Question

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To put

from the distribution with Let X, X,....,x,, be a random sample of size probability density function fx(x) = fx(x;e) - (0-1)2 bar x>1. >1. To answer this question, enter you answer as a formula. In addition to the usual guidelines, two more instructions for this problem only : write ) as single variable p and as m. and these can be used as inuts of functions as usual variables e.g log(P), m^2, ex etc. Remember p represents the product of is only, but will not work for the product of any function of I 1. Find the maximum likelihood estimator of 8 (2n)(2"log(P)) + 1 Submit Answer Incorrect. Tries 2/5 Previous Tries 2. Suppose O>2. Find the Method of moms estimator of O. Use the sqrt(x) formula for square root. (2sqrt(p) - 1)/(sqrt(p) - 1) Submit Answer Incorrect. Tries 2/5 Previous Tries Post Discussion Send Feedback Type here to search 30 F2

Answer 1

Lt X, X, ..X pIp be a pandom sample of size n with (8- ac x>,6)1 TT)P ane iver 1. The lilefperfunc on Le) )- T (0-a is 2n (0-1) (8-1 Tdar P & Heace a likelihis LeAoL (,0) . In dale-)ho dax -,lop 2n + 0 de 2n 2 n Tnp + hap 2 n - =0 2n ep <0 (6-1) Hence muximizes, L 30 MLE is Finsren7 Rap

E Jef.0da 2 I - (0J X 자랑.1 1-0 Irpak 2-A dx 2- 6 2-6 (e-Aax 2-6 1-0 2-6 2-e 2 e (8-) ox 2-6 100 2-0 e-7 efe-) 2-0 1 (2-0) 2-0 2 0-1 6- 2-0) 2-6 A-L t, by me thad of moment 6-1 2 e-1 E(x) = -2 A 2 the pesitive se root is considered m-21m Vm-) 21m-1 2m-1 8 = Hente he metad of moment est mator is - (2 pt ())/t))