Lecture 48 Sections Mon, Nov 16, 2009
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1 and and Lecture 48 Sections Hampden-Sydney College Mon, Nov 16, 2009
2 Outline and
3 Outline and
4 and Exercise 13.4, page 821. The following data represent trends in cigarette consumption per capita (in hundreds) and lung cancer mortality (per 100, 000) for Canadian males: Cigarette Consumption (x) Mortality Rate (y) (b) Give the equation of the least squares regression line of y = mortality rate on x = cigarette consumption. (c) Interpret the slope of the regression line. (Be specific.) (d) Use the least squares regression equation to predict the lung cancer mortality rate when the cigarette consumption per capita is 2000.
5 and Solution (b) Enter the x values into list L 1 and the y values into L 2. Then use LinReg(a+bx) L 1,L 2,Y 1 to get the regression line. The line is ŷ = x.
6 and Solution (c) The slope, 2.35, means that if x increases by 1, then y increases by That is, the mortality rate increases by 2.35 deaths per 100, 000 for every additional 100 cigarettes consumed. (d) If cigarette consumption were 2000, the model predicts that the mortality rate would be ŷ(20) = (20) = 31.6 lung cancer deaths per 100, 000.
7 Outline and
8 and How do we know that a linear regression model is the best choice? What other types of regression are there? There are many other types. How many would you like? The linear model is by far the simplest, but it is not the only choice.
9 and How do we know that a linear regression model is the best choice? What other types of regression are there? There are many other types. How many would you like? The linear model is by far the simplest, but it is not the only choice.
10 and How do we know that a linear regression model is the best choice? What other types of regression are there? There are many other types. How many would you like? The linear model is by far the simplest, but it is not the only choice.
11 and How do we know that a linear regression model is the best choice? What other types of regression are there? There are many other types. How many would you like? The linear model is by far the simplest, but it is not the only choice.
12 and How do we know that a linear regression model is the best choice? What other types of regression are there? There are many other types. How many would you like? The linear model is by far the simplest, but it is not the only choice.
13 TI-83 - and TI-83 The TI-83 will do a variety of nonlinear regressions. Press STAT > CALC. The list includes LinReg - Linear regression: ŷ = a + bx. QuadReg - Quadratic regression: ŷ = ax 2 + bx + c. CubicReg - Cubic regression: ŷ = ax 3 + bx 2 + cx + d.
14 TI-83 - and TI-83 And... QuartReg - Quartic regression: ŷ = ax 4 + bx 3 + cx 2 + dx + e. LnReg - Logarithmic regression: ŷ = a + b ln x. ExpReg - Exponential regression: ŷ = ab x.
15 TI-83 - and TI-83 And... PwrReg - Power regression: ŷ = ax b. Logistic - Logistic regression: ŷ = c 1 + ae bx. SinReg - Sinusoidal regression: ŷ = a sin (bx + c) + d.
16 Outline and
17 The Appropriateness of the Linear Model and We can learn a bit about the nature of the model by examining the residuals. This is called residual analysis. First, we need to find the residuals e i = y i ŷ i. Then we draw a scatterplot of x versus e and see whether there is a pattern.
18 The Appropriateness of the Linear Model and To do this on the TI-83, after finding the equation of the regression line, enter to store the residuals in L 4. L 2 -Y 1 (L 1 ) L 4 Then draw a scatterplot of L 1 (x) versus L 4 (e).
19 The Plot and Example ( Plots) Free lunch rate vs. graduation rate Graduation Rate Free Lunch Rate
20 The Plot and Example ( Plots) Free lunch rate vs. graduation rate Graduation Rate Free Lunch Rate
21 The Plot and Example ( Plots) The residual plot s Free Lunch Rate
22 The Appropriateness of the Linear Model and If the residual plot shows no clear pattern, but just a big blob of points, then the linear model is appropriate. On the other hand, if the residual plot shows a distinct curvature, or any other distinct pattern, then the linear model may not be appropriate.
23 Outline and
24 A Model and Example (A Model) Consider the following data. x y x y
25 A Model and Example (A Model) The scatterplot
26 A Model and Example (A Model) The regression line
27 A Model and Example (A Model) The residual plot
28 A Model and Example (A Model) The residual plot
29 A Model and Example (A Model) Quadratic regression
30 A Model and Example (A Model) Quadratic regression
31 Outline and
32 and Definition (Outlier) An outlier is a point with an unusually large residual (e.g., at least 2.5 standard deviations from the mean). Definition ( Point) An influential point is a point that exerts a inordinate influence on the regression line.
33 and An outlier may or may not be influential. An influential point may or may not be an outlier.
34 and Example ( ) Consider the following data. x y
35 and Example ( ) The scatterplot
36 and Example ( ) The regression line is ŷ = x. x y ŷ y ŷ
37 and Example ( ) The regression line is ŷ = x. x y ŷ y ŷ
38 and Example ( ) The regression line is ŷ = x. x y ŷ y ŷ
39 and The mean residual is 0.0 (always) and the standard deviation of these residuals is 2.0. Thus, the residual 5.0 is 2.5 standard deviations above the mean, an outlier. But, is the point (4, 10) influential? Remove is and see what the effect is.
40 and Example ( ) Including the point (4, 10)
41 and Example ( ) Excluding the point (4, 10)
42 and The regression line of the remaining points is ŷ = x. This is nearly the same as ŷ = x.
43 and Now change the point (4, 10) to the point (12, 12). x y
44 and The regression line (12, 12) is ŷ = x. Removing (12, 12) changes it to ŷ = x.
45 and Example ( ) Including the point (12, 12)
46 and Example ( ) Excluding the point (12, 12)
47 and Yet the residual of (12, 12) is only The standard deviation of the set of residuals is Therefore, (12, 12) is not an outlier, but it is influential.
48 Outline and
49 and Read Sections 13.4, 13.5, pages Let s Do It! 13.5, Exercises 8, 9, 10, page 835.
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