1 / 70

Multiple Regression

Multiple Regression. Multiple Regression. The test you choose depends on level of measurement: Independent Variable Dependent Variable Test Dichotomous Interval-Ratio Independent Samples t-test Dichotomous Nominal Nominal Cross Tabs Dichotomous Dichotomous

erica-nolan
Download Presentation

Multiple Regression

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Multiple Regression

  2. Multiple Regression The test you choose depends on level of measurement: Independent Variable Dependent Variable Test Dichotomous Interval-Ratio Independent Samples t-test Dichotomous Nominal Nominal Cross Tabs Dichotomous Dichotomous Nominal Interval-Ratio ANOVA Dichotomous Dichotomous Interval-Ratio Interval-Ratio Bivariate Regression/Correlation Dichotomous Two or More… Interval-Ratio Dichotomous Interval-Ratio Multiple Regression

  3. Multiple Regression • Multiple Regression is very popular among social scientists. • Most social phenomena have more than one cause. • It is very difficult to manipulate just one social variable through experimentation. • Social scientists must attempt to model complex social realities to explain them.

  4. Multiple Regression • Multiple Regression allows us to: • Use several variables at once to explain the variation in a continuous dependent variable. • Isolate the unique effect of one variable on the continuous dependent variable while taking into consideration that other variables are affecting it too. • Write a mathematical equation that tells us the overall effects of several variables together and the unique effects of each on a continuous dependent variable. • Control for other variables to demonstrate whether bivariate relationships are spurious

  5. Multiple Regression • For example: A researcher may be interested in the relationship between Education and Income and Number of Children in a family. Independent Variables Education Family Income Dependent Variable Number of Children

  6. Multiple Regression • For example: • Research Hypothesis: As education of respondents increases, the number of children in families will decline (negative relationship). • Research Hypothesis: As family income of respondents increases, the number of children in families will decline (negative relationship). Independent Variables Education Family Income Dependent Variable Number of Children

  7. Multiple Regression • For example: • Null Hypothesis: There is no relationship between education of respondents and the number of children in families. • Null Hypothesis: There is no relationship between family income and the number of children in families. Independent Variables Education Family Income Dependent Variable Number of Children

  8. Multiple Regression • Bivariate regression is based on fitting a line as close as possible to the plotted coordinates of your data on a two-dimensional graph. • Trivariate regression is based on fitting a plane as close as possible to the plotted coordinates of your data on a three-dimensional graph. Case: 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 Children (Y): 2 5 1 9 6 3 0 3 7 7 2 5 1 9 6 3 0 3 7 14 2 5 1 9 6 Education (X1) 12 16 2012 9 18 16 14 9 12 12 10 20 11 9 18 16 14 9 8 12 10 20 11 9 Income 1=$10K (X2): 3 4 9 5 4 12 10 1 4 3 10 4 9 4 4 12 10 6 4 1 10 3 9 2 4

  9. Multiple Regression Y Plotted coordinates (1 – 10) for Education, Income and Number of Children 0 X2 X1 Case: 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 Children (Y): 2 5 1 9 6 3 0 3 7 7 2 5 1 9 6 3 0 3 7 14 2 5 1 9 6 Education (X1) 12 16 2012 9 18 16 14 9 12 12 10 20 11 9 18 16 14 9 8 12 10 20 11 9 Income 1=$10K (X2): 3 4 9 5 4 12 10 1 4 3 10 4 9 4 4 12 10 6 4 1 10 3 9 2 4

  10. Multiple Regression Y What multiple regression does is fit a plane to these coordinates. 0 X2 X1 Case: 1 2 3 4 5 6 7 8 9 10 Children (Y): 2 5 1 9 6 3 0 3 7 7 Education (X1) 12 16 2012 9 18 16 14 9 12 Income 1=$10K (X2): 3 4 9 5 4 12 10 1 4 3

  11. Multiple Regression • Mathematically, that plane is: Y = a + b1X1 + b2X2 a = y-intercept, where X’s equal zero b=coefficient or slope for each variable For our problem, SPSS says the equation is: Y = 11.8 - .36X1 - .40X2 Expected # of Children = 11.8 - .36*Educ - .40*Income  

  12. Multiple Regression • Let’s take a moment to reflect… Why do I write the equation: Y = a + b1X1 + b2X2 Whereas KBM often write: Yi = a + b1X1i + b2X2i + ei One is the equation for a prediction, the other is the value of a data point for a person. 

