The Poisson Probability Distribution Skill 27
Objectives Use the Poisson distribution to compute the probability of the occurrence of events spread out over time or space. Use the Poisson distribution to approximate the binomial distribution when the number of trials is large and the probability of success is small.
Poisson Probability Distribution If we examine the binomial distribution as the number of trials n gets larger and larger while the probability of success p gets smaller and smaller, we obtain the Poisson distribution. The Poisson distribution applies to accident rates, arrival times, defect rates, the occurrence of bacteria in the air, and many other areas of everyday life.
Poisson Probability Distribution As with the binomial distribution, we assume only two outcomes: A particular event occurs (success) or does not occur (failure) during the specified time period or space. We are interested in computing the probability of r occurrences in the given time period, space, volume, or specified interval.
r = number of successes λ = mean number of successes over an interval
Example–Poisson Distribution Pyramid Lake is located in Nevada on the Paiute Indian Reservation. 8-to-10-pound trout are not uncommon, and 12-to-15-pound trophies are taken each season. The following information was given about the November catch for boat fishermen. Total fish per hour = 0.667 Suppose you decide to fish Pyramid Lake for 7 hours during the month of November.
Example–Poisson Distribution Use the information provided to find a probability distribution for r, the number of fish (of all sizes) you catch in a period of 7 hours. Solution: For fish of all sizes, Mean success rate per hour is 0.667. = 0.667/1 hour
Example–Solution Since we want to study a 7-hour interval Rounded value; = 4.7 for a 7-hour period.
Example–Solution Since r is the number of successes (fish caught) in the corresponding 7-hour period and = 4.7 for this period, use the Poisson distribution to get,
Example–Poisson Distribution What is the probability that in 7 hours you will get 0, 1, 2, or 3 fish of any size? Solution:
Example–Poisson Distribution What is the probability that you will get four or more fish in the 7-hour fishing period? Solution: P (r 4) = P(4) + P(5) + … = 1 – P(0) – P(1) – P(2) – P(3) 1 – 0.01 – 0.04 – 0.10 – 0.16 = 0.69 There is about a 69% chance that you will catch four or more fish in a 7-hour period.
Example–Poisson Distribution The average number of homes sold by the Acme Realty Company is 2 homes per day. What is the probability that exactly 3 homes will be sold tomorrow? Solution: r = 3 λ = 2 There is about a 18.04% chance that the Acme Realty Company will sell exactly three homes tomorrow.
Example–Poisson Distribution Suppose the average number of lions seen on a 1-day safari is five. What is the probability that tourists will see fewer than four lions on the next 1-day safari? Solution: λ = 5 r < 4 P(0) = .0067 P(1) = .0337 P(2) = .0842 P(3) = .1404 There is about a 26.5% chance that a tourist will see fewer than four lions on the next 1-day safari.
Example–Poisson Distribution Suppose the average number of lions seen on a 1-day safari is five. What is the probability that tourists will see more than four lions on the next 1-day safari? Solution: λ = 5 and r > 4 P(r > 4) = 1 – [P(0) + P(1) + P(2) + P(3) + P(4)] P(0) = .0067; P(1) = .0337; P(2) = .0842; and P(3) = .1404 P(4) = .1755 P(r > 4) = 1 – [.4405] P(r > 4) = .5595 There is about a 55.95% chance that a tourist will see fewer than four lions on the next 1-day safari.
Example–Poisson Distribution On a particular river, overflow floods occur once every 100 years on average. You are a historian studying the river, calculate the probability of the river overflowing more than three times in a 200-year period. Solution: λ = 1/100yrs Need to find average in 200 years. λ = 2/200yrs r > 3 times P(r > 3) = 1 – [P(0) + P(1) + P(2) + P(3)]
Example–Poisson Distribution P(r > 3) = 1 – [P(0) + P(1) + P(2) + P(3)] P(0) = .1353 P(1) = .2707 P(2) = .2707 P(3) = .1804 P(r > 3) = 1 – [.8571] P(r > 3) = .1429 There is about a 14.29% chance that the river will overflow more than three times in a 200-year period.
27: Poisson Probability Distribution Summarize Notes Homework Worksheet Quiz