Do selection researchers regularly square validity/correlation coefficients?

Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) recommendation mentioned above is premised on the following statement: “researchers regularly evaluate the effectiveness of selection measures based on the variance they account for in overall job performance ratings” (italic added). As early as 1965, “the validity coefficient is usually defined as the correlation of test score with outcome or criterion score” (Cronbach & Gleser, Reference Cronbach and Gleser1965, p. 31). Although we understand that (multiple) correlations (r, R) are habitually squared and interpreted as variance accounted for (perhaps due to the field’s heavy reliance on regression), this is not the regular case among scholars and professional practitioners in personnel selection (e.g., Society for Industrial and Organizational Psychology, 2018).Footnote ¹ Instead, most of them usually quantify the effectiveness of a selection procedure using an operational validity/correlation coefficient, which is the observed validity/correlation corrected for measurement error in job performance ratings and range restriction on the predictor and, if possible, the criterion (e.g., Schmidt & Hunter, Reference Schmidt and Hunter1998; Viswesvaran et al., Reference Viswesvaran, Ones, Schmidt, Le and Oh2014, figure 1). Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) recommendation (squaring observed validities/correlations as the first step) also runs counter to their Footnote 1—“see Funder and Ozer (Reference Funder and Ozer2019) for a discussion about how the widespread practice of squaring correlations to estimate variance explained is actually a highly misleading metric.”

Why is it problematic to square validity/correlation coefficients and compare them?

Jensen (Reference Jensen1998) argued, “the common habit of squaring the validity (correlation) coefficient to obtain the proportion of variance in the criterion accounted for by the linear regression of criterion measures on test scores, although not statistically incorrect, is an uninformative and misleading way of interpreting a validity (correlation) coefficient” (p. 301; also see Funder & Ozer, Reference Funder and Ozer2019; Schmidt, Reference Schmidt2017, p. 35). Schmidt and Hunter (Reference Schmidt and Hunter2015) similarly argued that “variance-based indexes of effect size are virtually always deceptive and misleading and should be avoided, whether in meta-analysis or in primary research” (pp. 215–216; also see pp. 213–216 for more details). In particular, a serious problem emerges when we compare selection procedures using squared correlations. Using the two observed validity/correlation coefficients (.20 vs. .40) provided above, we can say the validity/correlation coefficient of .40 is twice as high as that of .20 because correlation coefficients are effect sizes that can be directly compared. If we square these correlations as the first step of their recommendation, then we have .16 and .04 (16% vs. 4% of the total variance in job performance ratings), and their difference is now fourfold (= .16/.04) instead of twofold (= .40/.20). More relevant to their recommendation, if we adjust these squared correlations for the ratee-relevant effects (16% × 4 vs. 4% × 4), then their difference remains the same at fourfold albeit with each value quadrupled (64% vs. 16% of the ratee-relevant variance in job performance ratings). More drastically, if we apply Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) recommendation to two other selection procedures with observed r/validity = .20 vs. .60, their difference of threefold is squared and amplified to ninefold: 16% vs. 144% (yes, over 100%!) of the ratee-specific variance in job performance ratings. We are unsure whether any researcher in personnel selection would agree with it. Some jokingly noted that if the goal is to maximize the difference between the two predictors, we should cube, rather than square, their validities/correlations.

The problem lies in the fact that squared correlations are related in a very nonlinear way to the corresponding effect sizes (correlations). Thus, comparing squared correlations, whether adjusted for the ratee main effect or not, is problematic because they are not effect sizes and, thus, they are neither compatible nor comparable. This is why validity/correlation coefficients are used, instead of squared correlations, as input to validity generalization (meta-analytic) studies. In fact, Funder and Ozer (Reference Funder and Ozer2019) further clarified the reasoning behind the incompatibility issue.

Other issues with squaring correlation/validity coefficients include masking the sign of the relationship and making relatively modest yet still meaningful correlations (e.g., rs up to .23) less distinguishable or indistinguishable (e.g., all never more than 5% of variance accounted for; see Funder & Ozer, Reference Funder and Ozer2019 for more details). Furthermore, the validity (r) of a selection procedure, not its square (r ²), is a direct determinant of its utility and, if the cost is zero, is proportional to its utility (Brogden, Reference Brogden1949).

What is the basis for the correction factor of 4? Is it trustworthy?

As noted above, Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) recommendation is not just to square an observed validity/correlation coefficient but also to multiply it by 4 assuming the proportion of the total variance attributable to the ratee main effects is ¼ or 25%. Below is an example from the focal article.

