14658

Properties

Appears in sequences

• Numbers that are the sum of 8 nonzero 8th powers.at n=23A003386
• Expansion of Molien series for 8-dimensional real Clifford group 2^{1+6}.Alt_8.2 of genus 3 and order 5160960.at n=50A024186
• Numbers k such that k and 5*k, taken together, are pandigital.at n=5A115925
• Triangle, read by rows, where the g.f. of column k, C_k(x), is defined by the recurrence: C_k(x) = [ 1 + Sum_{n>=k+1} C_n(x)*x^(n-k) ]^(k+1) for k>=0.at n=30A127126
• Column 2 of triangle A127126.at n=5A127129
• Table of the elementary symmetric functions a_k(1,2,4,5,...,n+1).at n=48A196842
• Number of (n+2) X 3 binary arrays avoiding patterns 001 and 110 in rows, columns and nw-to-se diagonals.at n=23A202440
• Number T(n,k) of permutations of [n] with exactly k (possibly overlapping) occurrences of some of the consecutive patterns 123, 1432, 2431, 3421; triangle T(n,k), n>=0, 0<=k<=max(0,n-2), read by rows.at n=24A231210
• Number of permutations of [n] with exactly one occurrence of one of the consecutive patterns 123, 1432, 2431, 3421.at n=8A231228
• Number of partitions p = [x(1), ..., x(k)], where x(1) >= x(2) >= ... >= x(k), of n such that min(x(i) - x(i-1)) is not a part of p.at n=35A241761
• Numbers k with the property that p = k^2 - 13 and q = k^2 + 13 are consecutive primes.at n=33A248785
• Numbers n such that Bernoulli number B_{n} has denominator 1806.at n=22A272139
• Sum of 4th powers of proper divisors of n.at n=21A279363
• Inverse of A304755: if A304755(k) = n, a(n) = k, or 0 if n does not occur in A304755.at n=22A304756