rwg.j.lindell: Lindell et al. r*wg(j) agreement index for multi-item scales
In multilevel: Multilevel Functions
rwg.j.lindell R Documentation
Lindell et al. r*wg(j) agreement index for multi-item scales
Description
Calculates the Lindell et al r*wg(j) within-group agreement index for multiple
item measures. The r*wg(j) is similar to the James, Demaree and Wolf (1984) rwg and rwg(j) indices. The
r*wg(j) index is calculated by taking the average item variability as the Observed Group Variance, and using the
average item variability in the numerator of the rwg formula (rwg=1-(Observed Group Variance/
Expected Random Variance)). In practice, this means that the r*wg(j) does not increase as the number of items in the
scale increases as does the rwg(j). Additionally, the r*wg(j) allows Observed Group Variances to be
larger than Expected Random Variances. In practice this means that r*wg(j) values can be negative.
Usage
rwg.j.lindell(x, grpid, ranvar=2)
Arguments
x
A matrix representing the scale of interest upon which one is interested
in estimating agreement. Each column of the matrix represents a separate scale item,
and each row represents an individual respondent.
grpid
A vector identifying the groups from which x originated.
ranvar
The random variance to which actual group variances are compared.
The value of 2 represents the variance from a rectangular
distribution in the case where there are 5 response options (e.g.,
Strongly Disagree, Disagree, Neither, Agree, Strongly Agree).
In cases where there are not 5 response options, the rectangular
distribution is estimated using the formula
ranvar=(A^2-1)/12
where
A is the number of response options. Note that one is not limited
to the rectangular distribution; rather, one can include any
appropriate random value for ranvar.
Value
grpid
The group identifier
rwg.lindell
The r*wg(j) estimate for the group
gsize
The group size
Author(s)
Paul Bliese
pdbliese@gmail.com
References
James, L.R., Demaree, R.G., & Wolf, G. (1984). Estimating within-group
interrater reliability with and without response bias. Journal of Applied
Psychology, 69, 85-98.
Lindell, M. K. & Brandt, C. J. (1999). Assessing interrater agreement on
the job relevance of a test: A comparison of CVI, T, rWG(J), and r*WG(J) indexes.
Journal of Applied Psychology, 84, 640-647.
See Also
ad.m
awg
rwg
rwg.j
rgr.agree
Examples
data(lq2002)
RWGOUT<-rwg.j.lindell(lq2002[,3:13],lq2002$COMPID)
RWGOUT[1:10,]
summary(RWGOUT)
multilevel documentation built on March 18, 2022, 5:47 p.m.
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| rwg.j.lindell | R Documentation |
Lindell et al. r*wg(j) agreement index for multi-item scales
Description
Calculates the Lindell et al r*wg(j) within-group agreement index for multiple item measures. The r*wg(j) is similar to the James, Demaree and Wolf (1984) rwg and rwg(j) indices. The r*wg(j) index is calculated by taking the average item variability as the Observed Group Variance, and using the average item variability in the numerator of the rwg formula (rwg=1-(Observed Group Variance/ Expected Random Variance)). In practice, this means that the r*wg(j) does not increase as the number of items in the scale increases as does the rwg(j). Additionally, the r*wg(j) allows Observed Group Variances to be larger than Expected Random Variances. In practice this means that r*wg(j) values can be negative.
Usage
rwg.j.lindell(x, grpid, ranvar=2)
Arguments
x |
A matrix representing the scale of interest upon which one is interested in estimating agreement. Each column of the matrix represents a separate scale item, and each row represents an individual respondent. |
grpid |
A vector identifying the groups from which x originated. |
ranvar |
The random variance to which actual group variances are compared. The value of 2 represents the variance from a rectangular distribution in the case where there are 5 response options (e.g., Strongly Disagree, Disagree, Neither, Agree, Strongly Agree). In cases where there are not 5 response options, the rectangular distribution is estimated using the formula ranvar=(A^2-1)/12 where A is the number of response options. Note that one is not limited to the rectangular distribution; rather, one can include any appropriate random value for ranvar. |
Value
grpid |
The group identifier |
rwg.lindell |
The r*wg(j) estimate for the group |
gsize |
The group size |
Author(s)
Paul Bliese pdbliese@gmail.com
References
James, L.R., Demaree, R.G., & Wolf, G. (1984). Estimating within-group interrater reliability with and without response bias. Journal of Applied Psychology, 69, 85-98.
Lindell, M. K. & Brandt, C. J. (1999). Assessing interrater agreement on the job relevance of a test: A comparison of CVI, T, rWG(J), and r*WG(J) indexes. Journal of Applied Psychology, 84, 640-647.
See Also
ad.m
awg
rwg
rwg.j
rgr.agree
Examples
data(lq2002) RWGOUT<-rwg.j.lindell(lq2002[,3:13],lq2002$COMPID) RWGOUT[1:10,] summary(RWGOUT)
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