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5-discrete dis-1.ppt
- 1. Chapter 5 Discrete Distributions Prepared By: Janvi Joshi 5-1
- 2. Discrete vs Continuous Distributions • Random Variable -- a variable which contains the outcomes of a chance experiment • Discrete Random Variable -- the set of all possible values is at most a finite or a countable infinite number of possible values. • This will produce value that are nonnegative whole numbers – Randomly selecting 25 people who consume soft drinks & determining how many people prefer diet soft drinks – Determining the number of defects in a batch of 50 items – Counting the number of people who arrive at store during a five minute period. Prepared By: Janvi Joshi 5-2
- 3. • Continuous Random Variable -- takes on values at every point over a given interval. – It is normally generated from time, height, weight & volume. • Elapsed time between arrivals of bank customers • Percent of the labor force that is unemployed Prepared By: Janvi Joshi 5-3
- 4. Some Special Distributions • Discrete – Binomial – Poisson – hypergeometric • Continuous – normal – uniform – exponential – t – chi-square – F Prepared By: Janvi Joshi 5-4
- 5. Requirements for a Discrete Probability Function • Probabilities are between 0 and 1, inclusively • Total of all probabilities equals 1 Prepared By: Janvi Joshi 5-5 P X ( ) over all x 1 X all for 1 ) ( 0 X P
- 6. Requirements for a Discrete Probability Function -- Examples Prepared By: Janvi Joshi 5-6 X P(X) -1 0 1 2 3 .1 .2 .4 .2 .1 1.0 X P(X) -1 0 1 2 3 -.1 .3 .4 .3 .1 1.0 X P(X) -1 0 1 2 3 .1 .3 .4 .3 .1 1.2 VALID NOT VALID NOT VALID
- 7. µ = ∑ (Xi * P(Xi)) where µ is the long run average, Xi = the ith outcome • Var(Xi) = ∑ ((Xi – m)2* P(Xi)) • Standard Deviation is computed by taking the square root of the variance Prepared By: Janvi Joshi 5-7
- 8. Discrete Distribution -- Example Prepared By: Janvi Joshi 5-8 0 1 2 3 4 5 0.37 0.31 0.18 0.09 0.04 0.01 Number of Crises Probability Distribution of Daily Crises 0 0.1 0.2 0.3 0.4 0.5 0 1 2 3 4 5 P r o b a b i l i t y Number of Crises Find out mean, variance & Standard deviation for given example
- 9. Mean of the Crises Data Example Prepared By: Janvi Joshi 5-9 m E X X P X ( ) . 115 0 0.1 0.2 0.3 0.4 0.5 0 1 2 3 4 5 P r o b a b i l i t y Number of Crises X P(X) XP(X) 0 .37 .00 1 .31 .31 2 .18 .36 3 .09 .27 4 .04 .16 5 .01 .05 1.15
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- 11. Binomial Distribution • A binomial experiment exhibits the following four properties 1. The experiment consists of a sequence of n identical trials 2. Two outcome possible on each trials. one as success & the other as a failure 3. The probability of success , denoted by p & not change from trial to trial. The probability of a failure denoted by 1-p 4. Trials are independent. Prepared By: Janvi Joshi 5-11
- 12. Binomial Distribution • Probability function • Mean value • Variance and standard deviation Prepared By: Janvi Joshi 5-12 P X n X n X X n X n X p q ( ) ! ! ! for 0 m n p 2 2 n p q n p q
- 13. According to the U.S. Census Bureau, approximately 6% of all workers in Jackson, are unemployed. In conducting a random telephone survey in Jackson, what is the probability of getting two or fewer unemployed workers in a sample of 20?find out variance & SD for same. Binomial Distribution: Demonstration Problem 5.3 5-13 Prepared By: Janvi Joshi
- 14. Binomial Distribution: Demonstration Problem 5.3 • In this example, – 6% are unemployed => p – The sample size is 20 => n – 94% are employed => q – X is the number of successes desired – What is the probability of getting 2 or fewer unemployed workers in the sample of 20? => P(X≤2) 5-14 Prepared By: Janvi Joshi
- 15. Binomial Distribution: Demonstration Problem 5.3 Prepared By: Janvi Joshi 5-15 n p q P X P X P X P X 20 06 94 2 0 1 2 2901 3703 2246 8850 . . ( ) ( ) ( ) ( ) . . . . P X ( ) )! ( )( )(. ) . . . 0 20! 0!(20 0 1 1 2901 2901 0 20 0 06 94 P X ( ) !( )! ( )(. )(. ) . . . 1 20! 1 20 1 20 06 3086 3703 1 20 1 06 94 P X ( ) !( )! ( )(. )(. ) . . . 2 20! 2 20 2 190 0036 3283 2246 2 20 2 06 94
- 16. Prepared By: Janvi Joshi 5-16 n = 20 PROBABILITY X 0.1 0.2 0.3 0.4 0 0.122 0.012 0.001 0.000 1 0.270 0.058 0.007 0.000 2 0.285 0.137 0.028 0.003 3 0.190 0.205 0.072 0.012 4 0.090 0.218 0.130 0.035 5 0.032 0.175 0.179 0.075 6 0.009 0.109 0.192 0.124 7 0.002 0.055 0.164 0.166 8 0.000 0.022 0.114 0.180 9 0.000 0.007 0.065 0.160 10 0.000 0.002 0.031 0.117 11 0.000 0.000 0.012 0.071 12 0.000 0.000 0.004 0.035 13 0.000 0.000 0.001 0.015 14 0.000 0.000 0.000 0.005 15 0.000 0.000 0.000 0.001 16 0.000 0.000 0.000 0.000 17 0.000 0.000 0.000 0.000 18 0.000 0.000 0.000 0.000 19 0.000 0.000 0.000 0.000 20 0.000 0.000 0.000 0.000 n p P X C 20 40 10 01171 20 10 10 10 40 60 . ( ) . . .
