Objective 2: Interpret the Slope and the y-Intercept of the Least-Squares Regression Line 4.2 Least-Squares Regression...
Objective 2: Interpret the Siope and the y-Intercept of the Least-Squares Regression Linde 04 of 1 Point Question Hep 4.2.13 student at a jnor colge conducted a survey of 20 randomly due students to detemine the rilation between the number of houns of video geme playing each wek, a Predit he grade-point average of a student who plays video games 8 hours per w and grde pont avergm y She found Round to he eaestundedth as needed) 3 Enter your...
A student at a junior college conducted a survey of 20 randomly selected full-time students to determine the relation between the number of hours of video game playing each week, x, and grade-point average, y. She found that a linear relation exists between the two variables. The least-squares regression line that describes this relation is y = -0.0516x + 2.9389 (a) Predict the grade-point average of a student who plays video games 8 hours per week. The predicted grade-point average...
A student at a junior college conducted a survey of 20 randomly selected full-time students to determine the relation between the number of hours of video game playing each week, x, and grade-point average, y. She found that a linear relation exists between the two variables. The least squares regression line that describes this relation is ģ= -0.0564x + 2 9482 (a) Predict the grade-point average of a student who plays video games 8 hours per week. The predicted grade...
Compute the least-squares regression equation for the given data set. Round the slope and y-intercept to at least four decimal places. х 3 7 5 4 y اقتها 1 6 4 5 Send data alle Regression line equation: y
1. If an estimated regression line has a y-intercept of 10 and a slope of 4, then when x = 2 the actual value ofy is: а. 18 b. 15 с. 14 d. unknown 2. Given the least squares regression line v = 5- 2x: a. the relationship between x and y is positive b. the relationship between x and y is negative. c. asx decreases, so does y. d. None of these choices. 3. A regression analysis between weight...
Run a regression analysis on the following data set, where y is the final grade in a math class and x is the average number of hours the student spent working on math each week. hours/week Grade х у 4 41.6 4 54.6 8 68.2 8 73.2 8 66.2 11 63.4 11 70.4 11 80.4 13 71.2 16 85.4 State the regression equation y = mx + b, with constants accurate to two decimal places. What is the predicted value...
The least squares regression line for the cost of a diamond necklace from a department store (y, in dollars) in the year x years since 2000 is given by yˆ=1823+314x. Interpret the y-intercept of the least squares regression line.
Using the data below find the slope and intercept for the least squares regression line. (SHOW ALL STEPS/WORK) x y xy x2 y2 16 109 1744 256 11881 25 122 3050 625 14884 39 143 5577 1521 20449 45 132 5940 2025 17424 49 199 9751 2401 39601 64 185 11840 4096 34225 70 199 13930 4900 39601 29 130 3770 841 16900 57 175 9975 3249 30625 22 118 2596 484 13924 416 1512 68173 20398 239514
The least squares regression line minimizes the sum of theA. Sum of Differences between actual and predicted Y valuesB. Sum of Squared differences between actual and predicted X valuesC. Sum of Absolute deviations between actual and predicted X valuesD. Sum of Absolute deviations between actual and predicted Y valuesE. Sum of Squared differences between actual and predicted Y values
Compute the least-squares regression line for predicting y from x given the following summary statistics, Round the slope and y- intercept to at least four decimal places. I=8.8 5,- 2.2 y = 102 y-101 =-0.82 Send data ol Regression line equation: -