The Wald confidence interval with continuity correction for the binomial probability. Described in Chapter 2 "The 1x2 Table and the Binomial Distribution"
Wald_CI_CC_1x2(X, n, alpha = 0.05)An object of the contingencytables_result class,
basically a subclass of base::list(). Use the utils::str() function
to see the specific elements returned.
# The number of 1st order male births (Singh et al. 2010)
Wald_CI_CC_1x2(singh_2010["1st", "X"], singh_2010["1st", "n"])
#> The Wald CI with continuity correction: estimate = 0.4690 (95% CI 0.4257 to 0.5123)
# The number of 2nd order male births (Singh et al. 2010)
Wald_CI_CC_1x2(singh_2010["2nd", "X"], singh_2010["2nd", "n"])
#> The Wald CI with continuity correction: estimate = 0.4951 (95% CI 0.4457 to 0.5446)
# The number of 3rd order male births (Singh et al. 2010)
Wald_CI_CC_1x2(singh_2010["3rd", "X"], singh_2010["3rd", "n"])
#> The Wald CI with continuity correction: estimate = 0.6168 (95% CI 0.5400 to 0.6935)
# The number of 4th order male births (Singh et al. 2010)
with(singh_2010["4th", ], Wald_CI_CC_1x2(X, n)) # alternative syntax
#> The Wald CI with continuity correction: estimate = 0.7333 (95% CI 0.5930 to 0.8736)
# Ligarden et al. (2010)
Wald_CI_CC_1x2(ligarden_2010["X"], ligarden_2010["n"])
#> The Wald CI with continuity correction: estimate = 0.8125 (95% CI 0.5900 to 1.0000)