One of the earliest applications of the Poisson distribution was in analyzing incoming calls to a telephone switchboard. Analysts generally believe that random phone calls are Poisson distributed. Suppose phone calls to a switchboard arrive at an average rate of 2.4 calls per minute.a.If an operator wants to take a one-minute break, what is the probability that there will be no calls during a one-minute interval?b.If an operator can handle at most five calls per minute, what is the probability that the operator will be unable to handle the calls in any one-minute period?c.What is the probability that exactly three calls will arrive in a two-minute interval?d.What is the probability that one or fewer calls will arrive in a 15-second interval?
a.P(x= 0 | λ = 2.4) =
b.P(x> 5 | λ = 2.4) =
c.P(x= 3 | λ = 4.8) =
d.P(x≤ 1 | λ = 0.6) =
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