A McMullen transform involving x->x+1/x of Lehmer's polynomial gives the polynomial used to get this expansion sequence: p(x)=1 + x + 10 x^2 + 8 x^3 + 44 x^4 + 28 x^5 + 113 x^6 + 57 x^7 + 191 x^8 + 79 x^9 + 227 x^10 + 79 x^11 + 191 x^12 + 57 x^13 + 113 x^14 + 28 x^15 + 44 x^16 + 8 x^17 + 10 x^18 + x^19 + x^20.
A143465
A McMullen transform involving x->x+1/x of Lehmer's polynomial gives the polynomial used to get this expansion sequence: p(x)=1 + x + 10 x^2 + 8 x^3 + 44 x^4 + 28 x^5 + 113 x^6 + 57 x^7 + 191 x^8 + 79 x^9 + 227 x^10 + 79 x^11 + 191 x^12 + 57 x^13 + 113 x^14 + 28 x^15 + 44 x^16 + 8 x^17 + 10 x^18 + x^19 + x^20.
Terms
- a(0) =1a(1) =-1a(2) =-9a(3) =11a(4) =43a(5) =-65a(6) =-142a(7) =272a(8) =351a(9) =-897a(10) =-636a(11) =2458a(12) =618a(13) =-5746a(14) =1125a(15) =11522a(16) =-8822a(17) =-19299a(18) =34019a(19) =23687a(20) =-107090a(21) =-3953a(22) =305278a(23) =-106133a(24) =-814418a(25) =505401a(26) =2042163a(27) =-1769399a(28) =-4753130a(29) =5499052
External references
- oeis: A143465