33336
domain: N
Appears in sequences
- Numbers having four 3's in base 10.at n=17A043504
- Periodic points under the map A053392 that adds consecutive pairs of digits and concatenates them.at n=30A053393
- Lunar fourth powers: n*n*n*n, where * is lunar multiplication.at n=36A087051
- Numbers k such that 2^k + k^3 + 1 is prime.at n=19A100358
- Numbers k such that k^2 is the concatenation of two numbers m and 8*m.at n=8A115550
- Numbers k such that the k-th triangular number contains only digits {1,5,6}.at n=29A119133
- Number of cells in columns 1 and 2 of all deco polyominoes of height n. A deco polyomino is a directed column-convex polyomino in which the height, measured along the diagonal, is attained only in the last column.at n=6A121584
- Derived from the centered polygonal numbers: start with the first triangular number, then the sum of the first square number and the second triangular number, then the sum of first pentagonal number, the second square number and the third triangular number, and so on and so on...at n=27A141534
- Number of reduced 3 X 3 semimagic squares with magic sum n.at n=24A173728
- Number of 0..n arrays x(0..3) of 4 elements without any two consecutive increases or two consecutive decreases.at n=14A200839
- G.f.: 1/(1 - x/(1 - x^4/(1 - x^7/(1 - x^10/(1 - x^13/(1 - x^16/(1 -...- x^(3*n-2)/(1 -...)))))))), a continued fraction.at n=34A206737
- Number of compositions (ordered partitions) of n into 2 or more distinct nonnegative parts.at n=23A216708
- Positive numbers with nondecreasing digits such that sum of cubes of the digits equals the square of the sum of the digits.at n=11A227072
- For k in {2,3,...,9} define a sequence as follows: a(0)=0; for n>=0, a(n+1)=a(n)+1, unless a(n) ends in k, in which case a(n+1) is obtained by replacing the last digit of a(n) with the digit(s) of k^2. This is k(6).at n=10A237343
- Numbers n with digits 3 and 6 only.at n=31A284633
- Multiples of 1852.at n=18A303272
- Numbers with no 0 digit that are divisible by the sum of any two of their digits at distinct positions.at n=42A308561
- Number of integer partitions of n whose multiplicities have multiplicities that cover an initial interval of positive integers.at n=44A325330
- Numbers whose square starts with exactly 4 identical digits.at n=34A346940