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Chi Square 2 II

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Title: Chi Square 2 II

1
Chi Square (?2 ) II

Two-way Tests

2
CHI-SQUARE ?2

Marginal Values Row Column Totals
?2 a Row by Column Association Test
?2 Goodness of Fit Model
?2 Test of Independence
Expected Values (fe) RM CM / Total N

3
Testing for a Gender Effect for Approval of
Clinton
4
Frequency Data Approval by Gender
5
Hypothesis Testing

Step 1 State Hypothesis
What is the Null?
What is the Alternative (Research) Hypothesis?
Last time, we just imputed equal probabilities
from what we know about probability theory
This time, we cant just say 25 in each cell
because the sample sizes for men and women are
different. We will show later how to get fe

6
Frequency Table Approval for Clinton by Gender
7
FIRST STEP COMPUTE PERCENTAGE TABLE

Row margins
335/908 36.9 Disapprove
573/908 63.1 Approve
NOTE Most Citizens Approve of Clinton
BUT We Are Testing for a Gender EffectAre
Women more Supportive Than Men?

8
PERCENTAGIZE TABLE
9
INTERPRETATION

Row Marginal Most Citizens (63) Approved of
Clinton.
Column Marginal There Are More Men in the
Sample (54).Step 1 Hypotheses
Null HypothesisH0 Women Men 0 Chance
Cell Percents Show Women More Supportive? Null
Hypothesis Challenged.

10
STEP 2 WHAT IS THE DISTRIBUTION?

Frequencies
Categorizing same individuals in two
waysApproval and Gender
Looking at the Effect of an Independent Variable
(Gender) on Dependent Variable (Approval).

11
Step 3 DETERMINE LEVEL OF SIGNIFICANCE

Set alpha at risk level of 5 (?.05) for 95
confidence.

12
STEP 4 DETERMINE CRITICAL VALUE OF ?2

Degrees of Freedom
( rows 1) ( Columns 1)
Here (2 1) (2 1) 1 1 1
Look up Critical Value of ?2 at 5 risk with 1
df and find ?2 3.84

13
CHI-SQUARE DISTRIBUTION
14
STEP 5 MAKE DECISION

Question Is the proportion of men and women
approving Clinton different from what you would
expect by chance?
Assuming the null hypothesis is true what
would be the expected values?
Need to Compute Expected values.
Ideas?

15
CALCULATING EXPECTED VALUES

Look at the Marginal ValuesNote 63 of all
respondents approve
Therefore, assuming the null is true that there
is no gender difference what would you expect
the cell percentages to look like?

16
ASSUMING THE NULL HYPOTHESIS IS TRUE

37 of women should disapprove as well as 37 of
men, sampling error
63 of women as well as 63 of men should
approve, sampling error
The proportions of men and women approving and
disapproving should be the same sampling error

17
CONSTRUCT A NULL TABLE of fe Values
18
TWO METHODS FOR COMPUTING EXPECTED VALUES

Text Method (Easiest)
Row Margin Column Margin
Total N
Cell a 335 418 / 908 140,030 / 908 154
Cell b 335 490 / 908 164,150 / 908 181
Cell c 573 418 / 908 239,514 / 908 264
Cell d 573 490 / 908 280,770 / 908 309

19
2. Null Percentage MethodIf null is true, the
Percentage of Men and Women should be the same.
Then compute the frequency based on that
percentage. Purely for Mathematical Completeness

Cell a .369 418 154
Cell b .369 490 181
Cell c .631 418 264
Cell d .631 490 309

20
CHI-SQUARE Frequency Observed (Expected)
21
KEY QUESTIONS

How closely do fo values match fe values?
Do the squared fo fe differences fit the null
hypothesis?
Or, are the differences between observations and
chance expectations so deviant as to justify
rejection of the null?

22
CHI-SQUARE
23
CALCULATE CHI-SQUARE
24
Compare Chi-Square Values