# Effect of sample size on the accuracy of Cohen’s d estimates (95 % CI)

**R Psychologist**, and kindly contributed to R-bloggers]. (You can report issue about the content on this page here)

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## Introduction

I’ve been incredibly busy the last month, amongst other things I’ve
moved about 400 miles from Umeå, in the north of sweden, to Stockholm.
However, I’ve been working a lot with R and especially with power
analysis both via Monte Carlo simulations and via analytical approaches.
I will not write about power analysis here, but I will write about a
closely related concept about sample size planning for *accuracy in
parameter estimation (AIPE)*. Whereas traditional power analysis is used
to plan for an adequate sample size to reject the null hypothesis at the
desired alpha level, sample size planning for AIPE is used to plan for a
desired with of the CI. AIPE functions are implemented in the
MBESS-package by Kelly and Lai, if you’re interested you can read more
about AIPE in Maxwell, Kelley, and Rausch (2008).

## Graphs

Here’s two graphs I did in R to illustrate the connection between sample
size and confidence interval. In Figure 2 you can see that that sample
size will increase as a function of the width *and* and the magnitude of
the effect, i.e. you need a larger sample to achieve a certain CI width
the larger the effect size is. You also see that this increase in sample
size is less apparent the larger the CI’s width become.

Figure 1. 95% confidence interval for Cohen’s *d* of 0.8 in relation to sample size
(per group), value above the error bars represent the CI’s range.

Figure 2. 95% confidence interval for different magnitudes of Cohen’s *d* in
relation to sample sizes (per group) and width of confidence intervals.

## R code

1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 | library(MBESS) library(ggplot2) # CI for d = 0.8 ---------------------------------------------------------- smd_plot <- data.frame() for(i in seq(10,400, by=10)) { # loop x.ci <- ci.smd(smd=0.8, n.1=i,n.2=i) smd_plot <- rbind(smd_plot, data.frame("lwr" = x.ci$Lower.Conf.Limit.smd, "upr" = x.ci$Upper.Conf.Limit.smd, "smd"=0.8, "n" = i)) } smd_plot$range <- round(smd_plot$upr - smd_plot$lwr,2) # ggplot -------------------------------------------------------------------- ggplot(smd_plot, aes(n, smd)) + geom_point() + geom_errorbar(aes(ymin=lwr, ymax=upr)) + geom_text(aes(label=range, y=upr), hjust=-0.4, angle=45, size=4) + scale_y_continuous(breaks=seq(0,2, by=0.25)) + scale_x_continuous(breaks=seq(0,400, by=20)) + ylim(-.2,1.8) # diffrent ds, widths and sample sizes ------------------------------------ ss2 <- NULL # nested loops to run ss.aie.smd with different deltas and widths for(j in seq(0.2, 1, by=0.2)) { ss <- NULL for(i in seq(0.1,2,by=0.2)) { ss <- c(ss, ss.aipe.smd(delta=i, width=j)) } if(j == 0.2) { ss2 <- data.frame("n" = ss) ss2$width <- j } else { ss_tmp <- data.frame("n" = ss) ss_tmp$width <- j ss2 <- rbind(ss2, ss_tmp) } } ss2$delta <- rep(seq(0.1,2,by=0.2), times=5) # add deltas used in loop # ggplot ------------------------------------------------------------------ ggplot(ss2, aes(delta, n, group=factor(width), linetype=factor(width))) + geom_line() |

## References

Cohen J. 1994. The earth is round (p < .05). *Am. Psychol*. 49(12):997–1003

Maxwell, S. E., Kelley, K., & Rausch, J. R. (2008). Sample size planning for statistical power and accuracy in parameter estimation. *Annu. Rev. Psychol.*, 59, 537-563.

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