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2013-03-17, 18:38
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#1 |
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Mar 2013
3 Posts |
About Odd Pefect Numbers
If all perfect numbers are the sum of consecutive powers of 2, why does anyone think that there could be an odd perfect number?
Can someone explain this please? |
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2013-03-17, 18:46
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#2 | |
"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
2·47·101 Posts |
Quote:
Did you read Mathworld and wiki (see chapters about even and odd perfect numbers) before asking? |
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2013-03-17, 18:56
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#3 |
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Mar 2013
3 Posts |
Yes, but nothing I've read addresses the fact that perfect numbers are the sums of consecutive powers of 2. I find it extremely unlikely that I'm the first to discover that, so I'm simply wondering why there is still speculation about the existence of odd perfect numbers.
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2013-03-17, 19:04
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#4 | |
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"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
949410 Posts |
Oh. No, you didn't discover that.
What you are saying is that a sum of consecutive powers of 2 = (a power of 2 minus 1) times (a power of 2). That is obvious. After you will see this equality, continue reading about even perfect numbers. From the word "Euclid..." Quote:
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2013-03-17, 19:13
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#5 | |
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Mar 2013
3 Posts |
Quote:
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2013-03-18, 04:55
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#6 |
"Bill Staffen"
Jan 2013
Pittsburgh, PA, USA
23·53 Posts |
I think Batalov is simply saying that just because the consecutive powers of 2 are PNs, that doesn't mean that all PNs are consecutive powers of 2. Only that the consecutive powers of 2 are currently the only known category of perfect numbers. Just because we know a way to form a perfect number doesn't prove that there are not other ways.
Last fiddled with by Aramis Wyler on 2013-03-18 at 04:56 |
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2013-03-18, 06:06
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#7 |
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Basketry That Evening!
"Bunslow the Bold"
Jun 2011
40<A<43 -89<O<-88
3×29×83 Posts |
Yes, that is correct, but:
the main takeaway here is that we can prove that all PNs that are even by assumption can be written as sums of powers of twos (when and only when a certain Mersenne number is prime). But since this proof requires evenness as an assumption, it says nothing about the existence or form of odd PNs. (This is very clearly a much harder subject, having withstood centuries of mathematicians' concerted effort on the matter.) Last fiddled with by Dubslow on 2013-03-18 at 06:06 Reason: more precise italics |
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2013-03-18, 06:22
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#8 | |
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Romulan Interpreter
Jun 2011
Thailand
32·29·37 Posts |
Quote:
Unfortunately this shades no light on the "odd" side, and generally, nothing from the "even" can be applied to the "odd" side, therefore we have no idea if there are any odd perfect numbers or not. Most probably there are none. But who knows? Big numbers are full of surprises. edit: crosspost with Dubslow, sorry Last fiddled with by LaurV on 2013-03-18 at 06:25 |
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