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- Newsgroups: sci.math.stat
- Path: sparky!uunet!mcsun!fuug!anon
- From: an7855@anon.penet.fi
- Subject: Re: F distribution and relation to Beta
- Message-ID: <1993Jan23.205550.1671@fuug.fi>
- Sender: anon@fuug.fi (The Anon Administrator)
- Organization: Anonymous contact service
- X-Anonymously-To: sci.math.stat
- Date: Sat, 23 Jan 1993 20:41:00 GMT
- Lines: 71
-
- >
- > pddxt@chalk.cpceng.cpc.gmeds.com (Dino Triantos 575-4386) writes:
- >
- > >I'm working on a problem in Mood, Graybill and Boes that asks to find the
- > >relationship between the F and Beta distributions. The problem asks: If
- > >X has an F distribution with m and n degrees of freedom, show that
- > >
- > > mX/n
- > > W = ------- has a Beta distribution.
- > > 1 + mX/n
- >
- > >Any suggestions or solutions would be greatly appreciated!
- >
- > >Dinos Triantos
- > >GM/Midsize Automotive Division
- > >Vehicle Systems Analysis
- > >C-P-C Engr. Center Rm# G241
- > >Fax: (313) 575-7270
- > >E-mail: pddxt@cpceng.cpc.gmeds.com
- >
- > Is this a homework problem or will the solution to this
- > statistical issue help GM build better cars? The net has
- > informal prohibitions against providing answers to homework
- > problems. The problem you raise is a very standard homework
- > assignment in undergraduate statistics classes. When I did it as
- > a homework problem many years ago I remember that it was a bit
- > easier to do it as W = 1/(1+(m/n)F). It won't help you solve it,
- > but a useful insight is that W is often known as R^2. Good luck!
- >
-
- What rock did this respondent crawl out from under of?
-
- [I've carefully removed his identity from his response.
- I'm more concerned with what he represent that who he is.]
-
- Here we have an individual working in industry who has a statistics
- question and some clown decides to disgrace the profession by going beyond
- even stereotypical behavior to insult the client (Is this a homework
- problem or will the solution to this statistical issue help GM build
- better cars?) and provide some helpful misinformation (When I did it as a
- homework problem many years ago I remember that it was a bit easier to do
- it as W = 1/(1+(m/n)F). Put the two together and you've got intellectual
- bullying (or incompentence, depending on the reason for the
- misinformation) at its worst. And no one bothers to take the respondent
- to task!
-
- I've never posted to this group because of my anger at the amount of
- abuse and misinformation that gets passed out. I've prefered to send my
- advice by private e-mail and take part in a real dialogue with my
- "clients". But I've just decided I have no further interest in even
- lurking.
-
- Wouldn't it have been nice if Mr. Triantos had learned that
- statisticians were only too happy to help those who were eager and willing
- to learn? Why not merely have told him
-
- "The only trick to this problem is that there's no trick! It's
- straightforward. Just find X in terms of W,
- X = (n/m) (W/(1-W)), and don't forget the Jacobian!
- Also, check the region over which the density is positive. It's trivial
- here but it's important, especially in more than one dimension where even
- "great men" have screwed up calculating marginal densities by using the
- wrong limits of integration."
-
- Of course, it's too late to tell him now. If I were he, I'd be
- long gone. As it is, *I'm* gone after this posting.
-
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