*22*

A nested ANOVA is a type of ANOVA (“analysis of variance”) in which at least one factor is *nested* inside another factor.

For example, suppose a researcher wants to know if three different fertilizers produce different levels of plant growth.

To test this, he has three different technicians sprinkle fertilizer A on four plants each, another three technicians sprinkle fertilizer B on four plants each, and another three technicians sprinkle fertilizer C on four plants each.

In this scenario, the response variable is plant growth and the two factors are technician and fertilizer. It turns out that technician is *nested* within fertilizer:

The following step-by-step example shows how to perform this nested ANOVA in R.

**Step 1: Create the Data**

First, let’s create a data frame to hold our data in R:

#create data df frame(growth=c(13, 16, 16, 12, 15, 16, 19, 16, 15, 15, 12, 15, 19, 19, 20, 22, 23, 18, 16, 18, 19, 20, 21, 21, 21, 23, 24, 22, 25, 20, 20, 22, 24, 22, 25, 26), fertilizer=c(rep(c('A', 'B', 'C'), each=12)), tech=c(rep(1:9, each=4))) #view first six rows of data head(df) growth fertilizer tech 1 13 A 1 2 16 A 1 3 16 A 1 4 12 A 1 5 15 A 2 6 16 A 2

**Step 2: Fit the Nested ANOVA**

We can use the following syntax to fit a nested ANOVA in R:

**aov(response ~ factor A / factor B)**

where:

**response:**The response variable**factor A:**The first factor**factor B:**The second factor nested within the first factor

The following code shows how to fit the nested ANOVA for our dataset:

#fit nested ANOVA nest #view summary of nested ANOVA summary(nest) Df Sum Sq Mean Sq F value Pr(>F) df$fertilizer 2 372.7 186.33 53.238 4.27e-10 *** df$fertilizer:factor(df$tech) 6 31.8 5.31 1.516 0.211 Residuals 27 94.5 3.50 --- Signif. codes: 0 ‘***’ 0.001 ‘**’ 0.01 ‘*’ 0.05 ‘.’ 0.1 ‘ ’ 1

**Step 3: Interpret the Output**

We can look at the p-value column to determine whether or not each factor has a statistically significant effect on plant growth.

From the table above, we can see that fertilizer has a statistically significant effect on plant growth (p-value

This tells us that if we’d like to increase plant growth, we should focus on the fertilizer being used rather than the individual technician who is sprinkling the fertilizer.

**Step 4: Visualize the Results**

Lastly, we can use boxplots to visualize the distribution of plant growth by fertilizer and by technician:

#load ggplot2 data visualization package library(ggplot2) #create boxplots to visualize plant growth ggplot(df, aes(x=factor(tech), y=growth, fill=fertilizer)) + geom_boxplot()

From the chart we can see that there is significant variation in growth between the three different fertilizers, but not as much variation between the technicians within each fertilizer group.

This seems to match up with the results of the nested ANOVA and confirms that fertilizer has a significant effect on plant growth but individual technicians do not.

**Additional Resources**

How to Perform a One-Way ANOVA in R

How to Perform a Two-Way ANOVA in R

How to Perform a Repeated Measures ANOVA in R