So I seen a thread about prime numbers the other day. And a commentor talked about divisorsplots.com
I have discovered a pattern in primes.
N01, N07, N11, N13, N17, N19, N23, N29,
N31, N37, N41, N43, N47 ,N49, N53, N59,
N61, N67, N71, N73, N77, N79, N83, N89,
N91, N97| N01, N03, N07, N09, N13, N19
(N01-N97 here is 0)
N21, N27, N31, N33, N37, N39, N43, N49
N51, N57, N61, N63, N67, N69, N73, N79
N81, N87, N91, N93, N97, N99| N03, N09
(N01-N99 here is 1)
N11, N17, N21, N23, N27, N29, N33, N39
N41, N47, N51, N53, N57, N59, N63, N69
N71, N77, N81, N83, N87, N89, N93, N99
(N03-N99 here is 2.)
When you take a number N and if you divide it by 3 and you get a remained of 0,1 or 2. And then add one of the 2 corresponding digits. You increase your chances of have a prime. Or you can guarantee you won't have a prime. If you off set it.
Such the N has a remainder of 1, 33339966781 might be prime. While 33339966783 is not prime at all.
https://youtu.be/KV3Z6pE_HUo
I have several videos of this sieve because I can extrapolate tons of data from this sieve.
I have discovered a pattern in primes.
N01, N07, N11, N13, N17, N19, N23, N29,
N31, N37, N41, N43, N47 ,N49, N53, N59,
N61, N67, N71, N73, N77, N79, N83, N89,
N91, N97| N01, N03, N07, N09, N13, N19
(N01-N97 here is 0)
N21, N27, N31, N33, N37, N39, N43, N49
N51, N57, N61, N63, N67, N69, N73, N79
N81, N87, N91, N93, N97, N99| N03, N09
(N01-N99 here is 1)
N11, N17, N21, N23, N27, N29, N33, N39
N41, N47, N51, N53, N57, N59, N63, N69
N71, N77, N81, N83, N87, N89, N93, N99
(N03-N99 here is 2.)
When you take a number N and if you divide it by 3 and you get a remained of 0,1 or 2. And then add one of the 2 corresponding digits. You increase your chances of have a prime. Or you can guarantee you won't have a prime. If you off set it.
Such the N has a remainder of 1, 33339966781 might be prime. While 33339966783 is not prime at all.
https://youtu.be/KV3Z6pE_HUo
I have several videos of this sieve because I can extrapolate tons of data from this sieve.
