Traffic on I-787 in Troy, NY, follows a Poisson process with a rate 2/3’s of a...

Vehicles pass Holborn Station during weekdays at randomly at an average rate of 300 per hour....

Vehicles pass Holborn Station during weekdays at randomly at an average rate of 300 per hour. Give two reasons why we should use a Poisson distribution to describe this process. Find the probability that no vehicle passes in one minute. Find the probability of at least three vehicles pass in ten minutes. What is the expected number of vehicles passing in three minutes? In a 5-minute interval, find the probability that the number of cars passing is within one standard...

Traffic on Rosedale Road in Princeton, NJ, follows a Poisson process with rate 6 cars per...

Traffic on Rosedale Road in Princeton, NJ, follows a Poisson process with rate 6 cars per minute. A deer runs out of the woods and tries to cross the road. It takes the deer a random time (independent of everything else), uniformly distributed between 2 and 5 seconds, to cross the road. If there is a car passing while the deer is on the road, it will hit the deer with portability 2/3 (independent of everything else). Find the probability...

The number of traffic accidents in a certain area follows a Poisson process with a rate...

The number of traffic accidents in a certain area follows a Poisson process with a rate of 1.5 per hour between 8:00 A.M. and 5:00 P.M. during the normal working hours in a working day. Compute the following probabilities. There will be no traffic accident between 11:30 AM to 12:00 PM. There will be more than 3 traffic accidents after 3:45 P.M. There will be in between 15 and 18 traffic accident during the normal working hours in a working...

The number of hits to a website follows a Poisson process. Hits occur at the rate...

The number of hits to a website follows a Poisson process. Hits occur at the rate of 2.9 per minute between​ 7:00 P.M. and 11​:00 P.M. Given below are three scenarios for the number of hits to the website. Compute the probability of each scenario between 8 : 44 P.M. and 8​:46 P.M. Interpret each result. ​(a) exactly six ​(b) fewer than six ​(c) at least six

Suppose small aircraft arrive at a certain airport according to a Poisson process at a rate...

Suppose small aircraft arrive at a certain airport according to a Poisson process at a rate α=8 per hour. (a) What is the probability that exactly 6 small aircraft arrive during a 1-hour period? (2 pts) (b) What are the expected value and standard deviation of the number of small aircraft that arrive during a 90 minute period? (3 pts) (c) What is the probability that at least 5 aircraft arrive during a 2.5 hour period? (5 pts)

A student receiving texts can be modeled as a Poisson process at a rate of 3...

A student receiving texts can be modeled as a Poisson process at a rate of 3 per hour. a) What is the probability that the student receives 2 or more texts in the next 30 minutes? b) Given that the student received 3 texts in the last 10 minutes, what is the probability that the next text will arrive within 15 minutes? c) Among a group of 10 students, what is the probability that at least 2 will receive at...

2. The arrival of insurance claims follows a Poisson distribution with a rate of 7.6 claims...

2. The arrival of insurance claims follows a Poisson distribution with a rate of 7.6 claims per hour. a) Find the probability that there are no claims during 10 minutes. (10) b) Find the probability that there are at least two claims during 30 minutes. (10) c) Find the probability that there are no more than one claim during 15 minutes. (10) d) Find the expected number of claims during a period of 2 hours. (5)

2. The arrival of insurance claims follows a Poisson distribution with a rate of 7.6 claims...

2. The arrival of insurance claims follows a Poisson distribution with a rate of 7.6 claims per hour. a) Find the probability that there are no claims during 10 minutes. b) Find the probability that there are at least two claims during 30 minutes. c) Find the probability that there are no more than one claim during 15 minutes. d) Find the expected number of claims during a period of 2 hours. (5)

The number of hits to a website follows a Poisson process. Hits occur at the rate...

The number of hits to a website follows a Poisson process. Hits occur at the rate of 1.0 per minute between​ 7:00 P.M. and 12​:00 P.M. Given below are three scenarios for the number of hits to the website. Compute the probability of each scenario between 7 : 29 P.M. and 7​:34 P.M. Interpret each result. ​(a) exactly eight ​ (b) fewer than eight ​ (c) at least eight ​ (a)​ P(8​)=___ ​(Round to four decimal places as​ needed.)

The number of hits to a website follows a Poisson process. Hits occur at the rate...

The number of hits to a website follows a Poisson process. Hits occur at the rate of 1.8 per minute between​ 7:00 P.M. and 9​:00 P.M. Given below are three scenarios for the number of hits to the website. Compute the probability of each scenario between 7 : 43 P.M. and 7​:48 P.M. Interpret each result. ​(a) exactly eight ​( b) fewer than eight ​ (c) at least eight ​ (a)​ P(8​) =______ ​(Round to four decimal places as​ needed.)...