  13. Multiple Regression 57% of the variation in number of children is explained by education and income!  Y = 11.8- .36X1- .40X2

  14. Multiple Regression r2   (Y – Y)2- (Y – Y)2  (Y – Y)2  Y = 11.8- .36X1- .40X2 161.518 ÷ 261.76 = .573

  15. Multiple Regression So what does our equation tell us? Y = 11.8 - .36X1 - .40X2 Expected # of Children = 11.8 - .36*Educ - .40*Income Try “plugging in” some values for your variables. 

  16. Multiple Regression So what does our equation tell us? Y = 11.8 - .36X1 - .40X2 Expected # of Children = 11.8 - .36*Educ - .40*Income If Education equals:& If Income Equals: Then, children equals: 0 0 11.8 10 0 8.2 10 10 4.2 20 10 0.6 20 11 0.2 ^

  17. Multiple Regression So what does our equation tell us? Y = 11.8 - .36X1 - .40X2 Expected # of Children = 11.8 - .36*Educ - .40*Income If Education equals:& If Income Equals: Then, children equals: 1 0 11.44 1 1 11.04 1 5 9.44 1 10 7.44 1 15 5.44 ^

  18. Multiple Regression So what does our equation tell us? Y = 11.8 - .36X1 - .40X2 Expected # of Children = 11.8 - .36*Educ - .40*Income If Education equals:& If Income Equals: Then, children equals: 0 1 11.40 1 1 11.04 5 1 9.60 10 1 7.80 15 1 6.00 ^

  19. Multiple Regression If graphed, holding one variable constant produces a two-dimensional graph for the other variable. 11.44 Y 11.40 Y b = -.36 b = -.4 6.00 5.44 0 15 0 15 X1 = Education X2 = Income

  20. Multiple Regression • An interesting effect of controlling for other variables is “Simpson’s Paradox.” • The direction of relationship between two variables can change when you control for another variable.  + Education Crime Rate Y = -51.3 + 1.5X

  21. Multiple Regression • “Simpson’s Paradox”  + Education Crime Rate Y = -51.3 + 1.5X1 + Education Urbanization (is related to both) + Crime Rate Regression Controlling for Urbanization - Education  Crime Rate Y = 58.9 - .6X1 + .7X2 + Urbanization

  22. Multiple Regression Crime Original Regression Line Looking at each level of urbanization, new lines Rural Small town Suburban City Education

  23. Multiple Regression Now… More Variables! • The social world is very complex. • What happens when you have even more variables? • For example: A researcher may be interested in the effects of Education, Income, Sex, and Gender Attitudes on Number of Children in a family. Independent Variables Education Family Income Sex Gender Attitudes Dependent Variable Number of Children

  24. Multiple Regression • Research Hypotheses: • As education of respondents increases, the number of children in families will decline (negative relationship). • As family income of respondents increases, the number of children in families will decline (negative relationship). • As one moves from male to female, the number of children in families will increase (positive relationship). • As gender attitudes get more conservative, the number of children in families will increase (positive relationship). Independent Variables Education Family Income Sex Gender Attitudes Dependent Variable Number of Children

  25. Multiple Regression • Null Hypotheses: • There will be no relationship between education of respondents and the number of children in families. • There will be no relationship between family income and the number of children in families. • There will be no relationship between sex and number of children. • There will be no relationship between gender attitudes and number of children. Independent Variables Education Family Income Sex Gender Attitudes Dependent Variable Number of Children

  26. Multiple Regression • Bivariate regression is based on fitting a line as close as possible to the plotted coordinates of your data on a two-dimensional graph. • Trivariate regression is based on fitting a plane as close as possible to the plotted coordinates of your data on a three-dimensional graph. • Regression with more than two independent variables is based on fitting a shape to your constellation of data on an multi-dimensional graph.

  27. Multiple Regression • Regression with more than two independent variables is based on fitting a shape to your constellation of data on an multi-dimensional graph. • The shape will be placed so that it minimizes the distance (sum of squared errors) from the shape to every data point.

