EXERCÍCIO 8 – ANÁLISE DA VARIÂNCIA DE PLANOS FACTORIAIS |
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OUTPUT 14 |
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Análise
da Variância Bifactorial (A2B2) |
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Comandos |
GET |
FILE='C:\Documents and Settings\user\Desktop\E08_DATA1.sav'. |
UNIANOVA |
vd BY a b |
/METHOD = SSTYPE(3) |
/INTERCEPT = INCLUDE |
/PRINT = DESCRIPTIVE ETASQ OPOWER |
/CRITERIA = ALPHA(.05) |
/DESIGN = a b a*b. |
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Output |
Between-Subjects Factors |
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N |
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A |
1 |
10 |
2 |
10 |
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B |
1 |
10 |
2 |
10 |
Descriptive Statistics |
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A |
B |
Mean |
Std. Deviation |
N |
1 |
1 |
16,8000 |
2,1679 |
5 |
2 |
11,0000 |
2,2361 |
5 |
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Total |
13,9000 |
3,6953 |
10 |
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2 |
1 |
10,6000 |
2,0736 |
5 |
2 |
12,0000 |
2,2361 |
5 |
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Total |
11,3000 |
2,1628 |
10 |
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Total |
1 |
13,7000 |
3,8312 |
10 |
2 |
11,5000 |
2,1731 |
10 |
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Total |
12,6000 |
3,2347 |
20 |
Tests of Between-Subjects Effects |
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Source |
Type III Sum of Squares |
df |
Mean Square |
F |
Sig. |
Partial Eta Squared |
Noncent. Parameter |
Observed Power(a) |
Corrected Model |
122,8000(b) |
3 |
40,9333 |
8,6175 |
,0012 |
,6177 |
25,8526 |
,9754 |
Intercept |
3175,2000 |
1 |
3175,2000 |
668,4632 |
,0000 |
,9766 |
668,4632 |
1,0000 |
A |
33,8000 |
1 |
33,8000 |
7,1158 |
,0169 |
,3078 |
7,1158 |
,7071 |
B |
24,2000 |
1 |
24,2000 |
5,0947 |
,0383 |
,2415 |
5,0947 |
,5639 |
A * B |
64,8000 |
1 |
64,8000 |
13,6421 |
,0020 |
,4602 |
13,6421 |
,9337 |
Error |
76,0000 |
16 |
4,7500 |
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Total |
3374,0000 |
20 |
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Corrected Total |
198,8000 |
19 |
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a Computed using alpha = ,05 |
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b R Squared = ,618 (Adjusted R Squared =
,546) |
Ver Procedimentos e Outputs em
ANOVA Bifactorial: Medidas de Associação e do
Tamanho do Efeito e Poder Observado
Última
actualização: 2011-10-21