Numbers n such that the multiplicative group modulo n is the direct product of 9 cyclic groups.

Terms

a(0) =38798760a(1) =46966920a(2) =52492440a(3) =59219160a(4) =63303240a(5) =66186120a(6) =68643960a(7) =70750680a(8) =75555480a(9) =77597520a(10) =80120040a(11) =81124680a(12) =83723640a(13) =84444360a(14) =85645560a(15) =86551080a(16) =87807720a(17) =92520120a(18) =93573480a(19) =93933840a(20) =95975880a(21) =98138040a(22) =102222120a(23) =102287640a(24) =104772360a(25) =104984880a(26) =107267160a(27) =107987880a(28) =108228120a(29) =109341960