-59
domain: Z
Appears in sequences
- The negative integers.at n=58A001478
- a(n) = -n.at n=59A001489
- Expansion of e.g.f: (1+x)*cos(x).at n=59A009001
- Expansion of sinh(x)*cos(log(1+x)).at n=5A009618
- Expansion of tan(log(1+log(1+x))).at n=4A009636
- Zeroth row of infinite Latin square heading to -oo.at n=40A019585
- a(n) = Sum_{k=1..n} (-1)^k*k*floor(n/k).at n=64A024919
- Discriminant of lattice A_n of determinant n+1.at n=58A030640
- Discriminants of quadratic number fields Q(sqrt -n) for n squarefree.at n=36A033197
- a(n) = n*(-1)^n.at n=59A038608
- Matrix 5th power of inverse partition triangle A038498.at n=55A050308
- Matrix 6th power of inverse partition triangle A038498.at n=56A050309
- Coefficients of the '5th-order' mock theta function f_1(q).at n=77A053257
- Coefficients of the '6th-order' mock theta function gamma(q).at n=59A053274
- Smallest (in magnitude) nonzero number m such that n!+m is prime.at n=48A053714
- Smallest (in magnitude) nonzero number m such that n!+m is prime.at n=52A053714
- a(n) = Sum_{d|2n+1} phi(d)*mu(d).at n=30A054586
- a(n) = n * mu(n), where mu is the Möbius function A008683.at n=58A055615
- McKay-Thompson series of class 33A for Monster.at n=46A058636
- a(n) = bin_prime_sum(fibonacci(A001651[n])), where fibonacci(A001651[n]) is A014437[n].at n=59A059878