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Old 2019-04-15, 14:46   #25
Mar 2019

5×11 Posts

I will try to fix the proof once again
Assume that there exist a finite amount of twin prime numbers.
Then we can construct a list, which in this case will be S, S= A1,A2,A3,A4...An
Let P be the product of all twin prime numbers in S, P= A1*A2*A3*A4..An
Let Q=P+1
If Q is a twin prime number then S is not complete
If Q is composite then some prime factor p divides Q, if this factor p were in our list S then it would divide P, but p divides P+1=Q. If p divides P and Q then p would have to divide the difference of the two numbers, which is (P+1)-P or just 1. Since no twin prime number divides 1, p can not be on the list. This means that at least one twin prime number exists
beyond those in the list.

Last fiddled with by MathDoggy on 2019-04-15 at 15:30
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