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Distributionshard
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Let Xn∼Binomial(n,pn)X_n \sim \text{Binomial}(n, p_n)Xn​∼Binomial(n,pn​) where pn=λn+o(1n)p_n = \frac{\lambda}{n} + o\left(\frac{1}{n}\right)pn​=nλ​+o(n1​) as n→∞n \to \inftyn→∞. Let Yn=2XnY_n = 2 X_nYn​=2Xn​. What is the probability generating function GY(s)=E[sY]G_Y(s) = E[s^Y]GY​(s)=E[sY] of the limiting distribution of YnY_nYn​ as n→∞n \to \inftyn→∞?