Suppose we stay up late to watch a meteor shower from 11am to 3am. Suppose meteors...

The Geminids is an annual meteor shower that appears every December. Under a clear, dark sky,...

The Geminids is an annual meteor shower that appears every December. Under a clear, dark sky, an observer of the Geminids would see an average of 20 meteors per 10-minute period (if the meteors’ emanation point were directly overhead). It’s December and you host a Geminids party on the peak night of the meteor shower. The sky is clear and dark, and the meteors’ emanation point is directly overhead. You and your friends watch the sky for 10 minutes. The...

13. A customer service center receives a wide variety of calls for a manufacturer, but 0.09...

13. A customer service center receives a wide variety of calls for a manufacturer, but 0.09 of these calls are warranty claims. Assume that all calls are independent and that the probability of each call being a warranty claim is 0.09. Let X denote the number of warranty claims received in the first 16 calls. Find the expected value of X. QUESTION 14 Customers arrive at a bank according to a Poisson process having a rate of 2.42 customers per...

Suppose that Airplanes are coming into an Airfield at an average rate 4 per hour according...

Suppose that Airplanes are coming into an Airfield at an average rate 4 per hour according to a Poisson process. We start to account the Airplanes from 3:00 (pm). (a) What is the probability that the third Airplanes takes more that 2 hours to arrive? (b) What is the expected time the third Airplanes arrive to the station? (c) What is the probability that three Airplanes arrive between 3:00pm-4:00pm? (d) What is the probability that no buses arrive between 3:00pm-5:00pm?

Suppose that buses are coming into a station at an average rate 4 per hour according...

Suppose that buses are coming into a station at an average rate 4 per hour according to a Poisson process. We start to account the buses from 1:00 (pm). (a) What is the probability that no buses arrive between 1:00pm-2:00pm? (b) What is the probability that three buses arrive between 1:00pm-3:00pm? (c) What is the probability that the third bus takes more that 3 hours to arrive? (d) What is the expected time the third bus arrive to the station?

Suppose passengers arrive at a MARTA station between 10am-5pm following a Poisson process with rate λ=...

Suppose passengers arrive at a MARTA station between 10am-5pm following a Poisson process with rate λ= 60 per hour. For notation, let N(t) be the number of passengers arrived in the first t hours, S0= 0 , Sn be the arrival time of the nth passenger, Xn be the interrarrival time between the (n−1)st and nth passenger. a. What is the probability that ten passengers arrive between 2pm and 4pm given that no customer arrive in the first half hour?...

It is the question on the text book but has no solution to it. Suppose trees...

It is the question on the text book but has no solution to it. Suppose trees in a forest are distributed according to a Poisson process. Let X be the distance from an arbitrary starting point to the nearest tree. The average number of trees per square metre is lambda". Derive f(x) the same way we derived the Exponential probability density function. You are now using the Poisson distribution in two dimensions (area) rather than one dimension (time). I am...

The number of delegates that arrives at a day-long business conference during a major snowstorm follows...

The number of delegates that arrives at a day-long business conference during a major snowstorm follows a POISSON process with a rate of 2 delegates every 10 minutes. a) Solve for the probability that at least three delegates arrive at the conference in the next 1/2 hour. b) Suppose the conference runs from 9 am to 6 pm, what is the expected # of delegates that will arrive during that timeframe? What is the variance of the expected # of...

Suppose that the customers arrive at a hamburger stand at an average rate of 49 per...

Suppose that the customers arrive at a hamburger stand at an average rate of 49 per hour, and the arrivals follow a Poisson distribution. Joe, the stand owner, works alone and takes an average of 0.857 minutes to serve one customer. Assume that the service time is exponentially distributed. a) What is the average number of people waiting in queue and in the system? (2 points) b) What is the average time that a customer spends waiting in the queue...

1. Willow Brook National Bank operates a drive-up teller window that allows customers to complete bank...

1. Willow Brook National Bank operates a drive-up teller window that allows customers to complete bank transactions without getting out of their cars. On weekday mornings, arrivals to the drive-up teller window occur at random, with an arrival rate of 6 customers per hour or 0.1 customers per minute. Also assume that the service times for the drive-up teller follow an exponential probability distribution with a service rate of 54 customers per hour, or 0.9 customers per minute. Determine the...

From “Just-In-Time” delivery and inventory control in a warehouse, to customer service at a call center,...

From “Just-In-Time” delivery and inventory control in a warehouse, to customer service at a call center, to line management at Disneyland, sometimes knowing how many customers you have is not as important to know how fast they are piling up. In this Project you will need to collect real world data, use it to build a model, and then use that model to assess a second set of data that you will also collect. First you need to decide what...