29631
domain: N
Appears in sequences
- From expansion of falling factorials.at n=13A005492
- Denominators of continued fraction convergents to sqrt(296).at n=7A041557
- Rotating digits of a(n)^2 right once still yields a square.at n=20A045877
- Numbers k such that k^3 is a cube whose digits occur with an equal minimum frequency of 2.at n=22A052051
- Integers that are Rhonda numbers to base 14.at n=3A100972
- Number of permutations of length n which avoid the patterns 1234, 2143, 3421.at n=30A116842
- Numbers n such that n^1+n+1, n^2+n+1, n^3+n+1 and n^4+n+1 are all prime.at n=20A219117
- Squarefree terms of A276655.at n=35A276756
- Expansion of (1 + x) * Product_{k>=1} 1/(1 - x^k)^k.at n=17A309267
- Indices n for which the partial sums of sin(k) (0 <= k <= n) reach a new minimum.at n=48A322288
- a(n) = 2*n^4/3 - 4*n^3/3 + 11*n^2/6 - 13*n/6 + 1.at n=15A345897
- G.f. A(x) satisfies: A(x) = 1 - x * A(x/(1 - x)^2) / (1 - x).at n=10A351658
- Integers k such that there exists an integer 0<m<k such that sigma(m)^2 + sigma(k)^2 = 2*(m+k)^2.at n=14A385008