59895
domain: N
Appears in sequences
- a(n) = (2*n - 11)*n^2.at n=33A015245
- Palindromes with exactly 6 prime factors (counted with multiplicity).at n=31A046332
- Composite palindromes with only palindromic prime factors whose sum is palindromic (counted with multiplicity).at n=18A046357
- Palindromes with exactly 6 palindromic prime factors (counted with multiplicity).at n=3A046380
- a(n) = smallest palindrome > a(n-1) such that a(1)*a(2)*...*a(n) + 1 is prime with a(1) = 2.at n=37A051896
- Palindromes n such that n and n^2 have same digit sum.at n=16A058852
- Partition the nonnegative integers into minimal groups whose sums are palindromes; this sequence gives the sums.at n=38A072482
- a(n) = 11*a(n-1) - 22*a(n-2), a(0)=0, a(1)=1.at n=6A190870
- Numbers k such that the sum of prime factors of k (counted with multiplicity) equals four times the largest prime divisor of k.at n=35A212862
- Numbers k such that k*product_of_digits(k) is a nonzero cube.at n=12A229544
- Numbers k with property that k is the least logarithmically smooth numbers (meaning largest prime factor of k is less than log(k)) having squarefree kernel equal to squarefree kernel of k.at n=15A333961