User talk:Lutvokuric
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Perfect square
This square is, according to some opinions, the greatest mathematical wonder in the worlds.
And this why:
THE SUBJECT OF THIS THESIS IS A PROGRAM-CYBERNETIC-INFORMATIONAL LAWS IN THE MATHEMATICAL SQUARE. THIS SQUARE WAS DECODED IN ONE OF THE PHENOMENON IN NATURE. IN THAT SQUARE AUTHOR WITH HIS MATHEMATICAL LANGUAGE DECODED SOME OF THE MOST IMPORTANT SCIENTIFIC INFORMATIONS. WE ARE TALKING ABOUT ONE OF THE GREATEST MIRACLES IN THE PRESENT HISTORY OF MANKIND.
-This square is created with the help of mathematical lawfulness that are not known to the today's sience. These mathematical lawfulness are not known to any mathematician. No mathematician is using these mathematical laws in his/her scientific work. If we had all mathematicians working together, they would not be able to create this square.
-In this square, using the language of numbers, the authors name is writen, the squares author. His name can be found when all numbers are put in corelation with one another. Such combinations with written name of the author are indefinite.
This square, according to our opinion, is the greatest mathematical chalenge for the humanity.
We are asking mathematicians to get to know the secrets of this square. We are asking them to show us if this square is the greatest wonder in the world.
SQUARE
8 9 15 24 25
26 30 36 43 44 45 46 47 49 59 60 61 62 63 64 65 79 87 88 93
The numbers from this square have their secret coded markings. All numbers with the same markings we can group in the appropriate group of numbers. Those groups are numerous those are:
- Groups of even and odd numbers,
- Groups of numbers that are distributed in the squares with odd first number and group of numbers that are distributed in the squares with even first number, - Group of numbers located in outer squares and a group of numbers located in inner squares. - Group of X and Y numbers, and so.on.
In every example of already mentioned examples, we have two groups of numbers with the same coded markings. The difference of totals in those groups is number 931. Why that number? Because, that number is arithmetical expression for the name of the Autor this square.
Example 1
A1= (8+24 + 26+30 + 36+44 + 46+60 + 62+64 + 88)= 488; Analog code of number 488 is number 884;
A2= (9+15 + 25+43 + 45+47 + 49+59 + 61+63 + 65+79 + 87+93) = 740; Analogue code of number 740 is number = 047;
(A1 + A2) = (884 + 047) = 931;
931 = Arithmetical expression for the name of the Author this square
A1 = Even numbers; A2 = Odd numbers;
Example 2
A3= (9+ 24+ 26+ 36+ 44+ 46+ 49+ 60+ 62+ 64+ 79+ 88) = 587; Analogue code of number 587 is number 785;
A4= (8+ 15+ 25+ 30+ 43+ 45+ 47+ 59+ 61+ 63+ 65+ 87+ 93) = 641; Analogue code of number 641 is number = 146;
(A3 + A4) = (785 + 146) = 931;
931 = Arithmetical expression for the name of the Author this square
A3 = Numbers in squares with first even number; A4 = Numbers in squares with first odd numbers;
Example 3
A5=(9+ 24+ 30+ 43+ 46+ 49+ 61+ 63+ 79+ 88) = 492; Analogue code = 294;
A6= (8+15+25+26+36+44+45+47+59+60+62+64+ 65+ 87+ 93) = 736;
Analogue code = 637;
(A5 + A6) = (294 + 637) = 931;
931 = Arithmetical expression for the name of the Author this quadrant
A5 = Number in even columns (2 and 4); A6 = Number in odd columns (1, 3, 5);
Example 4
A7= (24+ 25+ 43+ 44+ 49+ 59+ 63+ 64+ 88+ 93) = 552; Analogue code= 255;
A8=(8+9+15+26+ 30+ 36+ 45+ 46+ 47+ 60+ 61+ 62+ 65+ 79+ 87) = 676;
Analogue code= 676;
