|
| |
|
|
A057813
|
|
a(n) = (2*n+1)*(4*n^2+4*n+3)/3.
|
|
23
|
|
|
|
1, 11, 45, 119, 249, 451, 741, 1135, 1649, 2299, 3101, 4071, 5225, 6579, 8149, 9951, 12001, 14315, 16909, 19799, 23001, 26531, 30405, 34639, 39249, 44251, 49661, 55495, 61769, 68499, 75701, 83391, 91585, 100299, 109549, 119351, 129721, 140675, 152229, 164399
(list;
graph;
refs;
listen;
history;
text;
internal format)
|
|
|
|
OFFSET
|
0,2
|
|
|
COMMENTS
|
For n>0, 30*a(n) is the sum of the ten distinct products of 2*n-1, 2*n+1, and 2*n+3. For example, when n = 1, we sum the ten distinct products of 1, 3, and 5: 1*1*1 + 1*1*3 + 1*1*5 + 1*3*3 + 1*3*5 + 1*5*5 + 3*3*3 + 3*3*5 + 3*5*5 + 5*5*5 = 330 = 30*11 = 30*a(1). -J. M. Bergot,Apr 06 2014
|
|
|
LINKS
|
|
|
|
FORMULA
|
G.f. for sequence with interpolated zeros: 1/(8*x)*sinh(8*arctanh(x)) = 1/(16*x)*( ((1 + x)/(1 - x))^4 - ((1 - x)/(1 + x))^4 ) = 1 + 11*x^2 + 45*x^4 + 119*x^6 +.... Cf.A019560.-Peter Bala,Apr 07 2017
E.g.f.: (3 + 30*x + 36*x^2 + 8*x^3)*exp(x)/3. -G. C. Greubel,Dec 01 2017
12*a(n) = (2*n + 1)*(a(n + 1) - a(n - 1)).
Sum_{n >= 0} (-1)^n/(a(n)*a(n+1)) = 3*Pi/16 - 1/2. Cf.A016754andA336266.(End)
|
|
|
MAPLE
|
|
|
|
MATHEMATICA
|
Table[(2*n + 1)*(4*n^2 + 4*n + 3)/3, {n, 0, 50}] (*David Nacin,Mar 01 2012 *)
|
|
|
PROG
|
(PARI) P(x, y, z) = x^3 + x^2*y + x^2*z + x*y^2 + x*y*z + x*z^2 + y^3 + y^2*z + y*z^2 + z^3;
|
|
|
CROSSREFS
|
1/12*t*(2*n^3-3*n^2+n)+2*n-1 for t = 2, 4, 6,... givesA049480,A005894,A063488,A001845,A063489,A005898,A063490,A057813,A063491,A005902,A063492,A005917,A063493,A063494,A063495,A063496.
|
|
|
KEYWORD
|
nonn,easy
|
|
|
AUTHOR
|
|
|
|
STATUS
|
approved
|
| |
|
|
