0,2

a(n) = A126890(n,3) for n>2. - Reinhard Zumkeller (reinhard.zumkeller(AT)gmail.com), Dec 30 2006

If X is an n-set and Y a fixed (n-4)-subset of X then a(n-3) is equal to the number of 2-subsets of X intersecting Y. - Milan R. Janjic (agnus(AT)blic.net), Aug 15 2007

A. H. Beiler, Recreations in the Theory of Numbers, Dover, N.Y., 1964, p. 193.

Milan Janjic, Two Enumerative Functions

G.f.(x)=x(4-3x)/(1-x)^3.

a(n)=C(n,2)-3*n,n>=7 - Zerinvary Lajos (zerinvarylajos(AT)yahoo.com), Nov 25 2006

Equals A028563/2 - Zerinvary Lajos (zerinvarylajos(AT)yahoo.com), Feb 12 2007

If we define f(n,i,a)=sum(binomial(n,k)*stirling1(n-k,i)*product(-a-j,j=0..k-1),k=0..n-i), then a(n) = -f(n,n-1,4), for n>=1. [From Milan R. Janjic (agnus(AT)blic.net), Dec 20 2008]

a(n)=n+a(n-1)+2 (with a(1)=0) [From Vincenzo Librandi (vincenzo.librandi(AT)tin.it), Nov 18 2009]

For n=2, a(2)=2+0+2=4; n=3, a(3)=3+4+2=9; a(4)=4+9+2=15 [From Vincenzo Librandi (vincenzo.librandi(AT)tin.it), Nov 18 2009]

a:=n->sum(floor(k+2*n/(k+n)), k=3..n): seq(a(n), n=2..53); - Zerinvary Lajos (zerinvarylajos(AT)yahoo.com), Oct 01 2006

[seq(binomial(n, 2)-3*n, n=7..58)]; - Zerinvary Lajos (zerinvarylajos(AT)yahoo.com), Nov 25 2006

a:=n->sum(n/2, j=8..n): seq(a(n), n=7..58); - Zerinvary Lajos (zerinvarylajos(AT)yahoo.com), Feb 12 2007

seq(sum(k-1, k=5..n), n=4..55); - Zerinvary Lajos (zerinvarylajos(AT)yahoo.com), Jan 28 2008

a:=n->sum(numer (k/(k+3)), k=4..n): seq(a(n), n=3..54); - Zerinvary Lajos (zerinvarylajos(AT)yahoo.com), May 31 2008

with (combinat):seq((fibonacci(3, n)+n-13)/2, n=3..54); - Zerinvary Lajos (zerinvarylajos(AT)yahoo.com), Jun 07 2008

lst={}; Do[AppendTo[lst, n*(n+7)/2], {n, 0, 5!}]; lst ...and/or... s=0; lst={s}; Do[s+=n+1; AppendTo[lst, s], {n, 3, 5!}]; lst [From Vladimir Orlovsky (4vladimir(AT)gmail.com), Oct 25 2008]

Equals A000217(n+3)-6. Cf. A000096, A055998, A074171.

Third column (m=2) of (1, 4)-Pascal triangle A095666.

Cf. A000096, A055998, A056000, A001477.

Cf. A002522.

Sequence in context: A073046 A066495 A134227 this_sequence A022945 A022443 A079423

Adjacent sequences: A055996 A055997 A055998 this_sequence A056000 A056001 A056002

easy,nonn,new

Barry E. Williams, Jun 16 2000

More terms from James A. Sellers (sellersj(AT)math.psu.edu), Jul 04 2000