|
|
本帖最后由 Menuett 于 2013-12-22 15:59 编辑
4 e; k7 ^9 E' m1 E% c3 \9 n煮酒正熟 发表于 2013-12-20 12:05 : z Q# h7 M/ E! P/ M4 J
基本可以说是显著的。总的来说,在商界做统计学分析,95%信心水平是用得最多的,当95%上不显著时,都会去 ...
) y& }9 }+ Y- q6 v2 q$ H6 K
/ K' [( {$ P2 f- `! j这个其实是一种binomial response,应该用Contigency Table或者Logisitic Regression(In case there are cofactors)来做。只记比率丢弃了Number of trial的信息(6841和1217个客户)。 , e# p3 e' F' }" Y/ l
2 q& g. N' R! d5 u T结果p=0.5731。 远远不显著。要在alpha level 0.05的水平上检验出76.42%和75.62%的区别,即使实验组和对照组各自样本大小相同,各自尚需44735个样本(At power level 80%)。see: Statistical Methods for Rates and Proportions by Joseph L. Fleiss (1981)
5 C/ g- r' [0 `6 o# \$ }0 p& t! O' n% U
/ }. r6 M5 n0 xR example:6 q4 }5 g1 g8 w; R8 s: Z
# D, Y- @' ^+ n
> M<-as.table(rbind(c(1668,5173),c(287,930)))
4 N- H7 G2 V! Y> chisq.test(M)9 \+ Z* j h3 A7 z1 W7 v! z
6 h) w+ i( G, [* \/ @# p+ M Pearson's Chi-squared test with Yates' continuity correction
* e$ U$ [3 N4 l6 {- ?' }8 i" N7 {) S) c+ |) @
data: M
( ]/ ~0 \7 @- g# P zX-squared = 0.3175, df = 1, p-value = 0.5731
' c; q4 t l# B5 x. [2 w& }7 O3 n9 x( H$ @$ O
Python example:. h9 T8 _' _/ |
; o$ }' V5 N7 O, v M$ |4 Z+ j
>>> from scipy import stats8 u3 W/ X! i9 J) G8 `' D( e8 U
>>> stats.chi2_contingency([[6841-5173,5173],[1217-930,930]])
- b9 I& [- K* Q6 u: q% q& N(0.31748297614660292, 0.57312422493552839, 1, array([[ 1659.73628692, 5181.26371308],
* E! O$ H8 m# O! s% q: p [ 295.26371308, 921.73628692]])) |
|