Editing Number (section)

===Computable numbers===
{{Main|Computable number}}
A '''computable number''', also known as ''recursive number'', is a [[real number]] such that there exists an [[algorithm]] which, given a positive number ''n'' as input, produces the first ''n'' digits of the computable number's decimal representation. Equivalent definitions can be given using [[μ-recursive function]]s, [[Turing machine]]s or [[λ-calculus]]. The computable numbers are stable for all usual arithmetic operations, including the computation of the roots of a [[polynomial]], and thus form a [[real closed field]] that contains the real [[algebraic number]]s.

The computable numbers may be viewed as the real numbers that may be exactly represented in a computer: a computable number is exactly represented by its first digits and a program for computing further digits. However, the computable numbers are rarely used in practice. One reason is that there is no algorithm for testing the equality of two computable numbers. More precisely, there cannot exist any algorithm which takes any computable number as an input, and decides in every case if this number is equal to zero or not.

The set of computable numbers has the same cardinality as the natural numbers. Therefore, [[almost all]] real numbers are non-computable. However, it is very difficult to produce explicitly a real number that is not computable.