Question

7. Let X1, X2, ..., Xn be i.i.d. random variables drawn from a N(u,0%). Show that the Sample Variance (52) and the Maximum Likelihood Estimator (S) of o2 are both Consistent Estimators for o?. S2 27=2(X-X)2 and S 21-2(X;-) n-1 n (n-1)S Hint: has a Chi-Square Distr. with (n − 1) degrees of freedom. E(x{n-1)) = n-1,V(xin-1)) = 2(n − 1)

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Answer 1

estimator For T Conditions to be consistent of o are :- o as n iy E(T) iiy vlt) o no d Ž (xi-x)² I cxi-x)? n. n-1 n-1 n n-l Note; (n-1). S² 02 naudu -- E Ingl. 62 2) ni, Els") =n-1 02 1 28 & El82) = on Now; (n-1).5² Latina - Van ( 15-14-) = 2(n-1) (n-11 . Var (3") = 2 (n-1) Var (3²) 204 n-l As nyo; Var (3²) Oas nonno

consistent . Hence, it g2 in estimator of s² si (x,-F)? n-1 n.(n-1) Ž (xi-x)² n izi n-1 af n. 5,² - (n-1).s² We know; Bom (n-1):52 Xini n.s, 2 ~xn M n-1 nos, Eln = n-) 62 R-1 o² -> El,") = = (1-12). 02 As no ; o : E18,2) = ²4 ∞ (

زم؟ Var n-1).& Var (X2) = 2 (n-1) Now; n. 8,² = (nol).s² Var (a) = 2 (n-1) 2 n Var (13) = 2(n-1) => Var (8) 2 (n-1).04 n2 an -).04. As na no UR and 1 - 0 1 2 » so; Var (12) o n. and E (8,2) o² Hence; s2 is also consistent estimator no of 2