Date: Mar 20, 2013 6:25 AM
Author: JT
Subject: Re: Is there any webpage or math program that can write fracitons,<br> numbers into bijective enumeration?
On 20 mar, 10:46, 1treePetrifiedForestLane <Space...@hotmail.com>

wrote:

> what is the canonical digital representation

> for base-one accounting?

>

> (inductive proof .-)

>

>

>

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>

>

>

> > I don't think anyone is interested (I'm certainly not).

Accounting you mean counting? You ask me what counting is? It is a

collection of discrete entities ranging from first to last member (inf

is not member of any set).

The first member in counting numbers in is generally one or 1, unless

you do not adhere to some headless infinity working collective.

Below you can see sets? of discrete natural items and the summation of

members that make up a set of countable naturals, as you see they

range from first to last since their countable and they are the reason

numbers have comparable magnitudes, 1 is the base unit of math it does

have a comparable magnitude, you can cut it to make fractions, count

it to make sets with comparable magnitudes. The whole idea of

numberline is wrong since 1 do not have any geometric properties/

attributes. It does have a magnitude though since it is divisible into

fractions, the cuts from fractions also have magnitudes that

comparable to 1. Partitioning into bases is a principle with geometric

properties, but base one have no other projection than counting from

the first to the last discrete member making up a natural number.

1={1}

2={1,1}

3={1,1,1}

4={1,1,1,1}

5={1,1,1,1,1}

6={1,1,1,1,1,1}

7={1,1,1,1,1,1,1}

8={1,1,1,1,1,1,1,1}

9={1,1,1,1,1,1,1,1,1}

A={1,1,1,1,1,1,1,1,1,1}