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Reginald Delacruz

Reginald Delacruz

Answered question

2022-06-24

Let a sample ( x , y ) R 2 n be given, where y only attains the values 0 and 1. We can try to model this data set by either linear regression
y i = α 0 + β 0 x i
with the coefficients determined by the method of least squares or by logistic regression
π i = exp ( α 1 + β 1 x i ) 1 + exp ( α 1 + β 1 x i ) ,
where π i denotes the probability that y i = 1 under the given value x i and the coefficients are determined by the Maximum-Likelihood method. My question is whether the following statement holds true.
Claim: If β 0 > 0 ( β 0 < 0), then β 1 > 0 ( β 1 > 0).
I figure this could be due to the sign of the correlation coefficient.

Answer & Explanation

assumintdz

assumintdz

Beginner2022-06-25Added 22 answers

If β 0 > 0, i.e., x E [ Y | X = x ] = β 0 > 0, is suggests that increase in x will increase the probability that Y = 1, since E [ Y | X = x ] = P ( Y = 1 | X = x ) = p. Now, the logistic model is equivalent to
ln ( p 1 p ) = α 1 + β 1 x .
The right hand side can be viewed as linear approximation of ln ( p / ( 1 p ) ). Given that the original linear model is ok, and β 0 > 0, it translates into / x ln ( p / ( 1 p ) ) = ( p ( 1 p ) ) 1 β 0 > 0 for the ln odds model, namely, β 1 must be positive as well (as the slope of the linear approximation).

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