(A7 + A8) = (255 + 676) = 931;
931 = Arithmetical expression for the name of the Author this square
A7 = Number in 4 and 5. Column; A8 = Numbers in 1st, 2nd and 3rd column;
Example 5
A9=(8+9+15+24+25+26+44+45+59+ 60+ 64+ 65+ 79+ 87+ 88+93) = 791; Analogue code= 197;
A10= (30+ 36+ 43+ 46+ 47+ 49+ 61+ 62+ 63) = 437;
Analogue code = 734;
(A9 + A10) = (197 + 734) = 931;
931 = Arithmetical expression for the name of the Author this square
A9 = Outer numbers; A10 = Inner numbers;
Example 6
A11 = (9+ 15+ 25+ 45+ 59+ 65+ 79+ 87+ 93) = 477; Analogue code = 774;
A12=(8+ 24+ 26+ 30+ 36+ 43+ 44+ 46+ 47+ 49+ 60+ 61+ 62+ 63+ 64+ 88 =751; Analogue code= 157;
(A11 + A12) = (774 + 157) = 931;
931 = Arithmetical expression for the name of the Author this square
A11 = Odd outer numbers A12 = Other numbers in square
Example 7
A13 = (43+ 47+ 49+ 61+ 63) = 263; Analogue code = 362;
A14=(8+ 9+ 15+ 24+ 25+ 26+ 30+ 36+ 44+ 45+ 46+ 59+ 60+ 62+ 64+ +65+ 79+ 87+ 88+ 93)=965; Analogue code=569;
(A13 + A14) = (362 + 569) = 931;
931 = Arithmetical expression for the name of the Author this square
A13 =Odd inner numbers; A14 = Other numbers in square;
Example 8
A15 = (15+ 25+ 45+ 47+ 59+ 65+ 87+ 93) = 436; Analogue code = 634; A16= (8+ 9+ 24+ 26+ 30+ 36+ 43+ 44+ 46+ 49+ 60+ 61+ 62+ + 63+ 64+ 79+88) = 792; Analogue code= 297;
(A15 + A16) = (634 + 297) = 931;
931 = Arithmetical expression for the name of the Author this square
A15 = Odd numbers in odd columns; A16 = Other numbers in square;
Example 9
A17 = (9+ 15+ 25+ 45+ 47+ 49+ 59+ 65+ 79+ 87+ 93) = 573; Analogue code = 375;
A18=(8+24+26+30+ 36+ 43+ 44+ 46+ 60+ 61+ 62+ 63+ 64+ 88)= 655; Analogue code= 556;
(A17 + A18) = (375 + 556) = 931;
931 = Arithmetical expression for the name of the Author this square
A17 = Odd numbers in odd rows A18 = Other numbers in square
Example 10 A19 = (8+ 25+ 30+ 43+ 47+ 61+ 63+ 65+ 93) = 435; Analogue code = 534;
A20=(9+ 15+ 24+ 26+ 36+ 44+ 45+ 46+ 49+ 59+ 60+ 62+ 64+ + 79+ 87+88) =793 Analogue code= 397
(A19 + A20) = (534 + 397) = 931;
931 = Arithmetical expression for the name of the Author this square
A19 = Diagonal numbers A20 = Other numbers in square
Example 11
A21 = (8+ 30+ 47+ 63+ 93) = 241; Analogue code = 142;
A22=(9+ 15+ 24+ 25+ 26+ 36+ 43+ 44+ 45+ 46+ 49+ 59+ 60+ 61+ 62+ 64+ 65+ 79+ 87+ 88)= 987; Analogue code=789;
(A21 + A22) = (142 + 789) = 931;
931 = Arithmetical expression for the name of the Author this square
A21 = Numbers in diagonal A A22 = Other numbers in square
Example 12
A23 = (25+ 43+ 47+ 61+ 65) = 241; Analogue code = 142;
A24=(8+ 9+ 15+ 24+ 26+ 30+ 36+ 44+ 45+ 46+ 49+ 59+ 60+ 62+ 63+ 64+ + 79+ 87+ 88+ 93) = 987; Analogue code= 789;
(A23 + A24) = (142 + 789) = 931;
931 = Arithmetical expression for the name of the Author this square
A23 = Numbers in diagonal B A24 = Other numbers in square
Example 13
A25 = (25+ 43+ 47+ 61+ 63+ 65 + 93) = 397; Analogue code = 793;
A26=(8+ 9+ 15+ 24+ 26+ 30+ 36+ 44+ 45+ 46+ 49+ 59+ 60+ 62+ + 64+ 79+ 87+ 88)= 831; Analogue code =138;
(A25 + A26) = (793 + 138) = 931;
931 Arithmetical expression for the name of the Author this square
A25 = Odd numbers in diagonals; A26 = Other numbers in square;
Example 14
A27 = (25+ 43+ 49+ 59+ 63+ 93) = 332; Analogue code = 233;
A28=(8+ 9+ 15+ 24+ 26+ 30+ 36+ 44+ 45+ 46+ 47+ 60+ 61+ 62+ 64+ + 65+ 79+ 87+ 88)= 896; Analog code= 698;
(A27 + A28) = (233 + 698) = 931;
931 = Arithmetical expression for the name of the Author this square
A27 = Odd numbers in 4. and 5 column; A28 = Other numbers in square
etc.
