#' @import TeachingSampling
#' @export
#'
#' @title
#' Statistical power for a hyphotesis testing on a difference of means.
#' @description
#' This function computes the power for a (right tail) test of difference of means
#' @return
#' The power of the test.
#' @details
#' We note that the power is defined as: \deqn{1-\Phi(Z_{1-\alpha} - \frac{ (D - (\mu_1 - \mu_2))}{\sqrt{\frac{1}{n}(1-\frac{n}{N})S^2}})}
#' where \deqn{S^2 = DEFF (\sigma_1^2 + \sigma_2^2 }
#' @author Hugo Andres Gutierrez Rojas <hagutierrezro at gmail.com>
#' @param N The population size.
#' @param n The sample size.
#' @param mu1 The value of the estimated mean of the variable of interes for the first population.
#' @param mu2 The value of the estimated mean of the variable of interes for the second population.
#' @param sigma1 The value of the estimated variance of the variable of interes for the first population.
#' @param sigma2 The value of the estimated mean of a variable of interes for the second population.
#' @param D The value of the null effect.
#' @param DEFF The design effect of the sample design. By default \code{DEFF = 1}, which corresponds to a simple random sampling design.
#' @param conf The statistical confidence. By default \code{conf = 0.95}.
#' @param plot Optionally plot the power achieved for an specific sample size.
#'
#' @references
#' Gutierrez, H. A. (2009), \emph{Estrategias de muestreo: Diseno de encuestas y estimacion de parametros}. Editorial Universidad Santo Tomas
#' @seealso \code{\link{ss4p}}
#' @examples
#' b4dm(N = 100000, n = 400, mu1 = 5, mu2 = 5, sigma1 = 10, sigma2 = 15, D = 5)
#' b4dm(N = 100000, n = 400, mu1 = 5, mu2 = 5, sigma1 = 10, sigma2 = 15, D = 0.03, plot = TRUE)
#' b4dm(N = 100000, n = 4000, mu1 = 5, mu2 = 5, sigma1 = 10, sigma2 = 15,
#' D = 0.05, DEFF = 2, conf = 0.99, plot = TRUE)
b4dm <- function(N, n, mu1, mu2, sigma1, sigma2, D, DEFF = 1, conf = 0.95, plot = FALSE){
S2 <- DEFF * (sigma1^2 + sigma2^2)
Za = qnorm(conf)
f = n/N
VAR = (1 / n) * (1 - f) * S2
beta = 100 * (1 - pnorm(Za - ((D - (mu1 - mu2)) / sqrt(VAR))))
if(plot == TRUE) {
nseq=seq(1,N,10)
betaseq=rep(NA,length(nseq))
for(k in 1:length(nseq)){
fseq=nseq[k]/N
varseq=(1/nseq[k])*(1-fseq)*S2
betaseq[k]=100*(1 - pnorm(Za - ((D - (mu1 - mu2)) / sqrt(varseq))))
}
plot(nseq,betaseq, type="l", lty=1, pch=1, col=3, ylab="Power of the test (%)",xlab="Sample Size")
points(n,beta, pch=8, bg = "blue")
abline(h=beta,lty=3)
abline(v=n,lty=3)
}
msg <- cat('With the parameters of this function: N =', N, 'n = ', n, 'mu1 =', "mu1 =", mu1, "mu2 =", mu2,
"sigma1 =", sigma1, "sigma2 =", sigma2, 'D =', D, 'DEFF = ', DEFF, 'conf =', conf,
'. \nThe estimated power of the test is ', beta, '. \n \n')
result <- list(Power = beta)
result
}
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