-44
domain: Z
Appears in sequences
- The negative integers.at n=43A001478
- a(n) = -n.at n=44A001489
- Discriminants of Shapiro polynomials.at n=1A001782
- Numerators of coefficients of expansion of arctan(x)^2 = x^2 - 2/3*x^4 + 23/45*x^6 - 44/105*x^8 + 563/1575*x^10 - 3254/10395*x^12 + ...at n=4A002428
- Expansion of (Sum_{n=-inf..inf} x^(n^2))^(-22).at n=1A004423
- Percolation series for b.c.c. lattice.at n=4A006805
- Expansion of e.g.f.: sin(tanh(log(1+x))).at n=5A009519
- Expansion of the e.g.f. sin(x)*(1+x).at n=44A009531
- Expansion of sin(x)*exp(tanh(x)).at n=5A009544
- Expansion of sinh(x)*cos(tan(x)).at n=2A009620
- Expansion of tan(log(1+x))/exp(x).at n=4A009648
- Expansion of tanh(sin(log(1+x))).at n=5A009790
- Expansion of tanh(tanh(log(1+x))).at n=5A009820
- Expansion of Product_{k>=1} (1-x^k)^44.at n=1A010838
- a(n) = (2*n - 15)*n^2.at n=2A015247
- Zeroth row of infinite Latin square heading to -oo.at n=30A019585
- Expansion of Product_{m>=1} (1 - m*q^m)^2.at n=11A022662
- a(n) = 2 - n.at n=46A022958
- a(n) = 3-n.at n=47A022959
- a(n) = 4-n.at n=48A022960