Multivariate Statistics: Regression, Correlation, and Prediction Models
Chapter 7
Using Multivariate Statistics
Multiple Regression
Multiple Correlation
What’s the difference between regression and correlation?
Cutoff and Multiple Cutoff Models
Validity Generalization & Replication
Chap 7 Multivariate Statistics
1
Compensatory Prediction Models
Table 7.1
Composite Trait Scores for 3 Candidates, A, B, C
Questions when summing scores (compensatory) are:
1. To weight or not to weight
2. Is a deficiency in one (or more) traits critical?
Without weights (top)
All composite scores are
equal
: Sum = 30
All 3 traits weighted equally (unit weighting)
With weights (bottom)
All composite scores are
different:
60, 58, 45
If trait 2 is critical, is an additive model appropriate?
Hint: look at candidate C
Chap 7 Multivariate Statistics
2
COMPENSATORY PREDICTION MODELS
Regression Equations
Y = a + b
1
X
1
+ b
2
X
2
what’s the difference between b and
β
weights?
Why use one or the other?
Multiple Correlation
How are the correlations among the predictors related to the
multiple R?
Would you want high correlations among predictors?
Suppressors and Moderator Variables
Suppressor variables explained
Suppressors
How could reading ability act as a suppressor for security
guard performance?
Moderators
How could social skills moderate the conscientiousness-
performance relationship?
Other Additive Composites
Unit weighting is usually sufficient
(Bobko, Roth, & Buster, 2007)
Could you add veterans’ preference or religious preference?
Chap 7 Multivariate Statistics
3
Non-compensatory models
Based on Cutoffs
Multiple Cutoff Models
Two situations warrant it:
1. vital trait
2. if variance is too low (small) to yield sig
r.
What can happen if cutoffs are all:
very low?
all very high?
Sequential Hurdles (multiple hurdles)
(fig 7.2)
When could this be useful?
Is it every advisable to select at random?
Chap 7 Multivariate Statistics
4
Non-compensatory models
Based on Cutoffs
Norm-Referenced and Domain-Referenced Cutoffs
Norm-referenced: Note Figure 7.1
Score of 12 is considered
Poor (Group A) %ile rank of 24.6
Good (Group B) %ile rank of 54.0
Excellent (Group C) %le rank of 99.2
Domain-referenced (criterion referenced)
The domain, not a point in the score distribution (e.g.
12)
Is the criterion
(bar to reach)
For a Mechanic
aptitude (norm-referenced)
Certification (domain referenced)
Chap 7 Multivariate Statistics
5
Non-compensatory models
Based on Cutoffs
Cutoff based on Local Information
Instead of using national or published norms
Cutoffs can be established by:
Looking at test construction or validation process
Contrasting Groups
Identify high and low groups
Predictive Yield Method
Hire good applicants when available
Need to know future need and probable qualifications
Regression-Based Methods
Solve regression equation for X desired
Judgmental Methods
Angoff (1971) Method –SMEs decide cutoff score
Chap 7 Multivariate Statistics
6
Non-compensatory models
Based on Cutoffs
Multiple Cutoff Methods
Non-compensatory – each must be vital to performance
Only when predictors are
perfectly reliable
Partial Compensatory
Compensatory
Cut Score Caveats
Not for convenience -
done too often
Dichotomization –
rarely justified
Justified in some situations:
1. civil service; 2. License/ certification;
3. Cyclical hiring; 4. sequential (e.g minimal quals)
Chap 7 Multivariate Statistics
7
REPLICATION AND CROSS-
VALIDATION
Replication
Repeating the original study
Seldom do validity coefficients replicate
Cross Validation (for MR)
Do regression weights hold up in a different
sample
Why is cross validation necessary?
Hint: Shrinkage
Chap 7 Multivariate Statistics
8
Validity Generalization
(
we know about this!)
Situational Specificity v.
