tsum.test {PASWR} | R Documentation |
Summarized t-test
Description
Performs a one-sample, two-sample, or a Welch modified two-sample t-test based on user supplied summary information. Output is identical to that produced with t.test
.
Usage
tsum.test(
mean.x,
s.x = NULL,
n.x = NULL,
mean.y = NULL,
s.y = NULL,
n.y = NULL,
alternative = c("two.sided", "less", "greater"),
mu = 0,
var.equal = FALSE,
conf.level = 0.95,
...
)
Arguments
mean.x |
a single number representing the sample mean of |
s.x |
a single number representing the sample standard deviation of |
n.x |
a single number representing the sample size of |
mean.y |
a single number representing the sample mean of |
s.y |
a single number representing the sample standard deviation of |
n.y |
a single number representing the sample size of |
alternative |
is a character string, one of |
mu |
is a single number representing the value of the mean or difference in means specified by the null hypothesis. |
var.equal |
logical flag: if |
conf.level |
is the confidence level for the returned confidence interval; it must lie between zero and one. |
... |
Other arguments passed onto |
Details
If y
is NULL
, a one-sample t-test is carried out with x
. If y
is not NULL
, either a standard or Welch modified two-sample t-test is performed, depending on whether var.equal
is TRUE
or FALSE
.
Value
A list of class htest
, containing the following components:
statistic |
the t-statistic, with names attribute |
parameters |
is the degrees of freedom of the t-distribution associated with statistic. Component |
p.value |
the p-value for the test |
conf.int |
is a confidence interval (vector of length 2) for the true mean or difference in means. The confidence level is recorded in the attribute |
estimate |
is a vector of length 1 or 2, giving the sample mean(s) or mean of differences; these estimate the corresponding population parameters. Component |
null.value |
is the value of the mean or difference in means specified by the null hypothesis. This equals the input argument |
alternative |
records the value of the input argument alternative: |
data.name |
is a character string (vector of length 1) containing the names x and y for the two summarized samples. |
Null Hypothesis
For the one-sample t-test, the null hypothesis is that the mean of the population from which x
is drawn is mu
. For the standard and Welch modified two-sample t-tests, the null hypothesis is that the population mean for x
less that for y
is mu
.
The alternative hypothesis in each case indicates the direction of divergence of the population mean for x
(or difference of means for x
and y
) from mu
(i.e., "greater"
, "less"
, or "two.sided"
).
Test Assumptions
The assumption of equal population variances is central to the standard two-sample t-test. This test can be misleading when population variances are not equal, as the null distribution of the test statistic is no longer a t-distribution. If the assumption of equal variances is doubtful with respect to a particular dataset, the Welch modification of the t-test should be used.
The t-test and the associated confidence interval are quite robust with respect to level toward heavy-tailed non-Gaussian distributions (e.g., data with outliers). However, the t-test is non-robust with respect to power, and the confidence interval is non-robust with respect to average length, toward these same types of distributions.
Confidence Intervals
For each of the above tests, an expression for the related confidence interval (returned component conf.int
) can be obtained in the usual way by inverting the expression for the test statistic. Note that, as explained under the description of conf.int
, the confidence interval will be half-infinite when alternative is not "two.sided"
; infinity will be represented by Inf
.
Author(s)
Alan T. Arnholt <arnholtat@appstate.edu>
References
Kitchens, L.J. 2003. Basic Statistics and Data Analysis. Duxbury.
Hogg, R. V. and Craig, A. T. 1970. Introduction to Mathematical Statistics, 3rd ed. Toronto, Canada: Macmillan.
Mood, A. M., Graybill, F. A. and Boes, D. C. 1974. Introduction to the Theory of Statistics, 3rd ed. New York: McGraw-Hill.
Snedecor, G. W. and Cochran, W. G. 1980. Statistical Methods, 7th ed. Ames, Iowa: Iowa State University Press.
See Also
Examples
# 95% Confidence Interval for mu1 - mu2, assuming equal variances
round(tsum.test(mean.x = 53/15, mean.y = 77/11, s.x=sqrt((222 - 15*(53/15)^2)/14),
s.y = sqrt((560 - 11*(77/11)^2)/10), n.x = 15, n.y = 11, var.equal = TRUE)$conf, 2)
# One Sample t-test
tsum.test(mean.x = 4, s.x = 2.89, n.x = 25, mu = 2.5)