sca: Linear transformation of the IRT scale
In irtoys: A Collection of Functions Related to Item Response Theory (IRT)
sca R Documentation
Linear transformation of the IRT scale
Description
Linearly transform a set of IRT parameters to bring them to the scale of
another set of parameters. Four methods are implemented: Mean/Mean,
Mean/Sigma, Lord-Stocking, and Haebara.
Usage
sca(
old.ip,
new.ip,
old.items,
new.items,
old.qu = NULL,
new.qu = NULL,
method = "MS",
bec = FALSE
)
Arguments
old.ip
A set of parameters that are already on the desired scale
new.ip
A set of parameters that must be placed on the same scale as
old.ip
old.items
A vector of indexes pointing to those items in
old.ip that are common to both sets of parameters
new.items
The indexes of the same items in new.ip
old.qu
A quadrature object for old.ip, typically produced by
the same program that estimated old.ip. Only needed if
method="LS" or method="HB"
new.qu
A quadrature object for new.ip, typically produced by
the same program that estimated new.ip. Only needed if
method="HB"
method
One of "MM" (Mean/Mean), "MS" (Mean/Sigma), "SL"
(Stocking-Lord), or "HB" (Haebara). Default is "MS"
bec
Use back-equating correction? When TRUE, the Stocking-Lord or
Hebaera procedures will be adjusted for back-equating (see Hebaera, 1980).
Ignored when method is MM or MS. Default is FALSE.
Value
A list of:
slope
The slope of the linear transformation
intercept
The intercept of the linear transformation
scaled.ip
The parameters in new.ip tranformed to a scale that
is compatible with old.ip
Author(s)
Ivailo Partchev and Tamaki Hattori
References
Kolen, M.J. & R.L. Brennan (1995) Test Equating: Methods and
Practices. Springer.
Haebara, T. (1980) Equating logistic ability scales by
a weighted lest squares method. Japanese Psychological Research, 22,
p.144–149
Examples
## Not run:
# a small simulation to demonstrate transformation to a common scale
# fake 50 2PL items
pa <- cbind(runif(50,.8,2), runif(50,-2.4,2.4), rep(0,50))
# simulate responses with two samples of different ability levels
r.1 <- sim(ip=pa[1:30,], x=rnorm(1000,-.5))
r.2 <- sim(ip=pa[21:50,], x=rnorm(1000,.5))
# estimate item parameters
p.1 <- est(r.1, engine="ltm")
p.2 <- est(r.2, engine="ltm")
# plot difficulties to show difference in scale
plot(c(-3,3), c(-3,3), ty="n", xlab="True",ylab="Estimated",
main="Achieving common scale")
text(pa[1:30,2], p.1$est[,2], 1:30)
text(pa[21:50,2], p.2$est[,2], 21:50, co=2)
# scale with the default Mean/Sigma method
pa.sc = sca(old.ip=p.1$est, new.ip=p.2$est, old.items=21:30, new.items=1:10)
# add difficulties of scaled items to plot
text(pa[21:50,2], pa.sc$scaled.ip[,2], 21:50, co=3)
## End(Not run)
irtoys documentation built on May 12, 2022, 5:06 p.m.
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| sca | R Documentation |
Linear transformation of the IRT scale
Description
Linearly transform a set of IRT parameters to bring them to the scale of another set of parameters. Four methods are implemented: Mean/Mean, Mean/Sigma, Lord-Stocking, and Haebara.
Usage
sca( old.ip, new.ip, old.items, new.items, old.qu = NULL, new.qu = NULL, method = "MS", bec = FALSE )
Arguments
old.ip |
A set of parameters that are already on the desired scale |
new.ip |
A set of parameters that must be placed on the same scale as
|
old.items |
A vector of indexes pointing to those items in
|
new.items |
The indexes of the same items in |
old.qu |
A quadrature object for |
new.qu |
A quadrature object for |
method |
One of "MM" (Mean/Mean), "MS" (Mean/Sigma), "SL" (Stocking-Lord), or "HB" (Haebara). Default is "MS" |
bec |
Use back-equating correction? When TRUE, the Stocking-Lord or Hebaera procedures will be adjusted for back-equating (see Hebaera, 1980). Ignored when method is MM or MS. Default is FALSE. |
Value
A list of:
slope |
The slope of the linear transformation |
intercept |
The intercept of the linear transformation |
scaled.ip |
The parameters in |
Author(s)
Ivailo Partchev and Tamaki Hattori
References
Kolen, M.J. & R.L. Brennan (1995) Test Equating: Methods and Practices. Springer.
Haebara, T. (1980) Equating logistic ability scales by a weighted lest squares method. Japanese Psychological Research, 22, p.144–149
Examples
## Not run: # a small simulation to demonstrate transformation to a common scale # fake 50 2PL items pa <- cbind(runif(50,.8,2), runif(50,-2.4,2.4), rep(0,50)) # simulate responses with two samples of different ability levels r.1 <- sim(ip=pa[1:30,], x=rnorm(1000,-.5)) r.2 <- sim(ip=pa[21:50,], x=rnorm(1000,.5)) # estimate item parameters p.1 <- est(r.1, engine="ltm") p.2 <- est(r.2, engine="ltm") # plot difficulties to show difference in scale plot(c(-3,3), c(-3,3), ty="n", xlab="True",ylab="Estimated", main="Achieving common scale") text(pa[1:30,2], p.1$est[,2], 1:30) text(pa[21:50,2], p.2$est[,2], 21:50, co=2) # scale with the default Mean/Sigma method pa.sc = sca(old.ip=p.1$est, new.ip=p.2$est, old.items=21:30, new.items=1:10) # add difficulties of scaled items to plot text(pa[21:50,2], pa.sc$scaled.ip[,2], 21:50, co=3) ## End(Not run)
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