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作家唐国明哥德巴赫猜想1+1创新的最全证明(英文版)

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唐国明  初级会员   发表于:2017-07-10 11:58   只看该作者
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作家唐国明哥德巴赫猜想1+1创新的最全证明(中英文版)

(哈哈,英文系软件翻译)

Tang Guoming uses the "single digit" method to prove the most complete proof of Goldbach's conjecture 1 + 1 innovation

Geese poet, red scientist, writer Tang Guoming Goddebach conjecture 1 + 1 innovation of the most complete proof formula:

The "1 + 1" general formula is:

(Even number> 2; said prime number of digits in front of the number of prime number of its number of digits can only take the range of 1,2,3,5,7,9 cycle to take; n> 0)

Geese poet, red scientist, writer Tang Guoming Goddebach conjecture 1 + 1 innovation of the most complete proof formula principle:

A number of even no matter how many of its single digits are fled 0,2,4,6,8; a no matter how many prime, its single digits in addition to 2 and 5 of the two prime, its single digits (Note, this sentence can also be expressed as: no matter how much prime, its single digits can only be 1,2,3,5,7,9 - for the Special prime numbers 2 and 5, since even-numbered 4 can only be expressed by the sum of prime numbers 2 plus 2, and the prime number 5 is summed with any prime number, and the sum is always a single digit of 0, 2, 4, .) Regardless of the infinity of even infinity, it can be expressed as the sum of the two prime numbers. Because an even number is expressed as the sum of two primes, it is only necessary to add the number of digits of the two prime numbers to satisfy the even-numbered bits 0, 2, 4, 6, 8 unconditionally. So even greater than 2 or not less than 4 even can be expressed as the sum of the two prime number is absolutely established. Concise that is, because the prime number 2 and 5 into more than 10 single digits can only be a co-number, 4 can only be even the number of 2 plus 2 sum; so no matter how much prime, its single digits Always 1, 2, 3, 5, 7, 9, no matter how big even, its single digits are always 0,2,4,6,8, so even more than 2 even can be the sum of two prime numbers.

"1 + n" and "s + z" set up the demonstration process

I am surprised that once the master is greater than 2 prime number of digits can only be in the 1,3,5,7,9 between the cycle of change is always the same, how they multiply the plot of the number of bits is always in 1, 3, 5, 7, 9 in the odd nature of the rotation, so simply to "1 + n" and "s + z" proved. In addition, due to the prime number of the number of even 2, the other prime number of single digits are in the 1,3,5,7,9 cycle in the presence of their two no matter how the two are even, that is, "1 +1" naturally established, the following to prove by formula.

"1 + 1" established formula to prove the process

From the above all the proof process is theorem: a no matter how many even, its single digits are fled 0,2,4,6,8; a no matter how many prime, its single digits in addition to 2 and 5 the two prime In addition, its single digits are escaped 1,3,7,9; (Note, this sentence can also be expressed as: no matter how much prime, its single digits can only be 1,2,3, 5,7,9 - for special prime numbers 2 and 5, since even 4 can only be expressed by the sum of prime numbers 2 plus 2, prime number 5 is summed with any prime number, and the sum is always a single digit of 0,2 4, 6, 8. Even the infinity of even infinity, can be expressed as the sum of the two prime numbers. Because an even number is expressed as the sum of two primes, it is only necessary to add the number of digits of the two prime numbers to satisfy the even-numbered bits 0, 2, 4, 6, 8 unconditionally. So even greater than 2 or not less than 4 even can be expressed as the sum of the two prime number is absolutely established. Concise that is, because the prime number 2 and 5 into more than 10 single digits can only be a co-number, 4 can only be even the number of 2 plus 2 sum; so no matter how much prime, its single digits Always 1, 2, 3, 5, 7, 9, no matter how big even, its single digits are always 0,2,4,6,8, so even more than 2 even can be the sum of two prime numbers.

References:

[1] Chen Jing run "junior number theory Ⅰ" Harbin Institute of Technology Press 2012-05-01

[2] "the world's three major mathematical conjecture" "Gold Bach conjecture (one of the world's three major mathematical problems)" "prime" "odd" "even" "prime factor" factor "Badu Encyclopedia 2017

March 30, 2017 - June 9, 2017 written on the foot of the mountain in Yuelu

"Tang Guoming uses the" single digit "method to prove the most complete proof of Goldbach's conjecture 1 + 1 innovation"

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