-448
domain: Z
Appears in sequences
- Expansion of Product (1 - x^k)^8 in powers of x.at n=25A000731
- Bisection of A002470.at n=4A002287
- Glaisher's function W(n).at n=8A002470
- Glaisher's function G(n) (18 squares version).at n=5A002609
- Triangle of coefficients of Euler polynomials 2^n*E_n(x) (exponents in increasing order).at n=34A004174
- Triangle of coefficients of Euler polynomials 2^n*E_n(x) (exponents in decreasing order).at n=29A004175
- Expansion of ( Sum_{n = -infinity..infinity} x^(n^2) )^(-6).at n=3A004407
- Triangle of coefficients of Chebyshev polynomials U_n(x).at n=23A008312
- Expansion of sin(sinh(x))*x.at n=4A009493
- Expansion of e.g.f. tan(sinh(x)*cos(x)), odd powers only.at n=3A009685
- cos(tanh(x)+tan(x))=1-4/2!*x^2+16/4!*x^4-448/6!*x^6+14592/8!*x^8...at n=3A013138
- Expansion of e.g.f.: exp(tan(x)-arctanh(x))=1-8/5!*x^5-448/7!*x^7-32384/9!*x^9+8064/10!*x^10...at n=7A013456
- Expansion of Product_{m>=1} (1+q^m)^(-4).at n=13A022599
- a(n) = 8^n - n^9.at n=2A024097
- Triangle of coefficients in expansion of sin(n*x) (or sin(n*x)/cos(x) if n is even) in ascending powers of sin(x).at n=50A028298
- Fourier coefficients of E_{0,4}.at n=3A035016
- Triangle read by rows of coefficients of Chebyshev's U(n,x) polynomials (exponents in increasing order).at n=42A053117
- Triangle of coefficients of Chebyshev's U(n,x) polynomials (exponents in decreasing order).at n=38A053118
- Matrix inverse of triangle A055140.at n=41A055141
- McKay-Thompson series of class 12e for Monster.at n=39A058493