157464
domain: N
Appears in sequences
- a(n) = 8*3^n.at n=9A005051
- A traffic light problem: expansion of 2/(1 - 3*x)^3.at n=7A006043
- MU-numbers: next term is uniquely the product of 2 earlier terms.at n=37A007335
- Product of the proper divisors of n.at n=53A007956
- Even cubes: a(n) = (2*n)^3.at n=27A016743
- a(n) = (3*n)^3.at n=18A016767
- a(n) = (4n+2)^3.at n=13A016827
- a(n) = (5n + 4)^3.at n=10A016899
- a(n) = (6*n)^3.at n=9A016911
- a(n) = (7*n + 5)^3.at n=7A017043
- a(n) = (8*n + 6)^3.at n=6A017139
- a(n) = (9*n)^3.at n=6A017163
- a(n) = (10*n + 4)^3.at n=5A017319
- a(n) = (11*n + 10)^3.at n=4A017511
- a(n) = (12*n + 6)^3.at n=4A017595
- Numbers of form 3^i*8^j, with i, j >= 0.at n=40A025615
- Numbers of form 6^i*9^j, with i, j >= 0.at n=24A025628
- a(n) = number of (s(0), s(1), ..., s(n)) such that every s(i) is an integer, s(0) = 0, |s(i) - s(i-1)| = 1 for i = 1,2,3; |s(i) - s(i-1)| <= 1 for i >= 4. Also a(n) = sum of numbers in row n+1 of the array T defined in A026082 and a(n) = 24*3^(n-4) for n >= 4.at n=12A026097
- Cubes k such that digits of cube root of k appear in k.at n=22A029777
- Cubes with property that all even digits occur together and all odd digits occur together.at n=26A030479