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From: Archimedes Plutonium on 14 Jul 2010 02:08 Archimedes Plutonium wrote: > Archimedes Plutonium wrote: > > While I am at it, may as well jogg the memory of how sqrt2 is proven > > irrational as a tug of > > war between being even and odd: > > --- quoting from Wikipedia --- > > Assume that â2 is a rational number, meaning that there exists an > > integer a and an integer b in general such that a / b = â2. > > > > Then â2 can be written as an irreducible fraction a / b such that a > > and b are coprime integers and (a / b)2 = 2. > > > > It follows that a2 / b2 = 2 and a2 = 2 b2. â (â(a / b)n = an / bn â) > > > > Therefore a2 is even because it is equal to 2 b2. (2 b2 is necessarily > > even because it is 2 times another whole number; that is what "even" > > means.) > > > > It follows that a must be even (as squares of odd integers are > > themselves odd). > > > > Because a is even, there exists an integer k that fulfills: a = 2k. > > > > Substituting 2k from (6) for a in the second equation of (3): 2b2 = > > (2k)2 is equivalent to 2b2 = 4k2 is equivalent to b2 = 2k2. > > > > Because 2k2 is divisible by two and therefore even, and because 2k2 = > > b2, it follows that b2 is also even which means that b is even. > > > > By (5) and (8) a and b are both even, which contradicts that a / b is > > irreducible as stated in (2). > > > > --- end quoting Wikipedia on sqrt2 irrational proof --- > > > > Now remember that most people define Perfect Number such as 6 with the > > factor of 2 as > > in this: > > > > 1/6 + 2/6 + 3/6 + 6/6 = 2 > > > > whereas I define it as a factor of 1: > > > > 1/6 + 2/6 + 3/6 = 1 > > > > I do it that way so as to allow me to say that 1 is the only odd > > perfect number. > > > > And the reason I bring this up is to show you that there are an even > > number > > of factors of 4 of them compared when = 2, to an odd number of factors > > when = 1. > > > > So when we add 6/6 we have an even number of factors in the equation > > whereas when > > we delete 6/6 we have an odd number of factors. This is important in > > the proof, because > > to have existence of even numbered perfect numbers depends on one of > > them being > > 50% and thus making the rest of the factors an even number to join up > > to fill in for the > > other 50% needed to be perfect. Whereas in odd perfect numbers, we > > have an odd number > > of factors in the summation for there is never a 50% factor that we > > can eliminate out. > > > > The only odd perfect number that could ever be mustered would be one > > in which looks like this: > > > > 33.33...% + 33.333....% + 33.333....% but that case is impossible > > since you cannot have > > three summations all of the same percentage. > > > > Now that maybe a proof in itself that no odd perfect number other than > > 1 exists. To argue that > > to have a odd perfect number the outcome must devolve into 1/3 + 1/3 + > > 1/3 for the outcome surely cannot devolve into 50% + (summing of > > another 50%) > > > > Archimedes Plutonium wrote: > > > While I am at it, I may as well clear out all the old unsolved Ancient > > > Greek conjectures > > > of these three: > > > 1) Twin Primes > > > 2) Infinitude of even Perfect Numbers > > > 3) 1 is the only odd Perfect Number > > > > > > I proved Twin Primes and even Perfect Numbers already in this thread > > > so may as well grapple with 1 is the only odd Perfect Number. > > > > > > I did this proof in early 1990s, so it is nothing new as to the > > > technique > > > involved. I won no converts, but sometimes in mathematics a proof > > > acceptance > > > takes longer than finding a proof. People are stubborn and jeolous > > > like anything else. > > > > > > Now the wording of this conjecture is different from the literature > > > for they say No > > > Odd Perfect number exists, but I like to use 1 as an Odd Perfect > > > Number and there > > > is no prejudice to that restatement and proof. > > > > > > Now the way I prove that 1 is the only odd perfect number is that I > > > look upon the smallest > > > even perfect number of 6 and see how it is driven to be "perfect" and > > > I use fractions to > > > get me the insight. > > > > > > So I see 6 as the smallest perfect even number because I see this: > > > > > > 1/6 + 2/6 + 3/6 = 6/6 > > > > > > Now that does not give me any real insight until I turn that around to > > > be this: > > > > > > 1/2 + 1/3 + 1/6 = 1 > > > > > > Now the insights begin to flow. I see that to ever attain "perfectness > > > of number" > > > I need 50% as one factor. > > > > > > Then the major insight occurs, that the numerator is always going to > > > be odd > > > whereas the denominators are going to be a mix of odd and even. > > > > > > Now do many of you readers remember the proof of the square root of 2 > > > is > > > irrational and how we play around with even and odd in the proof? You > > > remember that > > > tussle back and forth of even and odd. > > > > > > Well in the proof that 1 is the only odd perfect number we have a sort > > > of deja vu all over > > > again with even and odd accounting. > > > > > > To be a perfect number such as 6, you need that 50% margin in one > > > divisor. You can > > > never have that 50% in a odd number. Take for example 15 > > > > > > 1/15 + 3/15 + 5/15 > > > > > > 1/15 + 1/5 + 1/3 > > > > > > So, in my proof in the early 1990s, what I was doing was saying that > > > if a Odd Perfect > > > number larger than 1 exists, it is a very strange number indeed > > > because it would have > > > to have a 50% factor and that would mean it would have to have a > > > denominator that was > > > even when denominators are odd for odd numbers. > > > > > > > So what I argued in my earlier 1990s proof that 1 is the only odd > > perfect number is that > > much the same as square root of 2 as rational is impossible since it > > then destroys the meaning of odd versus even factorability. > > > > In order to have a Odd Perfect Number larger than 1, would entail > > either one of these > > two impossible situations: > > > > (a) we have 1/3 + 1/3 + 1/3 > > or > > I was typing too fast, let me correct that. I should have included: > > 1/3 + 1/3combo + 1/3combo > > In the case of even perfect numbers we have always a 50% and then it > is just a matter of adding up the other 50% to get perfect so I wrote > 1/2 + 1/2combo for even perfect numbers > > But to get a perfect odd number we can never have the 50% so we must > have something like a > > 1/3 + 1/3combo + 1/3combo > I think I can shorten the proof by noting why that is impossible. > > Now I do remember a expert in this field reporting about what he > called, correct me if wrong, > about the surplus and deficit of numbers in contention for > perfectness. What he meant was that there are even numbers that are > below being perfect and then there are some that are > above perfectness, that they have more factors that they exceed 100%, > whereas perfect > numbers add up to 100%. And surprizingly this surplus and deficit > holds true for odd numbers > vying for perfectness. It seems strange that some odd numbers > summation exceeds 100%. > > So I am cognizant of that fact, in marshalling this proof together. > > So basically let me summarize at this moment. There cannot be a odd > perfect number > except 1, because to attain perfectness the accounting must end up > looking like this: > > 1/3 + 1/3combo + 1/3combo > > In the case of 45 we have: > > 1/45 + 3/45 + 15/45 + 5/45 + 9/45 for a total of 33/45 > > We have a 1/3 in that of 15/45 and we have one 1/3combo in that of > 1/45+5/45+9/45 > So in 45 we have 1/3 +1/3combo but no extra 1/3combo > > So perhaps I can shorten the proof by pointing out why no odd number > can be perfect, > except 1, because no odd number can add up to 1/3 + 1/3combo + > 1/3combo. And also > why this 1/3 has to be the unique adding up. > > I think the short answer is that you have to have 1/3 + 2/3combo and > it is the 2 in the > numerator that is never allowed to be a factor in odd numbers. > > So I suspect the entire proof of No Odd Perfect number hinges on that > 2 in the numerator > and why it is impossible for an Odd Perfect number except 1 > > > > > > (b) we have 1/2 + ( a combination equalling a sum of the other 1/2) > > > > Both those end up destroying the even versus odd factorability > > > > Now the question would be, why AP able to prove this and noone before, > since there > was no mistakes in Logic Structure as in Euclid's IP of indirect > method. Apparently a > proof of No Odd Perfect Number just took a clever sort of fellow. > Someone who can > disassemble a math problem into its simple basic underpinnings. > Yes, the above constitutes a proof of No Odd Perfect Numbers. One last detail I have to address is the uniqueness of the 1/3 +1/3combo +1/3combo form. It is not unique for there maybe a Odd Perfect Number candidate if we jump to the next series contender of 1/5 + 1/5combo + 1/5combo + 1/5combo + 1/5combo. And the next contender would be a 1/7 series but they all fail starting with the 1/3 series because they all require a even number in the numerator of 1/3 + 2/3combo or for 1/5 series we have 1/5 + 4/5combo So that covers the uniqueness and covers all the contenders. So in leaving, what is the impossibility of why No Odd Perfect Numbers can exist (other than 1) ? And the answer is that there is a fight, a tussle between even and odd, that in order to add up to 100% an odd number must be divisible by 2 and that is impossible. In order for any odd number with its factors adding up to reach 100% with no deficit and no surplus but exactly 100% means there was a 2 in the numerator and thus a 2 divides a odd number. P.S. really hard to fathom why these Perfect Numbers conjectures are the oldest unproven conjectures until now. I guess by superdeterminism, they were saved for me to do. Oxygen in me, oxygen of Plutonium, fill me with life anew, that I may love what thou dost love and do what thou has superdetermined to do. Archimedes Plutonium http://www.iw.net/~a_plutonium/ whole entire Universe is just one big atom where dots of the electron-dot-cloud are galaxies |