This model: Yi=β1+β2log(Xi2)+β3log(Xi3)+ei is
Select one:
a. Log – Log model b. Log - Linear model c. Linear - Log Model d. Linear – Linear model
Here option c is correct.
Given model is linear log model.
If you use natural log values for your independent variables (x) and keep your dependent variable (y) in its original scale then this model is called linear log model.
This model: Yi=β1+β2log(Xi2)+β3log(Xi3)+ei is Select one: a. Log – Log model b. Log - Linear model...
Consider the linear regression model Yi = β0 + β1 Xi + ui Yi is the ______________, the ______________ or simply the ______________. Xi is the ______________, the ______________ or simply the ______________. is the population regression line, or the population regression function. There are two ______________ in the function (β0 & β1 ). β0 is is the ______________ of the population regression line; β1is is the ______________ of the population regression line; and ui is the ______________. A. Coefficients...
linear regression model yi= a + bxi +ei calculate 95% confidence interval of b assuming ei ~N(0,o2)
Consider the least-squares residuals ei-yi-yi, 1, 2, . . . , linear regression model. Find the variance of the residuals Var(e). Is the vari- ance of the residuals a constant? Discuss. n,from the simple
Consider a simple linear regression model with nonstochastic regressor: Yi = β1 + β2Xi + ui. 1. [3 points] What are the assumptions of this model so that the OLS estimators are BLUE (best linear unbiased estimates)? 2. [4 points] Let βˆ and βˆ be the OLS estimators of β and β . Derive βˆ and βˆ. 12 1212 3. [2 points] Show that βˆ is an unbiased estimator of β .22
3. Consider the linear model: Yİ , n where E(Ei)-0. Further α +Ari + Ei for i 1, assume that Σ.r.-0 and Σ r-n. (a) Show that the least square estimates (LSEs) of α and ß are given by à--Ỹ and (b) Show that the LSEs in (a) are unbiased. (c) Assume that E(e-σ2 Yi and E(49)-0 for all i where σ2 > 0. Show that V(β)--and (d) Use (b) and (c) above to show that the LSEs are consistent...
1. If a true model of simple linear regression reads: yi −y ̄ = β0 +β1(xi −x ̄)+εi for i = 1, 2, · · · , n, showβ0 =0andβˆ0 =0. (1pt) (hint: use the formula of estimator βˆ0 = y ̄ − βˆ1x ̄.)
Which of the following is NOT an assumption of the multiple regression model? Select one: a. E(ei)=0 E ( e i ) = 0 b. The values of each xik are not random and are not exact linear functions of the other explanatory variables. c. cov(yi,yj)=cov(ei,ej)=0;(i≠j) c o v ( y i , y j ) = c o v ( e i , e j ) = 0 ; ( i ≠ j ) d. var(yi)=var(ei)=σ2i
Consider the zero intercept model given by Yi = B1Xi + ei (i=1,…,n) with the ei normal, independent, with variance sigma^2. For this mode (i) find the sum of (Yi –Yi-hat). (ii) find the sum of (Yi – Yi-hat)Xi. (iii) find the estimator of the error variance, sigma^2. (iv) is the estimator of the error variance biased?
Consider the linear model: Yi = α0 + α1(Xi − X̄) + ui. Find the OLS estimators of α0 and α1. Compare with the OLS estimators of β0 and β1 in the standard model discussed in class (Yi = β0 + β1Xi + ui). Consider the linear model: Yį = ao + Q1(X; - X) + Ui. Find the OLS estimators of do and a1. Compare with the OLS estimators of Bo and B1 in the standard model discussed in...
Consider the simple linear regression model: where Yİ is systolic blood pressure in mm Hg, X11 is smoking status, with Xn-1 if the ith participant is a smoker and X0 otherwise, and Xi2 age in years. If /91.2 8.7 1.4 Interpret the effect of age on the outcome. Interpret the effect of smoking on the outcome a. b.