基于二项分布的小样本总体率可信区间估计方法
Clopper-Pearson Bounds from HEP Data Cuts a r X i v :h e p -e x /0010061v 1 24 O c t 2000Clopper-Pearson Bounds from HEP Data Cuts ∗Bernd A.Berg Department of Physics,The Florida State University,Tallahassee,FL 32306,USA.E-mail:berg@hep.fsu.edu October 20,2000Abstract For ...
For the measurement of N[sub s] signals in N events rigorous confidence bounds on the true signal probability p[sub exact] were established in a classical paper by Clopper and Pearson [Biometrica 26, 404 (1934)]. Here, their bounds are generalized to the HEP situation where cuts on the ...
The Clopper-Pearson exact method is strictly conservative. It is the most commonly cited exact method for finding a confidence interval [1].
EN转载 链接: https://www.codesd.com/item/confidence-interval-of-coefficients-using-the-...
typeisClopper-Pearson(CP)interval; it uses the tail method for forming confidence intervals. According to [7] and [8], there was a time when this method was treated as the “golden rule” for obtaining binomial proportion confidence intervals. In a traditional statistical sense, the appe...
Generalised Clopper-Pearson confidence intervals for the binomial proportion. Journal of Statistical Computation and Simulation. 2006;76:489-508.PUZA, B. & O'NEILL, T. (2006a). Generalised Clopper-Pearson confidence in- tervals for the binomial proportion. Journal of Statistical Computation and ...
R Code for Clopper-Pearson `exact´ CI for a binomial parameter:为准确的克洛珀-皮尔森` CI为二项式参数R代码 下载文档 收藏 打印 转格式 624阅读文档大小:44.0K3页damatuhao8上传于2014-02-09格式:DOC samdist a computer code for calculating statistical distributions for r-matrix resonance parameters (...
Clopper, C. J. and E. Pearson. 1934 . The use of confidence or fiducial limits illustrated in the case of binomial. Biometrika 26: 404 – 413 ... GH Shelton,ML Linenberger - 《Semin Vet Med Surg》 被引量: 92发表: 1995年 Recommended tests and confidence intervals for paired binomial...
(2010): "The Shortest Clopper-Pearson Confidence Interval for Binomial Probability," Communications in Statistics - Simulation and Computation, 39, 188-193, doi: 10.1080/03610910903391270.W. Zielin´ski. The shortest clopper-pearson confidence interval for binomial probability. Communications in ...