Geometric mean and CV [Power / Sample Size]

posted by Rocco_M – Mexico, 2019-09-06 17:49 (310 d 06:19 ago) – Posting: # 20548
Views: 2,959

Thanks. So basically your analysis follows from the fact that the variance of the difference of T and R equal the sum of the variance of T and the variance of R, correct? And you are using the geometric CV as the estimate of CVp for R?


Edit: Full quote removed. Please delete everything from the text of the original poster which is not necessary in understanding your answer; see also this post #5[Helmut]

Complete thread:

Activity
 Admin contact
20,822 posts in 4,356 threads, 1,447 registered users;
online 25 (1 registered, 24 guests [including 14 identified bots]).
Forum time: 00:09 CEST (Europe/Vienna)

The analysis of variance is not a mathematical theorem,
but rather a convenient method of arranging the arithmetic.    R.A. Fisher

The Bioequivalence and Bioavailability Forum is hosted by
BEBAC Ing. Helmut Schütz
HTML5