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Distributionshard
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A zero-truncated Poisson distribution has the probability mass function P(X=k)=λke−λk!(1−e−λ)P(X = k) = \frac{\lambda^k e^{-\lambda}}{k! (1 - e^{-\lambda})}P(X=k)=k!(1−e−λ)λke−λ​ for k∈{1,2,3,… }k \in \{1, 2, 3, \dots\}k∈{1,2,3,…}, where λ>0\lambda > 0λ>0. If the expected value of this distribution is exactly 222, determine the value of λ+2e−λ\lambda + 2 e^{-\lambda}λ+2e−λ.