Manuals/calci/Bartlett'sTest

BARTLETTSTEST(DataRange,ConfidenceLevel,NewTableFlag)

$DataRange$ is the array of x values.
$ConfidenceLevel$ is the value from 0 to 1.
$NewTableFlag$ is either TRUE or FALSE. TRUE for getting results in a new cube. FALSE will display results in the same cube.

Description

Bartlett's test is used to test if k samples are from populations with equal variances.
Also called Bartlett's test for homogeneity of variances. It is used to test if variances are equal for all samples.
Bartlett's test is sensitive to departures from normality.
It is used when you’re fairly certain your data comes from a normal distribution.
That is, if the samples come from non-normal distributions, then Bartlett's test may simply be testing for non-normality.

  $B={\frac {df_{W}lnMS_{W}-\sum _{j}df_{j}lns_{j}^{2}}{1+{\frac {1}{3(k-1)}}(\sum _{j}{\frac {1}{df_{j}}}-{\frac {1}{df_{W}}})}}$

=BARTLETTSTEST([A1:A8,B1:B8,C1:C8,D1:D8],0.05,true)

BARTLETT'S TEST
	DATA-0	DATA-1	DATA-2	DATA-3
MEAN	60.375	77.875	78	71.875
VARIANCE	214.26785714285714	157.55357142857142	164.57142857142858	181.55357142857142
LNVARIANCE	5.367226901229239	5.059765536486956	5.1033446922005234	5.201550769540011
COUNT	8	8	8	8
DF	7	7	7	7
1/DF	0.14285714285714285	0.14285714285714285	0.14285714285714285	0.14285714285714285

RESULTS
	DATA
B-NUMERATOR	0.19960131136474502
B-DENOMINATOR	1.0595238095238095
B	0.18838775454650092
P-VALUE	0.979441777737987
B-CRITICAL	7.810299999999978
RESULT	THE P-VALUE IS LESSER THAN THE B-CRITICAL VALUE, SO THE VARIANCES ARE JUDGED TO BE EQUAL.