Statistics

1. Statistics Chapter 3: Probability

2. Where We’ve Been • Making Inferences about a Population Based on a Sample • Graphical and Numerical Descriptive Measures for Qualitative and Quantitative Data McClave: Statistics, 11th ed. Chapter 3: Probability

3. Where We’re Going • Probability as a Measure of Uncertainty • Basic Rules for Finding Probabilities • Probability as a Measure of Reliability for an Inference McClave: Statistics, 11th ed. Chapter 3: Probability

4. 3.1: Events, Sample Spaces and Probability • An experiment is an act or process of observation that leads to a single outcome that cannot be predicted with certainty. McClave: Statistics, 11th ed. Chapter 3: Probability

5. 3.1: Events, Sample Spaces and Probability • A sample point is the most basic outcome of an experiment. An Ace A four A Head McClave: Statistics, 11th ed. Chapter 3: Probability

6. 3.1: Events, Sample Spaces and Probability • A sample space of an experimentis the collection of all sample points. • Roll a single die: S: {1, 2, 3, 4, 5, 6} McClave: Statistics, 11th ed. Chapter 3: Probability

7. 3.1: Events, Sample Spaces and Probability • Sample points and sample spaces are often represented with Venn diagrams. McClave: Statistics, 11th ed. Chapter 3: Probability

8. All probabilities must be between 0 and 1. The probabilitiesof all the sample points must sum to 1. Probability Rules for Sample Points 3.1: Events, Sample Spaces and Probability McClave: Statistics, 11th ed. Chapter 3: Probability

9. All probabilities must be between 0 and 1 The probabilitiesof all the sample points must sum to 1 Probability Rules for Sample Points 3.1: Events, Sample Spaces and Probability 0 indicates an impossible outcome and 1 a certain outcome. Something has to happen. McClave: Statistics, 11th ed. Chapter 3: Probability

10. 3.1: Events, Sample Spaces and Probability • An event is a specific collection of sample points: • Event A: Observe an even number. McClave: Statistics, 11th ed. Chapter 3: Probability

11. 3.1: Events, Sample Spaces and Probability • The probability of an event is the sum of the probabilities of the sample points in the sample space for the event. • Event A: Observe an even number. • P(A) = 1/6 + 1/6 + 1/6 = 3/6 = 1/2 McClave: Statistics, 11th ed. Chapter 3: Probability

12. Calculating Probabilities for Events Define the experiment. List the sample points. Assign probabilities to sample points. Collect all sample points in the event of interest. The sum of the sample point probabilities is the event probability. 3.1: Events, Sample Spaces and Probability McClave: Statistics, 11th ed. Chapter 3: Probability

13. Calculating Probabilities for Events Define the experiment List the sample points Assign probabilities to sample points Collect all sample points in the event of interest The sum of the sample point probabilities is the event probability 3.1: Events, Sample Spaces and Probability If the number of sample points gets too large, we need a way to keep track of how they can be combined for different events. McClave: Statistics, 11th ed. Chapter 3: Probability

14. 3.1: Events, Sample Spaces and Probability • If a sample of n elements is drawn from a set of N elements (N ≥ n), the number ofdifferent samples is McClave: Statistics, 11th ed. Chapter 3: Probability

15. 3.1: Events, Sample Spaces and Probability • If a sample of 5 elements is drawn from a set of 20 elements, the number ofdifferent samples is McClave: Statistics, 11th ed. Chapter 3: Probability

16. 3.2: Unions and Intersections McClave: Statistics, 11th ed. Chapter 3: Probability

17. 3.2: Unions and Intersections McClave: Statistics, 11th ed. Chapter 3: Probability

18. 3.2: Unions and Intersections A A  C A B  C B C McClave: Statistics, 11th ed. Chapter 3: Probability

19. 3.3: Complementary Events • The complement of any event A is the event that A does not occur, AC. A: {Toss an even number} AC: {Toss an odd number} B: {Toss a number ≤ 3} BC: {Toss a number ≥ 4} A  B = {1,2,3,4,6} [A  B]C = {5} (Neither A nor B occur) McClave: Statistics, 11th ed. Chapter 3: Probability

20. 3.3: Complementary Events McClave: Statistics, 11th ed. Chapter 3: Probability

21. A: {At least one head on two coin flips} AC: {No heads} 3.3: Complementary Events McClave: Statistics, 11th ed. Chapter 3: Probability

22. 3.4: The Additive Rule and Mutually Exclusive Events • The probability of the union of events A and B is the sum of the probabilities of A and B minus the probability of the intersection of A and B: McClave: Statistics, 11th ed. Chapter 3: Probability

23. 3.4: The Additive Rule and Mutually Exclusive Events At a particular hospital, the probability of a patient having surgery (Event A) is .12, of an obstetric treatment (Event B) .16, and of both .02. What is the probability that a patient will have either treatment? McClave: Statistics, 11th ed. Chapter 3: Probability

24. 3.4: The Additive Rule and Mutually Exclusive Events • Events A and B are mutually exclusive if AB contains no sample points. McClave: Statistics, 11th ed. Chapter 3: Probability

25. 3.4: The Additive Rule and Mutually Exclusive Events If A and B are mutually exclusive, McClave: Statistics, 11th ed. Chapter 3: Probability

26. 3.5: Conditional Probability • Additional information or other events occurring may have an impact on the probability of an event. McClave: Statistics, 11th ed. Chapter 3: Probability

