0,5

Periodic with length 4^2=16.

a(n)=(1+floor(n/4)) mod 4.

a(n)=A010873(A002265(n+4)).

a(n)=1+floor(n/4)-4*floor((n+4)/16).

a(n)=(((n+4) mod 16)-(n mod 4))/4.

a(n)=((n+4-(n mod 4))/4) mod 4.

G.f. g(x)=(1+x+x^2+x^3+2x^4+2x^5+2x^6+2x^7+3x^8+3x^9+3x^10+3x^11)/(1-x^16).

G.f. g(x)=((1-x^4)*(1+2x^4+3x^8))/((1-x)(1-x^16)).

G.f. g(x)=(3x^16-4x^12+1)/((1-x)(1-x^4)(1-x^16)).

G.f. g(x)=(1+2x^4+3x^8)/((1-x)(1+x^4)(1+x^8)).

Cf. A000040, A133620-A133625, A133630, A133633-A133636.

Cf. A133884, A133880, A133890, A133900, A133910.

Sequence in context: A120425 A104186 A092363 this_sequence A053384 A069624 A092139

Adjacent sequences: A133871 A133872 A133873 this_sequence A133875 A133876 A133877

nonn

Hieronymus Fischer (Hieronymus.Fischer(AT)gmx.de), Oct 10 2007