Copyright ©2011 Brooks/Cole, Cengage Learning Testing Hypotheses about Means Chapter 13
Dec 18, 2015
Copyright ©2011 Brooks/Cole, Cengage Learning
Testing Hypotheses
about Means
Chapter 13
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Hypothesis testing about: • a population mean
• the difference between means of two populations
Three Cautions:1. Inference is only valid if the sample is representative
of the population for the question of interest.
2. Hypotheses and conclusions apply to the larger population(s) represented by the sample(s).
3. If the distribution of a quantitative variable is highly skewed, consider analyzing the median rather than the mean – called nonparametric methods (Topic 2 on CD).
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13.1 Introduction to Hypothesis Tests for MeansSteps in Any Hypothesis Test1. Determine the null and alternative hypotheses.
2. Verify necessary data conditions, and if met, summarize the data into an appropriate test statistic.
3. Assuming the null hypothesis is true, find the p-value.
4. Decide whether or not the result is statistically significant based on the p-value.
5. Report the conclusion in the context of the situation.
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13.2: Testing Hypotheses about One Mean
Step 1: Determine null and alternative hypotheses
1. H0: = 0 versus Ha: 0 (two-sided)
2. H0: = 0 versus Ha: < 0 (one-sided)
3. H0: = 0 versus Ha: > 0 (one-sided)
Remember a p-value is computed assuming H0 is true, and 0 is the value used for that computation.
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Situation 1: Population of measurements of interest is approximately normal, and a random sample of any size is measured. In practice, use method if shape is not notably skewed or no extreme outliers.
Situation 2: Population of measurements of interest is not approximately normal, but a large random sample (n 30) is measured. If extreme outliers or extreme skewness, better to have a larger sample.
Step 2: Verify Necessary Data Conditions …
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The t-statistic is a standardized score for measuring the difference between the sample mean and the null hypothesis value of the population mean:
Continuing Step 2: The Test Statistic
This t-statistic has (approx) a t-distribution with df = n - 1.
ns
xt 0
error standard
valuenullmean sample
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• For Ha less than, the p-value is the area below t, even if t is positive.
• For Ha greater than, the p-value is the area above t, even if t is negative.
• For Ha two-sided, p-value is 2 area above |t|.
Step 3: Assuming H0 true, Find the p-value
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These two steps remain the same for all of the hypothesis tests considered in this discussion.
Choose a level of significance , and reject H0 if the p-value is less than (or equal to) .
Otherwise, conclude that there is not enough evidence to support the alternative hypothesis.
Steps 4 and 5: Decide Whether or Not the Result is Statistically Significant based on the p-value and Report the Conclusion in the Context of the Situation
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Example 13.1 Normal Body Temperature
What is normal body temperature? Is it actually less than 98.6 degrees Fahrenheit (on average)?
Step 1: State the null and alternative hypotheses
H0: = 98.6
Ha: < 98.6
where = mean body temperature in human population.
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Example 13.1 Normal Body Temp (cont)
Data: random sample of n = 16 normal body temps
Step 2: Verify data conditions …
98.4, 98.6, 98.8, 98.8, 98.0, 97.9, 98.5, 97.6, 98.4, 98.3, 98.9, 98.1, 97.3, 97.8, 98.4, 97.4
Boxplot shows no outliers nor strong skewness.
Sample mean of 98.2 is close to sample median of 98.35.
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Example 13.1 Normal Body Temp (cont)
Step 2: … Summarizing data with a test statistic
Key elements:
Sample statistic: = 98.200 (under “Mean”)
Standard error: (under “SE Mean”)
(under “T”)
124.016
497.0..
n
sxes
x
22.3124.0
6.982.980
ns
xt
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Example 13.1 Normal Body Temp (cont)
Step 3: Find the p-value
From output: p-value = 0.003
From Table A.3: p-value is less than 0.004.
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Example 13.1 Normal Body Temp (cont)
Step 4: Decide whether or not the result is statistically significant based on the p-value
Using = 0.05 as the level of significance criterion, the results are statistically significant because 0.003, the p-value of the test, is less than 0.05. In other words, we can reject the null hypothesis.
