Assignment 2: LASA 1: Linear Regression
Assignment 2: LASA 1: Linear Regression
In this assignment, you will use a spreadsheet to examine pairs of variables, using the method of linear regression, to determine if there is any correlation between the variables. Afterwards, you will postulate whether this correlation reveals a causal relationship (and why).
Click here to open the Excel spreadsheet containing the data for this assignment.
This spreadsheet contains the data from a study that attempted to see if there is a correlation between the hours that students studied and the grade that they earned on a test. The correlation test you are about to run will help you to determine if there is, in fact, a correlation between study time and test score. If you find a strong correlation, then you will postulate whether you feel this indicates a causal relationship.
Below are instructions on how to perform this correlation test in Microsoft Excel.
In the Excel spreadsheet, perform the following operations:
 Save the spreadsheet to your computer.
 With your mouse, highlight all of the data on the spreadsheet in columns A and B.
 In the tabs at the top of the page, click Insert.
 In the Insert ribbon, in the Charts section, click Scatter. Be sure to select the option where it will just plot dots, it will be called Scatter with only Markers. If you do this right, then you’ll see a chart on the page.
 Now, on the chart, rightclick on one of the data points (dots). Just pick a dot somewhere near the middle of the distribution.
 Select Add Trendline from the dropdown menu that appears when you rightclick on a dot.
 A new menu will appear. Select Linear, select Automatic, and click the boxes next to Display Equation on chart and Display rsquared value on chart.
 Click Close.
 Now, you should see a line drawn through the dots. It will roughly cut through the middle of the dot distribution.
 You’ll also see the linear regression equation and r^{2} value displayed next to the line.
To see an example spreadsheet containing a completed analysis click here.
Now that you’ve completed your analysis and determined the linear regression formula and r^{2}, it is now time to report on the results of your study and examine your findings.
In a Microsoft Word document, respond to the following:
 Report the sample you selected and the question that was explored in the study.
 Report the r^{2} linear correlation coefficient and the linear regression equation produced in the Excel spreadsheet.
 What would be the value of Pearson’s r (simply the square root of r^{2})?
 Would Pearson’s r be positive or negative? What does this imply about the relationship between the factors in this study?
 What is the implication of any correlation found between the variables in the study you picked?
 Does this correlation imply a causal relationship? Explain.
 Are there other variables that you think should have been examined that would have improved this study or helped to pinpoint what factors are causal?
For this assignment, you will submit a spreadsheet and a report. The spreadsheet will be the Microsoft Excel file containing your scatterplot and analysis. Name your Microsoft Excel file as follows: LastnameFirstInitial_M3_A2.xls.
The report will be a Microsoft Word document in which you will address all of the questions in this assignment in the form of a narrative. Name your Microsoft Word document as follows: LastnameFirstInitial_M3_A2.docx.
Submit both files to the M3: Assignment 2 Dropbox by Tuesday, July 7, 2015.
Assignment 2 Grading Criteria 
Maximum Points

Complete scatterplot and attach as an Excel file (the fraction of variation in one variable should be accounted for by variation of the other). 
56

Report the r^{2} correlation coefficient and linear regression equation with slope and intercept included and state whether the value of r is positive or negative. 
96

Explain the implication of any linear relation, including its three components (scatterplot, r^{2} value and linear equation) found between hours spent studying, and the exam score earned. 
48

Total: 
200
