1. 13.2 Inference for Two Way Tables

2.  Analyze Two Way Tables Using Chi-Squared Test for Homogeneity and Independence

3. Goodness of Fit HomogeneityIndependence 1 variable -distribution 2 variables (2 way table) -distribution -proportions 2 variables (2 way table) -association -dependent upon -relationship -influences

4.  Is there evidence the wheel is unbalanced?  (one variable- prize you get) PrizeTeddy Bear GoldfishT-shirtPoster # of winners 34413927

5.  Is there evidence that proportion of kids who attend regular MGS is different for each grade level. Notice it is a 2-way table with two categorical variables: Grade level and whether you attend MGS FreshmenSophomoreJuniorSenior Attend MGS 45619981 Does Not Attend MGS 97866472

6.  This is the same thing as a test of homogeneity except the wording of the question will use key words such as association or relationship. We complete the same steps in our calculator, we just use a different name for our test and word our Ho and Ha different.  Is there evidence of a relationship between grade level and kids who attend MGS regularly?

7.  Expected Counts=  Degrees of freedom (r-1)(c-1) Chi-Squared Test Statistic

8.  Find the expected counts: First you need to find the row and column totals above. I did the first example-you fill in the rest! ExpectedFreshmenSophomoreJuniorSenior Attend MGS(286*142)/605 =67.13 Does Not Attend MGS ObservedFreshmenSophomoreJuniorSeniorTotal Attend MGS 45619981286 Does Not Attend MGS 97866472319 Total142147163153605

9.  Expected counts complete! Now let’s try the quick way. Follow along!  Go to your calculator.  Matrix-Edit-enter [A]  Matrix[A] r x c (so change it to 2 x 4). Then input your observed counts.  Then hit: stat-tests-x² test.  Just hit calculate. It gives you your calculations but we can worry about those later!!  Go back to matrix and hit enter on matrix [B].  When you hit enter again scroll through the matrix and notice your calculator did all the expected counts and they should match what you just did by hand! ExpectedFreshmenSophomoreJuniorSenior Attend MGS(286*142)/605 =67.13 69.4977.0572.32 Does Not Attend MGS 74.8777.5185.9580.67 X²-test Observed:[A] Expected: [B] Calculate

10.  df =(r-1)(c-1) =(2-1)(4-1) =1*3=3 ObservedFreshmenSophomoreJuniorSeniorTotal Attend MGS 45619981286 Does Not Attend MGS 97866472319 Total142147163153605

11.  H₀:the proportion of ________ is the SAME as __________  Ha: the proportion of ________ is DIFFERENT than __________  (these are just template sentences, remember whatever the question is asking is your Ha)

12.  Example 1: Do the boys’ preferences for the following TV programs differ significantly from the girls’ preferences? Use a 5% significance level. HouseGrey’s Anatomy American Idol CSI Boys667867105 Girls4813012361

13.  H₀:the boys preference for TV programs is the SAME as the girls  Ha: the boys preference for TV programs is DIFFERENT than the girls  Assumptions: -random sample -all expected counts are ≥ 1 -no more than 20% of the expected counts <5 HouseGrey’s Anatomy American Idol CSI Boys53.196.988.677.4 Girls60.9111.1101.488.6

14.  Chi-Squared Test (Homogeneity) w/ α=0.05  P(x²>41.08)=0.000000006  df=3  Since p< α, it is statistically significant. Therefore we reject H₀. There is enough evidence to say the preference of TV programs for boys is different than girls.

15.  Example 2: The following data is an SRS of 650 patients at a local hospital. Does the effect of aspirin significantly differ from a placebo for these medical conditions? AspirinPlacebo Fatal Heart Attacks 2060 Non-Fatal Heart Attacks 125220 Strokes75150

16.  H₀:the effects of aspirin is the same as the placebo  Ha: the effects of aspirin is different than the placebo  Assumptions: -random sample -all expected counts are ≥ 1 -no more than 20% of the expected counts <5 AspirinPlacebo Fatal Heart Attacks 27.152.9 Non-Fatal Heart Attacks 116.8228.2 Strokes76.2148.8

17.  Chi-Squared Test (Homogeneity) w/ α=0.05  P(x²>3.70)=0.1573  df=2  Since p∡ α, it is not statistically significant. Therefore we do not reject H₀. There is not enough evidence to say the effect of aspirin differs from the placebo.

18.  H₀: There is no relationship (association) between ________ and ________.  Ha: There is a relationship (association) between ________ and ________.

19.  Example 3: An SRS of 1000 was taken  Is there a relationship between gender and political parties? RepublicanDemocratIndependent Male20015050 Female25030050

20.  H₀: There is no relationship between gender and political party  Ha: There is a relationship between gender and political party  Assumptions: -random sample -all expected counts are ≥ 1 -no more than 20% of the expected counts <5 RepublicanDemocratIndependent Male180 40 Female270 60

21.  Chi-Squared Test (Independence) w/ α=0.05  P(x²>16.2)=0.0003  df=2  Since p< α, it is statistically significant. Therefore we reject H₀. There is enough evidence to say there is a relationship between gender and political party

22.  Example 4: An SRS of 592 people were taken comparing their hair and eye color. Is there an association between hair color and eye color? BlackBrownRedBlonde Brown68119267 Green20841794 Blue15541410 Hazel8291416

23.  H₀: There is no association between hair color and eye color  Ha: There is an association between hair color and eye color  Assumptions: -random sample -all expected counts are ≥ 1 -no more than 20% of the expected counts <5 BlackBrownRedBlonde Brown41.0105.726.347.0 Green40.1103.325.745.9 Blue17.344.711.119.9 Hazel12.532.28.014.3

24.  Chi-Squared Test (Independence) w/ α=0.05  P(x²>134.98)≈0  df=9  Since p< α, it is statistically significant. Therefore we reject H₀. There is enough evidence to say there is an association between hair color and eye color