IITK sports facility has $4$ tennis courts. Players arrive at the courts at a Poisson rate of one pair per $10$ min and use a court for an exponentially distributed time with mean $40$ min. Suppose that a pair of players arrives and finds all courts busy and $k$ other pairs waiting in queue. How long will they have to wait to get a court on the average?
Poisson Process - Courts
5
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statistics
stochastic-processes