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You are not logged in. #1 20130721 14:44:51
My New Primes with a Strange PropertyConsider these two equation: But there is no prime of this form: If you could find a prime then you must be kool:) If you could find one, n should be greater than at least 100,000. If you could find a counterexample then it would be a pleasure to see if you could find the twin primes of the form as follows: Last edited by Stangerzv (20130721 16:52:32) #2 20130721 14:55:54
Re: My New Primes with a Strange PropertyThe Generalize equation can be written as follows: I do believe it would behave more less the same for all t>1 Last edited by Stangerzv (20130721 19:25:13) #3 20130721 15:13:15
Re: My New Primes with a Strange PropertyFor t=1, There are plenty of Prime of this form. But for this equation: There are only two primes for n<1,000,000 (i.e. 2 & 5) Last edited by Stangerzv (20130721 16:53:08) #4 20130721 16:06:23
Re: My New Primes with a Strange PropertyHi; In mathematics, you don't understand things. You just get used to them. I have the result, but I do not yet know how to get it. All physicists, and a good many quite respectable mathematicians are contemptuous about proof. #5 20130721 16:52:01
Re: My New Primes with a Strange PropertyHi bobbym #6 20130721 17:01:48
Re: My New Primes with a Strange PropertyYeah..I found out the proof too:) Quite easy though! #7 20130721 17:08:57
Re: My New Primes with a Strange PropertyTherefore, the only twin prime for this generalize equation is (5,7). Last edited by Stangerzv (20130721 17:33:31) #8 20130721 17:26:52
Re: My New Primes with a Strange PropertyThe proof is as follows: Then => Which can be factorized as follows: Which is a composite number. Last edited by Stangerzv (20130721 17:32:35) #9 20130721 19:26:26
Re: My New Primes with a Strange PropertyPrimes only occur at even t of the form 2^a for where a is an integerLast edited by Stangerzv (20130721 20:22:10) 