Step 5: Report the Conclusion
We can conclude, based on these data, that the mean temperature in the human population is actually less than 98.6 degrees.
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Rejection Region Approach (Optional)
Replaces Steps 3 and 4 with:
Substitute Step 3: Find the critical value and rejection region for the test.
Substitute Step 4: If the test statistic is in the rejection region, conclude that the result is statistically significant and reject the null hypothesis. Otherwise, do not reject the null hypothesis.
Note: Rejection region method and p-value method will always arrive at the same conclusion about statistical significance.
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Rejection Region Approach
Summary (use row of Table A.2 corresponding to df)
For Example 13.1 Normal Body Temperature?
Alternative was one-sided to the left, df = 15, and = 0.05.Critical value from table A.2 is –1.75.Rejection region is t – 1.75. The test statistic was –3.22 so the null hypothesis is rejected. Same conclusion is reached.
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13.4: Testing Hypotheses about Difference between Two Means
Step 1: Determine null and alternative hypothesesH0: 1 – 2 = versus
Ha: 1 – 2 or Ha: 1 – 2 < or Ha: 1 – 2 >
Watch how Population 1 and 2 are defined.
Lesson 1: the General (Unpooled) Case
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Step 2: Verify data conditions and compute the test statistic.
Both n’s are large or no extreme outliers or skewness in either sample. Samples are independent. The t-test statistic is:
2
22
1
21
21 0
error standard
valuenullmean sample
ns
ns
xxt
Steps 3, 4 and 5: Similar to t-test for one mean.
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Example 13.4 Effect of Stare on Driving
Question: Does stare speed up crossing times?
Step 1: State the null and alternative hypotheses
H0: 1 – 2 = versus Ha: 1 – 2 >
where 1 = no-stare population and 2 = stare population.
Randomized experiment: Researchers either stared or did not stare at drivers stopped at a campus stop sign; Timed how long (sec) it took driver to proceed from sign to a mark on other side of the intersection.
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Example 13.3 Effect of Stare (cont) Data: n1 = 14 no stare and n2 = 13 stare responses
Step 2: Verify data conditions …
No outliers nor extreme skewness for either group.
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Example 13.3 Effect of Stare (cont) Step 2: … Summarizing data with a test statistic
Sample statistic: = 6.63 – 5.59 = 1.04 seconds
Standard error:
21 xx
43.013
822.0
14
36.1).(.
22
2
22
1
21
21 n
s
n
sxxes
41.2
43.0
004.10
2
22
1
21
21
ns
ns
xxt
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Example 13.3 Effect of Stare (cont)
Steps 3, 4 and 5: Determine the p-value and make a conclusion in context.
The p-value = 0.013, so we reject the null hypothesis,
the results are “statistically significant”.
The p-value is determined using a t-distribution with df = 21 (df using Welch approximation formula) and finding area to right of t = 2.41. Table A.3 p-value is between 0.009 and 0.015.
We can conclude that if all drivers were stared at, the mean crossing times at an intersection would be faster than under normal conditions.
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Lesson 2: Pooled Two-Sample t-Test
Based on assumption that the two populations have equal population standard deviations: 21
2
11 deviation standard Pooled
21
222
211
nn
snsnsp
2121
11).(. Pooled
nnsxxes p
Note: Pooled df = (n1 – 1) + (n2 – 1) = (n1 + n2 – 2).
21
2
21
11
0
error standard pooled
valuenullmean sample
nns
xxt
p
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Guidelines for Using Pooled t-Test
• If sample sizes are equal, pooled and unpooled standard errors are equal and so t-statistic is same. If sample standard deviations are similar, assumption of common population variance is reasonable and pooled procedure can be used.
• If sample sizes are very different, pooled test can be quite misleading unless sample standard deviations similar. If sample sizes very different and smaller standard deviation accompanies larger sample size, do not recommend using pooled procedure.
• If sample sizes are very different, standard deviations are similar, and larger sample size produced the larger standard deviation, pooled t-test is acceptable and will be conservative.
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The null and alternative hypotheses are:
H0: 1 – 2 = versus Ha: 1 – 2
where 1 = female population and 2 = male population.
