Date: Mar 21, 2013 5:52 AM
Author: JT
Subject: Re: Is there any webpage or math program that can write fracitons,<br> numbers into bijective enumeration?
On 20 mar, 11:25, JT <jonas.thornv...@gmail.com> wrote:

> On 20 mar, 10:46, 1treePetrifiedForestLane <Space...@hotmail.com>

> wrote:

>

> > what is the canonical digital representation

> > for base-one accounting?

>

> > (inductive proof .-)

>

> > > 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}

Ternary NyaN format

1=1 {1}

2=2 {1,1}

3=3 {1,1,1}

4=11 3+1 {1,1,1}+{1}

5=12 3+2 {1,1,1}+{1,1}

6=13 3+3 {1,1,1}+{1,1,1}

7=21 6+1 {1,1,1,1,1,1}+{1}

8=22 6+2 {1,1,1,1,1,1}+{1,1}

9=23 6+3 {1,1,1,1,1,1}+{1,1,1}

10=31 9+1 {1,1,1,1,1,1,1,1,1}+{1}

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