To install and load the library
install.packages("PowerUpR")
library(PowerUpR)
Statistical power, minimum detectable effect size (MDES), MDES difference (MDESD), or minimum required sample size (MRSS) can be requested by using the relevant function given design parameters. Each function begins with an output name, follows by a period, and ends with a design name in the form <output>.<design>()
. There are three types of output; mdes
for main effects (mdes
or mdesd
for moderation effects), power
, and mrss
. Each output can be requested for fourteen types of designs to detect main treatment effects; ira1r1
, bira2r1
, bira2f1
, bira2c1
, cra2r2
, bira3r1
, bcra3r2
, bcra3f2
, cra3r3
, bira4r1
, bcra4r2
, bcra4r3
, bcra4f3
, cra4r4
, and five types of designs to detect moderator effects; mod221
, mod222
, mod331
, mod332
, and mod333
. To detect mediator effects, only power
can be requested for three types of designs; med211
, med221
, and med321
.
For designs to detect main effects, first three letters stand for the type of assignment; for individual random assignment ira
, for blocked individual random assignment bira
, for cluster random assignment cra
, and for blocked cluster random assignment bcra
. Numbers indicate total number of levels and the level at which randomization takes place correspondingly. The single letter inbetween refers to whether the top level is random or fixed. Naming conventions are slighlty different for designs to detect moderator and mediator effects. Numbers following mod
keyword indicate total number of levels, the level at which randomization takes place, and the level at which moderator resides correspondingly. As for the mediator effects, numbers following med
keyword indicate the level at which treatment, mediator and outcome variables reside.
For example, the function mdes.cra2r2()
can be called to calculate MDES for main treatment effect in a two-level cluster-randomized trial. Similiarly, the function mdesd.mod222()
can be called to calculate MDESD for moderator effect residing at level 2 in a two-level cluster-randomized trial. Finally, the function power.med221()
can be called to calculate statistical power for mediator effect residing at level 2 in a two-level cluster-randomized trial.
Live apps at: https://poweruprshiny.shinyapps.io/v103/ [earlier version] https://poweruprshiny.shinyapps.io/v104/ [3-2-1 mediation added]
Suggested citations:
Dong, N., Kelcey, B., Spybrook, J., & Maynard, R. A. (2017a). PowerUp!-Moderator: A tool for calculating statistical power and minimum detectable effect size of the moderator effects in cluster randomized trials (Version 1.08) [Software]. Available from http://www.causalevaluation.org/
Dong, N., Kelcey, B., Spybrook, J., & Maynard, R. A. (2017b). PowerUp!-Mediator: A tool for calculating statistical power for causally-defined mediation in cluster randomized trials. (Beta Version 1.0) [Software]. Available from http://www.causalevaluation.org/
Dong, N., Kelcey, B., & Spybrook, J. (2017). Power analyses of moderator effects in three-level cluster randomized trials. Journal of Experimental Education. Advance online publication. doi: 10.1080/00220973.2017.1315714
Dong, N. & Maynard, R. A. (2013). PowerUp!: A tool for calculating minimum detectable effect sizes and sample size requirements for experimental and quasi-experimental designs. Journal of Research on Educational Effectiveness, 6(1), 24-67. doi: 10.1080/19345747.2012.673143
Dong, N., & Maynard, R. A. (2013). PowerUp!: A tool for calculating minimum detectable effect sizes and minimum required sample sizes for experimental and quasi-experimental design studies. [Software]. http://www.causalevaluation.org/
Kelcey, B., Dong, N., Spybrook, J., & Shen, Z. (2017). Experimental Power for Indirect Effects in Group-randomized Studies with Group-level Mediators. Multivariate Behavioral Research. Advance online publication. doi: 10.1080/00273171.2017.1356212
Kelcey, B., Dong, N., Spybrook, J., & Cox, K. (2017). Statistical power for causally-defined individual and contextual indirect effects in group-randomized Trials. Journal of Educational and Behavioral Statistics. Advance online publication. doi: 10.3102/1076998617695506
Spybrook, J., Kelcey, B., & Dong, N. (2016). Power for detecting treatment by moderator effects in two and three-level cluster randomized trials. Journal of Educational and Behavioral Statistics. doi: 10.3102/1076998616655442
Acknowledgement:
This work is supported by National Science Foundation through a collaborative research grant titiled “Power Analyses for Moderator and Mediator Effects in Cluster Randomized Trials” to Benjamin Kelcey (Award Number: 1437679), Jessaca Spybrook (Award Number:1437692). and Nianbo Dong (Award Number: 1437745).