In running a simple regression, a researcher inadvertently swapped X and Y. X and Y are...

In the simple linear regression model estimate Y = b0 + b1X A. Y - estimated...

In the simple linear regression model estimate Y = b0 + b1X A. Y - estimated average predicted value, X – predictor, Y-intercept (b1), slope (b0) B. Y - estimated average predicted value, X – predictor, Y-intercept (b0), slope (b1) C. X - estimated average predicted value, Y – predictor, Y-intercept (b1), slope (b0) D. X - estimated average predicted value, Y – predictor, Y-intercept (b0), slope (b1) The slope (b1) represents A. the estimated average change in Y per...

13. Interpreting the intercept in a simple linear regression model is: * (A) reasonable if the...

13. Interpreting the intercept in a simple linear regression model is: * (A) reasonable if the sample contains values of x around the origin. (B) not reasonable because researchers are interested in the effect of a change in x on the change in y. (C) reasonable if the intercept’s p-value is less than 0.05. (D) not reasonable because it is always meaningless. 14. Which of the following is NOT one of the assumptions necessary for simple linear regressions?: * (A)...

If the R-square of the simple regression of Y on X is 0.5, and the sample...

If the R-square of the simple regression of Y on X is 0.5, and the sample size is 10, and you are testing the hypothesis that X does not have statistically significant effect on Y at the 5% level of significance, then the F table value you must be using for this test is …. . 5.32 4.97 161.5 1.96 5.12

In a simple linear regression analysis attempting to link lottery sales (y) to jackpot amount (x),...

In a simple linear regression analysis attempting to link lottery sales (y) to jackpot amount (x), the following data are available: x y jackpot ($millions) Sales (millions) 12 60 14 70 6 40 8 50 The slope (b) of the estimated regression equation here is 3.5. The intercept (a) is 20. Produce the 95% confidence interval estimate of the population slope, β, and report the upper bound for the interval. a)5.02 b)4.66 c)7.23 d)3.72

Linear Regression and Correlation. x y 3 -3.26 4 2.72 5 1.2 6 1.88 7 0.16...

Linear Regression and Correlation. x y 3 -3.26 4 2.72 5 1.2 6 1.88 7 0.16 8 -5.66 9 3.02 10 -6.7 11 -3.92 12 -5.34 Compute the equation of the linear regression line in the form y = mx + b, where m is the slope and b is the intercept. Use at least 3 decimal places. y = x +   Compute the correlation coeficient for this data set. Use at least 3 decimal places. r=   Compute the P-value...

Linear Regression and Correlation. x y 3 -10.52 4 1.94 5 -2.7 6 -3.14 7 -9.18...

Linear Regression and Correlation. x y 3 -10.52 4 1.94 5 -2.7 6 -3.14 7 -9.18 8 -4.82 9 -12.26 10 -11.1 11 -6.44 Compute the equation of the linear regression line in the form y = mx + b, where m is the slope and b is the intercept. Use at least 3 decimal places. (Round if necessary) y = x + Compute the correlation coeficient for this data set. Use at least 3 decimal places. (Round if necessary)...

The following data have been collected for a simple linear regression analysis relating sales (y) to...

The following data have been collected for a simple linear regression analysis relating sales (y) to price (x): x y Price     ($) Sales (units) 4 120 7 60 5 100 8 80 In applying the least squares criterion, the slope (b) and the intercept (a) for the best-fitting line are b = -12 and a = 162. You are to conduct a hypothesis test to determine whether you can reject the null hypothesis that the population slope, β, is 0...

1. Suppose (X, Y) take on values {(1,10),( 3,11),( 8,9),( 4,15),( 7,20)}. Construct a simple linear...

1. Suppose (X, Y) take on values {(1,10),( 3,11),( 8,9),( 4,15),( 7,20)}. Construct a simple linear regression model treating Y as the dependent variable, the LSE of the intercept 2.Suppose you construct a simple linear regression model. Using 5 observations the LSE of the slope is calculated as -0.3 with associated standard error .86. Now you wish to test  versus  at the 0.05 significance level. The test statistic is

If we multiply both Y and X by 1000 and re-estimate the regression, the slope coefficient...

If we multiply both Y and X by 1000 and re-estimate the regression, the slope coefficient and its standard error will a. Increase by 1000 times Increase by (1/1000) times Remain same Decrease by 1000 times If we multiply both Y and X by 1000 and re-estimate the regression, the intercept coefficient and its standard error will a. Increase by 1000 times Decrease by 1000 times Remain same Increase by (1/1000) times If we multiply Y by 1000 and re-estimate...

Chapter 9, Section 1, Exercise 006 Computer output for fitting a simple linear model is given...

Chapter 9, Section 1, Exercise 006 Computer output for fitting a simple linear model is given below. State the value of the sample slope for the given model. In testing if the slope in the population is different from zero, identify the p-value and use it (and a 5 % significance level) to make a clear conclusion about the effectiveness of the model. The regression equation is Upper Y ⁢ equals 84.8 minus 0.0137 Upper X Predictor Coef SE Coef...