1) Thing to Notice in the Last Row of Value (7) Divided by 2 - 9 ; At Each " a " Value see it Divide Evenly when Choosing each Integer 2 - 9
2) Choose " a " one integer at a time to see values at each " a " - Notice the Values of 7/n at each " a " : Primes Generated: 7 ,13, 19, 31, 37, 43,
3) a = 6 + multiples of 6 give integers : a = 6 , 12, 18, 24, 30, 36, 42, 48 gives Integer Values in equation above 7/n values. Which is interesting -Pattern
By Davide Castelvecchi and Nature magazine | October 8, 2015
Math Mystery: Shinichi Mochizuki and the Impenetrable Proof
Primal importance
The abc conjecture refers to numerical expressions of the type a + b = c. The statement, which comes in several slightly different versions, concerns the prime numbers that divide each of the quantities a, b and c. Every whole number, or integer, can be expressed in an essentially unique way as a product of prime numbers—those that cannot be further factored out into smaller whole numbers: for example, 15 = 3 × 5 or 84 = 2 × 2 × 3 × 7. In principle, the prime factors of a and b have no connection to those of their sum, c. But the abc conjecture links them together. It presumes, roughly, that if a lot of small primes divide a and b then only a few, large ones divide c