  28. Multiple Regression • Regression with more than two independent variables is based on fitting a shape to your constellation of data on an multi-dimensional graph. • The shape will be placed so that it minimizes the distance (sum of squared errors) from the shape to every data point. • The shape is no longer a line, but if you hold all other variables constant, it is linear for each independent variable.

  29. Multiple Regression Y Imagining a graph with four dimensions! Y Y Y Y 0 X2 X1 0 0 0 X2 0 X1 X2 X1 X2 X1 X2 X1

  30. Multiple Regression For our problem, our equation could be: Y = 7.5 - .30X1 - .40X2 + 0.5X3 + 0.25X4 E(Children) = 7.5 - .30*Educ - .40*Income + 0.5*Sex + 0.25*Gender Att. 

  31. Multiple Regression So what does our equation tell us? Y = 7.5 - .30X1 - .40X2 + 0.5X3 + 0.25X4 E(Children) = 7.5 - .30*Educ - .40*Income + 0.5*Sex + 0.25*Gender Att. Education: Income: Sex: Gender Att: Children: 10 5 0 0 2.5 10 5 0 5 3.75 10 10 0 5 1.75 10 5 1 0 3.0 10 5 1 5 4.25 ^

  32. Multiple Regression Each variable, holding the other variables constant, has a linear, two-dimensional graph of its relationship with the dependent variable. Here we hold every other variable constant at “zero.” 7.5 Y Y 7.5 b = -.3 b = -.4 4.5 3.5 0 10 0 10 X2 = Education X1 = Income ^ Y = 7.5 - .30X1 - .40X2 + 0.5X3 + 0.25X4

  33. Multiple Regression Each variable, holding the other variables constant, has a linear, two-dimensional graph of its relationship with the dependent variable. Here we hold every other variable constant at “zero.” 8.75 b = .25 Y Y 8 b = .5 7.5 7.5 0 1 0 5 X3 = Sex X4 = Gender Attitudes ^ Y = 7.5 - .30X1 - .40X2 + 0.5X3 + 0.25X4

  34. Multiple Regression:SPSS Model Summary • R2 • TSS – SSE / TSS • TSS = Distance from mean to value on Y for each case • SSE = Distance from shape to value on Y for each case • Can be interpreted the same for multiple regression—joint explanatory value of all of your variables (or “your model”) • Can request a change in R2 test from SPSS to see if adding new variables improves the fit of your model

  35. Multiple Regression:SPSS Model Summary • R • The correlation of your actual Y value and the predicted Y value using your model for each person • Adjusted R2 • Explained variation can never go down when new variables are added to a model. • Because R2 can never go down, some statisticians figured out a way to adjust R2 by the number of variables in your model. • This is a way of ensuring that your explanatory power is not just a product of throwing in a lot of variables. Average deviation from the regression shape.

  36. Multiple Regression:BLUE Criteria The BLUE Regression Criteria • Regression forces a best-fitting model (a “straight-edges” shape so to speak) onto data (data-points constellation so to speak). If the model (shape) is appropriate for the data (constellation), regression should be used. • But how do we know that our “straight-edges” model (shape) is appropriate for the data (constellation)? • Criteria for determining whether a regression (straight-edge) model is appropriate for the data (constellation) are nicknamed “BLUE” for best linear unbiased estimate.

  37. Multiple Regression:BLUE Criteria The BLUE Regression Criteria • Violating the BLUE assumptions may result in biased estimates or incorrect significance tests. (However, OLS is robust to most violations.) • Data (constellation) should meet these criteria: • The relationship between the dependent variable and its predictors is linear • No irrelevant variables are either omitted from or included in the equation. (Good luck!) • All variables are measured without error. (Good luck!)