Validity Generalization
Special form of meta-analysis
All validity coefficients (across studies)
Would be the same if not for Artifacts
Hunter & Schmidt (‘90)
Reject SS if:
75 % of the variance in coefficients is explained
by known artifacts
Hunter & Schmidt (1990)
Chap 7 Multivariate Statistics
9
Explore the differences between regression and correlation, learn about compensatory prediction models, understand the role of suppressor and moderator variables, and delve into non-compensatory models based on cutoffs in multivariate statistics.
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Presentation Transcript
Chapter 7 Using Multivariate Statistics Multiple Regression Multiple Correlation What s the difference between regression and correlation? Cutoff and Multiple Cutoff Models Validity Generalization & Replication Chap 7 Multivariate Statistics 1
Compensatory Prediction Models Table 7.1 Composite Trait Scores for 3 Candidates, A, B, C Questions when summing scores (compensatory) are: 1. To weight or not to weight 2. Is a deficiency in one (or more) traits critical? Without weights (top) All composite scores are equal: Sum = 30 All 3 traits weighted equally (unit weighting) With weights (bottom) All composite scores are different: 60, 58, 45 If trait 2 is critical, is an additive model appropriate? Hint: look at candidate C Chap 7 Multivariate Statistics 2
COMPENSATORY PREDICTION MODELS Regression Equations Y = a + b1X1 + b2X2 what s the difference between b and weights? Why use one or the other? Multiple Correlation How are the correlations among the predictors related to the multiple R? Would you want high correlations among predictors? Suppressors and Moderator Variables Suppressor variables explained Suppressors How could reading ability act as a suppressor for security guard performance? Moderators How could social skills moderate the conscientiousness- performance relationship? Other Additive Composites Unit weighting is usually sufficient (Bobko, Roth, & Buster, 2007) Could you add veterans preference or religious preference? Chap 7 Multivariate Statistics 3
Non-compensatory models Based on Cutoffs Multiple Cutoff Models Two situations warrant it: 1. vital trait 2. if variance is too low (small) to yield sig r. What can happen if cutoffs are all: very low? all very high? Sequential Hurdles (multiple hurdles) (fig 7.2) When could this be useful? Is it every advisable to select at random? Chap 7 Multivariate Statistics 4
Non-compensatory models Based on Cutoffs Norm-Referenced and Domain-Referenced Cutoffs Norm-referenced: Note Figure 7.1 Score of 12 is considered Poor (Group A) %ile rank of 24.6 Good (Group B) %ile rank of 54.0 Excellent (Group C) %le rank of 99.2 Domain-referenced (criterion referenced) The domain, not a point in the score distribution (e.g. 12) Is the criterion (bar to reach) For a Mechanic aptitude (norm-referenced) Certification (domain referenced) Chap 7 Multivariate Statistics 5
Non-compensatory models Based on Cutoffs Cutoff based on Local Information Instead of using national or published norms Cutoffs can be established by: Looking at test construction or validation process Contrasting Groups Identify high and low groups Predictive Yield Method Hire good applicants when available Need to know future need and probable qualifications Regression-Based Methods Solve regression equation for X desired Judgmental Methods Angoff (1971) Method SMEs decide cutoff score Chap 7 Multivariate Statistics 6
Non-compensatory models Based on Cutoffs Multiple Cutoff Methods Non-compensatory each must be vital to performance Only when predictors are perfectly reliable Partial Compensatory Compensatory Cut Score Caveats Not for convenience -done too often Dichotomization rarely justified Justified in some situations: 1. civil service; 2. License/ certification; 3. Cyclical hiring; 4. sequential (e.g minimal quals) Chap 7 Multivariate Statistics 7
REPLICATION AND CROSS- VALIDATION Replication Repeating the original study Seldom do validity coefficients replicate Cross Validation (for MR) Do regression weights hold up in a different sample Why is cross validation necessary? Hint: Shrinkage Chap 7 Multivariate Statistics 8
Validity Generalization (we know about this!) Situational Specificity v. Validity Generalization Special form of meta-analysis All validity coefficients (across studies) Would be the same if not for Artifacts Hunter & Schmidt ( 90) Reject SS if: 75 % of the variance in coefficients is explained by known artifacts Hunter & Schmidt (1990) Chap 7 Multivariate Statistics 9
