Define C(n) by the recursion C(0) = 3*i where i^2 = -1, C(n+1) = 1/(1 + C(n)), then a(n) = 3*(-1)^n/Im(C(n)) where Im(z) denotes the imaginary part of the complex number z.

A069960

Define C(n) by the recursion C(0) = 3*i where i^2 = -1, C(n+1) = 1/(1 + C(n)), then a(n) = 3*(-1)^n/Im(C(n)) where Im(z) denotes the imaginary part of the complex number z.

Terms

    a(0) =1a(1) =10a(2) =13a(3) =45a(4) =106a(5) =289a(6) =745a(7) =1962a(8) =5125a(9) =13429a(10) =35146a(11) =92025a(12) =240913a(13) =630730a(14) =1651261a(15) =4323069a(16) =11317930a(17) =29630737a(18) =77574265a(19) =203092074a(20) =531701941a(21) =1392013765a(22) =3644339338a(23) =9541004265a(24) =24978673441a(25) =65395016074a(26) =171206374765a(27) =448224108237

External references