32223
domain: N
Appears in sequences
- Numbers that are palindromic in bases 2 and 10.at n=14A007632
- Palindromes of form k^2 + k + 3.at n=9A027715
- Lucky numbers that are both palindromic and nonprime.at n=39A031880
- The number phi_3(n) of Frobenius partitions that allow up to 3 repetitions of an integer in a row.at n=26A053992
- Numbers that are palindromic in base 2 as well as in base 10 (initial zeros may be prepended).at n=46A069024
- Palindromes whose sum of anti-divisors is palindromic.at n=14A073956
- Smallest multiple of n which begins with R(n) and ends in n where R(n) (A004086) is the digit reversal of n. Suitable number of zeros are assumed to the left of the MSD if required.at n=22A077741
- Numbers k such that the "inventory" A063850 of k is a palindrome.at n=21A079466
- Numbers such that RevBinary() = RevDecimal(), where RevDecimal(n) is the decimal reversal of n (A004086) and RevBinary(n) is the binary reversal of n (A030101).at n=20A081434
- Smallest palindromic multiple of (n with trailing 0's omitted, A004151) using only nonzero digits of n; all digits must appear; or 0 if no such number exists.at n=22A083960
- Smallest palindromic multiple of n in which n is a substring (anywhere), or 0 if n = 10k or no such number exists.at n=22A084044
- Palindromes in which the sum of the internal digits = the sum of the external digits.at n=20A088285
- Palindromic in bases 10 and 32.at n=26A099165
- G.f. A(x) satisfies A(x) = 1 + x*A(-x)^3.at n=9A143046
- Number of walks within N^3 (the first octant of Z^3) starting at (0,0,0) and consisting of n steps taken from {(-1, -1, 1), (0, 0, 1), (0, 1, -1), (1, 0, -1), (1, 1, 0)}.at n=8A150463
- Decimal representation of the reverted binary representation of n followed by digits substitution 0->2, 1->3.at n=17A176892
- Increase each digit in the binary representation of n by 2.at n=17A176894
- List of primitive words over the alphabet {2,3}.at n=38A213971
- Palindromic composite numbers starting with a digit 3.at n=32A222726
- Products of 3 evil primes (A027699) p,q,r, such that numbers p*q, p*r, q*r, and p*q*r are odious (A000069).at n=36A230353