sf.test {nortest} | R Documentation |
Shapiro-Francia test for normality
Description
Performs the Shapiro-Francia test for the composite hypothesis of normality, see e.g. Thode (2002, Sec. 2.3.2).
Usage
sf.test(x)
Arguments
x |
a numeric vector of data values, the number of which must be between 5 and 5000. Missing values are allowed. |
Details
The test statistic of the Shapiro-Francia test is simply the squared correlation between the ordered sample values and the (approximated) expected ordered quantiles from the standard normal distribution. The p-value is computed from the formula given by Royston (1993).
Value
A list with class “htest” containing the following components:
statistic |
the value of the Shapiro-Francia statistic. |
p.value |
the p-value for the test. |
method |
the character string “Shapiro-Francia normality test”. |
data.name |
a character string giving the name(s) of the data. |
Note
The Shapiro-Francia test is known to perform well,
see also the comments by Royston (1993). The expected ordered quantiles
from the standard normal distribution are approximated by
qnorm(ppoints(x, a = 3/8))
, being slightly different from the approximation
qnorm(ppoints(x, a = 1/2))
used for the normal quantile-quantile plot by
qqnorm
for sample sizes greater than 10.
Author(s)
Juergen Gross
References
Royston, P. (1993): A pocket-calculator algorithm for the Shapiro-Francia test for non-normality: an application to medicine. Statistics in Medicine, 12, 181–184.
Thode Jr., H.C. (2002): Testing for Normality. Marcel Dekker, New York.
See Also
shapiro.test
for performing the Shapiro-Wilk test for normality.
ad.test
, cvm.test
,
lillie.test
, pearson.test
for performing further tests for normality.
qqnorm
for producing a normal quantile-quantile plot.
Examples
sf.test(rnorm(100, mean = 5, sd = 3))
sf.test(runif(100, min = 2, max = 4))