Option 2 is correct: 4.43
The average number of customers in line at each server is - 4.43
At each server, the average no. of customer who is in line is 4.43 customers.
13 customers per hr per In a three server three separatelines form, cach line handled by...
In a three server set-up, three separate lines form, each line handled by an individual server. The average arrival rate for each server is 11 customers/hr, while the average service rate = 13 customers/per hr/per server. What is the approximate average number of customers in line at each server? (Use 'Multiple Servers, Ave. #in Line' Table). 4.43 a. 4.13 3 a. 4.82
In a three server set-up, three separate lines form, each line handled by an individual server. The average arrival rate for each server is 11 customers/hr, while the average service rate - 13 customers/per helper server. What is the approximate average number of customers in line at each server? Use Multiple Servers. Ave #in Line' Tablel a. 4.43 482
customers arrive at an average of 30 per hour. A single server in the store serves customers, taking 1.5 minutes on average to serve each customer. Inter-arrival times and service times follow the exponential distribution. What is the expected fraction of time that the server will be busy? On average, how many people will there be in the store? On average, how long will someone be in the store? What is the probability that there will be more than 2...
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...
For an infinite-source, single server system with an arrival rate of 15 customers per hour (Poisson) and service time of 2 minutes per customer (exponential), the average number waiting in line to be served is: a. 0.1 b. 0.133 c. 0.50 d.0.250
Problem 3: Assume that a single-server queueing system has a Poisson interarrival process with a rate of 10 customers per hour. Also, assume that the service time is exponential with at a rate of 12 customers per hour. Answer the following questions to 3 significant digits: a) What is the expected utilization of the server? b) What is the log-run time average of number of customers in the system? c) Using Little's law, use the answer from part (b) to calculate the average waiting...
1. A waiting line problem has an average of 80 arrivals per eight hour day. Suppose there is a single server and the average service time is 8 minutes. The average service rate is a) 8 per minute. b) 8 minutes. c) 10 per day. d) 10 per hour. e) 24 per hour f) none of the above. 2. A waiting line problem has an average of 80 arrivals per hour. Suppose each server can serve one customer every 4...
QUESTIONS For MM: GD queuing system with 2 servers of service rate =40 customers per hour per server and arrival ratei - 45 customers per hour, on the verge, how long in minutes) does a customer wait in line round off to 2 decimal digits) QUESTION 10 A small branch bank has two teller, one for deposits and one fow withdrawals Cistomers arrivent arch teller's window with an average rate of 20 customers per hour. The total customer anivartes per...
Please fill in all question marks!!!! Problem 15-25 (Algorithmic) Burger Dome sells hamburgers, cheeseburgers, French fries, soft drinks, and milk shakes, as well as a limited number of specialty items and dessert selections. Although Burger Dome would like to serve each customer immediately, at times more customers arrive than can be handled by the Burger Dome food service staff. Thus, customers wait in line to place and receive their orders. Suppose that Burger Dome analyzed data on customer arrivals and...
Please answer using stochastic operations principles Cars arrive at a rate of 10 per hour in a single-server drive-in restaurant. Assume that the teller serves vehicles with a rate exponentially distributed with a mean of 4 minutes per car (ie, a rate of 1 car every 4 minutes). Answer the following questions: (a) What is the probability that the teller is idle? (b) What is the average number of cars waiting in line for the teller? (A car that is...