Hearest hundredth, when necessary.) Data Set: {(0,7), (1,5), (1.5,3), (2, 5), (2.3, 3.2), (3, 2), (3.5, 4)} 1. The regression line is: y = 2. Based on the regression line, we would expect the value of response variable to be when the explanatory variable is 0. (NOTE: This is the y-intercept.) 3. For each increase of 1 in of the explanatory variable, we can expect a(n) decrease of in the response variable. (NOTE: This is the slope.)

A First Course in Probability (10th Edition)
10th Edition
ISBN:9780134753119
Author:Sheldon Ross
Publisher:Sheldon Ross
Chapter1: Combinatorial Analysis
Section: Chapter Questions
Problem 1.1P: a. How many different 7-place license plates are possible if the first 2 places are for letters and...
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Your Turn: Data Set 1
Instructions: Use the technology of your choice (calculator, Excel, GeoGebra, Google Sheets) to find the
regression line, the correlation coefficient of the following data sets, and interpolate or extrapolate the
requested data. (Round all numbers to the nearest hundredth, when necessary.)
Data Set: {(0,7), (1,5), (1.5, 3), (2, 5), (2.3,3.2), (3, 2), (3.5, 4)}
1. The regression line is: y =
2. Based on the regression line, we would expect the value of response variable to be
when the explanatory variable is 0. (NOTE: This is the y-intercept.)
3. For each increase of 1 in of the explanatory variable, we can expect a(n) decrease
in the response variable. (NOTE: This is the slope.)
4. If x = 2.5, the y =
This is an example of interpolation
5. The correlation coefficient is r =
Check
Transcribed Image Text:Your Turn: Data Set 1 Instructions: Use the technology of your choice (calculator, Excel, GeoGebra, Google Sheets) to find the regression line, the correlation coefficient of the following data sets, and interpolate or extrapolate the requested data. (Round all numbers to the nearest hundredth, when necessary.) Data Set: {(0,7), (1,5), (1.5, 3), (2, 5), (2.3,3.2), (3, 2), (3.5, 4)} 1. The regression line is: y = 2. Based on the regression line, we would expect the value of response variable to be when the explanatory variable is 0. (NOTE: This is the y-intercept.) 3. For each increase of 1 in of the explanatory variable, we can expect a(n) decrease in the response variable. (NOTE: This is the slope.) 4. If x = 2.5, the y = This is an example of interpolation 5. The correlation coefficient is r = Check
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