You could also use any number to the first power to get 1, which makes it far less cool. [Sorry, but I ruined it for myself, and I’d rather not be alone right now.]
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Any number to the zeroeth power*
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But also consider these numbers: 536271908. They are the Social Security number of the great mathematician Yevgeny Marsupian (1896-1970) who found that any large number is made up of smaller numbers ad infinitum (“a long way”.) He was never published in his lifetime. Less so now.
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Do "never" and "less so" have additional meanings as math terms?
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Nice but obviously completely base-dependent. Only trivial solutions in binary and base_3, but more frequent in higher bases, e.g. octal:67,20356,133326; base_13:14,69,BC,166,176,207,308,A4C,A9C,89A3C,29031A; hex:26,6A,EF,3FEAC
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Is there a polynominal solution to find these numbers?
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@enginbilgic123
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Uğraşıp bunu bulan işsizdir
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@debovelles je trouve ca tellement stylee mdrThanks. Twitter will use this to make your timeline better. UndoUndo
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I think it is fascinated that there are numbers with this property that have1,2,3,4 and 7 digits but there are gaps in the 5 to 6 digits and the 8 to 19 digits range. :)
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