GOLDBACH Conjecture - Some news on X = 0 (6)

I have worked recently little bit on GOLDBACH (every even number is the
sum of two primes) and I have proved the following:

The smallest number X which dosent comply with GOLDBACH has to be a
multiple of 6: X = 0 (6)


Is someone aware of this result ? Please send me your comment if you
have any.

Thank you in advance,
Alexandre BELDI

.

Relevant Pages

  • Re: i have just proved golbach conjecture
    ... > That's not Goldbach's conjecture. ... Goldbach says ALL ... > even numbers are a sum of two primes. ...
    (sci.math)
  • Re: a simple question about reductio ad absurdum
    ... >>in making a absurd hypothesis for simple thesis as the strong goldbach ... >>of two primes. ... To perform a reductio, assume the negation of what you ... written as the sum of two primes." ...
    (sci.math)
  • Re: Contradictory nature of Goldbach Conjecture
    ... number greater than 2 is the sum of two prime numbers". ... known as the Goldbach Conjecture, ... Conjecture, i.e. the statement itself is a theorem and to deny it is ... Fernando Revilla. ...
    (sci.math)
  • Re: GOLDBACH Conjecture - Some news on X = 0 (6)
    ... sum of two primes) and I have proved the following: ... The smallest number X which dosent comply with GOLDBACH has to be a ... I wouldn't expect anybody to produce a counter-example. ...
    (sci.math)
  • Re: GOLDBACH Conjecture - Some news on X = 0 (6)
    ... sum of two primes) and I have proved the following: ... As as I know, with GOLDBACH conjecture, we still in the dark. ... That's a much stronger statement than what you said before. ...
    (sci.math)