Re: Hi, I would like to solve for f(x)
- From: Jeffrey Lyons <not-me@xxxxxxxxxx>
- Date: Sun, 28 Aug 2005 13:07:30 -0400
On 26 Aug 2005 08:20:38 -0700, "Puppet_Sock" <puppet_sock@xxxxxxxxxxx>
wrote:
As stated previously f(x) can _NOT_ (by definition of the stated
problem) be a function of P. So anything like f(x) = F(x) / (x+P)
is out.
>Jeffrey Lyons wrote:
>> Hi, I would like to solve for f(x) when we know that
>> integrating (x + P) f(x) from P to Infinity over x equals 1.
>>
>> Any assistance wor poiinters would be appreciated.
>
>Consider
>
>f(x) = F(x) / (x+P)
>
>and then you've got
>
>integral{P,infinity} F(x) dx = 1
>
>and there's lots of such functions.
>Socks
.
- References:
- Hi, I would like to solve for f(x)
- From: Jeffrey Lyons
- Re: Hi, I would like to solve for f(x)
- From: Puppet_Sock
- Hi, I would like to solve for f(x)
- Prev by Date: Visualizing a measure zero cover of the rationals
- Next by Date: Re: ISO prime factorization algorithm for n <= 10^10
- Previous by thread: Re: Hi, I would like to solve for f(x)
- Next by thread: Some cute series.
- Index(es):
Relevant Pages
|
