85272
domain: N
Appears in sequences
- Alkane (or paraffin) numbers l(10,n).at n=15A018211
- Numbers k such that the least term in the periodic part of the continued fraction for sqrt(k) is 73.at n=3A031751
- Number of reversible strings with n-1 beads of 2 colors. 7 beads are black. String is not palindromic.at n=14A032094
- Denominators of continued fraction convergents to sqrt(485).at n=3A041925
- Partial sums of A051740.at n=15A051877
- Normalized triangle of odd numbered entries of even numbered rows of Pascal's triangle A007318.at n=58A091043
- Numbers that can be expressed as the difference of the squares of primes in exactly nine distinct ways.at n=10A092005
- Seventh column (m=6) of (1,3)-Pascal triangle A095660.at n=15A095662
- Seventh column of (1,5)-Pascal triangle A096940.at n=14A096944
- Coefficients in a q-analog of the function [LambertW(-2x)/(-2x)]^(1/2), as a triangle read by rows.at n=44A152550
- Number of n-element subsets of [n+7] having an even sum.at n=15A282083
- Number of length-n ternary words having at most 5 palindromic subwords (including the empty word).at n=43A329023
- Array read by ascending antidiagonals. A(n, k) = k! * [x^k] log((1 - x) / (1 - 2*x)) / (1 - x)^n, for 0 <= k <= n.at n=51A355257
- Expansion of the e.g.f. log((1 - x) / (1 - 2*x)) / (1 - x)^3.at n=6A355372
- Triangle read by rows: T(n, k) = k*(n - k)*binomial(2*n+2, 2*k+1)/(4*n + 2) for 1 <= k <= n-1.at n=38A375853
- Triangle read by rows: T(n, k) = k*(n - k)*binomial(2*n+2, 2*k+1)/(4*n + 2) for 1 <= k <= n-1.at n=42A375853
- Square array A(n,k), n >= 0, k >= 0, read by antidiagonals downwards, where column k is the expansion of B(x)^k, where B(x) is the g.f. of A381570.at n=50A381569