Participants

Data sources and measures

All clinics administered the Matrix Reasoning subscale following standard administration and scoring methods set forth in the manual (Wechsler, Reference Wechsler2008). The Matrix Reasoning subtest includes two sample items (A and B), and 26 test items. Item 4 is administered first unless intellectual disability is suspected, in which case administration begins with item 1. If examinees do not obtain perfect scores on either items 4 or 5, then preceding items are administered in reverse order until the examinee obtains perfect scores on two consecutive items. Following the administration manual, items were otherwise administered in order of difficulty (easiest to hardest). For each item, individuals received a score of either 1 (correct) or 0 (incorrect). After three consecutive scores of 0, the test was discontinued. Missing values after the test was discontinued following three failures were later coded as 0’s (i.e., incorrect) for purposes of CAT simulation.

Dimensionality assessment

The Matrix Reasoning subtest is universally scored as a single construct in practice. Nevertheless, the IRT model to be applied here assumes “essential” unidimensionality, that is, the responses primarily reflect a single common dimension. Thus, it is important, prior to estimating an IRT model, to first empirically establish the viability of a unidimensional model in our sample. To evaluate unidimensionality in the present data, we first estimated tetrachoric correlations among the items (deleting the first five items due to very high proportion corrects, see Table 1) and then factor analyzed the tetrachoric correlations using minres extraction. To establish essential unidimensionality, we examined the ratio of the first to the second eigenvalue, the magnitude of factor loadings, and several indices of statistical fit. Specifically, we used the lavaan library (Rosseel, Reference Rosseel2012) to fit a confirmatory unidimensional model specifying the items as ordinal and using diagonally weighted least squares estimation. We examined model chi-square, the scaled comparative fit index, scaled root mean squared error of approximation, and standardized root mean square residual. By traditional conventions, values of these indices >.90, <.05, and <.08 would be considered “good”.

Table 1. Matrix reasoning classical test theory statistics and item response theory parameter estimates

Note. IRT slope (α in the 2PL equation) is a discrimination parameter; IRT Location (β in the 2PL equation) is a difficulty parameter; s is standard deviation; raw.r is item to test score correlation; r.drop is item to test score correlation if item dropped.

Item response theory (IRT)

Compared to classical test theory (CTT) which focuses on test-level functioning, IRT focuses on item-level functioning. The chief goal of IRT is to fit a statistical model, called an item response function (IRF), which describes how the probability of responding correctly to an item changes as a function of ability or “trait” level (generally denoted as θ) and properties of an item (e.g., its difficulty and discrimination). It is assumed that the probability of responding correctly monotonically increases as a function of θ.This interpretation assumes that any variation in item response is driven by one dominant dimension (i.e., factor), which embodies the unidimensionality assumption.

As noted, the IRF describes the probability of responding correctly given ability or “trait level” (θ), and it is defined by several parameters (e.g., item difficulty, guessing rate, discrimination). For this application we selected a model that is analogous to the well-known and extensively used item-level factor analytic model. Specifically, we selected the so-called two-parameter logistic model (2PL)Footnote ¹ as shown in Equation 1.

(1) $$P\left(x=1|\theta \right)={1 \over 1+\exp (-\alpha \left(\theta -\beta \right))}$$

In the above, examinee individual differences in trait level are symbolized by θ, which in this study (and most IRT studies) is assumed to be like a Z-score with a mean θ of zero and standard deviation of 1.0. Test items vary in location (β), which is the point along the trait continuum at which the probability of responding correctly is 50%. Thus, the location parameter has a scale such that positive values indicate a more difficult item, that is, an item that would require higher than average trait level to get correct. A negative difficulty item indicates an “easier” item, meaning that even individuals below the population mean may have a high chance to get it correct. The so-called “discrimination” parameter (α) controls the slope of the IRF at its reflection point – higher values indicate more discriminating items; more “discriminating” means that the item is better able to distinguish between individuals in the trait range around the item location.

In IRT, items can vary not only in discrimination, but also in how much statistical information they provide in discriminating among individuals. Specifically, once an IRF is estimated for each item, it can be easily transformed into an item information function (IIF) as shown in Equation 2.

(2) $${\rm Info}|\theta =\alpha ^{2}P\left(x=1|\theta \right)(1-P\left(x=1|\theta \right))$$

An IIF describes how well an item can discriminate between individuals at different levels of ability. Items with higher discrimination (α) provide more information, but where that information is concentrated is determined by the location parameter (i.e., where the probability of a correct response is 50%).

