Logistic Regression: A Self-learning Text, Third Edition (Statistics in the Health Sciences)

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B. Example of model involving three exposure
variables:
logit PðÞ¼X aþb 1 SMKþb 2 PALþb 3 SBP

þ~

p 1

i¼ 1

giVi:

C. The odds ratio formula for the general no
interaction model:
RORE*vs:E**¼exp½ðE* 1 E** 1 Þb 1 þðE* 2 E** 2 Þb 2
þþðE*qE**qÞbqŠ;

whereE*¼(E 1 *,E 2 *,...,Eq*) andE**¼
(E 1 *,E 2 **,...,Eq**) are two specifications of the
collection of exposure variables to be compared.
D. Example of odds ratio involving three exposure
variables:
RORE*vs:E**¼exp½ðSMK*SMK**Þb 1
þðPAL*PAL**Þb 2
þðSBP*SBP**Þb 3 Š:
VI. The model and odds ratio for several exposure
variables with confounders and interaction
(pages 87–91)
A. An example of a model with three exposure
variables:
logit PðÞ¼X aþb 1 SMKþb 2 PALþb 3 SBPþg 1 AGE
þg 2 SEXþSMKðÞd 11 AGEþd 12 SEX
þPALðÞd 21 AGEþd 22 SEX
þSBPðÞd 31 AGEþd 32 SEX:
B. The odds ratio formula for the above model:
RORE*vs:E**¼exp½ðSMK*SMK**Þb 1
þðPAL*PAL**Þb 2 þðSBP*SBP**Þb 3
þd 11 ðSMK*SMK**ÞAGE
þd 12 ðSMK*SMK**ÞSEX
þd 21 ðPAL*PAL**ÞAGE
þd 22 ðPAL*PAL**ÞSEX
þd 31 ðSBP*SBP**ÞAGE
þd 32 ðSBP*SBP**ÞSEXŠ

94 3. Computing the Odds Ratio in Logistic Regression

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