- 17. Prepared By: Janvi Joshi 5-17 Ex:5.5 Ex:5.6
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- 21. Ex: 5.9 What is the first big change that American drivers made due to higher gas prices? According to an Access America survey, 30% said that it was cutting recreational driving. However, 27% said that it was consolidating or reducing errands. If these figures are true for all American drivers, and if 15 such drivers are randomly sampled and asked what is the first big change they made due to higher gas prices, a. What is the probability that exactly 6 said that it was consolidating or reducing errands? b. What is the probability that none of them said that it was cutting recreational driving? c. what is the probability that more than 9 said that it was cutting recreational driving? 5-21 Prepared By: Janvi Joshi
- 22. Poisson Distribution • Describes discrete occurrences over a continuum or interval • It is normally used to to describe the number of random arrival per some time interval. • Each occurrence is independent any other occurrences. • The number of occurrences in each interval can vary from zero to infinity. • Ex: Binomial dis: To determine prob of number of US made cars for repair if take 20 samples. • Ex: Poisson distribution: A number of cars randomly arriving for repair facility during 10min intervals. Prepared By: Janvi Joshi 5-22
- 23. Poisson Distribution • Probability function Prepared By: Janvi Joshi 5-23 P X X X where long run average e X e ( ) ! , , , ,... : . ... for (the base of natural logarithms ) 0 1 2 3 2 718282
- 24. • Suppose bank customers arrive randomly on weekday afternoons at an average of 3.2 customers every 4 mins. What is the probability of exactly 5 customers arriving in a 4- minute interval on a weekday afternoon? Prepared By: Janvi Joshi 5-24
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- 26. Poisson Distribution: Demonstration Problem 5.8 Prepared By: Janvi Joshi 5-26 0528 . 0 ! 10 = ) 10 = ( ! = P(X) minutes 8 customers/ 4 . 6 = Adjusted minutes 8 customers/ 10 = X minutes 4 customers/ 2 . 3 4 . 6 10 X 6.4 e e X P X
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- 28. Poisson Approximation of the Binomial Distribution • Binomial probabilities are difficult to calculate when n is large. • Under certain conditions binomial probabilities may be approximated by Poisson probabilities. • Poisson approximation Prepared By: Janvi Joshi 5-28 If and the approximation is acceptable . n n p 20 7, Use n p.
- 29. • n = 50 and p = .03. What is the probability that x = 4? That is, P(x = 4, n = 50 and p = .03) = ? Prepared By: Janvi Joshi 5-29
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- 31. Hypergeometric Distribution • Sampling without replacement from a finite population • The number of objects in the population is denoted N. • Each trial has exactly two possible outcomes, success and failure. • Trials are not independent • X is the number of successes in the n trials • The binomial is an acceptable approximation, if n < 5% N. Otherwise it is not. Prepared By: Janvi Joshi 5-31
- 32. Hypergeometric Distribution • Probability function – N is population size – n is sample size – A is number of successes in population – x is number of successes in sample Prepared By: Janvi Joshi 5-32 P x C C C A x N A n x N n ( )
- 33. • Twenty-four people, of whom eight are women, apply for a job. If five of the applicants are sampled randomly, what is the probability that exactly three of those sampled are women? Prepared By: Janvi Joshi 5-33
- 34. • Catalog Age lists the top 17 U.S. firms in annual catalog sales. Dell Computer is number one followed by IBM and W.W. Grainger. Of the 17 firms on the list, 8 are in some type of computer-related business. Suppose five firms are randomly selected. a. What is the probability that none of the firms is in some type of computer-related business? b. What is the probability that all five firms are in some type of computer-related business? c. What is the probability that exactly three are in non- computer-related business? Prepared By: Janvi Joshi 5-34
- 35. • A western city has 19 police officers eligible for promotion. Ten of the 19 are Hispanic. Suppose only five of the police officers are chosen for promotion and that one is Hispanic. If the officers chosen for promotion had been selected by chance alone, what is the probability that one or fewer of the five promoted officers would have been Hispanic? Prepared By: Janvi Joshi 5-35