-2147483648
domain: Z
Appears in sequences
- Even entries (A048967) minus the odd entries (A001316) in row n of Pascal's triangle (A007318).at n=31A085814
- Expansion of (1+4x-24x^2)/((1-4x)(1+4x)).at n=16A091095
- Expansion of (1-2*x)/(1-8*x^2).at n=21A094014
- Expansion of g.f. (1+x)/(1+2*x+4*x^2).at n=32A104537
- Row sums of triangle A118435.at n=21A118437
- Hankel transform of Sum_{k=0..floor(n/2)} binomial(2*k, k).at n=31A120582
- Powers of -2: a(n) = (-2)^n.at n=31A122803
- Expansion of (1+3*x)/(1+2*x).at n=32A123344
- Expansion of (1-4*x)/(1-2*x+4*x^2).at n=31A128018
- Expansion of (1-x)/(1 - 2*x + 4*x^2).at n=32A138230
- Inverse binomial transform of A001651.at n=33A141531
- Inverse binomial transform of A070366.at n=32A146321
- a(n) = A154570(n) + A154570(n+1).at n=32A154589
- The least significant four bytes of n! interpreted in two's complement.at n=32A289282
- The least significant four bytes of n! interpreted in two's complement.at n=33A289282