1 / 61

Chapter 20

Chapter 20. Testing Hypotheses About Proportions. Confidence Interval. Confidence Interval for p. Confidence Interval. Plausible values for the unknown population proportion, p . We have confidence in the process that produced this interval. Inference.

jillian-cleveland
Télécharger la présentation

Chapter 20

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. Chapter 20 Testing Hypotheses About Proportions

  2. Confidence Interval • Confidence Interval for p

  3. Confidence Interval • Plausible values for the unknown population proportion, p. • We have confidence in the process that produced this interval.

  4. Inference • Propose a value for the population proportion, p. • Does the sample data support this value?

  5. Comparing Confidence Intervals with Hypothesis Tests • Confidence Interval: A level of confidence is chosen. We determine a range of possible values for the parameter that are consistent with the data (at the chosen confidence level).

  6. Comparing Confidence Intervals with Hypothesis Tests • Hypothesis Test:Only one possible value for the parameter, called the hypothesized value, is tested. We determine the strength of the evidence provided by the data against the proposition that the hypothesized value is the true value.

  7. Example - Hypothesis Test • A law firm will represent people in a class action lawsuit against a car manufacturer only if it is sure that more than 10% of the cars have a particular defect. • Population: Cars of a particular make and model. • Parameter: Proportion of this make and model of car that have a particular defect.

  8. Example - Hypothesis Test • Test a claim about the population proportion, p • Start by formulating a hypotheses. • Null Hypothesis • H0: p= 0.10 • Alternative Hypothesis • HA: p> 0.10

  9. Parts to a Hypothesis Test • Null Hypothesis (H0) • What the model is believed to be • H0: p = p0 • Ex: Fair coin: H0: p = 0.5

  10. Parts to a Hypothesis Test • Alternative Hypothesis (Ha) • Claim you would like to prove • Ha: p < p0 • Ha: p > p0 • Ha: p  p0 • Ex: Fair Coin?: Ha: p  0.5

  11. Writing a Hypotheses • In the 1950’s only about 40% of high school graduates went on to college. Has the percentage changed? • H0: p = .4 vs. Ha: p  .4 • Is a coin fair? • H0: p = .5 vs. Ha: p  .5 • Only about 20% of people who try to quit smoking succeed. Sellers of a motivational tape claim that listening to the recorded messages can help people quit. • H0: p = .2 vs. Ha: p > .2

  12. Writing a Hypotheses • A governor is concerned about his “negatives” (the percentage of state residents who express disapproval of his job performance.) His political committee pays for a series of TV ads, hoping that they can keep the negatives below 30%. They will use follow-up polling to assess the ads’ effectiveness • H0: p = .3 vs. Ha: p < .3 • Coke will only market their new zero calorie soft drink only if they are sure that 60% percent of the people like the flavor • H0: p = .6 vs. Ha: p > .6

  13. Relationship Between H0 and Ha • Law & Order • We assume people accused of a crime are innocent until proven guilty. • H0: person is innocent • You, as the prosecutor, must gather enough evidence to prove that the person accused is guilty beyond a shadow of a doubt. • Ha: person is not innocent.

  14. Example - Hypothesis Test • Next, take a random sample and calculate • The law firm contacts 100 car owners at random and finds out that 12 of them have cars that have the defect. Thus = .12. • Is this sufficient evidence for the law firm to proceed with the class action law suit? • Ask: How likely is it that our came from a population with a mean po? • If it is likely, then I have no reason to question the value for po. • If it is unlikely, then we do have reason to question the value of po.

  15. Example - Hypothesis Test • Check your assumptions! • npo and nqo are greater than or equal to 10 • n is less than 10% of the population • random sample • independent values

  16. Example - Hypothesis Test • Sampling Distribution of if Null Hypothesis is True

  17. Example - Hypothesis Test • Sampling distribution of • Shape approximately normal because 10% condition and success/failure condition satisfied. • Mean: p= 0.10 (because we assume H0 is true) • Standard Deviation:

  18. Example - Hypothesis Test • Calculate a Test Statistic

  19. Example - Hypothesis Test

  20. Example - Hypothesis Test Use Z-Table z 0.05 0.06 0.07 0.05 0.06 0.7486 0.07

  21. Example - Hypothesis Test

  22. Example - Hypothesis Test Interpretation • Getting a sample proportion of 0.12 or more will happen about 25% (P-value = 0.25) of the time when taking a random sample of 100 from a population whose population proportion is p= 0.10.

  23. Example - Hypothesis Test Interpretation • Getting a value of the sample proportion of 0.12 is consistent with random sampling from a population with proportion p= 0.10. This sample result does not contradict the null hypothesis. The P-value is not small, therefore fail to reject H0.

  24. Parts to a Hypothesis Test • P-value = The probability of getting the observed statistic (i.e. ) or one that is more extreme given that the null hypothesis is true. • Ha: p < po (one-sided test) • p-value = P(Z < z) • Ha: p > po (one-sided test) • p-value = P(Z > z) • Ha: p ≠ po (two-sided test) • p-value = 2*P(Z > |z|)

  25. Ha: p < po p-value = P(Z < z)

  26. Ha: p > po p-value = P(Z > z) = P(Z < -z)

  27. Ha: p ≠ po p-value = 2*P(Z > |z|) = 2*P(Z < -|z|)

  28. Parts to a Hypothesis Test • Decision • Small p-values mean there is evidence that null hypothesis is incorrect. • Large p-values mean there is no evidence that null hypothesis is incorrect. • What values are considered small or large? • alpha level (significance level) = α • Typical values (0.01, 0.05, 0.10)

  29. Parts to a Hypothesis Test • Decision (in terms of H0) • Reject H0 • When p-value is smaller than α • Enough evidence exists to say that H0 is most likely incorrect. • Do not reject H0 • When p-value is larger than α • Not enough evidence exists to say that H0 is incorrect.