Right and left numbers
The square that we are talking about is consisted of 25 different numbers. Some of those are made of one number and some of two. Some numbers are on the right, and some numbers are on the left side. Now lets analyze those numbers; Numbers on the right side are: 8, 9, 5, 4, 5, 6, 0, 6, 3, 4, 5, 6, 7, 9, 9, 0, 1, 2, 3, 4, 5, 9, 7, 8 and 3. Total number is 128, and analogue code is 821. Number on the left side are: 0, 0, 1, 2, 2, 2, 3, 3, 4, 4, 4, 4, 4, 4, 5, 6, 6, 6, 6, 6, 6, 7, 8, 8, and 9.The total of numbers is 110, and analogue is 011. Now we are going to summarize the totals and analogue codes.
(128 + 821) + (110 + 011) = (139 + 931)
931 Arithmetical expression for the name of the Author this square
As we can see, numbers on the right and the left side are coded in the number 931, and his analogue code.
CONNECTION OF CORRESPONDING NUMBERS
Some of the secrets of this quadrant we can decode when we connect numbers with the first numbers of squares.
(Rank of the square and Number in the square) = Connecting number;
Example 1
(15 and 59) = 1559;
(21 and 65) = 2165;
(1559 + 2165) = 3724 = (931 + 931 + 931 + 931)
931 = Arithmetical expression for the name of the Author this square
Example 2
(Rank of the square and Number in the square) = Connecting number;
(16 and 60) = 1660; (20 and 64) = 2064;
(1660 + 2064) = 3724 = (931 + 931 + 931 + 931);
931 Arithmetical expression for the name of the Author this square Example 3
(Rank of the square and Number in the square) = Connecting number;
(17 and 61) = 1761; (19 and 63) = 1963;
(1761+ 1963) = 3724 = (931 + 931 + 931 + 931);
931 = Arithmetical expression for the name of the Author this square
Example 4
(Rank of the square and Number in the square) = Connecting number;
(18 and 62) = 1862; 1862 = (931 + 931);
931 = Arithmetical expression for the name of the Author this square
Example 5
Rank of the square Number in the square Connecting numbers 17 61 1761 18 62 1862 19 63 1963 Sum 5586 5586 = (931+931+931+931+931+931); 931 Arithmetical expression for the name of the Author this quadrant
Example 6 Rank of the square Number in the square Connecting numbers 16 60 1660 18 62 1862 20 64 2064 Sum 5586 5586 = (931+931+931+931+931+931);
931 = Arithmetical expression for the name of the Author this square
Example 7 Rank of the square Number in the square Connecting numbers 16 60 1660 17 61 1761 21 65 2165 Svega 5586 5586 = (931+931+931+931+931+931); 931 = Arithmetical expression for the name of the Author this square etc.
ANALOGUE CODE
Decoding of this square could be done with using the lawfulness of analogue code:
Example 1
Analogue code of the numbers from the square:
Analogue code of number 8 is number 80, number 9 is number 90, number 15 is number 51, etc.
