| mean_test2 {OneTwoSamples} | R Documentation |
Two sided or one sided test of hypothesis of mu1 and mu2 of two normal samples
Description
Compute the two sided or one sided test of hypothesis of mu1 and mu2 of two normal samples when the population variances are known, unknown equal, or unknown unequal.
Usage
mean_test2(x, y, sigma = c(-1, -1), var.equal = FALSE, side = 0)
Arguments
x |
A numeric vector. |
y |
A numeric vector. |
sigma |
A numeric vector of length 2, which contains the standard deviations of two populations. When the standard deviations are known, input it, then the function computes the interval endpoints using normal population; when the standard deviations are unknown, ignore it, now we need to consider whether the two populations have equal variances. See |
var.equal |
A logical variable indicating whether to treat the two variances as being equal. If |
side |
A parameter used to control two sided or one sided test of hypothesis. When inputting |
Value
A data.frame with variables:
mean |
The difference of sample means xb-yb. |
df |
The degree of freedom. |
statistic |
The statistic, when |
p_value |
The P value. |
Author(s)
Ying-Ying Zhang (Robert) robertzhangyying@qq.com
References
Zhang, Y. Y., Wei, Y. (2013), One and two samples using only an R funtion, doi:10.2991/asshm-13.2013.29.
Examples
x=rnorm(10, mean = 1, sd = 0.2); x
y=rnorm(20, mean = 2, sd = 0.3); y
mean_test2(x, y, sigma = c(0.2, 0.3), side = 1)
mean_test2(x, y, var.equal = TRUE, side = 1)
mean_test2(x, y, side = 1)