Another version of the Kaprekar numbers (A006886): n such that n = q+r and n^2 = q*10^m+r, for some m >= 1, q >= 0 and 0 <= r < 10^m, with n != 10^a, a >= 1 and n an m-digit number.
A053816
Another version of the Kaprekar numbers (A006886): n such that n = q+r and n^2 = q*10^m+r, for some m >= 1, q >= 0 and 0 <= r < 10^m, with n != 10^a, a >= 1 and n an m-digit number.
Terms
- a(0) =1a(1) =9a(2) =45a(3) =55a(4) =99a(5) =297a(6) =703a(7) =999a(8) =2223a(9) =2728a(10) =4950a(11) =5050a(12) =7272a(13) =7777a(14) =9999a(15) =17344a(16) =22222a(17) =77778a(18) =82656a(19) =95121a(20) =99999a(21) =142857a(22) =148149a(23) =181819a(24) =187110a(25) =208495a(26) =318682a(27) =329967a(28) =351352a(29) =356643
External references
- oeis: A053816