OK now we knew (3,4,6,6) is best combination
let’s test word values in order to pass similar formulas in any one of the directions, but in consistent way
We will test values from 3 to 10,000 (or 1000) for each word value
So let’s first inspect deeply all mathematical relationships produced by the sequence, as natural relationships, and as composing sequences dominated by the prime number 19. The sequences that is dominated through the prime 19, are divisible by 19, with no remainders.
Also note 66 refers to the value of the word ALLH, and 114 refers to the count of Quranic Chapters, and the count of Basmalah inside Quran, although Sura 9 doesn’t begin with a Basmalah, for the presence of a Basmalah twice in Sura 27 (Once in the beginning as unnumbered verse, and once in verse 30)
Also note 27 + 30 = 57 = 19 x 3
(102, 66, 329, 289)
1- The first half of basmala BSM ALLH (102 + 66) adds up to 168, the other half ALRHMN ALRHYM (329 + 289) adds up to 618
618 is a permutation of 168, both have the same digits (1,6,8) .. Also its noteworthy that the golden ratio in mathematics & nature is 0.618 & 1.618 .. rings a bell!!
2-
(102,66,329,289) starts with (1) and ends with (9)
19 = 19 x 1
3-
The Total 786 (102 + 66 + 329 + 289 = 786) starts with (7) and ends with (6)
76 = 19 x 4 (4 indicates 4 words)
4-
Establishing (102) as the value for the 1st word
1 102 = 19 x 58
5-
Establishing (786) as the value for the 1st verse
1 786 = 19 x 94
*** Note that largest prime factor in 58 is 29
*** Note that largest prime factor in 94 is 47
58 + 94 = 152 = 19 x 8
29 + 47 = 76 = 19 x 4
5+8 = 13
9+4 = 13
2+9 = 11
4+7 = 11
6-
Serial of 102 is a multiple of 19
7-
Serial of 786 is a multiple of 19
** Note that 102 & 786 share a lot of similarities, to establish 102 as the first word, and 786 as the first verse
Both Numbers start with odd digit
Both Numbers end with two even digits
Both numbers sum of even digits is twice the first odd digit .. (0+2 = 2) (2 is twice 1 the starting digit) & (8+6 = 14) (14 is twice 7 the starting digit)
Both numbers are originally a sequence .. 102 is a permutation of 012 .. 786 is a permutation of 678
8- (102,66,329,289)
Sum of even digits = 26 (0+2 +6+6 +2 +2+8)
Sum of odd digits = 22 (1 +3+9 + 9 )
26,22 = 19 x 138
9-
Sum of non composite nor prime digits = 1 (1+0)
Sum of prime digits = 9 (2+3+2+2)
Sum of Composite Digits = 38 (6+6+9+8+9)
So the three numbers categories have sums of (1,9,38) leading to (48 as the grand sum)
1938 = 19 x 102 (102 is the value of the first word)
Also the sums of non composite nor prime digits = 1 & sums of prime digits = 9 compose 19 = 19 x 1
And sums of composite digits = 38 = 19 x 2
10-
Sum of starting and ending digits of all words (1+2 +6+6 +3+9 +2+9) = 38 = 19 x 2
11-
The sum of occurences of the digits of the number 19 itself are (1,9,9) their sum = 19 (1 occured once in word 102, and 9 occured twice in words 329 & 289)
12-
The largest digit (9) occurs in positions (8,11)
The sum of positions = 8 + 11 = 19
13-
The most occuring digit (2) occurs in positions (3,7,9)
The sum of positions = 3 + 7 + 9 = 19
14-
There are 4 non repeating digits in (102,66,329,289) are the digits (1,0,3,8) in positions (1,2,6,10) ..
The sum of positions = 1 + 2 + 6 + 10 = 19
** Note than none repeating digits compose 10 & 38 .. 10 + 38 = 48 (sum of digits of word values) .. and also 38 is the sum of digits of starting and ending digits (1+2 +6+6 +3+9 +2+9) and 10 is the sum of digits in between (0+2+8)
15-
The digit (3) is the exact middle digit seperating the 11 digits, where 5 digits, would be on the left side, and 5 digits would be in the right side .. The middle digit (3) makes the seperation in pure mathematical harmony ..
