Publication Date:
2021-03-28
Description:
A repdigit is a positive integer that has only one distinct digit in its decimal expansion, i.e., a number of the form $$a(10^m-1)/9$$ a ( 10 m - 1 ) / 9 , for some $$mge 1$$ m ≥ 1 and $$1 le a le 9$$ 1 ≤ a ≤ 9 . Let $$left( P_n
ight) _{nge 0}$$ P n n ≥ 0 and $$left( E_n
ight) _{nge 0}$$ E n n ≥ 0 be the sequence of Padovan and Perrin numbers, respectively. This paper deals with repdigits that can be written as the products of consecutive Padovan or/and Perrin numbers.
Print ISSN:
2193-5343
Electronic ISSN:
2193-5351
Topics:
Mathematics
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