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

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

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

Consider the simple linear regression model for which the population regression equation can be written in...

Consider the simple linear regression model for which the population regression equation can be written in conventional notation as: yi= Beta1(xi)+ Beta2(xi)(zi)2+ui Derive the Ordinary Least Squares estimator (OLS) of beta i.e(BETA)

Consider the following observed values: (-5,-2) (-3,1) (0,4) (2,6) (1,3) (1) find the estimated regression line...

Consider the following observed values: (-5,-2) (-3,1) (0,4) (2,6) (1,3) (1) find the estimated regression line based on the observed data (2) for each xi, compute fitted value of yi (3) compute the residuals ei (4) calculate the coefficient of determination

Suppose you have a cross-country dataset with values for GDP (yi) and investment in research &...

Suppose you have a cross-country dataset with values for GDP (yi) and investment in research & development (xi). Describe the method of ordinary least squares (OLS) to estimate the following univariate linear regression model, i.e. yi = β0 + β1 xi + εi In particular, describe in your words which are the dependent and the explanatory variables; how the OLS estimation method works; how to interpret the estimates for the coefficients β0 and β1; what is the coefficient of determination...

A plot of the standardized residuals versus the fitted values for a multiple regression model: A....

A plot of the standardized residuals versus the fitted values for a multiple regression model: A. Can be used to check for outliers B. Can be used to check for independence of the errors and non-constant variance C. Can be used to check for non-constant variance D. Can be used to check for outliers and non-constant variance

Consider the simple linear regression model and let e = y −y_hat, i = 1,...,n be...

Consider the simple linear regression model and let e = y −y_hat, i = 1,...,n be the least-squares residuals, where y_hat = β_hat + β_hat * x the fitted values. (a) Find the expected value of the residuals, E(ei). (b) Find the variance of the fitted values, V ar(y_hat ). (Hint: Remember that y_bar i and β1_hat are uncorrelated.)

Given random variable Y, E(Y) = theta Var(Y) = (theta^2)/50 theta hat = bY where b<...

Given random variable Y, E(Y) = theta Var(Y) = (theta^2)/50 theta hat = bY where b< 1 MSE(theta hat) = (11 * theta^2)/512 Find b

Given are data for two variables, x and y. xi 6 11 15 18 20 yi...

Given are data for two variables, x and y. xi 6 11 15 18 20 yi 7 7 13 21 30 (a) Develop an estimated regression equation for these data. (Round your numerical values to two decimal places.) ŷ = (b)Compute the residuals. (Round your answers to two decimal places.) xi yi Residuals 6 7 11 7 15 13 18 21 20 30 (c)Compute the standardized residuals. (Round your answers to two decimal places.) xi yi Standardized Residuals 6 7...

In a small-scale regression study, we collected data on the number of children in a family...

In a small-scale regression study, we collected data on the number of children in a family Xi and the number of hours per week spent shopping Yi. The following data were obtained: i 1 2 3 4 5 6 Xi 2 6 3 1 1 9 Yi 13 17 12 12 9 22 Assume we performed a simple linear regression of Yi on Xi, i.e. E(Yi) = ?0 + ?1Xi (a) By hand compute X?X, X?Y, (X?X)-1, b, Y^(means Y-hat),...

Given a simple regression analysis, suppose that we have obtained the fitted regression model: yˆ =...

Given a simple regression analysis, suppose that we have obtained the fitted regression model: yˆ = 6 + 8x and also the following statistics , ? = 3.20, ?̅ = 8, n = 42, and ii# Find the 95% confidence interval for the point where x =18. Interpret the result. å i=1 (x - x )2 =420 I