-603
domain: Z
Appears in sequences
- McKay-Thompson series of class 6E for Monster (and, apart from signs, of class 12B).at n=24A007258
- McKay-Thompson series of class 6E for the Monster group with a(0) = 1.at n=24A045488
- McKay-Thompson series of class 6E for the Monster group with a(0) = 3.at n=24A105559
- McKay-Thompson series of class 12B for the Monster group.at n=24A112148
- Expansion of b(q^3)b(q^2)^2/(b(q)b(q^6)^2) in powers of q where b(q) is a cubic AGM function.at n=23A122831
- McKay-Thompson series of class 6E for the Monster group with a(0) = -5.at n=24A128632
- McKay-Thompson series of class 6E for the Monster group with a(0) = 4.at n=24A128633
- Sign weighted matrices n X n:example {{2 w[2], w[0], w[1]}, {3 w[0], 2 w[1], w[2]}, {3 w[1], 3 w[2], 2 w[0]}} are made into monomials using w[n]=1 if n<>0, x if n==0. The coefficients of the monomials form a triangular sequence.at n=25A140326
- Expansion of b(q) / b(q^2) in powers of q where b() is a cubic AGM theta function.at n=23A141094
- Expansion of 3*x*(3*x+1)*(2*x-1) / ( (1+x)*(3*x^2+1) ).at n=8A143769
- Omit first term from A160534 and divide by 7.at n=64A160535
- First column of A174295.at n=12A174297
- McKay-Thompson series of class 12B for the Monster group with a(0) = 5.at n=24A187146
- McKay-Thompson series of class 12B for the Monster group with a(0) = -4.at n=24A187147
- McKay-Thompson series of class 12B for the Monster group with a(0) = -3.at n=24A187148
- McKay-Thompson series of class 6E for the Monster group with a(0) = 7.at n=24A258094
- First differences of number of active (ON, black) cells in n-th stage of growth of two-dimensional cellular automaton defined by "Rule 347", based on the 5-celled von Neumann neighborhood.at n=13A271300
- First differences of number of active (ON, black) cells in n-th stage of growth of two-dimensional cellular automaton defined by "Rule 361", based on the 5-celled von Neumann neighborhood.at n=15A271417
- Expansion of f(-x) * f(-x^2)^4 / phi(x^2) in powers of x where phi(), f() are Ramanujan theta functions.at n=22A275372
- Expansion of Product_{k>0} 1/(1 + x^k)^(k*3).at n=15A279031