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The t Test for Independent Means
Chapter 8 The t Test for Independent Means Part 1: Oct. 2, 2014
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t Test for Independent Means
Comparing two samples e.g., experimental and control group Scores are independent of each other Focus on differences betw 2 samples, so comparison distribution is: Distribution of differences between means
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The Distribution of Differences Between Means
If null hyp is true, the 2 populations (where we get sample means) have equal means If null is true, the mean of the distribution of differences = 0
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Pooled Variance Start by estimating the population variance
Assume the 2 populations have the same variance, but sample variance will differ… so pool the sample variances to estimate pop variance = df2 = Group2 N2-1 Pooled estimate of pop variance Sample 1 variance Sample 2 variance df total = total N-2
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Variance (cont.) Note – check to make sure S2 pooled is between the 2 estimates of S2 We’ll also need to figure S2M for each of the 2 groups:
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The Distribution of Differences Between Means
Use these to figure variance of the distribution of differences between means (S2 difference) Then take sqrt for standard deviation of the distribution of differences between means (S difference)
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T formula and df t distribution/table – need to know df, alpha Where df1 = N1-1 and df2 = N2-1 t observed for the difference between the two actual means = Compare T observed to T critical. If T obs is in critical/rejection region Reject Null
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Example Group 1 – watch TV news; Group 2 – radio news.
Is there a significant difference in knowledge based on news source? Research Hyp? Null Hyp?
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Example (cont.) M1 = 24, S2 = 4 N1 = 61 M2 = 26, S2 = 6 N2 = 21
Alpha = .01, 2-tailed test, df tot = N-2 = 80 S2 pooled = S2 M1 = S2 M2 = S2 difference = S difference =
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(cont.) t criticals, alpha = .01, df=80, 2 tailed t observed =
2.639 and –2.639 t observed = Reject or fail to reject null? Conclusion? APA-style sentence:
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