A university department maintains an emergency computer repair shop. History shows that broken computers arrive for repair randomly, but with average rates that depend on the number of computers that are already in the shop. The average arrival rates are shown 4. below: no. computers already in the shop 0 1 2 3 4 average arrival rate (no. per day) 54 4 3 | 0 The technician in the shop can repair computers at an average rate of 4 computers per day. However, whenever there are 3 or more computers in the shop for repair, an extra technician is used, and this doubles the average rate of computer repair to 8 computers per day. a) What is the probability that an extra technician is used? b) What is the expected number of computers in the shop awaiting service? c) The policy of using the extra technician was introduced because the shop wishes to return computers to users within a half-day of the computers arrival in the shop, on average. What is the average amount of time that a computer is in the shop? Does the shop achieve its goal of returning computers to the users in a half-day or less?
A university department maintains an emergency computer repair shop. History shows that broken computers arrive for repair randomly, but with average rates that depend on the number of computers that are already in the shop. The average arrival rates are shown 4. below: no. computers already in the shop 0 1 2 3 4 average arrival rate (no. per day) 54 4 3 | 0 The technician in the shop can repair computers at an average rate of 4 computers per day. However, whenever there are 3 or more computers in the shop for repair, an extra technician is used, and this doubles the average rate of computer repair to 8 computers per day. a) What is the probability that an extra technician is used? b) What is the expected number of computers in the shop awaiting service? c) The policy of using the extra technician was introduced because the shop wishes to return computers to users within a half-day of the computers arrival in the shop, on average. What is the average amount of time that a computer is in the shop? Does the shop achieve its goal of returning computers to the users in a half-day or less?
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter10: Sequences, Series, And Probability
Section10.8: Probability
Problem 32E
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