Combine R2  and yi hat = beta0 hat +(beta1 hat * xi) to find out how R2...

Linear Regression Find the variance of the fitted values Var(yi hat) Given that yi hat =...

Linear Regression Find the variance of the fitted values Var(yi hat) Given that yi hat = beta0 hat + (beta one hat * xi)

Regression: !Y=Bo + B1Xi +ui Randon Sample of 3 observations on Xi and Yi Yi Xi...

Regression: !Y=Bo + B1Xi +ui Randon Sample of 3 observations on Xi and Yi Yi Xi 51 3 60 2 45 4 a) Compute the OLS estimate Bo and B1 b) Compute the predicted value ŷi and the residual (u-hat)i for each of the 3 observations c) What is the mean of the (u-hat)i's? d) What is the mean of the ŷi's? How does it compare to the mean of the Yi's?

Suppose that (Yi, Xi) satisfy the least squares assumptions in Key Concept 4.3 and, in addition,...

Suppose that (Yi, Xi) satisfy the least squares assumptions in Key Concept 4.3 and, in addition, ui is N(0, σ2 u) and is independent of Xi. A sample of size n = 30 yields = 43.2 + 61.5X, R2 = 0.54, SER = 1.52, (10.2) (7.4) where the numbers in parentheses are the homoskedastic-only standard errors for the regression coefficients. a) Construct a 95% confidence interval for β0. b) Test H0: β1 = 55 vs. H1 : β1 ≠ 55...

2. Find the least squares estimators of the follow models (10 marks per part): (a) yi...

2. Find the least squares estimators of the follow models (10 marks per part): (a) yi = β0 + β1xi + ui (b) Our research assistant mistakenly multiplies all the values of the dependent variable by 2, and all the values of our independent variable by 5, how would this influence our estimators? I.E solve the least squares estimator for the following model: ˜ yi = γ0 + γ1˜ xi + ϵi Where: ˜ yi = 2yi and ˜ xi...

Data for two variables, x and y, follow. xi 22 24 25 28 41 yi 12...

Data for two variables, x and y, follow. xi 22 24 25 28 41 yi 12 23 31 36 69 a. Develop the estimated regression equation for these data (to 2 decimals). Enter negative value as negative number. y=-43.71+2.78x b. Compute the standardized residuals for these data (to 2 decimals). Enter negative value as negative number. xi yi Standardized Residual 22 12 24 23 -0.02 25 31 1.31 28 36 41 69 c. Compute the leverage values for these data...

Consider the data. xi 1 2 3 4 5 yi 3 7 4 10 12 The...

Consider the data. xi 1 2 3 4 5 yi 3 7 4 10 12 The estimated regression equation for these data is ŷ = 0.90 + 2.10x. (a) Compute SSE, SST, and SSR using equations SSE = Σ(yi − ŷi)2, SST = Σ(yi − y)2, and SSR = Σ(ŷi − y)2. SSE=SST=SSR= (b) Compute the coefficient of determination r2. r2 = Comment on the goodness of fit. (For purposes of this exercise, consider a proportion large if it is...

Consider the data. xi 1 2 3 4 5 yi 4 7 6 10 13 The...

Consider the data. xi 1 2 3 4 5 yi 4 7 6 10 13 The estimated regression equation for these data is ŷ = 1.70 + 2.10x. (a) Compute SSE, SST, and SSR using equations SSE = Σ(yi − ŷi)2, SST = Σ(yi − y)2, and SSR = Σ(ŷi − y)2. SSE= SST= SSR= (b) Compute the coefficient of determination r2. r2= Comment on the goodness of fit. (For purposes of this exercise, consider a proportion large if it...

Consider the data. xi 1 2 3 4 5 yi 3 7 4 10 12 The...

Consider the data. xi 1 2 3 4 5 yi 3 7 4 10 12 The estimated regression equation for these data is ŷ = 0.90 + 2.10x. (a)Compute SSE, SST, and SSR using equations SSE = Σ(yi − ŷi)2,SST = Σ(yi − y)2,and SSR = Σ(ŷi − y)2. SSE= SST= SSR= (b)Compute the coefficient of determination r2. r2= Comment on the goodness of fit. (For purposes of this exercise, consider a proportion large if it is at least 0.55.)...

Consider the data. xi 1 2 3 4 5 yi 3 7 5 11 14 The...

Consider the data. xi 1 2 3 4 5 yi 3 7 5 11 14 The estimated regression equation for these data is ŷ = 0.20 + 2.60x. (a) Compute SSE, SST, and SSR using equations SSE = Σ(yi − ŷi)2, SST = Σ(yi − y)2, and SSR = Σ(ŷi − y)2. SSE = SST = SSR = (b) Compute the coefficient of determination r2. r2 = Comment on the goodness of fit. (For purposes of this exercise, consider a...

Consider the data. xi 3 12 6 20 14 yi 65 35 50 15 20 The...

Consider the data. xi 3 12 6 20 14 yi 65 35 50 15 20 The estimated regression equation for these data is ŷ = 70 − 3x. (a) Compute SSE, SST, and SSR using equations SSE = Σ(yi − ŷi)2, SST = Σ(yi − y)2, and SSR = Σ(ŷi − y)2. SSE = SST = SSR = (b) Compute the coefficient of determination r2. (Round your answer to three decimal places.) r2 = Comment on the goodness of fit....