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The Population Logit Model of the Binary Dependent Variable Y $\frac { 1 } { 1 + e ^ { - \left( \beta _ { 0 } + \beta _ { 1 } X _ { 1 } \right) } }$

Question 48

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The population logit model of the binary dependent variable Y with a single regressor is
Pr(Y=1 | X₁)= $\frac { 1 } { 1 + e ^ { - \left( \beta _ { 0 } + \beta _ { 1 } X _ { 1 } \right) } }$ Logistic functions also play a role in econometrics when the dependent variable is not a binary variable. For example, the demand for televisions sets per household may be a function of income, but there is a saturation or satiation level per household, so that a linear specification may not be appropriate. Given the regression model
Y_i = $\frac { \beta _ { 0 } } { 1 + \beta _ { 1 } e ^ { - \beta _ { 2 } X _ { i } } }$ + u_i,
sketch the regression line. How would you go about estimating the coefficients?

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The equation cannot be estimated using l...
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The Population Logit Model of the Binary Dependent Variable Y 11+e−(β0+β1X1)\frac { 1 } { 1 + e ^ { - \left( \beta _ { 0 } + \beta _ { 1 } X _ { 1 } \right) } }1+e−(β0​+β1​X1​)1​

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Correct Answer:VerifiedThe equation cannot be estimated using l...View AnswerUnlock this answer nowGet Access to more Verified Answers free of chargeView Full Answer For Free

The Population Logit Model of the Binary Dependent Variable Y $\frac { 1 } { 1 + e ^ { - \left( \beta _ { 0 } + \beta _ { 1 } X _ { 1 } \right) } }$

Correct Answer:
Verified
The equation cannot be estimated using l...
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