677707776
domain: N
Appears in sequences
- Composite palindromes with only palindromic prime factors whose sum is palindromic (counted with multiplicity).at n=27A046357
- a(1) = 1; a(n) = smallest palindrome which is a nontrivial product of n palindromes (repetitions allowed).at n=16A071277
- a(1) = 1; a(n) = smallest palindrome which is a nontrivial product of n palindromes (repetitions allowed).at n=17A071277
- a(1) = 1; a(n) = smallest palindrome which is a nontrivial product of n palindromes (repetitions allowed).at n=18A071277
- a(1) = 1; a(n) = smallest palindrome which is a nontrivial product of n palindromes (repetitions allowed).at n=19A071277
- Smallest palindrome with exactly n prime factors (counted with multiplicity).at n=20A076886
- Smallest palindrome divisible by an n-th power.at n=16A082613
- Near duplicate of A071277.at n=16A088114
- Near duplicate of A071277.at n=17A088114
- Near duplicate of A071277.at n=18A088114
- Near duplicate of A071277.at n=19A088114
- Smallest number m > 1 (not ending in a 0) such that m and the digit reversal of m have n prime factors (counted with multiplicity). Palindromes are included.at n=19A237913
- Smallest m such that m and reverse(m) each have n (not necessarily distinct) prime factors.at n=19A239697
- a(n) is the smallest positive palindromic number whose binary expansion ends in exactly n zeros, or 0 if no such number exists.at n=16A302864
- Least base-10 palindrome whose factorization includes an arbitrary number m of prime factors, with n <= m of them, all counted with multiplicity, being base-10 palindromes.at n=20A309565
- Palindromes setting a new record of their number of prime divisors A001222.at n=14A348050