  30. Parts to a Hypothesis Test • Conclusion (in terms of Ha) • If we reject H0, the conclusion would be: • There is evidence in favor of Ha • If we fail to reject H0, the conclusion would be • There is not enough evidence in favor of Ha

  31. Parts to a Hypothesis Test • Decision • Just remember one phrase: “If the p-value < , reject H0” • Conclusion • What have you decided about p? • Stated in terms of problem

  32. Parts to a Hypothesis Test • Step 1: Hypotheses • Specify  • Step 2: Test Statistic • Step 3: P-value • Step 4: Decision & Conclusion

  33. Example #1 • Many people have trouble programming their VCRs, so a company has developed what it hopes will be easier instructions. The goal is to have at least 90% of all customers succeed. The company tests the new system on 200 randomly selected people, and 188 of them were successful. Do you think the new system meets the company’s goal?

  34. Example #1 • Step 1: • Population parameter of concern: • p = proportion of people who successfully program their VCRs. • Hypotheses: • H0: p = 0.9 • Ha: p > 0.9 • We want to test this hypothesis at a =.05 level

  35. Example #1 • Step 2: • Assumptions: • Random sample • Independence • npo = 200(0.9) = 180 > 10 • nqo = 200(0.1) = 20 > 10 • n = 200 is less than 10% of the population size

  36. Example #1 • Step 2: • Model: • Test Statistic:

  37. Example #1 • Step 3: • P-value: • P(Z > z) = P(Z > 1.90) = 0.0287 • If p-value < , reject H0. • Is there strong enough evidence to reject H0? • If we want strong evidence (beyond a shadow of a doubt),  should be small.

  38. Example #1 • Step 4: • Decision: • 0.0287 = p-value <  = 0.05, so reject H0. • Conclusion: • There is evidence that the new system works in helping customers succeed in programming their VCRs.

  39. Example #1 • What is the interpretation of the p-value in the context of the problem? • If the true proportion of people that can successfully program their VCR with the new instructions is 90%, the probability of getting a sample proportion of 94% or one higher (more extreme) is about 2.9% (i.e. not very likely).

  40. Example #2 • In 1991, the state of New Mexico became concerned that their DWI rate was considerably above the national average. The national average that year, was .00809. Suppose they set up road blocks to allow them to randomly select drivers and record (and arrest) the number who were above the legal blood alcohol level. Out of a random sample of 100,000 drivers, 2213 were above the limit (and subsequently arrested). Was there strong evidence that the DWI rate in New Mexico was higher than the national average?

  41. Example #2 • Step 1: • Parameter of interest: • p = proportion of New Mexicans that have blood alcohol level above the limit. • Hypotheses: • H0: p = 0.00809 • Ha: p > 0.00809

  42. Example #2 • Step 2: • Check the necessary assumptions: • npo = 100,000(0.00809) = 809 • nqo = 100,000(0.99191) = 99191 • The population of New Mexico in 1991 was 1,547,115. Our sample size of 100,000 is less than 10% of the population. • Random sample • independence

  43. Example #2 • Step 2: • Model: • Test Statistic:

  44. Example #2 • Step 3: • P-value: • P(Z > 49.61) = P(Z < -49.61) = 0 (or < 0.0001) • Step 4: • Decision: • Use  = 0.05 • P-value < , reject H0.

  45. Example #2 • Step 4: • Conclusion: • There is enough evidence to say that New Mexico’s DWI is probably higher than the national average. • Does driving in New Mexico cause you to be drunk? • No, we are providing statistical inference based on data (evidence) gathered.

  46. Example #2 • What does the p-value mean in the context of this problem? • If the true proportion of New Mexicans that have a blood alcohol level above the legal limit is 0.809%, the probability of getting a sample proportion of 2.2% or higher (more extreme) almost 0 (i.e. very unlikely).

  47. General Notes • Always list both the null and alternative hypotheses for each problem. • Remember that the null states a value for the population parameter p. • The null arises from the context of the problem, not from the sample. • We start by assuming that the null is true. • If we find evidence, we can reject the null, but we never accept the null. We can fail to reject the null. • The alternative states what your alternate assumptions is if you reject the null.

  48. General Notes • Know how to determine whether you should use a one-sided or two-sided model. • It depends upon how the question is worded. • The z-statistic will be the same for each model, but the final p-value will change. • Know the way to determine the p-value in each case. • Always remember to interpret your conclusion in terms of the problem. • State what the outcome is and what the likelihood of it occurring is.

  49. Example #3 • A large company hopes to improve satisfaction, setting as a goal that no more than 5% negative comments. A random survey of 350 customers found only 13 with complaints. Is the company meeting its goal?

  50. Example #3 • Step 1: • Population parameter of concern • p = proportion of dissatisfied customers • H0: p = 0.05 • Ha: p < 0.05

More Related