Answer to Question #173569 in Operations Research for ANJU JAYACHANDRAN

Question #173569

4. (a) A television repairman finds that the time spent on his jobs has an exponential

distribution with a mean of 30 minutes. If he repairs sets in the order in which they

come in, and if arrival of sets follows a Poission distribution approximately with an

average rate of 10 per 8 hours day, what is the repairman’s expected idle time each

day, How many jobs are ahead of the average set just brought in?

Expert's answer

Here"\\lambda=\\frac{10}{8\u00d760}=\\frac{1}{48}set per minute"

But "\\mu=\\frac{1}{30} set\/minute"

Prob.that their is no unit in the system P_O=1-"\\frac{\\lambda}{\\mu}"

="1-\\frac{5}{8}=\\frac{3}{8}"

Repairmans's expected idle time in 8 hours a day:

=nP_O="8\u00d7\\frac{3}{8}" =3hours

Expected average n.o. of jobs or average n.o.of Tv sets in the system

L_S="\\frac{\\lambda}{\\mu-\\lambda}"

But "\\mu-\\lambda"

="\\frac{1}{30}-\\frac{1}{48}=\\frac{1}{80}"

Substuting into the formula

"=\\frac {1}{48}\u00d7\\frac{80}{1}=\\frac{5}{3}jobs"

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