27. 3.5: Conditional Probability • Additional information may have an impact on the probability of an event. • P(Rolling a 6) is one-sixth (unconditionally). • If we know an even number was rolled, the probability of a 6 goes up to one-third. McClave: Statistics, 11th ed. Chapter 3: Probability

28. 3.5: Conditional Probability • The sample space is reduced to only the conditioning event. • To find P(A), once we know B has occurred (i.e., given B), we ignore BC (including the A region within BC). B BC A A McClave: Statistics, 11th ed. Chapter 3: Probability

29. 3.5: Conditional Probability B BC A A McClave: Statistics, 11th ed. Chapter 3: Probability

30. 3.5: Conditional Probability B A McClave: Statistics, 11th ed. Chapter 3: Probability

31. 3.5: Conditional Probability • 55% of sampled executives had cheated at golf (event A). • P(A) = .55 • 20% of sampled executives had cheated at golf and lied in business (event B). • P(A  B) = .20 • What is the probability that an executive had lied in business, given s/he had cheated in golf, P(B|A)? McClave: Statistics, 11th ed. Chapter 3: Probability

32. 3.5: Conditional Probability • P(A) = .55 • P(A  B) = .20 • What is P(B|A)? McClave: Statistics, 11th ed. Chapter 3: Probability

33. 3.6: The Multiplicative Rule and Independent Events • The conditional probability formula can be rearranged into the Multiplicative Rule of Probability to find joint probability. McClave: Statistics, 11th ed. Chapter 3: Probability

34. Assume three of ten workers give illegal deductions Event A: {First worker selected gives an illegal deduction} Event B: {Second worker selected gives an illegal deduction} P(A) = P(B) = .1 + .1 + .1 = .3 P(B|A) has only nine sample points, and two targeted workers, since we selected one of the targeted workers in the first round: P(B|A) = 1/9 + 1/9 = .11 + .11 = .22 The probability that both of the first two workers selected will have given illegal deductions P(AB) = P(B|A)P(A) = .(3) (.22) = .066 3.6: The Multiplicative Rule and Independent Events McClave: Statistics, 11th ed. Chapter 3: Probability

35. 3.6: The Multiplicative Rule and Independent Events McClave: Statistics, 11th ed. Chapter 3: Probability

36. 3.6: The Multiplicative Rule and Independent Events A Tree Diagram First selected worker Second selected worker McClave: Statistics, 11th ed. Chapter 3: Probability

37. Dependent Events P(A|B) ≠ P(A) P(B|A) ≠ P(B) Independent Events P(A|B) = P(A) P(B|A) = P(B)  Studying stats 40 hours per week Working 40 hours per week Having blue eyes 3.6: The Multiplicative Rule and Independent Events McClave: Statistics, 11th ed. Chapter 3: Probability

38. Dependent Events P(A|B) ≠ P(A) P(B|A) ≠ P(B) Independent Events P(A|B) = P(A) P(B|A) = P(B) Mutually exclusive events are dependent: P(B|A) = 0 Since P(B|A) = P(B), P(AB) = P(A)P(B|A) = P(A)P(B) 3.6: The Multiplicative Rule and Independent Events McClave: Statistics, 11th ed. Chapter 3: Probability

39. 3.7: Random Sampling • If n elements are selected from a population in such a way that every set of n elements in the population has an equal probability of being selected, the n elements are said to be a (simple) random sample. McClave: Statistics, 11th ed. Chapter 3: Probability

40. How many five-card poker hands can be dealt from a standard 52-card deck? Use the combination rule: 3.7: Random Sampling McClave: Statistics, 11th ed. Chapter 3: Probability

41. 3.7: Random Sampling • Random samples can be generated by • Mixing up the elements and drawing by hand, say, out of a hat (for small populations) • Random number generators • Random number tables • Table I, App. B • Random sample/number commands on software McClave: Statistics, 11th ed. Chapter 3: Probability

42. 3.8: Some Additional Counting Rules Situation Number of Different Results Multiplicative Rule • Draw one element from each of k sets, sized n1, n2, n3, … nk Permutations Rule • Draw n elements, arranged in a distinct order, from a set of N elements Partitions Rule • Partition N elements into k groups, sized n1, n2, n3, … nk(ni=N) McClave: Statistics, 11th ed. Chapter 3: Probability

43. 3.8: Some Additional Counting Rules • Multiplicative Rule Assume one professor from each of the six departments in a division will be selected for a special committee. The various departments have four, seven, six, eight, six and five professors eligible. How many different committees, X*, could be formed? McClave: Statistics, 11th ed. Chapter 3: Probability

44. 3.8: Some Additional Counting Rules • Permutations If there are eight horses entered in a race, how many different win, place and show possibilities are there? McClave: Statistics, 11th ed. Chapter 3: Probability

45. 3.8: Some Additional Counting Rules • Partitions Rule The technical director of a theatre has twenty stagehands. She needs eight electricians, ten carpenters and two props people. How many different allocations of stagehands, Y*, can there be? McClave: Statistics, 11th ed. Chapter 3: Probability

46. 3.8: Bayes’s Rule • Given k mutually exclusive and exhaustive events B1,B2,… Bk, and an observed event A, then McClave: Statistics, 11th ed. Chapter 3: Probability

47. 3.8: Bayes’s Rule • Suppose the events B1, B2, and B3, are mutually exclusive and complementary events with P(B1) = .2, P(B2) = .15 and P(B3) = .65. Another event A has these conditional probabilities: P(A|B1) = .4, P(A|B2) = .25 and P(A|B3) = .6. • What is P(B1|A)? McClave: Statistics, 11th ed. Chapter 3: Probability