Regression

1. Regression • Regression • Specific statistical methods for finding the “line of best fit” for one response (dependent) numerical variable based on one or more explanatory (independent) variables.

2. Curve Fitting vs. Regression • Regression • Includes using statistical methods to assess the "goodness of fit" of the model.  (ex. Correlation Coefficient) Cause and effect Relationship between variables

3. Regression: 3 Main Purposes • To describe (or model) • To predict (or estimate) • To control (or administer)

4. Simple Linear Regression • Statistical method for finding • the “line of best fit” • for one response (dependent) numerical variable • based on one explanatory (independent) variable.  

5. Least Squares Regression • GOAL - minimize the sum of the square of the errors of the data points. • This minimizes the Mean Square Error

6. Steps to Reaching a Solution • Draw a scatterplot of the data. • Visually, consider the strength of the linear relationship. • If the relationship appears relatively strong, find the correlation coefficient as a numerical verification. • If the correlation is still relatively strong, then find the simple linear regression line.

7. Least square method • Interpreting the result: y = a + bx • The valueofbis the slope • The value of ais the y-intercept Deviation method = deviations taken from actual mean values of x and y Y – Y = byx (X – X ) byx= ∑dxdy – (∑dx∑dy) ; ∑dx2 – (∑dx)2 byx= r σ y σx

8. example • The hrd mgr of a company wants to find a measure which he can used to fix the monthly income of persons applying for a job in the production department. As an experimental project he collected data on 7 persons from that department referring to years of service and their monthly income. • Find regression equation of income on yrs of service. • What initial start would you recommend for a person applying for the job after having served in a similar capacity in another company for 13 yrs.

9. SINGLE REGRESSION Problem 1 N = 1000 Average Salary = Rs. 22,500 σ Rs. 9050 Average training score = 400 points σ 107 points Co- efficient of correlation between salary & training 0.82 (ryx = 0.82) Forecast salary from training score Solution Let Salary = Y Let Training score = X . ˙ . Y = Avg salary = 22,500 Std deviation = σ Y = 9050 Avg Training score = X = 400 . ˙ . Std deviation = σ X = 107 The Regression, equation of Y on X Y – Y = byx (X – X ) . ˙ . Y – 22,500 = [ (r) (σ y) ][X – 400] (σ x) Regression 1

10. . ˙ . Y – 22,500 = [ (0.82) (9050) ][X – 400] (107) . ˙ . Y – 22,500 = 69.36 (X – 400) . ˙ . Y = 69.36 X – 27744 + 22500 . ˙ . Y = 69.36 X – 5,244 If training score was 450 Then expected salary Y = 69.36 * 450 – 5244 = Rs 25,968 Regression 2

11. MULTIPLE REGRESSION Problem 2 Following are the Intercorrelation , Means and Standard Deviations of Leader Competence (y), Emotional Awareness of Others (X2) and Interpersonal Skills Scores (X3). Using the data derive a Multiple Regression Equation. Regression 3

12. Solution Leader Competence = X1 X1= 12 Emotional Awareness = X2X2 = 20 Interpersonal Skill = X3X3 = 18 r 12 = 0.75 σ 1= 3 r 13 = 0.85 σ 2 = 5 r 23 = 0.65 σ 3 = 4 The multiple regression equation is X1 = a + b12.3 (X2) + b13.2 (X3) To find b12.3 = σ 1[ r12 – (r13) (r23) ] = 3 [ 0.75 – 0.85 * 0.65 ] σ 21 – (r23)2 5 1 – (0.65)2 = 0.6 * 0.2 = 0.21 0.58 B13.2 = σ 1 [ r12 – (r12) (r23) ] = 3[ 0.85 – 0.75 * 0.65 ] σ 3 1 – (r23)2 4 1 – (0.65)2 = 0.75 * 0.36 = 0.47 0.58 Regression 4

13. To find ‘a’ X1 = a + b12.3 (X2) + b13.2 (X3) . ˙ . 12 = a + 0.21 (20) + 0.47 (18) . ˙ . 12 – 4.2 – 8.46 = a . ˙ . A = - 0.66 The Regression Equation is X1 = a + b12.3 ( X2) + b13.2 ( X3) . ˙ . X1 = - 0.66 + 0.21 (X2) + 0.47 (X3) Regression 5