![]() ![]() They indicate the deviation of each data point from the fitted line. Residuals are the differences between the observed Y values and the predicted Y values based on the regression line. It determines the covariance between X and Y. SP represents the sum of the products of the deviations of X and Y from their respective means. It quantifies the total variation in the X values from their mean. SSX measures the total sum of squares of the X variable. They indicate the central tendency of the data. Mean X and Mean Y represent the average values of the X and Y variables, respectively. They provide insights into the overall magnitude of the data. These values represent the total sum of the X and Y variables, respectively. For example, a correlation coefficient of 0.9 implies a strong positive relationship between X and Y. It ranges from -1 to +1, where -1 indicates a perfect negative correlation, +1 indicates a perfect positive correlation, and 0 suggests no correlation. The correlation coefficient measures the strength and direction of the linear relationship between X and Y. For example, an R-squared value of 0.85 means that 85% of the variation in Y can be explained by the X variable. R-squared ranges from 0 to 1, where 1 indicates a perfect fit. It indicates the proportion of the variance in the Y variable that can be explained by the X variable. R-squared measures the goodness-of-fit of the regression model. For instance, an intercept of 2 means that when X is zero, the predicted value of Y will be 2. ![]() ![]() It determines the starting point of the regression line on the Y-axis. The intercept represents the predicted value of Y when X is zero. For instance, a slope of 0.75 means that for every unit increase in X, the predicted value of Y increases by 0.75. A positive slope suggests a positive relationship between X and Y, while a negative slope implies an inverse relationship. The slope indicates the rate of change in the Y variable per unit change in the X variable. For example, if the equation is ŷ = 0.5X + 1, it means that for every unit increase in X, the predicted value of Y will increase by 0.5. The coefficient 'b' indicates the slope, and 'a' represents the intercept. This equation represents the relationship between the X and Y variables. How to Interpret Linear Regression Calculator Results Use these instructions to effectively utilize the Linear Regression Calculator for data analysis. Repeat or modify: You can repeat the process by entering new data points or modify the existing ones to explore different scenarios and observe how the regression analysis changes. This visual representation can provide further understanding of the data.ĥ. Visualize the fitted line plot: Below the results, a chart will be generated showing the data points and the fitted line based on the regression analysis. These insights will help you understand the relationship between the X and Y variables.Ĥ. View the results: The calculator will display various results, including the regression equation, slope, intercept, R-squared, correlation coefficient, and more. Click the "Calculate" button: After entering your data points, click the "Calculate" button to perform the linear regression analysis.ģ. Enter your data points: In the input fields labeled "X values" and "Y values," enter your data points separated by commas or spaces. ![]()
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