Suggestion of confidence interval methods for the Cronbach alpha in application to complex survey data
Section 1. Introduction
In this paper,
we propose methods to incorporate the survey designs in confidence intervals
for the alpha coefficient (Cronbach, 1951) based on the large sample
approximation (linearization) and the “double” bootstrap approach. These
methods have not been investigated in the related literature, even though the
alpha coefficient is widely used in psychology and other relevant research areas.
For a practical application of these methods, we analyze mental health
instruments data from the National Comorbidity Survey Replication (NCS-R), a
survey conducted between 2001 and 2003 intended to measure the prevalence of
mental disorders (Kessler,
Berglund, Chiu, Demler, Heeringa, Hiripi, Jin, Pennell, Walters, Zaslavsky and Zheng, 2004). In the analysis, we show the feasibility of the confidence interval
method for the alpha coefficient on a survey data set.
A great deal of
psychological and sociological research uses assessment instruments (i.e.,
questionnaires) to obtain quantitative information for a population of
interest. Ideally, the different items in one instrument measure the same
concepts to achieve a high internal consistency. The alpha coefficient, also
known as Cronbach’s alpha (henceforth referred to as
is a
popular statistic (e.g., a quick search of PubMed with the keywords “Cronbach
alpha” and “scale” from the years of 2012-2016 brings up more than 700
publications) that is widely used to measure the internal consistency
reliability of various instruments.
Let
denote the
-variate column vector of the observations indicating
items
from an instrument, and let
indicate
the corresponding covariance matrix. The value
is
defined as
where
is the
conforming column vector consisting of 1, and
indicates the trace of a matrix. The value
shows
the ratio between the sum of the covariances and the sum of variances and
covariances, thus a high value for
suggests
that the items are highly correlated within the instrument. The theoretical
values of
range
from 0 to 1, where a higher value is considered to be more desirable. The
estimator of
(denoted
by
is
defined as
where
is a
consistent estimator of
The
estimator
can take
any value less than or equal to 1, including negative values.
In the literature,
many confidence interval strategies for
can be found (e.g., van Zyl, Neudecker and Nel, 2000; Yuan, Guarnaccia and Hayslip, 2003; Kistner and Muller, 2004; Bonett and Wright,
2015), but discussions regarding the applications for complex survey data where
observations in the data can have unequal weights due to stratifications and
multistage cluster sampling (Lohr, 1999) are largely lacking.
This paper is
structured as follows: In Section 2, we propose strategies for obtaining
the confidence intervals of
using
the linearization method and the coverage-corrected bootstrap method. In
Section 3, simulation results are presented based on scenarios of
stratified multi-stage cluster sampling and unequal probability sampling
scenarios. In Section 4, the developed methods are applied to analyze the NCS-R data sets, and the results comparing
different demographics are reported. The Section 5 is devoted to the concluding remarks.
ISSN : 1492-0921
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