Finally, it is critical to note that IIFs are additive across items and thus can be summed to form an overall scale information function (SIF). The SIF is key because it allows us to study how the standard error of measurement changes as a function of trait level for a given set of items administered, whether the full, complete battery or only a few CAT items are administered. Specifically, Equation 3 shows how scale information is converted to a conditional standard error of measurement. This is critical because information, and thus the standard error (SE), is leveraged in CAT to more efficiently select items for administration.

(3) $$SE|\theta ={1 \over \sqrt{{\rm INFO}|\theta }}$$

Our first analyses centered on performing traditional classical test theory psychometric analyses on the data. This included item-test correlations, item means and standard deviations. These values were obtained using the R library psych (Revelle, Reference Revelle2023), alpha command. The IRT 2PL model parameters were estimated using the mirt library in R (Chalmers, Reference Chalmers2012). Although there are no definitive approaches to evaluating model fit in IRT, we examined root mean square error of approximation, standardized root mean square residual, and comparative fit index which are output from mirt (Maydeu-Olivares et al., Reference Maydeu-Olivares, Cai and Hernández2011). These are simply IRT versions of the fit indices shown previously and similar “benchmarks” would apply.

Computerized adaptive testing

As noted, CAT (Wainer et al., Reference Wainer, Dorans, Flaugher, Green and Mislevy2000; van der Linden & Glas, Reference van der Linden and Glas2000) has been investigated carefully in many assessment domains, including psychopathology assessment (see Gibbons et al., Reference Gibbons, Weiss, Frank and Kupfer2016) but has received scant attention in neuropsychological assessment. In CAT, an item is administered, usually of medium location parameter (e.g., around zero) and a response is collected and scored. Based on that response, a trait level estimate is made, and a new item is selected that is typically easier (if the examinee got the item wrong) or harder (if the examinee got the item right). More technically, the next item selected to administer is the one that maximizes the psychometric information (i.e., provided the most discrimination) at the current trait level estimate. This process of administering items, updating the latent trait estimate, and selecting new items to administer, continues until a termination criterion is met.

There are two major termination criteria used. First, items are adaptively administered until a fixed number, for example, 10, are administered. That is called fixed length adaptive testing. Second, items are administered until a standard error criterion is met. For example, items are administered until the standard error is at or below .30 (which would correspond roughly to an alpha reliability of .90). Of course, the procedure used is limited by the item bank one has on hand. If the test does not have enough items to provide sufficient psychometric information to reduce the standard error below a threshold, then a more liberal threshold is required.

In this research, for demonstration purposes, we conducted a real data simulation. We began again by filling in all cells of the data matrix after each person’s termination criterion was met with zeros to eliminate missing data. Therefore, the number correct for an individual is the number correctly answered until the stopping criterion was reached, and the number wrong is the sum of items missed prior to the stopping criterion plus all items after the stopping criterion. This demonstration is hypothetical and a “proof of concept,” but this is true of most real data simulations of CAT (Thompson & Weiss, Reference Thompson and Weiss2011).

The specific CAT algorithms evaluated here were as follows. We began by selecting the most informative item (most discriminating item) at trait level = 0. This item was always Item #13 which had discrimination of 2.88 and location of −0.31. Each examinee began with a trait level estimate of 0 and based on the response to the first item, trait level estimate and standard error were updated using the expected a posteriori (EAP) method of scoring (Bock & Mislevy, Reference Bock and Mislevy1982). The next item selected was the one that provided the most psychometric information at the current trait level estimate.

The first set of algorithms we examined were fixed test length. Specifically, we limited the CAT administration to 3, 6, and 12 items respectively. We then examined a standard error-based CAT. Specifically, we continued administering items in CAT format until an examinee’s trait level estimates had a standard error below .40 (16% error variance or reliability of roughly .84). The three key outcome statistics are (1) the average standard error of measurement for each CAT condition, (2) the root mean square deviation between CAT and full scale trait level estimates (RMSD), and (3) the correlations, both Pearson and Spearman, between CAT trait level estimates and full scale estimates (i.e., based on all the items). The first and second indices provide degree of uncertainty around the true score and full scale score, respectively. The CAT versus full scale correlations are part-whole correlations and must be positive. They should be interpreted as descriptive statistics reflecting the specific simulation and not as estimates of a “population” parameter. High correlations (e.g., >.90) imply that CAT scores would have very similar external correlates as the full scale scores.