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PPA 415 – Research Methods in Public Administration. Lecture 6 – One-Sample and Two-Sample Tests. Five-step Model of Hypothesis Testing. Step 1. Making assumptions and meeting test requirements. Step 2. Stating the null hypothesis.
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PPA 415 – Research Methods in Public Administration Lecture 6 – One-Sample and Two-Sample Tests
Five-step Model of Hypothesis Testing • Step 1. Making assumptions and meeting test requirements. • Step 2. Stating the null hypothesis. • Step 3. Selecting the sampling distribution and establishing the critical region. • Step 4. Computing the test statistic. • Step 5. Making a decision and interpreting the results of the test.
Five-step Model of Hypothesis Testing – One-sample Z Scores • Step 1. Making assumptions. • Model: random sampling. • Interval-ratio measurement. • Normal sampling distribution. • Step 2. Stating the null hypothesis (no difference) and the research hypothesis. • Ho: • H1:
Five-step Model of Hypothesis Testing – One-sample Z Scores • Step 3. Selecting the sampling distribution and establishing the critical region. • Sampling distribution = Z distribution. • Α=0.05. • Z(critical)=1.96 (two-tailed); +1.65 or -1.65 (two-tailed).
Five-step Model of Hypothesis Testing – One-sample Z Scores • Step 4. Computing the test statistic. • Use z-formula. • Step 5. Making a decision. • Compare z-critical to z-obtained. If z-obtained is greater in magnitude than z-critical, reject null hypothesis. Otherwise, accept null hypothesis.
Five-Step Model: Critical Choices • Choice of alpha level: .05, .01, .001. • Selection of research hypothesis. • Two-tailed test: research hypothesis simplify states that means of sample and population are different. • One-tailed test: mean of sample is larger or smaller than mean of population. • Type of error to maximize: Type I or Type II. • Type I – rejecting a null hypothesis that is true. • Type II – accepting a null hypothesis that is false.
Five-step Model: Example • Is the average age of voters in the 2000 National Election Study different than the average age of all adults in the U.S. population?
Five-step Model of Hypothesis Testing – Large-sample Z Scores • Step 1. Making assumptions. • Model: random sampling. • Interval-ratio measurement. • Normal sampling distribution. • Step 2. Stating the null hypothesis (no difference) and the research hypothesis. • Ho: • H1:
Five-step Model of Hypothesis Testing – Large-sample Z Scores • Step 3. Selecting the sampling distribution and establishing the critical region. • Sampling distribution = Z distribution. • α=0.05. • Z(critical)=1.96 (two-tailed)
Five-step Model of Hypothesis Testing – Large-sample Z Scores • Step 4. Computing the test statistic. • Step 5. Making a decision.
Five-Step Model: Small Sample T-test (One Sample) • Step 1. Making Assumptions. • Random sampling. • Interval-ratio measurement. • Normal sampling distribution. • Step 2. Stating the null hypothesis. • Ho: • H1:
Five-step Model of Hypothesis Testing – One-sample Z Scores • Step 3. Selecting the sampling distribution and establishing the critical region. • Sampling distribution = t distribution. • Α=0.05. • Df=N-1. • t(critical) from Appendix B, p. 359 in Healey.
Five-step Model of Hypothesis Testing – One-sample Z Scores • Step 4. Computing the test statistic. • Step 5. Making a decision. • Compare t-critical to t-obtained. If t-obtained is greater in magnitude than t-critical, reject null hypothesis. Otherwise, accept null hypothesis.
Five-step Model of Hypothesis Testing – One-sample Z Scores • Is the average age of individuals in the JCHA 2000 sample survey older than the national average age for all adults? (One-tailed).
Five-Step Model: Small Sample T-test (One Sample) – JCHA 2000 • Step 1. Making Assumptions. • Random sampling. • Interval-ratio measurement. • Normal sampling distribution. • Step 2. Stating the null hypothesis. • Ho: • H1:
Five-Step Model: Small Sample T-test (One Sample) – JCHA 2000 • Step 3. Selecting the sampling distribution and establishing the critical region. • Sampling distribution = t distribution. • Α=0.05. • Df=41-1=40. • t(critical) =1.684.
