design_effect: Design effects for two-level mixed models
In sjstats: Collection of Convenient Functions for Common Statistical Computations
View source: R/design_effect.R
design_effect R Documentation
Design effects for two-level mixed models
Description
Compute the design effect (also called Variance Inflation Factor)
for mixed models with two-level design.
Usage
design_effect(n, icc = 0.05)
Arguments
n
Average number of observations per grouping cluster (i.e. level-2 unit).
icc
Assumed intraclass correlation coefficient for multilevel-model.
Details
The formula for the design effect is simply (1 + (n - 1) * icc).
Value
The design effect (Variance Inflation Factor) for the two-level model.
References
Bland JM. 2000. Sample size in guidelines trials. Fam Pract. (17), 17-20.
Hsieh FY, Lavori PW, Cohen HJ, Feussner JR. 2003. An Overview of Variance Inflation Factors for Sample-Size Calculation. Evaluation and the Health Professions 26: 239-257. \Sexpr[results=rd]{tools:::Rd_expr_doi("10.1177/0163278703255230")}
Snijders TAB. 2005. Power and Sample Size in Multilevel Linear Models. In: Everitt BS, Howell DC (Hrsg.). Encyclopedia of Statistics in Behavioral Science. Chichester, UK: John Wiley and Sons, Ltd. \Sexpr[results=rd]{tools:::Rd_expr_doi("10.1002/0470013192.bsa492")}
Thompson DM, Fernald DH, Mold JW. 2012. Intraclass Correlation Coefficients Typical of Cluster-Randomized Studies: Estimates From the Robert Wood Johnson Prescription for Health Projects. The Annals of Family Medicine;10(3):235-40. \Sexpr[results=rd]{tools:::Rd_expr_doi("10.1370/afm.1347")}
Examples
# Design effect for two-level model with 30 observations per
# cluster group (level-2 unit) and an assumed intraclass
# correlation coefficient of 0.05.
design_effect(n = 30)
# Design effect for two-level model with 24 observation per cluster
# group and an assumed intraclass correlation coefficient of 0.2.
design_effect(n = 24, icc = 0.2)
sjstats documentation built on May 29, 2024, 12:09 p.m.
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View source: R/design_effect.R
| design_effect | R Documentation |
Design effects for two-level mixed models
Description
Compute the design effect (also called Variance Inflation Factor) for mixed models with two-level design.
Usage
design_effect(n, icc = 0.05)
Arguments
n |
Average number of observations per grouping cluster (i.e. level-2 unit). |
icc |
Assumed intraclass correlation coefficient for multilevel-model. |
Details
The formula for the design effect is simply (1 + (n - 1) * icc).
Value
The design effect (Variance Inflation Factor) for the two-level model.
References
Bland JM. 2000. Sample size in guidelines trials. Fam Pract. (17), 17-20.
Hsieh FY, Lavori PW, Cohen HJ, Feussner JR. 2003. An Overview of Variance Inflation Factors for Sample-Size Calculation. Evaluation and the Health Professions 26: 239-257. \Sexpr[results=rd]{tools:::Rd_expr_doi("10.1177/0163278703255230")}
Snijders TAB. 2005. Power and Sample Size in Multilevel Linear Models. In: Everitt BS, Howell DC (Hrsg.). Encyclopedia of Statistics in Behavioral Science. Chichester, UK: John Wiley and Sons, Ltd. \Sexpr[results=rd]{tools:::Rd_expr_doi("10.1002/0470013192.bsa492")}
Thompson DM, Fernald DH, Mold JW. 2012. Intraclass Correlation Coefficients Typical of Cluster-Randomized Studies: Estimates From the Robert Wood Johnson Prescription for Health Projects. The Annals of Family Medicine;10(3):235-40. \Sexpr[results=rd]{tools:::Rd_expr_doi("10.1370/afm.1347")}
Examples
# Design effect for two-level model with 30 observations per
# cluster group (level-2 unit) and an assumed intraclass
# correlation coefficient of 0.05.
design_effect(n = 30)
# Design effect for two-level model with 24 observation per cluster
# group and an assumed intraclass correlation coefficient of 0.2.
design_effect(n = 24, icc = 0.2)
R Package Documentation
Browse R Packages
We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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