cp's OEIS Frontend

This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.

A257659 Numbers that are not seventh powers, but can be written as the sum of the seventh powers of two or more of their prime factors.

Original entry on oeis.org

275223438741, 4561072096211306682, 9306119954843409393442022085025276
Offset: 1

Views

Author

Felix Fröhlich, Jul 26 2015

Keywords

Comments

From Robert Israel, Nov 02 2016: (Start)
Each term is the sum of the seventh powers of three or more of its prime factors (since the sum of seventh powers of two distinct primes would not be divisible by those primes).
It is possible that the three terms shown are just the smallest examples presently known - there may be smaller ones.
Other terms include the following (and these too may not be the next terms):
48174957112005843444270083236899591347874 = 2^7 + 1259^7 + 648383^7.
343628633008268493930426179988576850614546787655 = 5^7 + 97^7 + 6178313^7.
1556588247952374145751498792380776025975963817566087335 = 5^7 + 941^7 + 55174589^7.
6777869034345885139001456808449377853222864558972446987604 = 2^7 + 337^7 + 182635307^7.
8652931112104420195217156139788964690213217995925746635175635 = 5^7 + 29^7 + 507351601^7.
33684756195335243623428442147352712728560450053586233129585039130540009686445977 = 3^7 + 2731^7 + 229647602339^7.
4218418507660286246537768294375414778864666339784229288571328866079146694717894140 = 5^7 + 7^7 + 2677^7 + 457863123059^7.
(End)

Examples

			275223438741 is not a seventh power, i.e., not a term of A001015, but is equal to the product of prime numbers 3 * 23 * 43 * 92761523, and 3^7 + 23^7 + 43^7 = 275223438741, so 275223438741 is a term of the sequence.

References

  • J. M. De Koninck, Those Fascinating Numbers, American Mathematical Society, 2009, page 362, ISBN 978-0-8218-4807-4.

Links

Crossrefs

Cf. A001015, A092759.

Extensions

Edited by Robert Israel, Nov 02 2016

Started in 1964 by Neil J. A. Sloane | Maintained by The OEIS Foundation Inc.

Content is available under The OEIS End-User License Agreement.