independent samples 1.random selection: everyone from the specified population has an equal...
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Independent Samples
1. Random Selection:Everyone from the Specified Population has an Equal ProbabilityOf being Selected for the study (Yeah Right!)
2. Random Assignment:Every participant has an Equal Probability of being in the TreatmentOr Control Groups
The Null Hypothesis
•Both groups from Same PopulationNo Treatment Effect
•Both Sample Means estimate Same Population MeanDifference in Sample Means reflect Errors of Estimation of Mu
X-Bar1 + e1 = Mu (Mu – X-Bar1 = e1)X-Bar2 + e2 = Mu (Mu – X-Bar2 = e2)
Errors are Random and hence Unrelated
Expectation
If Both Samples were selected from the Same Population:
How much should the Sample Means Disagree about Mu?X-Bar1 – X-Bar2
•Errors of Estimation decrease with N•Errors of Estimation increase with Population Heterogeneity
The Expected Disagreement
The Standard Error of a Difference:SEX-Bar1-X-Bar2
The Average Difference between two Sample MeansThe Expected Difference between two Sample Means
•When they are Estimating the Same Mu•68% chance of this much Or Less•95% chance of (this much x 2) Or Less
Actually this much x 1.96, if you know sigmaRounded up to 2
Expectation: The Standard Error of the Difference
The Expected Disagreement between two Sample Means (if H0 true)
T for Treatment GroupC for Control Group
SEM for Treatment Group
SEM for Control Group
Add the Errors and take the Square Root
Evaluation
Compare the Difference you Got to the Difference you would ExpectIf H0 true
What you Got
What you Expect
?
df = n1 + n2 - 2
Evaluation
Compare the Difference you Got to the Difference you would ExpectIf H0 true
What you Got
What you Expect
?a) If they agree: Keep H0
b) If they disagree: Reject H0
Is TOO DAMN BIG!
Burn This!
Power
The ability to find a relationship when it exists
•Errors of Estimation and Standard Errors of the Difference decrease with N
Use the Largest sample sizes possible
•Errors of Estimation increase with Population Heterogeneity
Run all your subjects under Identical Conditions (Experimental Control)
Power
Case Number
10987654321
Val
ue
40
30
20
10
0
Pre-Test
Post-Test
What if your data look like this?Everybody increased their score (X-bar1 – X-Bar2),but heterogeneity among subjects (SEM1 & SEM2) is large
Power
Correlated Samples Designs:
•Natural Pairs: E.G.: Father vs. SonMeasuring liberal attitudes
•Matched Pairs: Matching pairs of students on I.Q.One of each pair gets treatment (e.g., teaching with technology
•Repeated Measures:Measure Same Subject Twice (e.g., Pre-, Post-therapy)
Look at differences between Pairs of Data Points, ignoring BetweenSubject differences
Correlated Samples
Same as usual
Minus strength of Correlation
Smaller denominatorMakes t bigger, henceMore Power
If r=0, denominator is the same, but df is smaller
Effect Size
•What are the Two Ts of Research?•What is better than computing Effect Size?
A weighted average ofTwo estimates of Sigma
Confidence Interval
Use 2-tailed t-value at95% confidence levelWith N1 + N2 –2 df
N-1 df
Does the Interval cross Zero?
Best Estimate
1020N =
SEX
mf
Me
an
+-
2 S
E H
EIG
HT
76
74
72
70
68
66
64
62
Group Statistics
20 64.9500 2.45967 .55000
10 72.3000 1.82878 .57831
SEXf
m
HEIGHTN Mean Std. Deviation
Std. ErrorMean
Independent Samples Test
1.352 .255 -8.338 28 .000 -7.3500 .88151 -9.15568 -5.54432
-9.210 23.527 .000 -7.3500 .79809 -8.99893 -5.70107
Equal variancesassumed
Equal variancesnot assumed
HEIGHTF Sig.
Levene's Test forEquality of Variances
t df Sig. (2-tailed)Mean
DifferenceStd. ErrorDifference Lower Upper
95% ConfidenceInterval of the
Difference
t-test for Equality of Means
18111N =
HAIR
nb
Me
an
+-
2 S
E H
EIG
HT
72
70
68
66
64
62
Independent Samples Test
.748 .395 -1.527 27 .139 -2.4242 1.58807 -5.68268 .83420
-1.573 23.314 .129 -2.4242 1.54102 -5.60972 .76123
Equal variancesassumed
Equal variancesnot assumed
HEIGHTF Sig.
Levene's Test forEquality of Variances
t df Sig. (2-tailed)Mean
DifferenceStd. ErrorDifference Lower Upper
95% ConfidenceInterval of the
Difference
t-test for Equality of Means
Assumptions of the t-Test
Both (if more than one) population(s):1. Normally distributed2. Equal variance
Violations of Assumptions:Robust unless gross
Transform scores (e.g. take log of each score)
Power
Power = 1 – BetaTheoretical (Beta usually unknown)
Reject H0:Decision is clear, you have a relationship
Fail to reject H0:Decision is unclear, you may have failed to find a Relationshipdue to lack of Power
Power
1. Increases with Effect Size (Mu1 – Mu2)
2. Increases with Sample SizeIf close to p<0.05 add N
3. Decreases with Standard Error of the Difference (denominator)Minimize by
• Recording data correctly• Use consistent criteria• Maintain consistent experimental conditions (control)• (Increasing N)