Five-Step Model: Small Sample T-test (One Sample) – JCHA 2000 • Step 4. Computing the test statistic. • Step 5. Making a decision. • T(obtained) > t(critical). Therefore, reject the null hypothesis. The sample of residents from the Jefferson County Housing Authority is significantly older than the adult population of the United States.
Five Step Model: Large Sample Proportions. • Formula.
Five Step Model: Large Sample Proportions • Step 1. Making assumptions. • Model: random sampling. • Nominal measurement. • Normal shaped sampling distribution. • Step 2. Stating the null hypothesis (no difference) and the research hypothesis. • Ho: • H1:
Five Step Model: Large Sample Proportions. • Step 3. Selecting the sampling distribution and establishing the critical region. • Sampling distribution = Z distribution. • Α=0.05, one or two-tailed. • Z(critical)=1.96 (two-tailed); +1.65 or -1.65 (two-tailed).
Five Step Model: Large Sample Proportions. • Step 4. Computing the test statistic. • Step 5. Making a decision. • Compare z-critical to z-obtained. If z-obtained is greater in magnitude than z-critical, reject null hypothesis. Otherwise, accept null hypothesis.
Five Step Model: Large Sample Proportions. • Do residents of Birmingham, Alabama, have significantly different homeownership rates than all residents of the United States?
Five Step Model: Large Sample Proportions. Homeownership in Birmingham, Alabama • Step 1. Making assumptions. • Model: random sampling. • Nominal measurement. • Normal shaped sampling distribution. • Step 2. Stating the null hypothesis (no difference) and the research hypothesis. • Ho: • H1:
Five Step Model: Large Sample Proportions. • Step 3. Selecting the sampling distribution and establishing the critical region. • Sampling distribution = Z distribution. • Α=0.05, two-tailed. • Z(critical)=1.96 (two-tailed).
Five Step Model: Large Sample Proportions. • Step 4. Computing the test statistic. • Step 5. Making a decision. • The absolute value of z-obtained is greater than the absolute value of Z-critical, therefore reject the null hypothesis. The homeownership rate in Birmingham is significantly different than the national rate.
Two-Sample Models – Large Samples • Most of the time we do not have the population means or proportions. All we can do is compare the means or proportions of population subsamples. • Adds the additional assumption of independent random samples.
Two-Sample Models – Large Samples • Formula.
Five-Step Model – Large Two-Sample Tests (Z Distribution) • Step 1. Making assumptions. • Model: Independent random samples. • Interval-ratio measurement. • Normal sampling distribution. • Step 2. Stating the null hypothesis (no difference) and the research hypothesis. • Ho: • H1:
Five-Step Model – Large Two-Sample Tests (Z Distribution) • Step 3. Selecting the sampling distribution and establishing the critical region. • Sampling distribution = Z distribution. • Α=0.05. • Z(critical)=1.96 (two-tailed); +1.65 or -1.65 (one-tailed).
Five-Step Model – Large Two-Sample Tests (Z Distribution) • Step 4. Computing the test statistic. • Step 5. Making a decision. • Compare z-critical to z-obtained. If z-obtained is greater in magnitude than z-critical, reject null hypothesis. Otherwise, accept null hypothesis.
Five-Step Model – Large Two-Sample Tests (Z Distribution) • Do non-white citizens of Birmingham, Alabama, believe that discrimination is more of a problem than white citizens?
Five-Step Model – Large Two-Sample Tests (Fair Housing) • Step 1. Making assumptions. • Model: Independent random samples. • Interval-ratio measurement. • Normal sampling distribution. • Step 2. Stating the null hypothesis (no difference) and the research hypothesis. • Ho: • H1:
Five-Step Model – Large Two-Sample Tests (Z Distribution) • Step 3. Selecting the sampling distribution and establishing the critical region. • Sampling distribution = Z distribution. • Α=0.05. • Z(critical)=+1.65 (one-tailed).
