the independent- samples t test chapter 11. independent samples t-test >used to compare two means in...
TRANSCRIPT
- Slide 1
- The Independent- Samples t Test Chapter 11
- Slide 2
- Independent Samples t-Test >Used to compare two means in a between-groups design (i.e., each participant is in only one condition)
- Slide 3
- Distribution of Differences Between Means
- Slide 4
- Hypothesis Tests & Distributions
- Slide 5
- Steps for Calculating Independent Sample t Tests >Step 1: Identify the populations, distribution, and assumptions. >Step 2: State the null and research hypotheses. >Step 3: Determine the characteristics of the comparison distribution. >Step 4: Determine critical values, or cutoffs. >Step 5: Calculate the test statistic. >Step 6: Make a decision.
- Slide 6
- Population 1: People told they are drinking wine from a $10 bottle. Population 2: People told they are drinking wine from a $90 bottle. The distribution: a distribution of differences between means (rather than a distribution of mean difference scores). Assumptions: The participants were not randomly selected so we must be cautious with respect to generalizing our findings. We do not know whether the population is normally distributed. Step 1: Identify the populations, distribution, and assumptions.
- Slide 7
- Null hypothesis: On average, people drinking wine they were told was from a $10 bottle give it the same rating as people drinking wine they were told was from a $90 bottle. H 0 : 1 = 2 Research hypothesis: On average, people drinking wine they were told was from a $10 bottle give it a different rating than people drinking wine they were told was from a $90 bottle. H 1 : 1 2 v Step 2: State the null and research hypotheses.
- Slide 8
- Calculate the pooled variance and then the standard deviation of the difference. Step 3: Determine the characteristics of the comparison distribution.
- Slide 9
- Formulae
- Slide 10
- Additional Formulae
- Slide 11
- Step 4: Determine critical values, or cutoffs.
- Slide 12
- Step 5. Calculate the test statistic
- Slide 13
- Step 6: Make a Decision.
- Slide 14
- >t(df) = tcalc, p .05 if there is no difference between means Use p t(7) = -2.44, p
- Beyond Hypothesis Testing >Just like z tests, single-sample t tests, and paired-samples t tests, we can calculated confidence intervals and effect size for independent-samples t tests
- Slide 16
- Steps for Calculating CIs >Step 1. Draw a normal curve with the sample difference between means in the center. >Step 2. Indicate the bounds of the CI on either end, writing the percentages under each segment of the curve. >Step 3. Look up the t values for lower and upper ends of the CIs in the t table. >Step 4. Convert the t values to raw differences. >Step 5. Check the answer.
- Slide 17
- A 95% Confidence Interval for Differences Between Means, Part I
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- A 95% Confidence Interval for Differences Between Means, Part II
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- A 95% Confidence Interval for Differences Between Means, Part III
- Slide 20
- Effect Size >Used to supplement hypothesis testing >Cohens d:
- Slide 21
- Effect Size
- Slide 22
- Data Transformations 1. Transform a scale variable to an ordinal variable. 2. Use a data transformation such as square root transformation to squeeze the data together to make it more normal. >Remember that we need to apply any kind of data transformation to every observation in the data set.
- Slide 23
- >When would you use a z test over a t test? >When would you use an independent sample t test? Think of a specific study. >When would you use a paired sample t test? Think of a specific study. Stop and Think