![]() In this example, the observed values fall an average of 7.3267 units from the regression line. The standard error of the regression is the average distance that the observed values fall from the regression line. In this example, the Adjusted R-squared is 0.4265. The adjusted R-squared can be useful for comparing the fit of different regression models to one another. This is a modified version of R-squared that has been adjusted for the number of predictors in the model. Related: What is a Good R-squared Value? Adjusted R-Squared In this example, the R-squared is 0.5307, which indicates that 53.07% of the variance in the final exam scores can be explained by the number of hours studied and the number of prep exams taken. The value for R-squared can range from 0 to 1. A value of 0 indicates that the response variable cannot be explained by the predictor variable at all. A value of 1 indicates that the response variable can be perfectly explained without error by the predictor variable. It is the proportion of the variance in the response variable that can be explained by the predictor variable. This is often written as r 2, and is also known as the coefficient of determination. In this example, the multiple R is 0.72855, which indicates a fairly strong linear relationship between the predictors study hours and prep exams and the response variable final exam score. Multiple R is the square root of R-squared (see below). A multiple R of 1 indicates a perfect linear relationship while a multiple R of 0 indicates no linear relationship whatsoever. It measures the strength of the linear relationship between the predictor variables and the response variable. Here is how to interpret each of the numbers in this section: Multiple R how well the regression model is able to “fit” the dataset. The first section shows several different numbers that measure the fit of the regression model, i.e. To analyze the relationship between hours studied and prep exams taken with the final exam score that a student receives, we run a multiple linear regression using hours studied and prep exams taken as the predictor variables and final exam score as the response variable. Suppose we have the following dataset that shows the total number of hours studied, total prep exams taken, and final exam score received for 12 different students: This tutorial walks through an example of a regression analysis and provides an in-depth explanation of how to read and interpret the output of a regression table. It’s important to know how to read this table so that you can understand the results of the regression analysis. When you use software (like R, SAS, SPSS, etc.) to perform a regression analysis, you will receive a regression table as output that summarize the results of the regression. In statistics, regression is a technique that can be used to analyze the relationship between predictor variables and a response variable.
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