where does the x go? Taking log on both sides we get,ΣIn (L(a = 2, B)) =-2n·In(B)+ In Ex,Now partially differentiating on both sides with respect to ß and equating to zero we get,8 In (L(a = 2, ß))SBEx,2n= 02n2CommentStep 5 of 5 AHence the maximum likelihood estimator of ß is

Taking log on both sides we get, In (L(a = 2, B)) =-2n·In (B)+ In Ex, Now partially differentiating on both sides with respect to B and equating to zero we get, 8 In (L(a = 2, B)) SB 2n = 0 2n 2 Comment Step 5 of 5 A Hence the maximum likelihood estimator of ß is 2

Taking log on both sides we get, In (L(a = 2, B)) =-2n·In (B)+ In Ex, Now partially differentiating on both sides with respect to B and equating to zero we get, 8 In (L(a = 2, B)) SB 2n = 0 2n 2 Comment Step 5 of 5 A Hence the maximum likelihood estimator of ß is 2

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter10: Sequences, Series, And Probability

Section10.8: Probability

Problem 22E

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Question

where does the x go?

Taking log on both sides we get,
Σ
In (L(a = 2, B)) =-2n·In(B)+ In Ex,
Now partially differentiating on both sides with respect to ß and equating to zero we get,
8 In (L(a = 2, ß))
SB
Ex,
2n
= 0
2n
2
Comment
Step 5 of 5 A
Hence the maximum likelihood estimator of ß is

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