Palindromes in Different Bases: A Conjecture of J. Ernest Wilkins
- Published in 2009
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We show that there exist exactly 203 positive integers $N$ such that for some integer $d \geq 2$ this number is a $d$-digit palindrome base 10 as well as a $d$-digit palindrome for some base $b$ different from 10. To be more precise, such $N$ range from 22 to 9986831781362631871386899.
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- PalindromesinDifferentBasesAConjectureofJErnestWilkins
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- date_added
- 2019-09-14
- date_published
- 2009-11-11
BibTeX entry
@article{PalindromesinDifferentBasesAConjectureofJErnestWilkins,
key = {PalindromesinDifferentBasesAConjectureofJErnestWilkins},
type = {article},
title = {Palindromes in Different Bases: A Conjecture of J. Ernest Wilkins},
author = {Edray Herber Goins},
abstract = {We show that there exist exactly 203 positive integers {\$}N{\$} such that for some
integer {\$}d \geq 2{\$} this number is a {\$}d{\$}-digit palindrome base 10 as well as a
{\$}d{\$}-digit palindrome for some base {\$}b{\$} different from 10. To be more precise,
such {\$}N{\$} range from 22 to 9986831781362631871386899.},
comment = {},
date_added = {2019-09-14},
date_published = {2009-11-11},
urls = {http://arxiv.org/abs/0909.5452v1,http://arxiv.org/pdf/0909.5452v1},
collections = {Easily explained,Fun maths facts,Integerology},
url = {http://arxiv.org/abs/0909.5452v1 http://arxiv.org/pdf/0909.5452v1},
year = 2009,
urldate = {2019-09-14},
archivePrefix = {arXiv},
eprint = {0909.5452},
primaryClass = {math.NT}
}