39. Consider an M/G/1 system in which the first customer in a busy period has the service...
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39. Consider an M/G/1 system in which the first customer in a busy period has the service distribution G1 and all others have distribution G2. Let C denote the number of customers in a busy period, and let S denote the service time of a customer chosen at random.
Argue that
(a) a0 = P0 = 1 − λE[S].
(b) E[S] = a0E[S1] + (1 − a0)E[S2] where Si has distribution Gi.
(c) Use
(a) and
(b) to show that E[B], the expected length of a busy period, is given by E[B] =
E[S1]
1 − λE[S2]
(d) Find E[C].
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