Salam Everybody,
I would like to share a very interesting phenomen, which no body is giving attention to. Its the structure of the verses of the Quran and how it is balanced using the Even and the Odd
Definitions- 1: even and odd
even number: a number, which is divisible by 2
odd number: a number, which is not divisible by 2
- 2: homogenous and heterogenous
We define a Sura to be homogeneous, if the number of the sura is even and the number of verses in it is also even, or if the number of the sura is odd and the number of verses in it is also odd.
Otherwise the sura is heterogenous
- 3: Suras of the Quran
There are 114 Suras in the Quran. The sum of numbers from 1-114 = 6555
- 4: numbered verses in the Quran
There are 6234 numbered verses in the Quran
The phenomenons- There are 60 Suras in the Quran, which have even number of verses.
These are divided into
- 30 even sura numbers
- 30 odd sura numbers
- There are 54 Suras in the Quran, which have odd number of verses.
These are divided into
- 27 even sura numbers
- 27 odd sura numbers
- There are 57 homogenous Suras and 57 heterogenous Suras in the Quran
- The sum of all Sura numbers and the numbers of numbered verses in these suras in the homogenous section is: 6234 (compare with definition #4)
- The sum of all Sura numbers and the numbers of numbered verses in these suras in the heterogenous section is: 6555 (compare with definition #3)
- The number of even Suras in the homogenous section = 30 = The number of odd Suras in the heterogenous section
- The number of odd Suras in the homogenous section = 27 = The number of even Suras in the heterogenous section
- The sum of Sura numbers in the homogenous section = 3303 = The sum of the numbered verses of the heterogenous section
- If we examine the two halves of the Quran (Suras 1-57 and Suras 58-114) we find:
- The number of homogenous Suras in the first half = 29 = The number of heterogenous Suras in the second half
- The number of homogenous Suras in the second half = 28 = The number of heterogenous Suras in the first half
- The sum of the numbered verses in the first 19th chapter is 2346 and the sum of numbered verses of the Quran is 6234, and the 6234 is the 19th permutation of 2346
And today I've observed something amazing:
If we examine the numbered verses of the Quran:
7 286 200 176 120 165 206 75 127 109 123 111 43 52 99 128 111 110 98 135 112 78 118 64 77 227 93 88 69 60 34 30 73 54 45 83 182 88 75 85 54 53 89 59 37 35 38 29 18 45 60 49 62 55 78 96 29 22 24 13 14 11 11 18 12 12 30 52 52 44 28 28 20 56 40 31 50 40 46 42 29 19 36 25 22 17 19 26 30 20 15 21 11 8 8 19 5 8 8 11 11 8 3 9 5 4 7 3 6 3 5 4 5 6And for each number we see if the number following it is higher or lower and write H for higher and L for lower we will get the following string:
HLLLHHLHLHLLHHHLLLHLLHLHHLLLLLLHLLHHLLHLLHLLLHLLHHLHLHHLLHLHL-HL-HH-LL-LHLLHLHLLLHLLLHHHLLHLL-HLH-H-LLHLLHLHLHLHHThe - means: the number of verses wasn't increased nor decreased
We have in this string 61 L's and 45 H's (difference 16)
But if we see how many times it was switched from high to low (represented as HL or H-L) we'll find: 32 switches
and if we see how many times it was switched from low to high (represented as LH or L-H) we'll find also: 32 switches.
One can not escape the relation between 32 and 16
Now to imagine the complexity of this structure, here is a task for people, who are interested in mathematics and/or programming, what we can just imagine solving it using arrays of integers.
? Find a prime number P
? Find N numbers, where each number has an index from 1-N and N is a multiple of P
? An index is homogeneous if the index is even and the number assigned to it is even, or if the index is odd and the number assigned to it is odd, otherwise its heterogeneous: the number of homogeneous indices must be equal to heterogenic indices
? The even numbers among these N numbers should have an equal number of odd indices and even indices
? The odd numbers among these N numbers should have an equal number of odd indices and even indices
? The sum of indices from 1-N should be equal to the sum of all indices and numbers in the homogeneous or heterogeneous section
? The sum of numbers from 1-N should be equal to the sum of all indices and numbers in the homogeneous or heterogeneous section
? Even indices in the homogeneous section must be equal to odd indices in the heterogeneous section
? Odd indices in the homogeneous section must be equal to even indices in the heterogeneous section
? The sum of indices in the homogeneous section must be equal to the sum of numbers in the heterogeneous section
? The number of homogeneous indices in the first half of indices must be equal to the number of heterogeneous indices in the second half of indices
? The number of homogeneous indices in the second half of indices must be equal to the number of heterogeneous indices in the first half of indices
? The sum of the N numbers should be the P-th permutation of the sum of the number assigned to the first P indices
? For each number from the N numbers write the number
followed by the numbers from 1 to this number. All numbers placed next to each other must be divisible by P
? For each number from the N numbers write the sum of numbers from 1 to this number followed by the numbers from 1 to this number. All numbers placed next to each other must be divisible by P
The 114 numbers given on this thread fulfill the requirements of this task for P=19
Best regards,
Mohamed
P.S. almost all information are taken from
http://www.mucizeler.com/19lar/ciftveteksayi.htm (turkish language, however I don't speak turkish
)