Number of ways of partitioning the integers {1,2,..,4n} into two (unordered) sets such that the sums of parts are equal in both sets (parts in either set will add up to (4n)*(4n+1)/4). Number of solutions to {1 +- 2 +- 3 +- ... +- 4n=0}.
A060005
Number of ways of partitioning the integers {1,2,..,4n} into two (unordered) sets such that the sums of parts are equal in both sets (parts in either set will add up to (4n)*(4n+1)/4). Number of solutions to {1 +- 2 +- 3 +- ... +- 4n=0}.
Terms
- a(0) =1a(1) =1a(2) =7a(3) =62a(4) =657a(5) =7636a(6) =93846a(7) =1199892a(8) =15796439a(9) =212681976a(10) =2915017360a(11) =40536016030a(12) =570497115729
External references
- oeis: A060005