39193
domain: N
Appears in sequences
- Expansion of g.f. 1/((1-3*x)*(1-4*x)*(1-6*x)).at n=5A016765
- First location of palindrome a(n) in decimal expansion of Pi is palindromic.at n=23A038101
- Numbers that are palindromic, divisible by 11 and have an odd number of digits.at n=34A045571
- Largest palindromic substring in 6^n.at n=32A046264
- All palindromes of length greater than 1 in the decimal expansion of e, ordered by the ending position of the palindrome. Multiple terms ending at the same position are ordered by the starting position of the palindrome.at n=31A099052
- Palindromes for which the multiplicative digital root is a prime.at n=39A117059
- a(n) = 121*n^2 - 11.at n=17A158539
- Sequence defined by the recurrence formula a(n+1)=sum(a(p)*a(n-p)+k,p=0..n)+l for n>=1, with here a(0)=1, a(1)=1, k=0 and l=1.at n=10A176605
- First available increasing palindromes (A002113) found in the decimal expansion of the number e-2 (A001113).at n=5A226487
- Palindromes of length greater than 1 in decimal expansion of e (A001113).at n=31A226536
- Smallest number k with A355915(k) = n.at n=38A356792
- Zeroless analog of tribonacci numbers.at n=24A371911