Assumptions Regarding Residuals in Linear Regression
- Software for Calculating Residual Analysis