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Buses arrive at a stop according to a Poisson process (N t ) t0 with rate . The arrival times are denoted by (S n

Buses arrive at a stop according to a Poisson process (Nt)t0 with rate . The arrival times are denoted by (Sn)n1. Every morning you arrive at the bus stop at a fixed time t > 0. Therefore, SNt is the time when the last bus passes before your arrival at the stop, and SNt+1 will be the time when you board the next bus.

You have a neighbour who is a bit magical: each day he manages to catch the bus just before yours.

(a) Argue that Vt = SNt+1 t, your waiting time for your bus, follows an exponential distribution with rate parameter .

(b) (i) By conditioning on Nt , find the cumulative distribution function of SNt , the departure time of your neighbour.

(ii) Show that E(SNt ) = t 1/ + 1 /( e t) .

(c) Calculate E(SNt+1 SNt ), the average time your neighbour departs ahead of you.

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