The sum of the left side = 1+0+2 +6+6 = 15
The sum of the right side = 2+9 +2+8+9 = 30 (15 x 2)
Also note that the two basic numbers that indicate this middle seperation are the number (3) which is the middle digit and the number (5) which is the count of the digits in each side
Note that 15 & 30 both are multiples of 3 & 5
Actually from another side, we can see that the sum of the first (5) digits = 15, then the seperating digit (3) indicates that the total digits sum outside the middle digit will be multiplied by 3 … 15 x 3 = 45
16-
In (102,66,329,289) The sum of digits left to (66) = 3 (1+0+2 = 3)
The sum of digits right to (66) = 33 (3+2+9 +2+8+9 = 33)
17-
The sum of digits of the word ALLH (66) = 12 (6+6 = 12)
The sum of digits of the other three words = 36 (1+0+2 +3+2+9 +2+8+9 = 36)
36 is exactly 3 times as the number 12 (36 = 12 x 3)
18-
The zones which each value’s digits is composed of
102 is within the range (0,2)
66 is within the range (6)
329 is within the range (2,9)
289 is within the range (2,9)
0,2 + 6 + 2,9 + 2,9 = 66
19-
The zones from the starting digit until the ending digit of each word
102 —> starts with (1) and ends with (2)
102 66 —> starts with (1) and ends with (6)
102 66 329 —> starts with (1) and ends with (9)
102 66 329 289 —> starts with (1) and ends with (9)
1,2 + 1,6 + 1,9 + 1,9 = 66
20-
The first digits of the four words in (102,66,329,289) are 1,6 (for first two words) & 3,2 (for other two words) composing 16 & 32
16+32 = 48 (the same as the digits sum of the words values) (1+0+2 +6+6 +3+2+9 +2+8+9 = 48)
Also 16 is exactly the half of 32 (32 = 16 x 2)
21-
The Number 19 was mentioned in Sura 74. Categorizing the 11 digits composing words (102, 66, 329, 289) into (7) + (4) sections is remarkable
7 Even Digits
4 Odd Digits
7 Non Prime Digits
4 Prime Digits
7 Fibonacci Digits
4 Non Fibonacci Digits
7 Digits After the first 19 divisible number (1026)
4 Digits Until the first 19 divisible number (1026)
7 Digits since the first digit repition (1026) (6329289) (66 is the first repetition)
4 consecutive digits with no repitions in the same sequence (may repeat after)
7 Digits that have repititions
4 Digits that have no repitions (Digits positions 1,2,6,10 = Sum 19)
22-
The 11 digits representing values of 4 words together compose the number 11,4 (19 x 6).
23-
The 11 digits reprenting values of 4 words, have ID sum of 66 (1+2+3+4+5+6+7+8+9+10+11), and have digits sum of 48 (1+0+2+6+6+3+2+9+2+8+9 = 48)
1 1
2 0
3 2
4 6
5 6
6 3
7 2
8 9
9 2
10 8
11 9
________________
66 48
66 + 48 = 114 = 19 x 6
24-
The words value are composed of 11 digits:-
– The sum of numbers from 1 to 11 = 66 = Value of WORD ALLH
– The sum of digits of numbers from 1 to 11 = 48 = Sum of digits of words values
66 + 48 = 114 = 19 x 6
25- Each word value . followed by each word corresponding letters positions from 1 to 19
102 1,2,3
66 4,5,6,7
329 8,9,10,11,12,13
289 14,15,16,17,18,19
= 19 x 53749297140699942637432278375869272201
26- The total value (786) . followed by all letters positions from 1 to 19
786
1,2,3
4,5,6,7
8,9,10,11,12,13
14,15,16,17,18,19
= 19 x 4137491877837374274375869272201
*********** 1x 2x 3x 4x ***********
27- With the value of each word
1 102
2 66
3 329
4 289
= 19 x 5801401752331
28- With the value of each word (cumulative)
1 102
2 168
3 497
4 786
= 19 x 58011412367094
29- With the value of each word (reversed direction)
1 201
2 66
3 923
4 982
= 19 x 6322454696578
30- With last digit of each word value
1 2
2 6
3 9
4 9
= 19 x 645471
31- With last digit of each word value . each word value
1 2 102
2 6 66
3 9 329
4 9 289
= 19 x 63696140206997331
