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Introductory Econometrics 4th Edition by Jeffrey Wooldridge
Edition 4ISBN: 978-0324660609Introductory Econometrics 4th Edition by Jeffrey Wooldridge
Edition 4ISBN: 978-0324660609 Exercise 5
Let d be a dummy (binary) variable and let z be a quantitative variable. Consider the model ![Let d be a dummy (binary) variable and let z be a quantitative variable. Consider the model this is a general version of a model with an interaction between a dummy variable and a quantitative variable. [An example is in equation. (i) Since it changes nothing important, set the error to zero, u = 0. Then, when d _ 0 we can write the relationship between y and z as the function f 0 (z) = 0 + 1 z. Write the same relationship when d = 1, where you should use f 1 (z) on the left-hand side to denote the linear function of z. (ii) Assuming that 1 0 (which means the two lines are not parallel), show that the value of z* such that f 0 (z*) = f 1 (z*) is z* = 0 / 1. This is the point at which the two lines intersect [as in Figure 7.2(b)]. Argue that z* is positive if and only if 0 and 1 have opposite signs (iii) Using the data in TWOYEAR.RAW, the following equation can be estimated: where all coefficients and standard errors have been rounded to three decimal places. Using this equation, find the value of totcoll such that the predicted values of log(wage) are the same for men and women. (iv) Based on the equation in part (iii), can women realistically get enough years of college so that their earnings catch up to those of men Explain. Equation Figure Graphs of equation: (a) 0 0, 1 0; (b) 0 0, 1 0.](https://d2lvgg3v3hfg70.cloudfront.net/SM2712/11eb9ee2_f0ba_713d_8edd_45e69b4a7c56_SM2712_00.jpg)
this is a general version of a model with an interaction between a dummy variable and a quantitative variable. [An example is in equation.
(i) Since it changes nothing important, set the error to zero, u = 0. Then, when d _ 0 we can write the relationship between y and z as the function f 0 (z) = 0 + 1 z. Write the same relationship when d = 1, where you should use f 1 (z) on the left-hand side to denote the linear function of z.
(ii) Assuming that 1 0 (which means the two lines are not parallel), show that the value of z* such that f 0 (z*) = f 1 (z*) is z* = 0 / 1. This is the point at which the two lines intersect [as in Figure 7.2(b)]. Argue that z* is positive if and only if 0 and 1 have opposite signs
(iii) Using the data in TWOYEAR.RAW, the following equation can be estimated:![Let d be a dummy (binary) variable and let z be a quantitative variable. Consider the model this is a general version of a model with an interaction between a dummy variable and a quantitative variable. [An example is in equation. (i) Since it changes nothing important, set the error to zero, u = 0. Then, when d _ 0 we can write the relationship between y and z as the function f 0 (z) = 0 + 1 z. Write the same relationship when d = 1, where you should use f 1 (z) on the left-hand side to denote the linear function of z. (ii) Assuming that 1 0 (which means the two lines are not parallel), show that the value of z* such that f 0 (z*) = f 1 (z*) is z* = 0 / 1. This is the point at which the two lines intersect [as in Figure 7.2(b)]. Argue that z* is positive if and only if 0 and 1 have opposite signs (iii) Using the data in TWOYEAR.RAW, the following equation can be estimated: where all coefficients and standard errors have been rounded to three decimal places. Using this equation, find the value of totcoll such that the predicted values of log(wage) are the same for men and women. (iv) Based on the equation in part (iii), can women realistically get enough years of college so that their earnings catch up to those of men Explain. Equation Figure Graphs of equation: (a) 0 0, 1 0; (b) 0 0, 1 0.](https://d2lvgg3v3hfg70.cloudfront.net/SM2712/11eb9ee2_f0ba_713e_8edd_891f247b3501_SM2712_00.jpg)
where all coefficients and standard errors have been rounded to three decimal places. Using this equation, find the value of totcoll such that the predicted values of log(wage) are the same for men and women.
(iv) Based on the equation in part (iii), can women realistically get enough years of college so that their earnings catch up to those of men Explain.