(80+90+51+42+ 52+62+ 03+63+34+ 44+ 54+ 64+ 74+ 94+ 95+ 06+ 16+ +26+ 36+ + 46+ 56+ 97+ 78+ 88+ 39) = 1390;
Analogue code of number 1390 = 0931 = 931;
931 Arithmetical expression for the name of the Author this quadrant
Example 2
Numbers from the square
(8+ 9+ 15+24+25+26+ 30+ 36+ 43+ 44+ 45+ 46+ 47+ 49+ 59+ 60+ 61+ 62+
+63+ 64+ 65+ 79+ 87+ 88+ 93) = 1228;
Analogue code of number 1228 = 8221;
(1228 + 8221) = 9449
9449 =(931+931+931+931+931+139+931+931+931+931+931);
931 = Arithmetical expression for the name of the Author this quadrant
In this example, we have coding in the number 931, and its analogue code.
ANALOGUE QUADRANT
Analogue code of number 8 is number 80, number 9 is number 90, number 15 is number 51, etc.
80 90 51 42 52 62 03 63 34 44 54 64 74 94 95 06 16 26 36 46 56 97 78 88 39
A B C D E Sum Analogue codes
A1 03 06 16 26 34 85 58 B1 36 39 42 44 46 207 702 C1 51 52 54 56 62 275 572 D1 63 64 74 78 80 359 953 E1 88 90 94 95 97 464 464 Sum 241 251 280 299 319 1390 2749 Analog codes 142 152 082 992 913 2281 - 1390 + 2749 + 2281) = 6420; 6420 = (931 + 139 + 931 + 139 + 931 + 139) + + (139 + 931 + 139 + 931 + 139 + 931); 931 = Arithmetical expression for the name of the Author this quadrant
MATHEMATICAL RELATIONS IN SIGN OF NUMBER 931
All numbers in the quadrant are connected with the great number of mathematical relations that are given in number 931. These are some more examples:
(43+44+45+46+47+49+60+61+62+63+64+79+87+88+93) = 931; (36+43+44+45+47+59+60+61+62+63+64+79+87+88+93) = 931; (36+43+44+45+46+59+60+61+62+63+65+79+87+88+93) = 931; (30+44+45+47+49+59+60+61+62+63+64+79+87+88+93) = 931; (30+43+46+47+49+59+60+61+62+63+64+79+87+88+93) = 931; (30+43+45+47+49+59+60+61+62+63+65+79+87+88+93) = 931;
931 = Arithmetical expression for the name of the Author this quadrant
etc.
Code 19 and 7
How to use codes 19 and 7 for decoding of already mentioned square will be explain in the next example:
We will connect numbers in this square with rank of the squares, where we can find:
(8 01 + 9 02 + 15 03 + 24 04 + 25 05 + 26 06 + 30 07 + 36 08 + + 43 +09 + 44 10 + 45 11 + 46 12 + 47 13 + 49 14 +
+59 15 + 60 16 + 61+ 17 + 62 18 + 63 19 + 64 20 + 65 21 +
+79 22 + + 87 23 + 88 24 + 93 25) = 123125;
123125 = (197 + 197 + 197 + 197 + 197 .....+ 197;
From the previously shown we can see that the being from the out-of-space that created this quadrant connected numbers from this quadrant with rank of the squares using codes 19 and 7.
Code 19 and 7 in the groups of numbers from quadrant
(59+60+61+63+64+65+79+87+88+93) = 719; (47+49+59+60+61+62+63+64+79+87+88) = 719; (46+49+59+60+61+62+63+65+79+87+88) = 719; (46+47+59+60+61+63+64+65+79+87+88) = 719; etc.
In this text, we have mentioned some other short examples so we could decode the secrets from this quadrant. There some other examples. The numbers from this quadrant have many other code markings. Those marking connect them in numerous complex program systems, cybernetic systems, and informational system. The most interesting codes that a being from Autor has created in this quadrant are code 19 and 7, and group of markings of X numbers.
We are asking mathematicians to get to know the secrets of this quadrant. We are asking them to show us if this quadrant is the greatest wonder in the world.
