About AAP Statistical Calculations
Standard Deviation
The primary statistical test for utilization and adverse impact is calculating the standard deviation. A standard deviation score of 2.00 or greater is considered statistically significant.
For utilization: [(Availability x total employees in the job group) - number of protected class employees] divided by the square root of [(1 - Availability ) x Availability x total employees in the job group]
For adverse impact of positive actions: Non-protected class selection rate - protected class selection rate divided by the square root of (overall selection rate *(1-overall selection rate) * ((1/total protected) + (1/total non-protected))
For adverse impact of negative actions: Protected class selection rate - non-protected class selection rate divided by the square root of (overall selection rate *(1-overall selection rate) * ((1/total protected) + (1/total non-protected))
Exact Binomial
Used to test statistical significance for difference between employment and availability; use if job group is fewer than 30 employees. An exact binomial result of .05 or less is considered statistically significant.
P^N + (((N/1) * P^(N -1)*Q)) + (((N * (N-1))/(1 * 2))) * (P^(N-2) * Q^2) + (((N * (N-1) * (N-2))/(1 * 2 * 3))) * (P^(N-3) * Q^3) + .... + Q^N Where: P = The probability of being non-protected (1 - availability of the protected group) Q = The probability of being protected (the availability) N = The number of people in the group (i.e. the number of trials)
The aggregation of the expanded members should only include up to the number of protected members + 1 (i.e., only add the first four expansion terms when there are three protected members in the group).
In the exact binomial formula, the "^" is the symbol for an exponential.
Fisher’s Exact Test
For Adverse Impact, if there are fewer than 30 incumbents or applicants in the the job group, the Fisher’s Exact Test will be used to test significance. FET scores of .025 or lower are considered statistically significant. The threshold of 30 can be adjusted in the Plan Settings screen, if desired.
The Fishers Exact Test calculation is too complicated to be described here.
Rule of Nines
When selecting Significant Difference as your utilization rule, you can select an alternate rule as well. The alternate rule will be used instead of the significant difference rule if the group size is too small, as determined by the Rule of Nines test.
The formula is the total number in the group multiplied by the protected class availability multiplied by its complement. The result should be greater than nine to rely on standard deviation as a test of significance. (job group total) * (protected class availability) * (1 – protected class availability)
Example: ////
If a job group has 76 employees and the availability for minorities is 7.8%, the formula would be 76 x .078 x (1 - .078) = 5.47 In this instance, the validity of standard deviation to measure the significance of any differences between minority availability and employment would be questionable.
The use of this rule is infrequent because it may establish too high a “small group” threshold. For example, under the Rule of Nines any job group with less than 36 employees will score less than 9. Some statisticians would set a lower absolute threshold.