The ratee-relevant variance represents the total variance in job performance ratings attributable to true ratee/incumbent performance factors (the shared variance by all indicators of all performance dimensions plus the shared variance by all indicators of each performance dimension) versus other nonperformance (error) factors such as rater/supervisor idiosyncrasies and random measurement error (Scullen et al., Reference Scullen, Mount and Goff2000). In fact, the ratio of the variance due to the ratee main effects to the total variance represents a somewhat narrowly defined interrater reliability of job performance ratings, given that reliability equals true variance divided by total variance—that is, reliability = true variance/(true variance + error variance). That is, the proportional value of .25 can be regarded as their interrater reliability estimate of job performance ratings. They recommend using its inverse (derived from 1/.25) as the correction/disattenuation factor of 4 for squared correlations (i.e., multiplying squared correlations by 4). Below is our issue with this correction factor.

We wonder about the accuracy of the value of .25 mentioned above, as it is not based on any systematic research synthesis (e.g., meta-analysis). It seems to be derived from several articles cited in the focal paper, but each article is based on different study designs, methods, and measures. Moreover, many meta-analyses indicate that the mean interrater reliability of job performance ratings is in the .50–.60 range (Speer et al., Reference Speer, Delacruz, Wegmeyer and Perrotta2024; Viswesvaran et al., Reference Viswesvaran, Ones and Schmidt1996); Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) suggested value of .25 appears very low, despite their claim that it is “a conservative estimate.” Therefore, even if we were to adopt their recommended procedures, the accuracy of the correction factor of 4 (derived from 1/.25) remains a significant question mark.

Is their recommendation psychometrically new, unique, and useful?

As noted above, squaring a validity (correlation) coefficient, although uninformative and misleading in most cases, is not statistically incorrect (Jensen, Reference Jensen1998). Therefore, we may be able to psychometrically evaluate Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) recommendation, particularly given that the .25 value represents their suggested reliability of job performance ratings, as discussed above. Using the example above, a selection procedure’s observed r/validity is .3, which gives us an r ² of .09, indicating that the selection procedure accounts for 9% of the total variance in job performance ratings. Multiplying the squared r of .09 by the correction factor of 4 or dividing the squared r of .09 by ¼, we can say the selection procedure explains 36% of the ratee-relevant variance in job performance ratings.

Let’s use a psychometric disattenuation procedure to estimate the operational validity of the same selection procedure while assuming no range restriction (operational validity = observed validity/SQRT of r _YY , the interrater reliability for job performance ratings). We first correct the r of .30 for measurement error in job performance ratings using the interrater reliability of .25. This yields the operational validity of .60 (= .30/SQRT of .25 = .30/.50). Per Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) recommendation, if we square it, we have .36, which is the same as the 36% mentioned above.Footnote ² Now, it should be clear that adjusting the squared observed correlation/validity for the ratee main effects as per their recommendation—that is, (r ²/reliability) or (r ² × [1/reliability]), is identical to correcting the observed correlation/validity for measurement error in job performance ratings using the well-established disattenuation formula and squaring the resulting correlation—that is, (r/SQRT of reliability)². For example, using the example above with the observed r of .30 and the reliability of .25 for job performance ratings, Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) suggestion of correcting a squared observed correlation for ratee main effects—that is, .30²/.25 or .30² × 4, is the same as squaring the corresponding operational validity—that is, (.30/SQRT of .25)² or (.30 × 2)².

In summary, our point is that Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) recommendation is essentially reduced to squaring operational validity (corrected for measurement error in job performance ratings alone in this case), casting doubt on the psychometric uniqueness and usefulness of their recommendation. In fact, this idea was already suggested by Guion (Reference Guion1965), who noted that “with an unreliable criterion, evaluation should be based upon predictable rather than total criterion variance” (p. 142, italics original). As noted earlier, their suggested reliability for job performance ratings (.25 for a single rater, .30 for aggregated ratings) is much lower than the currently available meta-analytic evidence in the .50–.60 range (e.g., Speer et al., Reference Speer, Delacruz, Wegmeyer and Perrotta2024). Moreover, instead of using their suggested value of .30 for aggregated performance ratings, it is more psychometrically sound to use the Spearman-Brown prophecy formula—that is, .40 for two raters and .50 for three raters, assuming the interrater reliability for a single rater is .25.

Is comparing a squared correlation before and after corrections meaningful?

Foster et al. (Reference Foster, Steel, Harms, O’Neill and Wood2024) discuss the following as an “unrealistically high” correlation/validity.

To clarify, the .88 value represents the operational validity estimate corrected for unreliability in job performance ratings and substantial indirect range restriction (low selection ratios associated with hiring for complex jobs) on the predictor. The example above clearly illustrates the same issue of comparing squared correlations detailed earlier (see Question 2), when comparing a given predictor’s validity before and after psychometric corrections per Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) recommendation. As reported earlier, the difference in validity before and after psychometric corrections is approximately four times (3.83 = .88/.23). However, when these two values are squared (.23² = .053, approximately their value of “5.5%” vs. .88² = .774, their value of “77.4%”), their difference is also squared to 14.64 times (= .88²/.23², approximately their value of “over a 1,400% increase” [which should read as a 1,346% increase]). In fact, when we compare the correlations (.23 vs. 88) instead, it represents a 283% increase in validity due to the psychometric corrections mentioned above. So, their mention of “over a 1,400% increase” is a statistical exaggeration, highlighting a major problem associated with Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) recommendation; as discussed earlier (see Funder & Ozer, Reference Funder and Ozer2019), squared correlations are not effect sizes, and, thus, they should not be directly compared.

