Editing Decimal (section)

===Approximation using decimal numbers===
Decimal numerals do not allow an exact representation for all [[real number]]s. Nevertheless, they allow approximating every real number with any desired accuracy, e.g., the decimal 3.14159 approximates {{pi}}, being less than 10<sup>−5</sup> off; so decimals are widely used in [[science]], [[engineering]] and everyday life.

More precisely, for every real number {{Mvar|x}} and every positive integer {{Mvar|n}}, there are two decimals {{Mvar|''L''}} and {{Mvar|''u''}} with at most ''{{Mvar|n}}'' digits after the decimal mark such that {{Math|''L'' ≤ ''x'' ≤ ''u''}} and {{Math|1=(''u'' − ''L'') = 10<sup>−''n''</sup>}}.

Numbers are very often obtained as the result of [[measurement]]. As measurements are subject to [[measurement uncertainty]] with a known [[upper bound]], the result of a measurement is well-represented by a decimal with {{math|''n''}} digits after the decimal mark, as soon as the absolute measurement error is bounded from above by {{Math|10<sup>−''n''</sup>}}. In practice, measurement results are often given with a certain number of digits after the decimal point, which indicate the error bounds. For example, although 0.080 and 0.08 denote the same number, the decimal numeral 0.080 suggests a measurement with an error less than 0.001, while the numeral 0.08 indicates an absolute error bounded by 0.01. In both cases, the true value of the measured quantity could be, for example, 0.0803 or 0.0796 (see also [[significant figures]]).