24484
domain: N
Appears in sequences
- Numbers k such that the period of the continued fraction for sqrt(k) contains exactly 84 ones.at n=28A031852
- Sin(n) decreases monotonically to -1.at n=39A046964
- a(0)=1; a(n) is the smallest integer > a(n-1) such that sin(a(n)) is closer to an integer (here 0 or -1) than sin(a(n-1)).at n=38A079037
- a(1) = 1, and for each n >=2, a(n) is the smallest number such that 1/cos(a(n)) < 1/cos(k) for all k < n, so that 1/cos(a(1)) > 1/cos(a(2)) > ... > 1/cos(a(n)) > ...at n=38A172448
- Sequence A154695 adjusted to leading one:t(n,m)=A154695(n,m)-A154695(n,0)+1.at n=22A174674
- Sequence A154695 adjusted to leading one:t(n,m)=A154695(n,m)-A154695(n,0)+1.at n=26A174674
- Numbers k that end with ( sum of digits of k )^2.at n=32A270343
- a(n) = Sum_{k=0..n} ceiling(phi^k), where phi is the golden ratio (A001622).at n=19A279100
- Number of partitions of n such that the (sum of distinct even parts) < n/2.at n=38A284616
- Number of partitions of n such that the (sum of distinct even parts) <= n/2.at n=38A284617
- Number of unlabeled rooted trees with n nodes in which all outdegrees are either 0, 1, or 3.at n=18A298204
- a(n) = n * Sum_{d|n} binomial(d+n-1,n)/d.at n=8A343549