* The average number of computers waiting for adjustment.
* The average number being adjusted.
* The average number of computers not in working order.

2. At the start of the football season, the ticket office gets very busy the day before the first game. Customers arrive at the rate of 4 every 10 minutes, and the average time to transact business is 2 minutes. What is the average number of people in line? What is the average time that a person will spend at the ticket office? What proportion of time is the server busy?

3. A car wash is open 6 days a week, bit its busiest day is always Saturday. From historical data, it is estimated that dirty cars arrive at the rate of 20 per hour all day Saturday. With a full crew working the hand-wash line, it is figured that cars can be cleaned at the rate of one every 2 minutes. One car at a time is cleaned. Assuming Poisson arrivals and exponential service times, what is the average number of cars in line? What is the average time that a car waits before it is washed? What is the average time that a car spends in the service system. What is the utilization rate of the car wash? What is the probability that no cars are in the system?