A309547 - OEIS

%I #9 Sep 14 2019 16:50:35

%S 0,0,0,0,0,0,2,4,12,18,38,48,80,102,164,206,302,374,522,632,856,1014,

%T 1326,1564,1988,2324,2904,3358,4114,4716,5700,6486,7734,8756,10322,

%U 11612,13544,15152,17534,19526,22414,24846,28310,31258,35394,38926,43822,48034

%N Sum of the even parts in the partitions of n into 5 parts.

%H <a href="/index/Par#part">Index entries for sequences related to partitions</a>

%F a(n) = Sum_{l=1..floor(n/5)} Sum_{k=l..floor((n-1)/4)} Sum_{j=k..floor((n-k-l)/3)} Sum_{i=j..floor((n-j-k-l)/2)} (i * ((i-1) mod 2) + j * ((j-1) mod 2) + k * ((k-1) mod 2) + l * ((l-1) mod 2) + (n-i-j-k-l) * ((n-i-j-k-l-1) mod 2)).

%e The partitions of n into 5 parts for n = 10, 11, ..

%e                                                        1+1+1+1+10

%e                                                         1+1+1+2+9

%e                                                         1+1+1+3+8

%e                                                         1+1+1+4+7

%e                                                         1+1+1+5+6

%e                                             1+1+1+1+9   1+1+2+2+8

%e                                             1+1+1+2+8   1+1+2+3+7

%e                                             1+1+1+3+7   1+1+2+4+6

%e                                             1+1+1+4+6   1+1+2+5+5

%e                                             1+1+1+5+5   1+1+3+3+6

%e                                 1+1+1+1+8   1+1+2+2+7   1+1+3+4+5

%e                                 1+1+1+2+7   1+1+2+3+6   1+1+4+4+4

%e                                 1+1+1+3+6   1+1+2+4+5   1+2+2+2+7

%e                     1+1+1+1+7   1+1+1+4+5   1+1+3+3+5   1+2+2+3+6

%e                     1+1+1+2+6   1+1+2+2+6   1+1+3+4+4   1+2+2+4+5

%e                     1+1+1+3+5   1+1+2+3+5   1+2+2+2+6   1+2+3+3+5

%e         1+1+1+1+6   1+1+1+4+4   1+1+2+4+4   1+2+2+3+5   1+2+3+4+4

%e         1+1+1+2+5   1+1+2+2+5   1+1+3+3+4   1+2+2+4+4   1+3+3+3+4

%e         1+1+1+3+4   1+1+2+3+4   1+2+2+2+5   1+2+3+3+4   2+2+2+2+6

%e         1+1+2+2+4   1+1+3+3+3   1+2+2+3+4   1+3+3+3+3   2+2+2+3+5

%e         1+1+2+3+3   1+2+2+2+4   1+2+3+3+3   2+2+2+2+5   2+2+2+4+4

%e         1+2+2+2+3   1+2+2+3+3   2+2+2+2+4   2+2+2+3+4   2+2+3+3+4

%e         2+2+2+2+2   2+2+2+2+3   2+2+2+3+3   2+2+3+3+3   2+3+3+3+3

%e --------------------------------------------------------------------------

%e   n  |     10          11          12          13          14        ...

%e --------------------------------------------------------------------------

%e a(n) |     38          48          80         102         164        ...

%e --------------------------------------------------------------------------

%e - _Wesley Ivan Hurt_, Sep 12 2019

%t Table[Sum[Sum[Sum[Sum[i * Mod[i - 1, 2] + j * Mod[j - 1, 2] + k * Mod[k - 1, 2] + l * Mod[l - 1, 2] + (n - i - j - k - l) * Mod[n - i - j - k - l - 1, 2], {i, j, Floor[(n - j - k - l)/2]}], {j, k, Floor[(n - k - l)/3]}], {k, l, Floor[(n - l)/4]}], {l, Floor[n/5]}], {n, 0, 50}]

%K nonn

%O 0,7

%A _Wesley Ivan Hurt_, Aug 07 2019