Computes a confidence interval for the mean of the variable (parameter
or feature of the process), and prints the data, a histogram with a density line,
the result of the Shapiro-Wilks normality test and a quantile-quantile plot.
Usage
ss.ci(x, sigma2 = NA, alpha = 0.05, data = NA, xname = "x",
approx.z = FALSE, main = "Confidence Interval for the Mean", digits = 3,
sub = "", ss.col = c("#666666", "#BBBBBB", "#CCCCCC", "#DDDDDD",
"#EEEEEE"))
Arguments
x
A numeric vector with the variable data
sigma2
The population variance, if known
alpha
The eqn\alpha error used to compute the \(100*(1-\\alpha)\%\) confidence interval
data
The data frame containing the vector
xname
The name of the variable to be shown in the graph
approx.z
If TRUE it uses z statistic instead of t when sigma is unknown and sample size
is greater than 30. The default is FALSE, change only if you want to compare with
results obtained with the old-fashioned method mentioned in some books.
main
The main title for the graph
digits
Significant digits for output
sub
The subtitle for the graph (recommended: six sigma project name)
ss.col
A vector with colors
Value
The confidence Interval.
A graph with the figures, the Shapiro-Wilks test, and a histogram.
Details
When the population variance is known, or the size is greater than 30,
it uses z statistic. Otherwise, it is uses t statistic.
If the sample size is lower than 30, a warning is displayed so as to
verify normality.