99792
domain: N
Appears in sequences
- Expansion of theta series of E_7 lattice in powers of q^2.at n=14A004008
- a(n) = Sum_{k=0..n} (k+1) * A026681(n, k).at n=12A026990
- Nonzero coefficients in theta series of {E_7}* lattice.at n=28A030443
- Triangle read by rows: T(n, k) = [z^k] P(n, z) where P(n, z) = Sum_{k=0..n} binomial(n, k) * Pochhammer(n - k + c, k) * z^k / k! and c = 4.at n=50A062145
- Number of hands that peg n points in the "show" phase of 6-card cribbage.at n=1A066354
- a(n) = binomial(n+5, 5)*binomial(n+8, 5).at n=4A105940
- a(n) = binomial(n+4,4)*binomial(n+7,7).at n=5A107419
- a(n) = n^2*(2*n + 5).at n=36A163683
- Integers with exactly 100 divisors.at n=3A163816
- Least integer k such that the set of the divisors of k contains exactly n pairs of numbers having the following property: for each pair of two distinct divisors, the reversal of one is equal to the other.at n=10A260705
- Bi-unitary harmonic numbers.at n=25A286325
- a(n) = A289671(n)/2^f(n), where f(n) = 2*floor((n-1)/3) + ((n+2) mod 3) = A004523(n).at n=49A289677
- a(n) = A289677(3*n+2).at n=16A290440
- Numbers with no 0 digit that are divisible by the sum of any two of their digits at distinct positions.at n=51A308561
- Random walk in R^3: Denominators of the expected distance after n steps.at n=10A340003
- Numbers that are the sum of four third powers in exactly ten ways.at n=30A345156
- Number of cribs that score n points in 6-card cribbage.at n=1A346266
- Bi-unitary arithmetic numbers k whose mean bi-unitary divisor is a bi-unitary divisor of k.at n=13A361787
- a(n) is the least number with exactly n divisors of the form 5*k+1.at n=25A364586
- a(n) is the least number with exactly n divisors of the form 5*k+2.at n=26A364598