expected value of a pdf

Identity · 2009-11-22 20:58:01

If we're given a probability density function

, ,

Why is it when we calculate the expected value, we get an undefined expression:

When obviously from the graph, it should be at x = 0?

Also, for an even graph (symmetric about the y-axis), should

all be at x = 0?

Thanks

bobbym · 2009-11-22 22:23:26

Hi identity;

I think this is the reason:

The antiderivative is:

So to do the definite integral you would end up subtracting 2 infinities. That is why the integral is undefined.

Last edited by bobbym (2009-11-22 22:29:11)

gckc123 · 2009-11-22 22:24:28

the distribution you stated is called Cauchy distribution.
Wikipedia has a very good explanation for why the mean is undefined.

http://en.wikipedia.org/wiki/Cauchy_distribution

Read the section "Explanation of undefined moments"

Cheers

gckc123 · 2009-11-22 22:26:09

One of a very interesting property of Cauchy distribution is that the mode and median is 0.
But the mean is undefined.

Apparently intuition fails you here(!!) You have to look at the definition of expectation.

Cheers

Last edited by gckc123 (2009-11-22 22:32:15)

Identity · 2009-11-23 12:27:53

Thanks bobbym and gckc123,

I was asking because I had a similar probability density function which I thought had an expected value of infinity, but it turns out it was my calculator's fault that it was coming out as undefined!

But yeah, Cauchy distribution is quite counterintuitive... I was always taught that an even graph will have its mean at the middle.

Last edited by Identity (2009-11-23 12:30:42)

Math Is Fun Forum

#1 2009-11-22 20:58:01

expected value of a pdf

#2 2009-11-22 22:23:26

Re: expected value of a pdf

#3 2009-11-22 22:24:28

Re: expected value of a pdf

#4 2009-11-22 22:26:09

Re: expected value of a pdf

#5 2009-11-23 12:27:53

Re: expected value of a pdf

Board footer