If I understand what you're asking: A digital recording of "Gone With
The Wind", say on a CD, is recorded in bits, binary digits, 1's and
0's. You can also express pi in binary, it's simply the base-2
representation of pi, all 1's and 0's, just like the movie recording.
So you have an infinite sequence of 0's and 1's which is the
representation of pi in which to search for the finite sequence of the
From: John M <[EMAIL PROTECTED]>
Sent: Fri, 31 Mar 2006 12:59:20 -0800 (PST)
Subject: Re: The Riemann Zeta Pythagorean TOE
may I humblly ask for an example, HOW you would
imagine the 'sequence' in pi's infinite variety of
numbers the connotation for "Gone With The Wind - the
Just 'per apices', show the kind of sequence included,
I don't want all the details.
--- [EMAIL PROTECTED] wrote:
> Interesting! This reminds me of the old standby
> example of being able to
> find any sequence of digits in the digits of pi, and
> therefore being able to
> find whole digital "recordings" of "Gone With The
> Wind" or anything you desire,
> including your-whole-life-as-you-desire-it-to-be, if
> you search long enough.
> ;) But that's the key, in my view. It requires
> desiring, searching and
> finding. That requires a person. Similarly, it
> requires a person to combine
> addition and multiplication. This is because it
> requires a person to think of
> grouping things. This is because it takes a person
> to define meaning.
> "An equation for me has no meaning unless it
> expresses a thought of God."
> "Ask and it will be given to you, seek and you will
> find, knock and the door
> will be opened to you." Jesus
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