-210

Appears in sequences

• G.f.: q * Product_{m>=1} (1-q^m)^8*(1-q^2m)^8.at n=5A002288
• Percolation series for directed square lattice.at n=9A006461
• Unique attractor for (RIGHT then MOBIUS) transform.at n=53A007554
• Expansion of cos(sin(x)*log(1+x)).at n=6A009049
• Expansion of e.g.f.: sech(sin(x)*log(x+1)).at n=6A012289
• cos(arcsinh(x)*log(x+1))=1-12/4!*x^4+60/5!*x^5-210/6!*x^6+1260/7!*x^7...at n=6A012577
• Expansion of e.g.f.: sech(arcsinh(x)*log(x+1))=1-12/4!*x^4+60/5!*x^5-210/6!*x^6...at n=6A012583
• Expansion of Product_{m>=1} (1 - m*q^m)^2.at n=21A022662
• Expansion of Product_{m>=1} 1/(1 + m*q^m)^6.at n=7A022698
• Expansion of Product_{m>=1} (1+m*q^m)^-14.at n=3A022706
• Generalized Stirling number triangle of first kind.at n=26A048176
• Generalized Stirling number triangle of first kind.at n=6A049460
• Start with 0, run through primes >=5, adding if -1 mod 6, subtracting if +1 mod 6.at n=36A051356
• Coefficients of the '3rd-order' mock theta function nu(q).at n=41A053254
• Coefficients of the '6th-order' mock theta function psi(q).at n=44A053269
• Regard triangle of rencontres numbers (see A008290) as infinite matrix, compute inverse, read by rows.at n=40A055137
• n - reversal of hexadecimal (base 16) digits of n (written in base 10).at n=31A055965
• Image of primes (A000040) under "little Hankel" transform that sends [c_0, c_1, ...] to [d_0, d_1, ...] where d_n = c_n^2 - c_{n+1}*c_{n-1}.at n=27A056221
• Low-temperature magnetization expansion for square lattice (Potts model, q=3).at n=10A057374
• McKay-Thompson series of class 24f for Monster.at n=21A058589