86400
domain: N
Appears in sequences
- Highly powerful numbers: numbers with record value of the product of the exponents in prime factorization (A005361).at n=24A005934
- Multiply successively by 1,1,2,2,3,3,4,4,..., n >= 1, a(0) = 1.at n=11A010551
- a(n) = n!*(n+1)!.at n=5A010790
- Theta series of 10-dimensional 2-modular lattice of minimal norm 2.at n=14A029545
- Product of consecutive factorials.at n=14A034882
- Triangle whose (i,j)-th entry is binomial(i,j)*10^(i-j)*12^j.at n=12A038314
- Triangle whose (i,j)-th entry is binomial(i,j)*12^(i-j)*10^j.at n=12A038336
- Number of seconds in the time units: second, minute, hour, day, week, month, year, century, millennium, (a)eon.at n=3A053401
- Products of distinct factorials.at n=24A058295
- Numbers n such that n! is a product of distinct factorials k!*l!*m!*... with k, l, m, etc. < n.at n=25A075082
- Coefficients in expansion of Eisenstein series -q*E'_2.at n=39A076835
- Symmetric triangle of certain normalized products of decreasing factorials.at n=30A090441
- Symmetric triangle of certain normalized products of decreasing factorials.at n=33A090441
- Coefficients of certain polynomials related to array A078740 ((3,2)-Stirling2).at n=19A091741
- a(n) = 2(m!)^2 for n = 2m and m!(m+1)! for n = 2m+1.at n=11A092186
- Triangle read by rows. First in a series of triangular arrays counting permutations of partitions.at n=48A092271
- In the triangle shown below the n-th row contains n rational numbers n/1, {n*(n-1)}/{n +(n-1)}, {(n)*(n-1)*(n-2)}/{n +(n-1)+(n-2)}, ..., the last term being 2*(n-1)!/(n+1). Sequence gives the numerators in each row.at n=51A093422
- Hook products of all partitions of 10.at n=33A093789
- Hook products of all partitions of 10.at n=32A093789
- Hook products of all partitions of 11.at n=29A093790