Answer to Question #243372 in Economics of Enterprise for Detch

Question #243372

Let X1 , X2 , ⋯, XN be a random sample of size n from normal

distribution with mean µ and variance σ 2 . a). Find the maximum

likelihood estimator of σ 2  2 . (2 points) b). Find the

asymptotic distribution of the maximum likelihood estimator of σ 2

 2 obtained in part (a).

Expert's answer

(a)"variance \\space v=v(\\Sigma \\frac{xi}{n})=\\frac{1}{n^{2}}\\Sigma v(xi)=\\frac{n}{n^{2}}\u03c3^{2}=\\frac{\u03c3^{2}}{n}"

therefore the likelihood estimator will be

"\u03c3^{2}=s^{2} \\frac{n}{n-1}=\\frac{\\Sigma (xi-x)^{2}}{n-1}"

s²=constant estimator

(b)The sample median estimator of the median Xn corresponding to p = 0.5, Xn is a then a normal distribution with parameters µ and σ2.

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