logit? ORVIII. Derivation of OR Formula
OR¼
odds 1
odds 0X¼(X 1 ,X 2 ,...,Xk)
(1) X 1 ¼(X 11 ,X 12 ,...,X 1 k)
(0) X 0 ¼(X 01 ,X 02 ,...,X 0 k)
NOTATION
ORX 1 ;X 0 ¼
odds forX 1
odds forX 0Now, how can we use this information about
logits to obtain anodds ratio, rather than an
odds? After all, we are typically interested in
measures of association, like odds ratios, when
we carry out epidemiologic research.Anyodds ratio, by definition, is a ratio of two
odds, written here asodds 1 divided byodds 0 ,in
which the subscripts indicate two individuals
or two groups of individuals being compared.Now we give an example of an odds ratio in
which we compare two groups, called group 1
and group 0. Using our CHD example involving
independent variables CAT, AGE, and ECG,
group 1 might denote persons with CAT¼1,
AGE¼40, and ECG¼0, whereas group
0 might denote persons with CAT¼0, AGE
¼40, and ECG¼0.More generally, when we describe an odds
ratio, the two groups being compared can be
defined in terms of the boldXsymbol, which
denotes a general collection of Xvariables,
from 1 tok.LetX 1 denote the collection ofXs that specify
group 1 and letX 0 denote the collection ofXs
that specify group 0.In our example, then,k, the number of vari-
ables, equals 3, andXis the collection of variables CAT, AGE, and
ECG,
X 1 corresponds to CAT¼1, AGE¼40, and
ECG¼0, whereas
X 0 corresponds to CAT¼0, AGE¼40, and
ECG¼0.Notationally, to distinguish the two groupsX 1
andX 0 in anodds ratio, we can write ORX 1 ,X 0
equals theodds forX 1 divided by theodds
forX 0.We will now apply the logistic model to this
expression to obtain a general odds ratio for-
mula involving the logistic model parameters.EXAMPLE
X¼(CAT, AGE, ECG)
(1)X 1 ¼(CAT¼1,AGE¼40,ECG¼0)
(0)X 0 ¼(CAT¼0,AGE¼40,ECG¼0)EXAMPLE
(1) CAT¼1, AGE = 40, ECG = 0
(0) CAT¼0, AGE = 40, ECG = 022 1. Introduction to Logistic Regression