One theta to rule them all: Test Individual Differences

Timo Bechger and Ivailo Partchev

05 July, 2024

Educational and psychological testing is all about individual differences. Using a measuring instrument, we try our best to place an individual with respect to others depending on their level of extroversion, depression, or mastery of English.

What if there are no individual differences at all? Classical test theory defines reliability as the ratio of the variance of the true scores to the variance of the observed scores (e.g., Bechger et al. 2003). The observed scores will have some chance variance, so reliability is 0 in that case. We have provided an IRT analogue with function individual_differences, to check whether the response data are consistent with the hypothesis of no individual differences in true ability.

First, we simulate a matrix of response data from the Rasch model. We simulate responses to 20 items with uniformly distributed difficulties for 2000 persons having all the same true ability of 0.5:

items = tibble(item_id=paste0('i',1:20), item_score=1, delta=runif(20, -2, 2))
sim_Rasch = r_score(items)

theta = rep(0.5, 2000)
simulated = sim_Rasch(theta)

Computing the sum scores and examining their distribution, we find nothing conspicuous:

hist(rowSums(simulated), main='', xlab='sumScore')
plot(ecdf(rowSums(simulated)), bty='l', main='ecdf', xlab='sumScore' )

We can also examine the various item-total regressions produced by function fit_inter. For example, here are the plots for the first two items:

mm = fit_inter(simulated)

plot(mm, show.observed = TRUE, 
     items = c('i1','i2'))

The curtains that eliminate the 5% smallest and 5% largest sum scores are drawn somewhat narrow but, apart from that, all regressions look nice. It appears that, by just looking at the response data, we are not in a very good position to judge whether there are any true individual differences in ability. To help with that, dexter offers a function, individual_differences:

dd = individual_differences(simulated)
plot(dd)

The gray line shows the predicted frequency of each sum score under the hypothesis of no true individual differences. The green dots show the observed frequencies and it will be clear that our observed data is compatible with the null hypothesis.

The print function for the test shows a chi-squared test for the null hypothesis. Note that this uses R’s option to simulate the p-value, which explains why the degrees of freedom are missing:

dd
## Chi-Square Test for the hypothesis that respondents differ in ability:
## 
##  Chi-squared test for given probabilities with simulated p-value (based
##  on 2000 replicates)
## 
## data:  observed
## X-squared = 21.97, df = NA, p-value = 0.1394

Thus, we find a p-value of 0.14 for the hypothesis that there are no individual differences.

What about real data? Dexter comes with a well-known example preinstalled, the verbal aggression data (Vansteelandt 2000) analysed in great detail in (Paul De Boeck 2004) and many others. 243 females and 73 males have answered on a 3-point scale (‘yes’, ‘perhaps’, or ‘no’) how likely they are to become verbally aggressive in four different frustrating situations

db = start_new_project(verbAggrRules, ":memory:")
add_booklet(db, verbAggrData, "data")

dd = individual_differences(db, booklet_id=="data")
plot(dd)

This is quite different now, and the chi-squared test is highly significant.

dd
## Chi-Square Test for the hypothesis that respondents differ in ability:
## 
##  Chi-squared test for given probabilities with simulated p-value (based
##  on 2000 replicates)
## 
## data:  observed
## X-squared = 1.6144e+21, df = NA, p-value = 0.0004998

References

Bechger, Timo M., Gunter Maris, Huub H. F. M. Verstralen, and Anton A. Béguin. 2003. “Using Classical Test Theory in Combination with Item Response Theory.” Applied Psychological Measurement 27 (5): 319–34.
Paul De Boeck, Mark Wilson, ed. 2004. Explanatory Item Response Models. Springer.
Vansteelandt, K. 2000. “Formal Methods for Contextualized Personality Psychology.” PhD thesis, K. U. Leuven.