0,2

10-adic integer x=.....86760045215487480163574218751 satisfying x^3=x.

A "bug" in the decimal enumeration system: another square root of 1.

Let a,b be integers defined in A018247, A018248 satisfying a^2=a,b^2=b, obviously a^3=a,b^3=b; let c,d,e,f be integers defined in A091661, A063006, A091663, A091664 then c^3=c, d^3=d, e^3=e, f^3=f, c+d=1, a+e=1, b+f=1, b+c=a, d+f=e, a+f=c, a=f+1, b=e+1, cd=-1, af=-1, gh=-1 where -1=.....999999999 - Edoardo Gueglio (egueglio(AT)yahoo.it), Jan 28 2004

K. Mahler, Introduction to p-Adic Numbers and Their Functions, Cambridge, 1973.

(a_0 + a_1*10 + a_2*10^2 + a_3*10^3 + ... )^2 = 1 + 0*10 + 0*10^2 + 0*10^3 + ...

...4218751^2 = ...0000001

To calculate c, d, e, f use Mathematica algorithms for a, b and equations: c=a-b d=1-c e=b-1 f=a-1 - Edoardo Gueglio (egueglio(AT)yahoo.it), Jan 28 2004

Sequence in context: A019163 A021177 A091662 this_sequence A135096 A070366 A068001

Adjacent sequences: A063003 A063004 A063005 this_sequence A063007 A063008 A063009

nonn,nice,easy

Robert Lozyniak (11(AT)onna.com), Aug 03 2001

More terms from Vladeta Jovovic (vladeta(AT)Eunet.yu), Aug 11 2001

What about the 10-adic square roots of -1, -2, -3, 2, 3, 4, ... ? Answer from Don Reble, Apr 25 2006: They do not exist, unless the square really is a square (+1, +4, +9, +16, ...). Then there's a nontrivial square root; for example, sqrt(4)=...44002229693692923584436016426479909569025039672851562498.