Equation![Let d be a dummy (binary) variable and let z be a quantitative variable. Consider the model this is a general version of a model with an interaction between a dummy variable and a quantitative variable. [An example is in equation. (i) Since it changes nothing important, set the error to zero, u = 0. Then, when d _ 0 we can write the relationship between y and z as the function f 0 (z) = 0 + 1 z. Write the same relationship when d = 1, where you should use f 1 (z) on the left-hand side to denote the linear function of z. (ii) Assuming that 1 0 (which means the two lines are not parallel), show that the value of z* such that f 0 (z*) = f 1 (z*) is z* = 0 / 1. This is the point at which the two lines intersect [as in Figure 7.2(b)]. Argue that z* is positive if and only if 0 and 1 have opposite signs (iii) Using the data in TWOYEAR.RAW, the following equation can be estimated: where all coefficients and standard errors have been rounded to three decimal places. Using this equation, find the value of totcoll such that the predicted values of log(wage) are the same for men and women. (iv) Based on the equation in part (iii), can women realistically get enough years of college so that their earnings catch up to those of men Explain. Equation Figure Graphs of equation: (a) 0 0, 1 0; (b) 0 0, 1 0.](https://d2lvgg3v3hfg70.cloudfront.net/SM2712/11eb9ee2_f0ba_713f_8edd_b3b9093866d4_SM2712_00.jpg)
Figure Graphs of equation: (a) 0 0, 1 0; (b) 0 0, 1 0.![Let d be a dummy (binary) variable and let z be a quantitative variable. Consider the model this is a general version of a model with an interaction between a dummy variable and a quantitative variable. [An example is in equation. (i) Since it changes nothing important, set the error to zero, u = 0. Then, when d _ 0 we can write the relationship between y and z as the function f 0 (z) = 0 + 1 z. Write the same relationship when d = 1, where you should use f 1 (z) on the left-hand side to denote the linear function of z. (ii) Assuming that 1 0 (which means the two lines are not parallel), show that the value of z* such that f 0 (z*) = f 1 (z*) is z* = 0 / 1. This is the point at which the two lines intersect [as in Figure 7.2(b)]. Argue that z* is positive if and only if 0 and 1 have opposite signs (iii) Using the data in TWOYEAR.RAW, the following equation can be estimated: where all coefficients and standard errors have been rounded to three decimal places. Using this equation, find the value of totcoll such that the predicted values of log(wage) are the same for men and women. (iv) Based on the equation in part (iii), can women realistically get enough years of college so that their earnings catch up to those of men Explain. Equation Figure Graphs of equation: (a) 0 0, 1 0; (b) 0 0, 1 0.](https://d2lvgg3v3hfg70.cloudfront.net/SM2712/11eb9ee2_f0ba_9850_8edd_0504a771f361_SM2712_00.jpg)
this is a general version of a model with an interaction between a dummy variable and a quantitative variable. [An example is in equation.
(i) Since it changes nothing important, set the error to zero, u = 0. Then, when d _ 0 we can write the relationship between y and z as the function f 0 (z) = 0 + 1 z. Write the same relationship when d = 1, where you should use f 1 (z) on the left-hand side to denote the linear function of z.
(ii) Assuming that 1 0 (which means the two lines are not parallel), show that the value of z* such that f 0 (z*) = f 1 (z*) is z* = 0 / 1. This is the point at which the two lines intersect [as in Figure 7.2(b)]. Argue that z* is positive if and only if 0 and 1 have opposite signs
(iii) Using the data in TWOYEAR.RAW, the following equation can be estimated:
where all coefficients and standard errors have been rounded to three decimal places. Using this equation, find the value of totcoll such that the predicted values of log(wage) are the same for men and women.
(iv) Based on the equation in part (iii), can women realistically get enough years of college so that their earnings catch up to those of men Explain.
Equation
Figure Graphs of equation: (a) 0 0, 1 0; (b) 0 0, 1 0.
Explanation
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Introductory Econometrics 4th Edition by Jeffrey Wooldridge
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