Please show all work, will rate immediately ?? Customers arrive at a supermarket according to a...
Customers arrive at a bank according to a Poisson process having a rate of 2.42 customers per hour. Suppose we begin observing the bank at some point in time. What is the probability that 3 customers arrive in the first 1.8 hours? Customers arrive at a bank according to a Poisson process having a rate of 2.3 customers per hour. Suppose we begin observing the bank at some point in time. What is the expected value of the number of...
Customers arrive at bank according to a Poisson process with rate 20 customers per hour. The bank lobby has enough space for 10 customers. When the lobby is full, an arriving customers goes to another branch and is lost. The bank manager assigns one teller to customer service as long as the number of customers in the lobby is 3 or less. She assigns two tellers if the number is more than 3 but less than 8. Otherwise she assigns...
Customers arrive at a service facility with one server according to a Poisson process with a rate of 5 per hour. The service time are i.i.d. exponential r.v.´s, and on the average, the server can serve 7 customers per hour. Suppose that the system is in the stationary regime. (a) What is the probability that at a particular time moment, there will be no queue? (b) What is the probability that a particular time moment, there will be more than...
customers are arriving to a shop according to Poisson process with mean 6.6 customers/hour. What is the probability that exactly 3 customers will arrive next hour?
3. Customers arrive at the drive-through lane of a fast food restaurant at a rate of one every 3 minutes. Use the Poisson probability distribution to answer the following (12 Marks) a. What is the expected number of customers in one hour? b. What is the probability that exactly two customers arriving at the drive-through lane in a nine-minutes interval? c. What is the probability that less than two customers arrive at the drive through lane a nine-minutes interval? d....
Customers are arriving to a shop according to Poisson process with mean 3 customers/hour. What is the probability that only 5 customers will arrive next two hours?
roblem Consider a single server queueing system where the customers arrive according to a Poisson process with a mean rate of 18 per hour, and the service time follows an exponential distribution with a mean of 3 minutes. (1). What is the probability that there are more than 3 customers in the system? (2). Compute L, Lq and L, (3). Compute W, W and W (4). Suppose that the mean arrival rate is 21 instead of 18, what is the...
4. Suppose that spectators arrive to a baseball game according to a Poisson process with a rate of 10 per minute. If a spectator wears a baseball jersey with probability 1, what is the probability that no spectator wearing a baseball jersey will arrive during the first four minutes?
4. Suppose that spectators arrive to a baseball game according to a Poisson process with a rate of 10 per minute. If a spectator wears a baseball jersey with probability 1,...
Customers arrive at a service facility according to a Poisson process of rate 5/hour. Let N(t) be the number of customers that have arrived up to time t (t hours) a. What is the probability that there is at least 2 customer walked in 30 mins? b. If there was no customer in the first 30 minutes, what is the probability that you have to wait in total of more than 1 hours for the 1st customer to show up?...
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Cars pass an interaction according to a Poisson process with rate X = 2 per minute. There are only 2 types of cars, and each passing car is, independently, with probability 0.4 and 0.6, of type A and type B, respectively. During a 2-minutes time period, there are 2 type A cars have passed the interaction. Find the probability that the first type A car passed during the first minute and the second type A...