-130
domain: Z
Appears in sequences
- Expansion of (Product_{j>=1} (1-(-x)^j) - 1)^5 in powers of x.at n=23A001483
- Expansion of cosh(x)/cos(log(1+x)).at n=5A009180
- Expansion of Product_{k>=1} (1 - x^k)^13.at n=3A010820
- Expansion of e.g.f. arctan(sin(x)*log(x+1)).at n=6A012283
- Expansion of e.g.f.: tanh(sin(x)*log(x+1)).at n=6A012286
- arctan(sinh(x)*arctan(x))=2/2!*x^2-4/4!*x^4-130/6!*x^6+2200/8!*x^8...at n=3A012558
- tanh(sinh(x)*arctan(x))=2/2!*x^2-4/4!*x^4-130/6!*x^6+2200/8!*x^8...at n=2A012561
- arctan(arcsinh(x)*tan(x))=2/2!*x^2+4/4!*x^4-130/6!*x^6-6232/8!*x^8...at n=2A012614
- E.g.f.: tanh(arcsinh(x)*tan(x)) = 2/2!*x^2+4/4!*x^4-130/6!*x^6-6232/8!*x^8...at n=2A012617
- Expansion of Product_{m>=1} (1+q^m)^(-5).at n=7A022600
- Expansion of Product_{m>=1} (1+q^m)^(-10).at n=3A022605
- 10th differences of primes.at n=19A036271
- Triangle formed from expansion of (x-1)*(x+2)*(x-3)*...*(x+-n).at n=47A047991
- Sequence is defined by property that binomial transform of (a0,a1,a2,a3,...) = (a0,a0,a1,a1,a2,a2,a3,a3,...).at n=12A051165
- Coefficients of the '10th-order' mock theta function X(q).at n=71A053283
- Sum_{d=1..n} phi(d)*mu(d).at n=43A054585
- Sum_{d=1..n} phi(d)*mu(d).at n=45A054585
- Sum_{d=1..n} phi(d)*mu(d).at n=44A054585
- 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=22A056221
- Numbers k such that 36*k^2 + 12*k + 7 is prime (sorted by absolute values with negatives before positives).at n=42A056910