Description Usage Arguments Value Author(s) References Examples
The function computes exact values of the power of the randomized UMPU test for equivalence in the strict (i.e. two-sided) sense of two binomial distributions and the conservative nonrandomized version of that test. It is assumed that the samples being available from both distributions are independent.
1 | bi2aeq1(m,n,rho1,rho2,alpha,p1,p2)
|
m |
size of Sample 1 |
n |
size of Sample 2 |
rho1 |
lower limit of the hypothetical equivalence range for the odds ratio |
rho2 |
upper limit of the hypothetical equivalence range for the odds ratio |
alpha |
significance level |
p1 |
true success rate in Population 1 |
p2 |
true success rate in Population 2 |
m |
size of Sample 1 |
n |
size of Sample 2 |
rho1 |
lower limit of the hypothetical equivalence range for the odds ratio |
rho2 |
upper limit of the hypothetical equivalence range for the odds ratio |
alpha |
significance level |
p1 |
true success rate in Population 1 |
p2 |
true success rate in Population 2 |
POWNR |
Power of the nonrandomized version of the test |
POW |
Power of the randomized UMPU test |
Stefan Wellek <stefan.wellek@zi-mannheim.de>
Peter Ziegler <peter.ziegler@zi-mannheim.de>
Wellek S: Testing statistical hypotheses of equivalence and noninferiority. Second edition. Boca Raton: Chapman & Hall/CRC Press, 2010, Par. 6.6.4.
1 2 | bi2aeq1(302,302,0.6667,1.5,0.05,0.5,0.5)
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