Five-Step Model – Large Two-Sample Tests (Z Distribution) • Step 4. Computing the test statistic. • Step 5. Making a decision. • Z(obtained) is greater than Z(critical), therefore reject the null hypothesis of no difference. Non-whites believe that discrimination is more of a problem in Birmingham.
Five-Step Model – Small Two-Sample Tests • If N1 + N2 < 100, use this formula.
Five-Step Model – Small Two-Sample Tests (t Distribution) • Step 1. Making assumptions. • Model: Independent random samples. • Interval-ratio measurement. • Equal population variances • Normal sampling distribution. • Step 2. Stating the null hypothesis (no difference) and the research hypothesis. • Ho: • H1:
Five-Step Model – Small Two-Sample Tests (t Distribution) • Step 3. Selecting the sampling distribution and establishing the critical region. • Sampling distribution = t distribution. • Α=0.05. • Df=N1+N2-2 • t(critical). See Appendix B, p. 359.
Five-Step Model – Small Two-Sample Tests (t Distribution) • Step 4. Computing the test statistic. • Step 5. Making a decision. • Compare t-critical to t-obtained. If t-obtained is greater in magnitude than t-critical, reject null hypothesis. Otherwise, accept null hypothesis.
Five-Step Model – Small Two-Sample Tests (t Distribution) • Did white and nonwhite residents of the Jefferson County Housing Authority have significantly different lengths of residence in 2000?
Five-Step Model – Small Two-Sample Tests (JCHA 2000) • Step 1. Making assumptions. • Model: Independent random samples. • Interval-ratio measurement. • Equal population variances • Normal sampling distribution. • Step 2. Stating the null hypothesis (no difference) and the research hypothesis. • Ho: • H1:
Five-Step Model – Small Two-Sample Tests (JCHA 2000) • Step 3. Selecting the sampling distribution and establishing the critical region. • Sampling distribution = t distribution. • Α=0.05, two-tailed. • Df=N1+N2-2=14+25-2=37 • t(critical) from Appendix B = 2.042
Five-Step Model – Small Two-Sample Tests (t Distribution) • Step 4. Computing the test statistic. • Step 5. Making a decision. • Z(obtained) is less than Z(critical) in magnitude. Accept the null hypothesis. Whites and nonwhites in the JCHA 2000 survey do not have different lengths of residence in public housing.
Five-Step Model – Large Two-Sample Tests (Proportions) • Step 1. Making assumptions. • Model: Independent random samples. • Interval-ratio measurement. • Normal sampling distribution. • Step 2. Stating the null hypothesis (no difference) and the research hypothesis. • Ho: • H1:
Five-Step Model – Large Two-Sample Tests (Proportions) • Step 3. Selecting the sampling distribution and establishing the critical region. • Sampling distribution = Z distribution. • Α=0.05. • Z(critical)=1.96 (two-tailed); +1.65 or -1.65 (one-tailed).
Five-Step Model – Large Two-Sample Tests (Proportions) • Step 4. Computing the test statistic. • Step 5. Making a decision. • Compare z-critical to z-obtained. If z-obtained is greater in magnitude than z-critical, reject null hypothesis. Otherwise, accept null hypothesis.
Five-Step Model – Large Two-Sample Tests (Proportions) • Did Presidents Ford and Carter have different approval rates for major disaster declarations?
Five-Step Model – Large Two-Sample Proportions (Example) • Step 1. Making assumptions. • Model: Independent random samples. • Interval-ratio measurement. • Normal sampling distribution. • Step 2. Stating the null hypothesis (no difference) and the research hypothesis. • Ho: • H1:
Five-Step Model – Large Two-Sample Proportions (Example) • Step 3. Selecting the sampling distribution and establishing the critical region. • Sampling distribution = Z distribution. • Α=0.05. • Z(critical)=1.96 (two-tailed).