For a polynomial P(m) with rational coefficients, denote by lcmd(P) the LCM of the denominators of all its coefficients. Then a(n) = lcmd(Sum_{i=1..m} (i^n*Sum_{j=1..i} j^n))/ lcmd((Sum_{i=1..m} i^n)^2).

A202533

For a polynomial P(m) with rational coefficients, denote by lcmd(P) the LCM of the denominators of all its coefficients. Then a(n) = lcmd(Sum_{i=1..m} (i^n*Sum_{j=1..i} j^n))/ lcmd((Sum_{i=1..m} i^n)^2).

Terms

    a(0) =2a(1) =6a(2) =10a(3) =42a(4) =2a(5) =22a(6) =130a(7) =10a(8) =34a(9) =798a(10) =70a(11) =230a(12) =2a(13) =6a(14) =58a(15) =4774a(16) =154a(17) =14a(18) =962a(19) =26a(20) =82a(21) =602a(22) =42a(23) =658a(24) =34a(25) =374a(26) =5830a(27) =6270a(28) =38a(29) =118

External references