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Practice

Practice. Which is more likely: at least one ace with 4 throws of a fair die or at least one double ace in 24 throws of two fair dice? This is known as DeMere's problem, named after Chevalier De Mere. Blaise Pascal later solved this problem. Binomial Distribution. p = .482 of zero aces

isaiah-wooten
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Practice

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  1. Practice • Which is more likely: at least one ace with 4 throws of a fair die or at least one double ace in 24 throws of two fair dice? This is known as DeMere's problem, named after Chevalier De Mere. • Blaise Pascal later solved this problem.

  2. Binomial Distribution p = .482 of zero aces 1 - .482 = .518 at least one ace will occur

  3. Binomial Distribution p = .508 of zero double aces 1 - .508 = .492 at least one double ace will occur

  4. Practice • Which is more likely: at least one ace with 4 throws of a fair die or at least one double ace in 24 throws of two fair dice? This is known as DeMere's problem, named after Chevalier De Mere. • More likely at least one ace with 4 throws will occur

  5. Example • You give 100 random students a questionnaire designed to measure attitudes toward living in dormitories • Scores range from 1 to 7 • (1 = unfavorable; 4 = neutral; 7 = favorable) • You wonder if the mean score of the population is different then 4

  6. Hypothesis • Alternative hypothesis • H1: sample = 4 • In other words, the population mean will be different than 4

  7. Hypothesis • Alternative hypothesis • H1: sample = 4 • Null hypothesis • H0: sample = 4 • In other words, the population mean will not be different than 4

  8. Results • N = 100 • X = 4.51 • s = 1.94 • Notice, your sample mean is consistent with H1, but you must determine if this difference is simply due to chance

  9. Results • N = 100 • X = 4.51 • s = 1.94 • To determine if this difference is due to chance you must calculate an observed t value

  10. Observed t-value tobs = (X - ) / Sx

  11. Observed t-value tobs = (X - ) / Sx • This will test if the null hypothesis H0:  sample = 4 is true • The bigger the tobs the more likely that H1:  sample = 4 is true

  12. Observed t-value tobs = (X - ) / Sx Sx = S / N

  13. Observed t-value tobs = (X - ) / .194 .194 = 1.94/ 100

  14. Observed t-value tobs = (4.51 – 4.0) / .194

  15. Observed t-value 2.63 = (4.51 – 4.0) / .194

  16. t distribution

  17. t distribution tobs = 2.63

  18. t distribution tobs = 2.63 Next, must determine if this t value happened due to chance or if represent a real difference in means. Usually, we want to be 95% certain.

  19. t critical • To find out how big the tobs must be to be significantly different than 0 you find a tcrit value. • Calculate df = N - 1 • Page 747 • First Column are df • Look at an alpha of .05 with two-tails

  20. t distribution tobs = 2.63

  21. t distribution tcrit = -1.98 tcrit = 1.98 tobs = 2.63

  22. t distribution tcrit = -1.98 tcrit = 1.98 tobs = 2.63

  23. t distribution tcrit = -1.98 tcrit = 1.98 tobs = 2.63 If tobs fall in critical area reject the null hypothesis Reject H0:  sample = 4

  24. t distribution tcrit = -1.98 tcrit = 1.98 tobs = 2.63 If tobs does not fall in critical area do not reject the null hypothesis Do not reject H0:  sample = 4

  25. Decision • Since tobs falls in the critical region we reject Ho and accept H1 • It is statistically significant, students ratings of the dorms is different than 4. • p < .05

  26. Example • You wonder if the average IQ score of students at Villanova significantly different (at alpha = .05)than the average IQ of the population (which is 100). You sample the students in this room. • N = 54 • X = 130 • s = 18.4

  27. The Steps • Try to always follow these steps!

  28. Step 1: Write out Hypotheses • Alternative hypothesis • H1: sample = 100 • Null hypothesis • H0: sample = 100

  29. Step 2: Calculate the Critical t • N = 54 • df = 53 •  = .05 • tcrit = 2.0

  30. Step 3: Draw Critical Region tcrit = -2.00 tcrit = 2.00

  31. Step 4: Calculate t observed tobs = (X - ) / Sx

  32. Step 4: Calculate t observed tobs = (X - ) / Sx Sx = S / N

  33. Step 4: Calculate t observed tobs = (X - ) / Sx 2.5 = 18.4 / 54

  34. Step 4: Calculate t observed tobs = (X - ) / Sx 12 = (130 - 100) / 2.5 2.5 = 18.4 / 54

  35. Step 5: See if tobs falls in the critical region tcrit = -2.00 tcrit = 2.00

  36. Step 5: See if tobs falls in the critical region tcrit = -2.00 tcrit = 2.00 tobs = 12

  37. Step 6: Decision • If tobs falls in the critical region: • Reject H0, and accept H1 • If tobs does not fall in the critical region: • Fail to reject H0

  38. Step 7: Put answer into words • We reject H0 and accept H1. • The average IQ of students at Villanova is statistically different ( = .05) than the average IQ of the population.

  39. Practice • You recently finished giving 5 of your friends the MMPI paranoia measure. Is your friends average average paranoia score significantly ( = .10) different than the average paranoia of the population ( = 56.1)?

  40. Scores

  41. Step 1: Write out Hypotheses • Alternative hypothesis • H1: sample = 56.1 • Null hypothesis • H0: sample = 56.1

  42. Step 2: Calculate the Critical t • N = 5 • df =4 •  = .10 • tcrit = 2.132

  43. Step 3: Draw Critical Region tcrit = -2.132 tcrit = 2.132

  44. Step 4: Calculate t observed tobs = (X - ) / Sx -.48 = (55.2 - 56.1) / 1.88 1.88 = 4.21/ 5

  45. Step 5: See if tobs falls in the critical region tcrit = -2.132 tcrit = 2.132 tobs = -.48

  46. Step 6: Decision • If tobs falls in the critical region: • Reject H0, and accept H1 • If tobs does not fall in the critical region: • Fail to reject H0

  47. Step 7: Put answer into words • We fail to reject H0 • The average paranoia of your friends is not statistically different ( = .10) than the average paranoia of the population.

  48. SPSS

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