Login

Welcome, Guest. Please login or register.

March 29, 2024, 07:11:44 pm

Author Topic: Mathematics - a new basis  (Read 33158 times)  Share 

0 Members and 1 Guest are viewing this topic.

ms.srki

  • Non-Student
  • Trailblazer
  • *
  • Posts: 42
  • Respect: 0
Mathematics - a new basis
« on: January 22, 2013, 04:20:10 am »
0
See a picture that represents the relations of the two triangles

https://docs.google.com/file/d/0BzkWG0xdRpPYVjFwZmotdThHV0E/edit

what is a "?"
3?3=3
3?3=4
3?3=5
3?3=6
3?3=7
3?3=8
3?3=9
3?3=10
3?3=12
« Last Edit: January 22, 2013, 01:56:21 pm by pi »

ms.srki

  • Non-Student
  • Trailblazer
  • *
  • Posts: 42
  • Respect: 0
Re: Mathematics - a new basis
« Reply #1 on: January 24, 2013, 04:10:47 am »
0
there is no solution in the current mathematics :
1.3+[0]3=3
2.3+[1]3=4
3.3+[2]3=5
4.3+[3]3=6 or 3+3=6
5.33Rd1(6)d2(7)+3=7
6.33Rd1(6)d2(8 )+3=8
7.33Rd1(6)d2(9)+3=9
8.33Rd1(6)d2(10)+3=10
9.33Rd1(6)d2(12)+3=12
(1,2,3,4) - there are several types of addition in the set N
(5,6,7,8,9) - that there are dynamic numbers, where this can add

ms.srki

  • Non-Student
  • Trailblazer
  • *
  • Posts: 42
  • Respect: 0
Re: Mathematics - a new basis
« Reply #2 on: January 28, 2013, 01:11:57 am »
0
1 Mathematics Space
We'll tell mathematical space with two initial geometric object that can not
prove.
1.Natural geometric object - natural along .
2.Real geometric objects - real alongs .
1.1 Natural along
In the picture there is a natural geometric object along (AB), it has a beginning (A)
and end (B) - this property natural long'll call point.

www1.png

1.2 The basic rule
Two (more) natural longer are connected only with points.

Mao

  • CH41RMN
  • Honorary Moderator
  • Great Wonder of ATAR Notes
  • *******
  • Posts: 9181
  • Respect: +390
  • School: Kambrya College
  • School Grad Year: 2008
Re: Mathematics - a new basis
« Reply #3 on: January 28, 2013, 02:20:23 am »
+16
This is great. Please, I must hear more about this new basis.
Editor for ATARNotes Chemistry study guides.

VCE 2008 | Monash BSc (Chem., Appl. Math.) 2009-2011 | UoM BScHon (Chem.) 2012 | UoM PhD (Chem.) 2013-2015

ms.srki

  • Non-Student
  • Trailblazer
  • *
  • Posts: 42
  • Respect: 0
Re: Mathematics - a new basis
« Reply #4 on: January 29, 2013, 01:23:42 am »
0
This is great. Please, I must hear more about this new basis.
go to the first proof, teaches

2 Natural Mathematics
2.1,along , one-way infinite along the (semi-line) "1"
"1"-from any previous evidence (axioms), a new proof
Theorem-Two (more) natural longer merge points in the direction of the first AB
longer natural.

EVIDENCE - Natural long (AB, BC) are connected - we get along AC.

www2.png

Natural long (AB, BC, CD) are connected - we get along AD.

www3.png

Natural long (AB, BC, CD, DE) are connected - we get along AE.

www4.png
...

Natural long (AB, BC, CD, DE, ...) are connected - getting the sim-
measurement along the infinite.

www5.png


...
« Last Edit: January 29, 2013, 08:58:12 pm by ms.srki »

BubbleWrapMan

  • Teacher
  • Part of the furniture
  • *
  • Posts: 1110
  • Respect: +97
Re: Mathematics - a new basis
« Reply #5 on: January 29, 2013, 03:00:32 am »
+8
Tim Koussas -- Co-author of ExamPro Mathematical Methods and Specialist Mathematics Study Guides, editor for the Further Mathematics Study Guide.

Current PhD student at La Trobe University.

TrueTears

  • TT
  • Honorary Moderator
  • Great Wonder of ATAR Notes
  • *******
  • Posts: 16363
  • Respect: +667
Re: Mathematics - a new basis
« Reply #6 on: January 29, 2013, 04:11:09 am »
+2
ok.
PhD @ MIT (Economics).