Example 13.7 Male and Female Sleep Times
Data: The 83 female and 65 male responses from students in an intro stat class.
Note: Sample sizes similar, sample standard deviations similar. Use of pooled procedure is warranted.
Q: Is there a difference between how long female and male students slept the previous night?
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Example 13.5 Male and Female Sleep Times Two-sample T for sleep [without “Assume Equal Variance” option]
Sex N Mean StDev SE MeanFemale 83 7.02 1.75 0.19Male 65 6.55 1.68 0.21
95% CI for mu(f) – mu(m): (-0.10, 1.02)T-Test mu (f) = mu(m) (vs not =): T-Value = 1.62 P = 0.11 DF = 140
Two-sample T for sleep [with “Assume Equal Variance” option]
Sex N Mean StDev SE MeanFemale 83 7.02 1.75 0.19Male 65 6.55 1.68 0.21
95% CI for mu(f) – mu(m): (-0.10, 1.03)T-Test mu (f) = mu(m) (vs not =): T-Value = 1.62 P = 0.11 DF = 146Both use Pooled StDev = 1.72
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13.5 Relationship Between Tests and Confidence Intervals
For two-sided tests (for one or two means): H0: parameter = null value and Ha: parameter null value
Note: 95% confidence interval 5% significance level99% confidence interval 1% significance level
• If the null value is covered by a (1 – )100% confidence interval, the null hypothesis is not rejected and the test is not statistically significant at level .
• If the null value is not covered by a (1 – )100% confidence interval, the null hypothesis is rejected and the test is statistically significant at level .
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Confidence Intervals and One-Sided Tests
• If the null value is covered by the interval, the test is not statistically significant at level .
• For the alternative Ha: parameter > null value, the test is statistically significant at level if the entire interval falls above the null value.
• For the alternative Ha: parameter < null value, the test is statistically significant at level if the entire interval falls below the null value.
When testing the hypotheses: H0: parameter = null value versus a one-sided alternative, compare the null value to a (1 – 2)100% confidence interval:
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Example 13.9 Ear Infections and Xylitol
95% CI for p1 – p2 is 0.020 to 0.226
Reject H0: p1 – p2 = and accept Ha: p1 – p2 > with = 0.025, because the entire confidence
interval falls above the null value of 0.
Note that the p-value for the test was 0.01, which is less than 0.025.
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13.6 Choosing an Appropriate Inference Procedure
• Confidence Interval or Hypothesis Test?Is main purpose to estimate the numerical value of a parameter? …
or to make a “maybe not/maybe yes” conclusion about a specific hypothesized value for a parameter?
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13.6 Choosing an Appropriate Inference Procedure
• Determining the Appropriate ParameterIs response variable categorical or quantitative? Is there one sample or two? If two, independent or paired?
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13.7 Effect Size
Effect size is a measure of how much the truth differs from chance or from a control condition.
Effect size for a single mean: 01
d
Effect size for comparing two means:
21
d
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Estimating Effect Size
Estimated effect size for a single mean:
s
xd 0ˆ
Estimated effect size for comparing two means:
s
xxd 21ˆ
Relationship:
Test statistic = Size of effect Size of study
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13.8 Evaluating Significance in Research Reports
1. Is the p-value reported? If know p-value, can make own decision, based on severity of Type 1 error and p-value.
2. If word significant is used, determine whether used in everyday sense or in statistical sense only. Statistically significant just means that a null hypothesis has been rejected, no guarantee the result has real-world importance.
3. If you read “no difference” or “no relationship” has been found, determine whether sample size was small. Test may have had very low power because not enough data were collected to be able to make a firm conclusion.
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13.8 Evaluating Significance in Research Reports
4. Think carefully about conclusions based on extremely large samples. If very large sample size, even weak relationship or small difference can be statistically significant.
5. If possible, determine what confidence interval should accompany a hypothesis test. Intervals provide information about magnitude of effect as well as information about margin of error in sample estimate.
6. Determine how many hypothesis tests were conducted in study. Sometimes researchers perform multitude of tests, but only few achieve statistical significance. If all null hypotheses true, then ~1 in 20 tests will achieve statistical significance just by chance at the .05 level of significance.