-9227465
domain: Z
Appears in sequences
- Expansion of x/(x^4-3*x^3+4*x^2-2*x+1).at n=34A051111
- Expansion of x/(x^4-3*x^3+4*x^2-2*x+1).at n=35A051111
- a(n) = (-1)^n * Fibonacci(2*n+1).at n=17A099496
- A transform of the Fibonacci numbers.at n=11A099843
- An inverse Catalan transform of Fibonacci(2n).at n=35A100334
- A transform of the Fibonacci numbers.at n=35A103311
- a(n+4) = a(n+3) - 2*a(n+2) - a(n+1) - a(n).at n=33A173343
- a(n)=(-1)^C(n+1,2)*(F(n+1)*(1+(-1)^n)/2+F(n+2)*(1-(-1)^n)/2).at n=33A178115
- a(n)=(-1)^C(n+1,2)*(F(n+1)*(1+(-1)^n)/2+F(n+2)*(1-(-1)^n)/2).at n=34A178115
- a(n) = (-1)^floor( (n-1) / 3 ) * F(n), where F = Fibonacci.at n=35A236191
- a(n) = Fibonacci(n) * A128834(n).at n=35A306637
- a(n) = F(n) * (-1)^(n*(n-1)/2) where F(n) = A000045(n) Fibonacci numbers.at n=35A333378