Medical studies often involve a comparison between two outcomes, each collected from a sample. The probability associated with, and confidence in the result of the study is of most importance, since one may argue that having been wrong with a percent could be what killed a patient. Sampling is usually done from a finite and discrete population and it follows a Bernoulli trial, leading to a contingency of two binomially distributed samples (better known as 2×2 contingency table). Current guidelines recommend reporting relative measures of association (such as the relative risk and odds ratio) in conjunction with absolute measures of association (which include risk difference or excess risk). Because the distribution is discrete, the evaluati...
Well-recommended methods of forming ‘confidence intervals’ for a binomial proportion give interval e...
The likelihood ratio method is used to construct a confidence interval for a population mean when sa...
The construction of a confidence interval for a binomial parameter is a basic analysis in statistica...
When collecting experimental data, the observable may be dichotomous. Sampling (eventually with repl...
The aim of the paper was to present the usefulness of the binomial distribution in studying of the c...
The relative risk and odds ratio are widely used in many fields, including biomedical research, to c...
For comparison of proportions, there are three commonly used measurements: the difference, the relat...
Four interval estimation methods for the ratio of marginal binomial proportions are compared in term...
Kaufman et al. compute the 'excess risk' of a disease in the presence of an exposure as the product ...
In this article we derive likelihood-based confidence intervals for the risk ratio using over-report...
Confidence interval are defines as an estimated range of values that is likely to include an unknown...
The construction of asymptotic confidence intervals is considered for the difference of binomial pro...
The fraction who benefit from treatment is the proportion of patients whose potential outcome under ...
• In applied statistics it is often necessary to obtain an interval estimate for an unknown proporti...
For binary outcome data from epidemiological studies, this article investigates the interval estimat...
Well-recommended methods of forming ‘confidence intervals’ for a binomial proportion give interval e...
The likelihood ratio method is used to construct a confidence interval for a population mean when sa...
The construction of a confidence interval for a binomial parameter is a basic analysis in statistica...
When collecting experimental data, the observable may be dichotomous. Sampling (eventually with repl...
The aim of the paper was to present the usefulness of the binomial distribution in studying of the c...
The relative risk and odds ratio are widely used in many fields, including biomedical research, to c...
For comparison of proportions, there are three commonly used measurements: the difference, the relat...
Four interval estimation methods for the ratio of marginal binomial proportions are compared in term...
Kaufman et al. compute the 'excess risk' of a disease in the presence of an exposure as the product ...
In this article we derive likelihood-based confidence intervals for the risk ratio using over-report...
Confidence interval are defines as an estimated range of values that is likely to include an unknown...
The construction of asymptotic confidence intervals is considered for the difference of binomial pro...
The fraction who benefit from treatment is the proportion of patients whose potential outcome under ...
• In applied statistics it is often necessary to obtain an interval estimate for an unknown proporti...
For binary outcome data from epidemiological studies, this article investigates the interval estimat...
Well-recommended methods of forming ‘confidence intervals’ for a binomial proportion give interval e...
The likelihood ratio method is used to construct a confidence interval for a population mean when sa...
The construction of a confidence interval for a binomial parameter is a basic analysis in statistica...