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ENGR 610 Applied Statistics Fall 2007 - Week 7 Marshall University CITE Jack Smith
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Overview for Today Review Hypothesis Testing, 9.1-9.3 One-Sample Tests of the Mean Go over homework problem 9.2 Hypothesis Testing, 9.4-9.7 Testing for the Difference between Two Means Testing for the Difference between Two Variances Testing for Paired Data or Repeated Measures Testing for the Difference among Proportions Homework assignment
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Hypothesis Testing One-Sample Tests for the Mean Z Test ( known) t Test ( unknown) Two-tailed and one-tailed tests p-value Connection with Confidence Interval Z Test for the proportion
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Null hypothesis A “no difference” claim about a population parameter under suspicion based on a sample Tested by sample statistics and either rejected or accepted based on critical test (Z, t, F, 2 ) value Rejection implies that an alternative (the opposite) hypothesis is more probable Analogous to a mathematical ‘proof by contradiction’ or the legal notion of ‘innocent until proven guilty’ Only the null hypothesis involves an equality, while the alternative hypothesis deals only with inequalities
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Critical Regions Critical value of test statistic (Z, t, F, 2,…) Based on desired level of significance Acceptance (null hypothesis) region, and a Rejection (alternative hypothesis) region One-tailed or two-tailed
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Type I and Type II errors Seek proper balance between Type I and II errors Type I error - false negative Null hypothesis rejected when in fact it is true Occurs with probability = level of significance - chosen! (1- ) = confidence coefficient Type II error - false positive Null hypothesis accepted when in fact it is false Occurs with probability = consumer’s risk (1- ) = power of test Depends on , difference between hypothesized and actual parameter value, and sample size
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Z Test ( known) - Two-tailed Critical value (Z c ) based on chosen level of significance, Typically = 0.05 (95% confidence), where Z c = 1.96 (area = 0.95/2 = 0.475) = 0.01 (99%) and 0.001 (99.9%) are also common, where Z c = 2.57 and 3.29 Null hypothesis ( = µ) rejected if Z > Z c or < -Z c, where
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Z Test ( known) - One-tailed Critical value (Z c ) based on chosen level of significance, Typically = 0.05 (95% confidence), but where Z c = 1.645 (area = 0.95 - 0.50 = 0.45) Null hypothesis ( ≤ µ) rejected if Z > Z c, where
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t Test ( unknown) - Two-tailed Critical value (t c ) based on chosen level of significance, , and degrees of freedom, n-1 Typically = 0.05 (95% confidence), where, for example t c = 2.045 (upper area = 0.05/2 = 0.025), for n-1 = 29 Null hypothesis rejected if t > t c or < -t c, where t
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Z Test on Proportion Use normal approximation to binomial distribution, where
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p-value vs critical value Use probabilities corresponding to values of test statistic (Z, t,…) If the p-value , accept null hypothesis If the p-value < , reject null hypothesis E.g., compare p to α instead of t to t c More direct Does not necessarily assume distribution is normal
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Connection with Confidence Interval Compute the Confidence Interval for the sample statistic (e.g., the mean) as in Ch 8 If the hypothesized population parameter is within the interval, accept the null hypothesis, otherwise reject it Equivalent to a two-tailed test Double α for half-interval (one-tail) test
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Z Test for the Difference between Two Means Random samples from independent groups with normal distributions and known 1 and 2 Any linear combination (e.g., the difference) of normal distributions ( k, k ) is also normal CLT: Populations 1 & 2 the same
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t Test for the Difference between Two Means (Equal Variances) Random samples from independent groups with normal distributions, but with equal and unknown 1 and 2 Using the pooled sample variance H 0 : µ 1 = µ 2
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t Test for the Difference between Two Means (Unequal Variances) Random samples from independent groups with normal distributions, with unequal and unknown 1 and 2 Using the Satterthwaite approximation to the degrees of freedom (df) Use Excel Data Analysis tool!
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F test for the Difference between Two Variances Based on F Distribution - a ratio of 2 distributions, assuming normal distributions F L ( ,n 1 -1,n 2 -1) F F U ( ,n 1 -1,n 2 -1), where F L ( ,n 1 -1,n 2 -1) = 1/F U ( ,n 2 -1,n 1 -1), and where F U is given in Table A.7 (using nearest df)
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Mean Test for Paired Data or Repeated Measures Based on a one-sample test of the corresponding differences (D i ) Z Test for known population D t Test for unknown D (with df = n-1) H 0 : D = 0
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2 Test for the Difference among Two or More Proportions Uses contingency table to compute (f e ) i = n i p or n i (1-p) are the expected frequencies, where p = X/n, and (f o ) i are the observed frequencies For more than 1 factor, (f e ) ij = n i p j, where p j = X j /n Uses the upper-tail critical 2 value, with the df = number of groups – 1 For more than 1 factor, df = (factors -1)*(groups-1) Sum over all cells
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Other Tests 2 Test for the Difference between Variances Follows directly from the 2 confidence interval for the variance (standard deviation) in Ch 8. Very sensitive to non-Normal distributions, so not a robust test. Wilcoxon Rank Sum Test between Two Medians
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Homework Work through rest of Appendix 9.1 Work and hand in Problems 9.69, 9.71, 9.74 Read Chapter 10 Design of Experiments: One Factor and Randomized Block Experiments
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