Answered step by step
Verified Expert Solution
Link Copied!

Question

1 Approved Answer

Mary (M) and John (J) together run a small insurance agency. Customer calls arrive as a Poisson process of rate 1 call/hour. An arriving customer

Mary (M) and John (J) together run a small insurance agency. Customer calls arrive as a Poisson process of rate 1 call/hour. An arriving customer call is taken for service only if both Mary and John are free, because they need to work together on each call that they take. Processing of a customer consists of John's service time (collecting the information from the customer) and Mary's service time (checking customer background). John's service time is exponentially distributed with mean 1 hours. Mary's service time is exponentially distributed with mean 2/3 hours. J and M service times are independent. J and M start serving each call simultaneously, work independently in parallel, and the call service is done when both J and M are done with their services. Any call arriving when another call is being served (i.e., when either J or M are still serving it) is blocked (lost). Suppose this "system" runs non-stop for a long time. In the long-run, what is the average rate at which calls are actually taken for service?

Step by Step Solution

There are 3 Steps involved in it

Step: 1

blur-text-image

Get Instant Access to Expert-Tailored Solutions

See step-by-step solutions with expert insights and AI powered tools for academic success

Step: 2

blur-text-image

Step: 3

blur-text-image

Ace Your Homework with AI

Get the answers you need in no time with our AI-driven, step-by-step assistance

Get Started

Recommended Textbook for

Complex Variables and Applications

Authors: James Brown, Ruel Churchill

8th edition

73051942, 978-0073051949

More Books

Students also viewed these Mathematics questions