Interested in asset pricing, econometrics, and social choice theory.

alondouek

  • Subject Review God
  • Honorary Moderator
  • ATAR Notes Superstar
  • *******
  • Posts: 2903
  • Oh to be a Gooner!
  • Respect: +316
  • School: Leibler Yavneh College
  • School Grad Year: 2012
Re: Mathematics - a new basis
« Reply #7 on: January 29, 2013, 09:20:27 am »
0
[size=200]2 Natural Mathematics [/size]


Size 200? Nope.
2013-2016
Majoring in Genetics and Developmental Biology

2012 ATAR: 96.55
English [48] Biology [40]

Need a driving instructor? Mobility Driving School

Mao

  • CH41RMN
  • Honorary Moderator
  • Great Wonder of ATAR Notes
  • *******
  • Posts: 9181
  • Respect: +390
  • School: Kambrya College
  • School Grad Year: 2008
Re: Mathematics - a new basis
« Reply #8 on: January 29, 2013, 03:18:43 pm »
0
Okay, fine. But I have a question. When two natural alongs intersect, how do they triangulate, and what becomes the natural longer?
Editor for ATARNotes Chemistry study guides.

VCE 2008 | Monash BSc (Chem., Appl. Math.) 2009-2011 | UoM BScHon (Chem.) 2012 | UoM PhD (Chem.) 2013-2015

ms.srki

  • Non-Student
  • Trailblazer
  • *
  • Posts: 42
  • Respect: 0
Re: Mathematics - a new basis
« Reply #9 on: January 29, 2013, 09:12:09 pm »
0
Okay, fine. But I have a question. When two natural alongs intersect, how do they triangulate, and what becomes the natural longer?
1.2 The basic rule
Two (more) natural longer are connected only with points.
- This rule exists because it prevents other connections -
duž (serbian word)- google translation - along , longer (depending on the other words in the translation)
...........
Google translator
2.2 Numeral along, numeric point "2.1"
Theorem-character mark points on the one-way infinite
long (A, B, C, ...), replace the labels {(0), (0.1), ..., (0,1,2,3,4,5,6,7,8,9 ), ...}
which are set circular and positionally.

Proof - is obtained by numerical along which the numerical point of {(0,00,000,
0000, ...), (​​0,1,10,11,100,101, ...), ..., (0,1,2,3,4,5,6,7,8,9,10,11, 12, ...), ...}.

www6.png
« Last Edit: January 29, 2013, 09:14:53 pm by ms.srki »

alondouek

  • Subject Review God
  • Honorary Moderator
  • ATAR Notes Superstar
  • *******
  • Posts: 2903
  • Oh to be a Gooner!
  • Respect: +316
  • School: Leibler Yavneh College
  • School Grad Year: 2012
Re: Mathematics - a new basis
« Reply #10 on: January 29, 2013, 09:23:45 pm »
+1
duž (noun) = 'straight line'.


But yes this still makes no sense to me.
2013-2016
Majoring in Genetics and Developmental Biology

2012 ATAR: 96.55
English [48] Biology [40]

Need a driving instructor? Mobility Driving School

e^1

  • Victorian
  • Forum Obsessive
  • ***
  • Posts: 222
  • Respect: +25
Re: Mathematics - a new basis
« Reply #11 on: January 29, 2013, 09:31:45 pm »
0
May I ask, where are you getting this from?

But yes this still makes no sense to me.

Second that.
« Last Edit: January 31, 2013, 10:34:34 pm by e^1 »

ms.srki

  • Non-Student
  • Trailblazer
  • *
  • Posts: 42
  • Respect: 0
Re: Mathematics - a new basis
« Reply #12 on: January 31, 2013, 01:10:02 am »
0
2.3 Natural numbers "2.2"
Theorem - There is a relationship (length) between  Point in numeric (0) and
all points along the numerical.

Proof - Value (length) numeric point (0) and numerical point (0)
the number 0

www7.png

Ratio (length) numeric point (0) and the numerical point of (1) the number o1

www8.png

Ratio (required) numeric point (0) and numeric item (2) is the number 2

www9.png

Ratio (length) numeric point (0) and the numerical point of (3) is the number 3

www10png

Ratio (length) numeric point (0) and the numerical point of (4) is the number 4

https://docs.google.com/file/d/0BzkWG0xdRpPYTUFvWnNUcXdUSkk/edit
...
Set - all the possibilities given theorem.
The set of natural numbers N = {0,1,2,3,4,5,6,7,8,9,10,11,12, ...}.

ms.srki

  • Non-Student
  • Trailblazer
  • *
  • Posts: 42
  • Respect: 0
Re: Mathematics - a new basis
« Reply #13 on: January 31, 2013, 10:25:53 pm »
0
2.4 Mobile Number "2.2,2.3"
Theorem-Natural numbers can be specified and other numerical
point other than the point numeric 0th
Proof - Value (length) numeric point (0) and numeric point (2)
the number 2

w12.png

Ratio (length) numerical point (1) and the numerical point of (3) is the number 2

w13.png

Ratio (length)  numerical point (2) and the numerical point of (4) is the number 2


w14.png
...
A set of mobile numbers Nn = {[n]N}

TrueTears

  • TT
  • Honorary Moderator
  • Great Wonder of ATAR Notes
  • *******
  • Posts: 16363
  • Respect: +667
Re: Mathematics - a new basis
« Reply #14 on: January 31, 2013, 10:31:06 pm »
+13
my mobile number is 0430634746
PhD @ MIT (Economics).

Interested in asset pricing, econometrics, and social choice theory.