14348908
domain: N
Appears in sequences
- a(n) = n^5 + 1.at n=28A002561
- a(n) = sigma_15(n), the sum of the 15th powers of the divisors of n.at n=2A013963
- Numerator of sum of -15th powers of divisors of n.at n=2A017693
- a(n) = 3^n + 1.at n=15A034472
- Sum of fifth powers of unitary divisors.at n=26A034679
- Numbers with two representations as cube + fifth power.at n=10A035046
- a(n) is the first term of the first run of exactly n non-perfect-powers.at n=35A087646
- Expansion of (1- 2*x - x^2)/((1-x)*(1-3*x)).at n=16A094388
- a(n) = 3^n + 1 - 0^n.at n=15A103457
- a(n) = 3^n - (-1)^n.at n=15A105723
- Pierpont 6-almost primes. 6-almost primes of form (2^K)*(3^L)+1.at n=0A111346
- a(n) = 2*A132357(n).at n=14A135263
- a(n) = 1 + 3^n * n^3.at n=9A168299
- Triangle T(n, k) = [x^k](p(x, n, q)) where p(x,n,q) = Product_{j=1..n} (x + q^j) + Product_{j=1..n} (x*q^j + 1), p(x, 0, q) = 1, and q = 3, read by rows.at n=15A173049
- Triangle T(n, k) = [x^k](p(x, n, q)) where p(x,n,q) = Product_{j=1..n} (x + q^j) + Product_{j=1..n} (x*q^j + 1), p(x, 0, q) = 1, and q = 3, read by rows.at n=20A173049
- a(n) = 3*9^n + 1.at n=7A199561
- Sums of two coprime positive cubes that are also sums of two coprime positive fifth powers.at n=2A228556
- a(n) is the smallest positive integer k such that 3^n+2 divides 3^(n+k)+2.at n=14A298827
- Expansion of 1/((1 - x) * ((1 - x)^3 + x^3)).at n=28A307395
- Expansion of 1/((1 - x) * ((1 - x)^3 + x^3)).at n=29A307395