-1008
domain: Z
Appears in sequences
- Expansion of 8-dimensional cusp form.at n=10A002408
- Magnetization series for face-centered cubic lattice.at n=21A003196
- Coefficients in expansion of Eisenstein series E_2 (also called E_1 or G_2).at n=20A006352
- Coefficients in expansion of Eisenstein series E_2 (also called E_1 or G_2).at n=41A006352
- Coefficients in expansion of Eisenstein series E_2 (also called E_1 or G_2).at n=26A006352
- From fundamental unit of Z[ (-n)^1/4 ].at n=30A006830
- McKay-Thompson series of class 6E for Monster (and, apart from signs, of class 12B).at n=23A007258
- Expansion of sin(log(1+x)^2).at n=7A009468
- Expansion of e.g.f. arcsinh(log(x+1)*log(x+1)).at n=7A012271
- sech(arcsin(x)*arcsin(x))=1-12/4!*x^4-240/6!*x^6-1008/8!*x^8...at n=4A012351
- sech(arctan(x)*arcsin(x))=1-12/4!*x^4+120/6!*x^6-1008/8!*x^8...at n=4A012443
- Expansion of e.g.f.: cosh(log(x+1)-tanh(x))=1+3/4!*x^4-40/5!*x^5+250/6!*x^6-1008/7!*x^7...at n=7A013291
- Expansion of e.g.f.: sec(log(x+1)-tanh(x))=1+3/4!*x^4-40/5!*x^5+250/6!*x^6-1008/7!*x^7...at n=7A013292
- a(n) = (17 - 2*n)*n^2.at n=12A015234
- a(n) = 2^n-n^5.at n=4A024015
- a(n) = 4^n - n^10.at n=2A024046
- McKay-Thompson series of class 6E for the Monster group with a(0) = 1.at n=23A045488
- Dirichlet inverse of sigma_3 function (A001158).at n=19A053825
- Triangle of coefficients, read by rows, where T(n,k) is the coefficient of x^n*y^k in f(x,y) that satisfies f(x,y) = 1/(1-x) - x^2/(1-x)^3 + xy*f(x,y)^3.at n=31A086632
- Expansion of a Schwarzian ({f_{32|8}, tau} / (4*Pi)^2) in powers of q^8.at n=1A092924