For fixed k, the variables \(\displaystyle{\left({2}{k}+{1}\right)}\hat{{{f}}}_{{k}}{\left(\lambda\right)}\) are

Alessandra Carrillo

Alessandra Carrillo

Answered question

2022-04-07

For fixed k, the variables (2k+1)f^k(λ) are asymptotically distributed according the Gamma distribution with shape parameter 2k+1 and mean (2k+1)fX(λ). It turns out that this suggests a confidence interval of the form
((4k+2)f^k(λ)χ{4k+2,1α}2,(4k+2)f^k(λ)χ{4k+2,α}2)
where χ{k,α}2 the α-quantile of the chi-square distribution with k degrees of freedom.
To show that this interval is asymptotically of level 12α

Answer & Explanation

Marin Lowe

Marin Lowe

Beginner2022-04-08Added 18 answers

Step 1
The mean of Γ(α,β) equals to
αβ=2k+1β=(2k+1)fX(λ)  β=1fX(λ).
Rewrite your statement as
(2k+1),f^k(λ)xdΓ(2k+1,1fX(λ)).
Use the PDF of Γ(α,β)
fY(x)=dβαΓ(α)xα1eβx,,x>0
and check that the multiplying YΓ(α,β) by c>0 results in changing β to βc only: cYΓ(α,βc)
So, in order to get asymptotically chi-squared distribution
χ4k+22=Γ(2k+1,12),
divide original estimator
(2k+1)f^k(λ) by fX(λ) and multiply by 2:
2(2k+1),f^k(λ)fX(λ)xdΓ(2k+1,12)=χ4k+22.
((4k+2)f^k(λ)χ4k+2,1α2fX(λ)(4k+2)f^k(λ)χ4k+2,α2)=
=(χ4k+2,α2(4k+2)f^k(λ)fX(λ)dχ4k+22χ4k+2,1α2)12α

Do you have a similar question?

Recalculate according to your conditions!

New Questions in College Statistics

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?

Product

Company

Connect with us

Get Plainmath App

Plainmath Logo

E-mail us: [email protected]

Our Service is useful for:

Plainmath is a platform aimed to help users to understand how to solve math problems by providing accumulated knowledge on different topics and accessible examples.

2023 Plainmath. All rights reserved