32- With last digit of each word value . each word value . first digit of each word value
1 2 102 1
2 6 66 6
3 9 329 3
4 9 289 2
= 19 x 636954035073331236468
33- Exact Middle digits in word values . each word value
1 0 102
2 66
3 2 329
4 8 289
= 19 x 5316982275418331
34- With the count of digits of each word value & the sum of digits of each word value
1 3 3
2 2 12
3 3 14
4 3 19
= 19 x 7011643849701
35- With the word value + the count of letters of each word
1 105
2 70
3 335
4 295
= 19 x 5817212281805
36- With the difference between the word value and the value of the word ALLH (66), which indicates the difference between each value and ALLH as the source
1 36
2 0
3 263
4 223
= 19 x 71685928117
37- With the permutation index of each word value
1 3
2 1
3 3
4 1
= 19 x 695439
** Note there are 19 possible total permutations (6+1 +6+6) permutations
Also Note (61 & 66) represent 61 primes until 289 & 66 primes until 329
38- With each word value & the smallest possible permutation of each word value & the largest possible permutation of each word value
1 102 012 210
2 66 66
3 329 239 932
4 289 289 982
= 19 x 580006426456138594336806541541578
39- With each word value & all the possible perumtations of each word value
1 102 012 021 102 120 201 210
2 66 66
3 329 239 293 329 392 923 932
4 289 289 298 829 892 928 982
= 19 x 580006326895852737479087717541704891225996275753909962594675257522578
40- With each word value & all the possible perumtations until reaching each word value
1 102 012 021 102
2 66 66
3 329 239 293 329
4 289 289
= 19 x 580006326895929822804862785962857331
41- With each word value & all the possible perumtations until reaching each word value & the permutation index of each word value
1 102 012 021 102 3
2 66 66 1
3 329 239 293 329 3
4 289 289 1
= 19 x 5800063268959614032280486278596281204889
42- With count of all possible permutations of each word value . all possible permutations . permutation index . all possible permutations until reach word value
1 6 012 021 102 120 201 210 3 012 021 102
2 1 66 1 66
3 6 239 293 329 392 923 932 3 239 293 329
4 6 289 298 829 892 928 982 1 289
= 19 x
43- With count of all possible permutations of each word value . all possible permutations . word value (66 is used once because it’s the only possible permutation)
1 6 012 021 102 120 201 210 102
2 1 66
3 6 239 293 329 392 923 932 329
4 6 289 298 829 892 928 982 289
= 19 x 84273795274316848474222192822312070154699599643839278384148941733104331
44- With the permutation index of the sum of values from 1 to the word value (Tn Word Value)
1 8
2 6
3 32
4 59
= 19 x 96122761
45- With each word value . All possible divisors
1 102 1,2,3,6,17,34,51
2 66 1,2,3,6,11,22,33
3 329 1,7,47
4 289 1,17
= 19 x 5800650617605929538742749122785130225743
46- With each word value . count of composite numbers until word value . count of prime numbers until word value
1 102 75,26
2 66 47,18
3 329 262,66
4 289 227,61
= 19 x 5803961192879912259277180469619
47- With each word value . count of odd numbers until word value . count of even numbers until word value . count of composite numbers until word value . count of prime numbers until word value
1 102 51,51 75,26
2 66 33,33 47,18
3 329 165,164 262,66
4 289 145,144 227,61
= 19 x 580271144875085964985175416658759277180469184969619
48- With each word value . count of prime numbers until word value . count of composite numbers until word value . count of odd numbers until word value . count of even numbers until word value
1 102 26,75 51,51
2 66 18,47 33,33
3 329 66,262 165,164
4 289 61,227 145,144
= 19 x 580140816585611498596491208750640271812050590902376