1157625
domain: N
Appears in sequences
- a(n) = (4*n + 1)^3.at n=26A016815
- a(n) = (5*n)^3.at n=21A016851
- a(n) = (6*n + 3)^3.at n=17A016947
- a(n) = (7*n)^3.at n=15A016983
- a(n) = (8*n + 1)^3.at n=13A017079
- a(n) = (9*n + 6)^3.at n=11A017235
- a(n) = (10*n + 5)^3.at n=10A017331
- a(n) = (11*n + 6)^3.at n=9A017463
- a(n) = (12*n + 9)^3.at n=8A017631
- First diagonal of A027448.at n=7A027454
- First diagonal of A027518.at n=7A027525
- Cubes of lucky numbers.at n=23A032599
- a(1)=8; if n = Product p_i^e_i, n > 1, then a(n) = Product p_{i+1}^{e_i+2}.at n=29A045971
- Cubes whose digit sum is also a cube.at n=26A053058
- Cubes of triangular numbers: (n*(n+1)/2)^3.at n=13A059827
- Cubes of the form a^2 + b^3 with a, b > 0.at n=15A066648
- a(n+1) is the smallest cube > a(n) such that the digits of a(n) are all (with multiplicity) properly contained in the digits of a(n+1), with a(0)=1.at n=3A067972
- a(n+1) is the smallest cube > a(n) such that the digits of a(n) are all (with multiplicity) contained in the digits of a(n+1), with a(0)=1.at n=4A067974
- Cubes k such that k-1 is divisible by a cube >1.at n=23A088035
- Denominator of Sum_{k=0..n} 1/binomial(n,k)^3.at n=7A100519