# Seeing if data is normally distributed in R

``````#data is a single vector of decimal values
normally.distributed <- function(data) {
if(data is normal)
return(TRUE)
else
return(NO)
}
``````
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It's not really clear what you're asking. Are you looking for a function to evaluate whether a vector of numbers look like random draws from a normal distribution? If so, why not just say that? –  Karl Oct 16 '11 at 1:40

Normality tests don't do what most think they do. Shapiro's test, Anderson Darling, and others are null hypothesis tests AGAINST the the assumption of normality. These should not be used to determine whether to use normal theory statistical procedures. In fact they are of virtually no value to the data analyst. Under what conditions are we interested in rejecting the null hypothesis that the data are normally distributed? I have never come across a situation where a normal test is the right thing to do. When the sample size is small, even big departures from normality are not detected, and when your sample size is large, even the smallest deviation from normality will lead to a rejected null.

For example:

``````> set.seed(100)
> x <- rbinom(15,5,.6)
> shapiro.test(x)

Shapiro-Wilk normality test

data:  x
W = 0.8816, p-value = 0.0502

> x <- rlnorm(20,0,.4)
> shapiro.test(x)

Shapiro-Wilk normality test

data:  x
W = 0.9405, p-value = 0.2453
``````

So, in both these cases (binomial and lognormal variates) the p-value is > 0.05 causing a failure to reject the null (that the data are normal). Does this mean we are to conclude that the data are normal? (hint: the answer is no). Failure to reject is not the same thing as accepting. This is hypothesis testing 101.

But what about larger sample sizes? Let's take the case where there the distribution is very nearly normal.

``````> library(nortest)
> x <- rt(500000,200)

Anderson-Darling normality test

data:  x
A = 1.1003, p-value = 0.006975

> qqnorm(x)
``````

Here we are using a t-distribution with 200 degrees of freedom. The qq-plot shows the distribution is closer to normal than any distribution you are likely to see in the real world, but the test rejects normality with a very high degree of confidence.

Does the significant test against normality mean that we should not use normal theory statistics in this case? (another hint: the answer is no :) )

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Very nice. The big follow-up question (which I have yet to find a satisfactory answer for, and would love to have a simple answer to give my students, but I doubt there is one) is: if one is using graphical diagnostics of a regression, how (other than fitting a model/following a procedure that is robust against a certain class of violation [e.g. robust models, generalized least squares,] and showing that its results do not differ interestingly) does one decide whether to worry about a particular type of violation? –  Ben Bolker Oct 17 '11 at 1:59
For linear regression... 1. Don't worry much about normality. The CLT takes over quickly and if you have all but the smallest sample sizes and an even remotely reasonable looking histogram you are fine. 2. Worry about unequal variances (heteroskedasticity). I worry about this to the point of (almost) using HCCM tests by default. A scale location plot will give some idea of whether this is broken, but not always. Also, there is no a priori reason to assume equal variances in most cases. 3. Outliers. A cooks distance of > 1 is reasonable cause for concern. Those are my thoughts (FWIW). –  Ian Fellows Oct 17 '11 at 5:02

Consider using the function `shapiro.test`, which performs the Shapiro-Wilks test for normality. I've been happy with it.

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This is generally reserved for small samples (n < 50), but can be used with samples up to ~ 2000 - Which I would consider a relatively small sample size. –  SoilSciGuy Feb 17 at 22:26

I would also highly recommend the `SnowsPenultimateNormalityTest` in the `TeachingDemos` package. The documentation of the function is far more useful to you than the test itself, though. Read it thoroughly before using the test.

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hadn't seen that before... funny –  John Oct 16 '11 at 7:26

`SnowsPenultimateNormalityTest` certainly has its virtues, but you may also want to look at `qqnorm`.

``````X <- rlnorm(100)
qqnorm(X)
qqnorm(rnorm(100))
``````
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``````library(nortest)