The number of six-term Egyptian fractions of rational numbers, x/y, 0 < x/y < 1, ordered as below. The sequence is the number of (p,q,r,s,t,u) such that x/y = 1/p + 1/q + 1/r + 1/s + 1/t + 1/u where p, q, r, s, t, and u are integers with p < q < r < s < t < u.

A349086

The number of six-term Egyptian fractions of rational numbers, x/y, 0 < x/y < 1, ordered as below. The sequence is the number of (p,q,r,s,t,u) such that x/y = 1/p + 1/q + 1/r + 1/s + 1/t + 1/u where p, q, r, s, t, and u are integers with p < q < r < s < t < u.

Terms

    a(0) =244817a(1) =3421052a(2) =206917a(3) =18420699a(4) =244817a(5) =49938a(6) =64025680a(7) =6462507a(8) =1434759a(9) =41993a(10) =131223239a(11) =3421052a(12) =244817a(13) =206917a(14) =16018a(15) =431008820a(16) =38282319a(17) =3506679a(18) =3879468a(19) =323772a(20) =108276a(21) =681922142a(22) =18420699a(23) =21874941a(24) =244817a(25) =659687a(26) =49938a(27) =45169

External references