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Coefficient of Determination

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Presentation on theme: "Coefficient of Determination"β€” Presentation transcript:

1 Coefficient of Determination
Section 3.3

2 Coefficient of determination
r = correlation r2 = coefficient of determination What this means? Tells us the proportion (or percent) of variability in y that is explained by the LSRL and variation in x.

3 Coefficient of determination
x 3 6 y 10 2 Scatterplot for data

4 Coefficient of determination
x y π’šβˆ’ π’š 2 16 3 10 36 6 2 4 Squares of deviations about y-bar (4)

5 Coefficient of determination
x y π’šβˆ’ π’š 𝟐 16 9 3 10 36 6 2 4 Squares of deviations about y-hat (0-3), (10-4), (2-5)

6 Coefficient of determination
x y π’šβˆ’ π’š 𝟐 16 9 3 10 36 6 2 4 56 54 SST SSE SST = sum of squares of the deviations SSE = sum of squares for error

7 Coefficient of determination
x y π’šβˆ’ π’š 𝟐 16 9 3 10 36 6 2 4 56 54 SST SSE π‘Ÿ 2 = π‘†π‘†π‘‡βˆ’π‘†π‘†πΈ 𝑆𝑆𝑇 π‘Ÿ 2 = π‘†π‘†π‘‡βˆ’π‘†π‘†πΈ 𝑆𝑆𝑇 = 56βˆ’54 56 =0.0357 SST – SSE measures the amount of variation of y that can be explained by the regression line of y on x.

8 Coefficient of determination
π‘Ÿ 2 = π‘†π‘†π‘‡βˆ’π‘†π‘†πΈ 𝑆𝑆𝑇 = 56βˆ’54 56 =0.0357 3.57% of the variation in y is explained by least-squares regression of y on x.

9 Coefficient of determination
x 5 10 y 7 8 Scatterplot for data

10 Coefficient of determination
x y π’šβˆ’ π’š 2 25 5 7 4 10 8 9

11 Coefficient of determination
x y π’šβˆ’ π’š 𝟐 25 1 5 7 4 10 8 9

12 Coefficient of determination
x y π’šβˆ’ π’š 𝟐 25 1 5 7 4 10 8 9 38 6 SST SSE π‘Ÿ 2 = π‘†π‘†π‘‡βˆ’π‘†π‘†πΈ 𝑆𝑆𝑇 = 38βˆ’6 38 =0.842 84.2% of the variation in y is explained by least-squares regression of y on x.

13 Coefficient of determination
Please note:

14 Comparing r2 Values, Ex. 3.12, p. 162 Distinction between explanatory and response variables is essential. Scatterplot of data that played a central role in the discovery that the universe is expanding. Distances from earth of 24 spiral galaxies and the speed at which these galaxies are moving away from us. There is a positive linear relationship, r = , so that more distant galaxies are moving away more rapidly. Astronomers believe that there is a perfect linear relationship and that the scatter is caused by imperfect measurements. The two lines on the plot are the two least-squares regression lines. Regression line of velocity on distance is solid, distance on velocity is dashed. Their correlation will be the same, but the regression lines will be different.

15 Please remember π‘Ÿ= π‘Ÿ 2 If you are given the percent of variation, you can find the correlation. Same for correlation οƒ  variation.

16 Practice Problems Exercises 3.42, 3.43

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