Are psychometrically corrected validities untrustworthy?

Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) description of Schmidt et al.’s (Reference Schmidt, Shaffer and Oh2008) operational validity estimate of .88 for cognitive ability tests for highly complex jobs as “unrealistically high” appears to suggest that their intuition tells them the real value cannot be as large as .88. We have several issues as follows. First, Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) skepticism seems to be based solely on Schmitt (Reference Schmitt2007) or their own intuition rather than evidence. One of the issues that Schmitt had with Le et al. (Reference Le, Oh, Shaffer and Schmidt2007) and Schmidt et al. (Reference Schmidt, Shaffer and Oh2008) is that the input artifact values used in their psychometric corrections are old and low, suggesting a possibility of overcorrections (also see Sackett et al., Reference Sackett, Zhang, Berry and Lievens2022, and Oh et al., Reference Oh, Le and Roth2023, for different views). As noted by Oh and Schmidt (Reference Oh and Schmidt2021), scholars who raised such concerns, however, failed to offer credible evidence that such artifact values (see Schmidt et al., Reference Schmidt, Shaffer and Oh2008, Appendix B for details) are incorrect because they are low or old. “Low is not necessarily inaccurate (as high is not necessarily accurate), and old is not necessarily inaccurate (as new is not necessarily accurate)” (p. 171). Moreover, they fail to cite and discuss the other side of the debate (Schmidt et al., Reference Schmidt, Le, Oh and Shaffer2007).Footnote ³

Second, as noted earlier, the .88 value represents a fully corrected operational validity estimate. As such, this value applies to the unrestricted/applicant population, not the restricted/incumbent sample. As is well known, corrections for indirect range restriction can be very substantial in certain conditions—such as high selectivity (low selection ratios) and the high correlation between scores on the actual (yet often unknown) selection criterion and scores on the predictor of interest—to the extent that a negatively observed validity changes sign after proper corrections. As Ree et al. (Reference Ree, Carretta, Earles and Albert1994; also see Oh et al., Reference Oh, Le and Roth2023) advised, “this should not be interpreted as discouragement of the application of [range restriction] corrections but, rather, as a caution for use of the proper formula” (p. 301, brackets added). It has been long known that “if any intelligent use is to be made of validity statistics from a restricted group, some statistical [range restriction] correction procedures are necessary to estimate what validity coefficients would have been obtained if it had been possible to obtain test and criterion data from a representative sample of all those to whom the selection devices were applied” (Thorndike, Reference Thorndike1949, pp. 171–172). However, there is uncertainty about how corrections for range restriction can and should be done alongside Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) recommendation.

Third, it is ironic that Foster et al. (Reference Foster, Steel, Harms, O’Neill and Wood2024) seem to be uncomfortable or skeptical about psychometrically correcting an observed correlation/validity coefficient for artifacts while simultaneously advocating for correcting a squared observed correlation/validity coefficient for ratee main effects (i.e., multiplying it by the correction factor of 4 [= 1/.25]); as noted earlier (see Question 4), the latter is essentially the same as psychometrically correcting an observed validity coefficient for measurement error in job performance ratings using the reliability of .25 (the very basis of their correction factor of 4). In fact, if an observed r/validity is close to .50 or greater, their recommendation of squaring the observed r/validity and multiplying it by 4 can also yield very high values (even over 100%, which are implausible values). Conceivably, with additional corrections for range restriction, their recommendation would yield even higher values. It raises the question of why Foster et al. (Reference Foster, Steel, Harms, O’Neill and Wood2024) are not skeptical about these high values while they are so skeptical about the operational validity of .88 mentioned above.

In conclusion, considering all the issues discussed above regarding squaring observed validity/correlation coefficients and adjusting them for ratee main effects (by multiplying the squared correlations by 4), it is difficult to see any real benefit of adopting Foster et al.’s (Reference Foster, Steel, Harms, O’Neill and Wood2024) recommendation, especially in personnel selection where a selection procedure’s operational validity, not its square, directly determines its economic value (e.g., utility). Therefore, instead of adopting their recommendation, we suggest we continue to use the operational validity coefficient (i.e., the observed validity corrected for measurement error in job performance ratings and range restriction on the predictor and, if possible, the criterion) as an index of selection procedure effectiveness, as has been done for years.