A least squares regression line to predict a student’s Stat145 test score (from 0-to-100) from the...

Predict a student’s GPA (y) based upon the number of hours studied per week (x). Hours/week...

Predict a student’s GPA (y) based upon the number of hours studied per week (x). Hours/week GPA 5 2.5 10 3.1 12 3.3 20 3.8 15 3.7 12 3.5 If you used the least-squares regression line to predict the GPA of a student who studied 40 hours per week that would be: a) residual b) interpolation c) extrapolation d) r2

Select all the statements that are true of a least-squares regression line. 1. R2 measures how...

Select all the statements that are true of a least-squares regression line. 1. R2 measures how much of the variation in Y is explained by X in the estimated linear regression. 2.The regression line maximizes the residuals between the observed values and the predicted values. 3.The slope of the regression line is resistant to outliers. 4.The sum of the squares of the residuals is the smallest sum possible. 5.In the equation of the least-squares regression line, Y^ is a predicted...

In a statistics course, a linear regression equation was computed to predict the final-test score from...

In a statistics course, a linear regression equation was computed to predict the final-test score from the score on the first quiz. The resulting equation was: ˆy = 25 + 0.84x with a correlation of 0.73 where y is the final test score and x is the score on the first quiz. (a) If Carla scored 82 points on her first quiz, what is the predicted value of her score on the final test? (b) The linear regression line predicted...

In Ordinary Least Squares Regression, the gap between the value of the dependent variable and the...

In Ordinary Least Squares Regression, the gap between the value of the dependent variable and the predicted value is called Question 2 options: A) the minimizing coefficient. B) the residual. C) the error term. D) the explanatory variable.

The accompanying data represent the number of days​ absent, x, and the final exam​ score, y,...

The accompanying data represent the number of days​ absent, x, and the final exam​ score, y, for a sample of college students in a general education course at a large state university. Complete parts ​(a) through​ (e) below. Absences and Final Exam Scores No. of absences, x 0 1 2 3 4 5 6 7 8 9 Final exam score, y 89.6 87.3 83.4 81.2 78.7 74.3 64.5 71.1 66.4 65.6 Critical Values for Correlation Coefficient n 3 0.997 4...

Suppose we have used the ordinary least squares to estimate a regression line. Now, to calculate...

Suppose we have used the ordinary least squares to estimate a regression line. Now, to calculate the residual for the ith observation xi, we do not need one of the followings: Select one: A.the standard error of the estimated slope. B.the estimated slope. C.the estimated intercept. D.the actual value of yi.

The following regression model is used to predict a student's grade in their final test: Grade...

The following regression model is used to predict a student's grade in their final test: Grade = B0 + B1 Study Hours + B2 Sleep Hours + B3 Tutoring + e Where: Grade = score on test out of 100 StudyHours = hours studied in the week before the test SleepHours = hours slept the night before the test Tutoring = whether of not the student went to tutoring before the test (not attending tutoring is the omitted condition) A...

The following data are quiz scores for two quizzes from 8 students in a class. First...

The following data are quiz scores for two quizzes from 8 students in a class. First Quiz Second Quiz 16 11 19 14 23 17 32 27 36 28 37 31 38 33 40 40 Least-squares Regression Line What is the least-squares regression line? Round to three decimal places. ˆy= Prediction Predict the score of the second quiz if a student scored 39 on the first quiz. Round to one decimal place.   

Find the slope from the least-squares regression line for the data below of final grade as...

Find the slope from the least-squares regression line for the data below of final grade as a percent and days absent. What does it tell us about the relationship? Final Absences 81 1 90 0 86 2 76 3 51 6 75 4 44 7 81 2 94 0 93 1 A. Slope is 94.695 For each day absent the student's final grade increase by 0.947% B. Slope is -94.695. For each day absent the student's final grade decrease by...

The slope of the least squares regression line is given by where r is the correlation...

The slope of the least squares regression line is given by where r is the correlation coefficient, sx is the standard deviation of the X‑values, and sy is the standard deviation of the Y‑values. If r = 0.25, sx = 2, and sy = 5, then how much should we expect Y to decrease for every one unit of increase in X?