  38. Multiple Regression:BLUE Criteria • The relationship between the dependent variable and its predictors is linear • No irrelevant variables are either omitted from or included in the equation. (Good luck!) • All variables are measured without error. (Good luck!) • The error term (ei) for a single regression equation has the following properties: • Error is normally distributed • The mean of the errors is zero • The errors are independently distributed with constant variances (homoscedasticity) • Each predictor is uncorrelated with the equation’s error term* *Omitted variable, IV measurement error, time series missing t – 1 variables affecting IV, simultaneity IV  DV

  39. Multiple Regression:Multicollinearity Controlling for other variables means finding how one variable affects the dependent variable at each level of the other variables. So what if two of your independent variables were highly correlated with each other??? Control, Typical Income Multicollinearity Control, Multicollinear Years on Job 0 Age

  40. Multiple Regression Income Multicollinearity So what if two of your independent variables were highly correlated with each other??? (this is the problem called multicollinearity) How would one have a relationship independent of the other? Years on Job 0 Age As you hold one constant, you in effect hold the other constant! Each variable would have the same value for the dependent variable at each level, so the partial effect on the dependent variable for each may be 0.

  41. Multiple Regression Multicollinearity • Some solutions for multicollinearity: • Remove some of the variables • Create a scale out of repetitive variables (making one variable out of several) • Run separate models with each independent variable

  42. Multiple Regression • Dummy Variables • They are simply dichotomous variables that are entered into regression. They have 0 – 1 coding where 0 = absence of something and 1 = presence of something. E.g., Female (0=M; 1=F) or Southern (0=Non-Southern; 1=Southern). What are dummy variables?!

  43. Multiple Regression Dummy Variables are especially nice because they allow us to use nominal variables in regression. But YOU said we CAN’Tdo that! A nominal variable has no rank or order, rendering the numerical coding scheme useless for regression.

  44. Multiple Regression • The way you use nominal variables in regression is by converting them to a series of dummy variables. Recode into different Nomimal VariableDummy Variables Race 1. White 1 = White 0 = Not White; 1 = White 2 = Black 2. Black 3 = Other 0 = Not Black; 1 = Black 3. Other 0 = Not Other; 1 = Other

  45. Multiple Regression • The way you use nominal variables in regression is by converting them to a series of dummy variables. Recode into different Nomimal VariableDummy Variables Religion 1. Catholic 1 = Catholic 0 = Not Catholic; 1 = Catholic 2 = Protestant 2. Protestant 3 = Jewish 0 = Not Prot.; 1 = Protestant 4 = Muslim 3. Jewish 5 = Other Religions 0 = Not Jewish; 1 = Jewish 4. Muslim 0 = Not Muslim; 1 = Muslim 5. Other Religions 0 = Not Other; 1 = Other Relig.

  46. Multiple Regression • When you need to use a nominal variable in regression (like race), just convert it to a series of dummy variables. • When you enter the variables into your model, you MUST LEAVE OUT ONE OF THE DUMMIES. Leave Out OneEnter Rest into Regression White Black Other

  47. Multiple Regression • The reason you MUST LEAVE OUT ONE OF THE DUMMIES is that regression is mathematically impossible without an excluded group. • If all were in, holding one of them constant would prohibit variation in all the rest. Leave Out OneEnter Rest into Regression Catholic Protestant Jewish Muslim Other Religion

  48. Multiple Regression • The regression equations for dummies will look the same. For Race, with 3 dummies, predicting self-esteem: Y = a + b1X1 + b2X2  a = the y-intercept, which in this case is the predicted value of self-esteem for the excluded group, white. b1 = the slope for variable X1, black b2 = the slope for variable X2, other

  49. Multiple Regression • If our equation were: For Race, with 3 dummies, predicting self-esteem: Y = 28 + 5X1 – 2X2 Plugging in values for the dummies tells you each group’s self-esteem average: White = 28 Black = 33 Other = 26  a = the y-intercept, which in this case is the predicted value of self-esteem for the excluded group, white. 5 = the slope for variable X1, black -2 = the slope for variable X2, other When cases’ values for X1 = 0 and X2 = 0, they are white; when X1 = 1 and X2 = 0, they are black; when X1 = 0 and X2 = 1, they are other.

  50. Multiple Regression • Dummy variables can be entered into multiple regression along with other dichotomous and continuous variables. • For example, you could regress self-esteem on sex, race, and education: Y = a + b1X1 + b2X2 + b3X3 + b4X4 How would you interpret this? Y = 30 – 4X1 + 5X2 – 2X3 + 0.3X4  X1 = Female X2 = Black X3 = Other X4 = Education 

More Related