Question

1. Consider a random sample of size n from a population with probability density function: х fx(x,0) = e 02 exig for x >0,0 >0. (a) Find the Cramer-Rao lower bound for the variance of an unbiased estimator of (b) Find the methods of moment estimator for @ and verifies that it attains the lower bound

Answer 1

Complete solution for the problem can be found in the images below with all the necessary steps.
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Let X, X2,-- Xn be random sample of from f (x) - ne -X1Q size I to OYO بیا Mo variance Cramer Rao Lower bound for of an unbiased estimator of is Inco) In (0) = fisher Information in the whole sample

information in one sample 4. ICO) .2 oz In (0) = n. I (0) XY -samples. a ? log fx (x: 0) log fx (,0) = 22 (log in e 10] 22 ( -zlog Otologx - 2) ) -xlo ә 02 202 ә9 2o = 2 ta o 20 2 zu 02 03 = E/ ::.-EL + 2n 22 202 log (fx (2. (7,0)) 타는 03 2 E(X) 2 o 3 02 E(x) = x² 10 dre - lx 20 dor El (3) (6) 3

I (0) = 2x2 o 2 3 02 I (0) 4 2 X, 2 oz 82 . INCO) = 2n 'C-hol-B Jor variance unbiased estimator is 20 02 Tus for any usonbined estimato on : TL% of o. van (T(X) 71 2n G M.O.M (method of moment) estimatoon ford E(x) = 20 27 El ²) = 0 ) ☺ a2 ΣΧ: MOM 2

Lexi is. 2n izi method of moments estimator of o. van como C mos 4n? iti I var ( [x;) Ivan(xi) za 42 [:xi's are ms] independent) a n-Van (81) 4n2 van (x) yn Now I X's are identical var/X)= E(X3) - Elx.)]* = E(x, y) = 40? Ex2 = (19) 2010 x3 e du 2 Q 2 O? 0.4 31 20² 0 = 3 = 602 Var (x1) = 60 ² 402= 22 = varlx, 2 20 un un Hence 0 attains CCR-L-B for unbioned estimator your o. van Cônom-) 2n. mom