Let P(A) be the power set of an n-element set A and let B be the Cartesian product of P(A) with itself. Remove (y,x) from B when (x,y) is in B and x <> y and let R35 denote the reduced set B. Then a(n) = the sum of the sizes of the union of x and y for every (x,y) in R35.

A133224

Let P(A) be the power set of an n-element set A and let B be the Cartesian product of P(A) with itself. Remove (y,x) from B when (x,y) is in B and x <> y and let R35 denote the reduced set B. Then a(n) = the sum of the sizes of the union of x and y for every (x,y) in R35.

Terms

    a(0) =0a(1) =2a(2) =14a(3) =78a(4) =400a(5) =1960a(6) =9312a(7) =43232a(8) =197120a(9) =885888a(10) =3934720a(11) =17307136a(12) =75509760a(13) =327182336a(14) =1409343488a(15) =6039920640a(16) =25770065920a(17) =109522223104a(18) =463857647616

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