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Chapter 12a Simple Linear Regression. Simple Linear Regression Model Least Squares Method Coefficient of Determination Model Assumptions. Regression may be the most widely used statistical technique in the social and natural sciences—as well as in business. Simple Linear Regression Model.
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Chapter 12a Simple Linear Regression • Simple Linear Regression Model • Least Squares Method • Coefficient of Determination • Model Assumptions
Regression may be the most widely used statistical technique in the social and natural sciences—as well as in business
Simple Linear Regression Model • The equation that describes how y is related to x and • an error term is called the regression model. • The simple linear regression model is: y = b0 + b1x +e where: • b0 and b1 are called parameters of the model, • e is a random variable called the error term.
Simple Linear Regression Equation • The simple linear regression equation is: E(y) = 0 + 1x • Graph of the regression equation is a straight line. • b0 is the y intercept of the regression line. • b1 is the slope of the regression line. • E(y) is the expected value of y for a given x value.
E(y) x Simple Linear Regression Equation • Positive Linear Relationship Regression line Intercept b0 Slope b1 is positive
E(y) x Simple Linear Regression Equation • Negative Linear Relationship Regression line Intercept b0 Slope b1 is negative
E(y) x Simple Linear Regression Equation • No Relationship Regression line Intercept b0 Slope b1 is 0
is the estimated value of y for a given x value. Estimated Simple Linear Regression Equation • The estimated simple linear regression equation • The graph is called the estimated regression line. • b0 is the y intercept of the line. • b1 is the slope of the line.
Sample Data: x y x1 y1 . . . . xnyn Estimated Regression Equation Sample Statistics b0, b1 Estimation Process Regression Model y = b0 + b1x +e Regression Equation E(y) = b0 + b1x Unknown Parameters b0, b1 b0 and b1 provide estimates of b0 and b1
^ yi = estimated value of the dependent variable for the ith observation Least Squares Method • Least Squares Criterion where: yi = observed value of the dependent variable for the ith observation
Least Squares Method • Slope for the Estimated Regression Equation
_ _ x = mean value for independent variable y = mean value for dependent variable Least Squares Method • y-Intercept for the Estimated Regression Equation where: xi = value of independent variable for ith observation yi = value of dependent variable for ith observation n = total number of observations
Example: Reed Auto Sales • Simple Linear Regression Reed Auto periodically has a special week-long sale. As part of the advertising campaign Reed runs one or more television commercials during the weekend preceding the sale. Data from a sample of 5 previous sales are shown on the next slide.
Example: Reed Auto Sales • Simple Linear Regression Number of TV Ads Number of Cars Sold 1 3 2 1 3 14 24 18 17 27
Estimated Regression Equation • Slope for the Estimated Regression Equation • y-Intercept for the Estimated Regression Equation • Estimated Regression Equation
Using Excel to Develop a Scatter Diagram andCompute the Estimated Regression Equation • Formula Worksheet (showing data)
Using Excel to Develop a Scatter Diagram andCompute the Estimated Regression Equation • Producing a Scatter Diagram Step 1Select cells B1:C6 Step 2Select the Chart Wizard Step 3When the Chart Type dialog box appears: Choose XY (Scatter) in the Chart type list Choose Scatter from the Chart sub-type display Click Next > Step 4When the Chart Source Data dialog box appears Click Next >
Using Excel to Develop a Scatter Diagram andCompute the Estimated Regression Equation • Producing a Scatter Diagram Step 5When the Chart Options dialog box appears: Select the Titles tab and then Delete Cars Sold in the Chart title box Enter TV Ads in the Value (X) axis box Enter Cars Sold in the Value (Y) axis box Select the Legend tab and then Remove the check in the Show Legend box Click Next >
Using Excel to Develop a Scatter Diagram andCompute the Estimated Regression Equation • Producing a Scatter Diagram Step 6When the Chart Location dialog box appears: Specify the location for the new chart Select Finish to display the scatter diagram
Using Excel to Develop a Scatter Diagram andCompute the Estimated Regression Equation • Adding the Trendline Step 1Position the mouse pointer over any data point and right click to display the Chart menu Step 2Choose the Add Trendlineoption Step 3When the Add Trendline dialog box appears: On the Type tab select Linear On the Options tab select the Display equation on chart box Click OK
Coefficient of Determination • Relationship Among SST, SSR, SSE SST = SSR + SSE where: SST = total sum of squares SSR = sum of squares due to regression SSE = sum of squares due to error
Coefficient of Determination • The coefficient of determination is: r2 = SSR/SST where: SSR = sum of squares due to regression SST = total sum of squares
Coefficient of Determination r2 = SSR/SST = 100/114 = .8772 The regression relationship is very strong; 88% of the variability in the number of cars sold can be explained by the linear relationship between the number of TV ads and the number of cars sold.
Using Excel to Computethe Coefficient of Determination • Producing r 2 Step 1 Position the mouse pointer over any data point in the scatter diagram and right click Step 2 When the Chart menu appears: Choose the Add Trendline option Step 3 When the Add Trendline dialog box appears: On the Options tab, select the Display R-squared value on chart box Click OK
Using Excel to Computethe Coefficient of Determination • Value Worksheet (showing r2)
where: b1 = the slope of the estimated regression equation Sample Correlation Coefficient
The sign of b1 in the equation is “+”. Sample Correlation Coefficient rxy = +.9366
Assumptions About the Error Term e 1. The error is a random variable with mean of zero. 2. The variance of , denoted by 2, is the same for all values of the independent variable. 3. The values of are independent. 4. The error is a normally distributed random variable.