-1792
domain: Z
Appears in sequences
- Expansion of 8-dimensional cusp form.at n=12A002408
- Triangle of coefficients of Chebyshev polynomials U_n(x).at n=38A008312
- Expansion of e.g.f. cos(sinh(x))/exp(x).at n=9A009059
- Expansion of exp(tanh(x))/exp(x).at n=8A009266
- Expansion of e.g.f.: exp(tan(x)-arctan(x))=1+4/3!*x^3-8/5!*x^5+160/6!*x^6+992/7!*x^7...at n=8A013440
- cosh(tan(x)-arctan(x))=1+160/6!*x^6-1792/8!*x^8+484224/10!*x^10...at n=4A013446
- sec(tan(x)-arctan(x))=1+160/6!*x^6-1792/8!*x^8+484224/10!*x^10...at n=4A013447
- Expansion of Product_{m>=1} (1-m*q^m)^28.at n=3A022688
- Expansion of Product_{m>=1} ((1+q^(2*m-1))/(1+q^(2*m)))^7.at n=12A029844
- a(n) = A048106(A001405(n)).at n=53A048244
- Triangle read by rows of coefficients of Chebyshev's U(n,x) polynomials (exponents in increasing order).at n=71A053117
- Triangle of coefficients of Chebyshev's U(n,x) polynomials (exponents in decreasing order).at n=72A053118
- Triangle T(n,k) of coefficients relating to Bezier curve continuity.at n=39A065109
- Triangular array read by rows, giving coefficients of P(n,X) = Product_{i=1..2n+1} (X - 1/cos(Pi*k/(2n+1))), a polynomial with integer coefficients.at n=35A075613
- Triangular array read by rows, giving coefficients of P(n,X) = Product_{i=1..2n+1} (X - 1/cos(Pi*k/(2n+1))), a polynomial with integer coefficients.at n=34A075613
- Skew triangle associated to the Euler numbers.at n=41A117411
- Triangle related to exp(x)*cos(2*x).at n=38A117435
- Triangle T(n, k) = binomial(2*n-k, k)*(-4)^(n-k), read by rows.at n=17A117438
- Row sums of triangle A118438.at n=8A118440
- Coefficients for obtaining A120057 from Bell numbers.at n=41A120058