Question

1. Let X1, X2,...,X, be a random sample from each of the distributions having the to lowing pdfs or pmfs: (a) f(x; 0) = 6"e-/x!, r = 0,1,2, ..., 0< < oo, zero elsewhere, where f(0,0) = 1. (b) f(2; 6) = 0.00-110,1)(2), 0 <O< 0o. (c) f(x; 6) = (1/0)e-1/10,00) (2), 0 <$<. (d) f(x; 0) = e-(2-) 110,00) (2), - < < . • For each case, find the ML estimator ômle of 0; • For each case, find the MM estimator @mm of e. . For the cases of (a), (b) and (c), obtain the Fisher information in the sample.

Answer 1

Sol.1 (270) LC1:0). 6C scứ :0) = o {si no re Tosci ! BlogL no 103 tot - Eu lego) gloob - Eri - J1092 0 =) n na on @moe Ed = ī ro ③ Method of Mement : mis E Cal=0 ô=en= mi= m Fischen Information or csson Caption = - 10 = = TO

MLE i- fax:o)- DE ocx<1 من سے ہ ےہ LCX:C), Bcn:0) = on. Qog (ni) Yog L = n logo + (O- slotte til boy ( ) doslo - lograd) Momeul Method of M = E(*): 0.22 S Scanned with one intervention CamScanner

| Fischen Information (1o):- .- EC2² L + n Io-E(S.2) = COMLE :- | 8c49) * 1(2:0) 60) = - os : con (2:0): (wiro) . Tegl - an logo slogL + Ene Soko 3) in die Ená =ă Moment - A method of en = F(x)= @ cs sand Oasis = = Searner

Fished information C Ip) :- Io = -( )+ 2 months to Arriola e nos o s uc oo -LOC - Erůtno - Lorio) = -(-o) π log L =- Eri tno slogL_ n we need to manimize L. L will be mau num if (Eritno) is minima and at happens when oth as min. => ÔMLE = X(1) first ordered statistic Scanned with CamScanner

mm: -(-o), M-O - t mi= Ecal = (ne drz it peredeti to e et -1 A li-= min omn 5-1 Fischer Informalton (Ig):- I loob = 0 10=-E (120) = 1 ds Scanned with CamScanner