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2018-01-22, 03:16
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#23 | |
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Romulan Interpreter
Jun 2011
Thailand
258B16 Posts |
Quote:
 Very nice! Man, you are good!
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2018-01-22, 09:20
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#24 |
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Just call me Henry
"David"
Sep 2007
Cambridge (GMT/BST)
23·3·5·72 Posts |
Very nice. Maybe someone should let numberphile know.
Also I believe papers have been published on less worthwhile subjects. |
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2018-01-23, 01:50
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#25 |
"Matthew Anderson"
Dec 2010
Oregon, USA
25×52 Posts |
I posted to the numberphile youtube page that this problem has been solved.
Regards, Matt |
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2018-01-23, 02:07
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#26 | |
"Forget I exist"
Jul 2009
Dumbassville
26×131 Posts |
Quote:
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2018-01-23, 21:59
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#27 | |
"Robert Gerbicz"
Oct 2005
Hungary
22×7×53 Posts |
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2018-03-16, 19:12
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#28 |
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Feb 2018
1 Posts |
How do you know that all sequences start with 1, and end with 8 (for even) or 3 (for odd)? Is there a proof?
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2018-03-17, 09:05
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#29 | |
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"Robert Gerbicz"
Oct 2005
Hungary
22·7·53 Posts |
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I"ve constructed all basic sequences that holds this, and then by induction we still maintain this. Note that all integers in [1,24] is free, because T(c,0) and T(c,1) doesn't use them. So we can use these small (1,3,8) integers at the endpoints. You could ask why we haven't used a shifted and reversed representation, so the sequences starts with 1,3 and 1,8; because in that case we don't know the last term of seq0 and seq1, so we can't glue the sequences. Or why we haven't used the constant 3 at the end for every sequence, because in that case 3=seq0(n)=seq1(n+1), but (n+1-n)=1 is odd so the parity position condition wouldn't be true. There are some traps here. Last fiddled with by R. Gerbicz on 2018-03-17 at 09:09 |
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