We say that a nonnegative [[real number]] <math>x</math> is '''constructible''' if a segment of length <math>x</math> can be constructed with a [[straight edge]] and [[compass]] starting with a segment of length <math>1</math>.

We say that a complex number <math>z = x+yi</math> is constructible if <math>|x|</math> and <math>|y|</math> are both constructible (we also say that the point <math>(x,y)</math> is constructible). It is easy to show that <math>x+yi</math> is constructible iff the point <math>(x,y)</math> can be constructed with a [[straight edge]] and [[compass]] in the [[cartesian plane]] starting with the points <math>(0,0)</math> and <math>(1,0)</math>.