The following discovery took place in the end of the year 2006 as I tried to understand why Muslims go around the Kaa'ba Seven times during the Hajj pilgrimage.
After completely analyzing the Kaa'ba and putting down its mathematical properties(a cube), I noticed a pattern of multiples of 7 and made the Supreme Priem discovery. However, I only thought it was applicable to 7, 13 & 91.
I was always fascinated by numbers in general, particularly the number "ONE" and I was wondering if there were number(s) that can divide ANY number(s) like the number "ONE".
Not exactly like "ONE" but similar to it and if so, would it then be possible to slightly comprehend how GOD controls everything.
Yes I mentioned GOD, and if that bothers you, please read this in a scientific point-of-view.
Henceforth, I wanted to manage and protect, in a mathematical method, ANYTHING with ease by GOD's will. For this idea was inspired by GOD.
Anyways, after a few months, I noticed a mathematical relationship as I was exploring the prime number 19. I applied the same method (below) and it worked and therefore I started discovering
"SUPREME PRIME NUMBERS".
"SUPREME PRIME NUMBERS".
Not all prime numbers can do what is below, and that is why I categorized the following prime numbers as Supreme Primes, because they are superior in the following mathematical properties.
The Law is this:
Supreme Primes: not 2, not 3, not 5, 7, 11, 13, 17, 19, 23, 29, not 31, not 37, not 41, 47... 999983...
- Supreme Primes are distinct prime numbers in which you can input any number or digits in a specific symmetrical method and it will always be a multiple of that prime number:
(1) Every Supreme Prime has its "Total Number of Digits" (except for 13), in which it is determined by the prime number itself reduced by 1. This applies to ALL Supreme Primes.
(2) This should always give you an even number in which you divide by 2.
(3) Then you can input any digit from 0-9 in each individual digit group symmetrically.
(4) Finally, you concatenate it back to form the initial "Total Number of Digits" which will be a multiple of that prime number.
Ex:
7 is a the smallest Supreme Prime.
(1) = xxxxxx a total of 7 digits reduced by 1 totaling 6 digits
(2) = xxx | xxx separated the digits by 2.
(3) = xyz | xyz {123 | 123}
(4) = xyzxyz/7 {123123/7=17589} Voila!
(2) = xxx | xxx separated the digits by 2.
(3) = xyz | xyz {123 | 123}
(4) = xyzxyz/7 {123123/7=17589} Voila!
You can verify yourself with the other prime numbers I put in the title. There are infinite amounts of Supreme Primes.
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