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:''This article gives a mathematical definition.  For a more accessible article see [[Decimal]].''
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A '''decimal representation''' of a [[non-negative]] [[real number]] ''r'' is an expression of the form of a [[series (mathematics)|series]], traditionally written as a sum
 
:<math> r=\sum_{i=0}^\infty \frac{a_i}{10^i}</math>
 
where ''a''<sub>0</sub> is a nonnegative integer,  and ''a''<sub>1</sub>, ''a''<sub>2</sub>, … are integers satisfying 0&nbsp;≤&nbsp;''a<sub>i</sub>''&nbsp;≤&nbsp;9, called the digits of the decimal representation. The sequence of digits specified may be finite, in which case any further digits ''a''<sub>''i''</sub> are assumed to be 0. Some authors forbid decimal representations with a trailing infinite sequence of "9"s.<ref>{{citation
| last=Knuth | first = D. E. | author-link = Donald Ervin Knuth
| title = The Art of Computer Programming
| contribution = Volume 1: Fundamental Algorithms | publisher = Addison-Wesley | year = 1973
| pages = 21}}</ref>
This restriction still allows a decimal representation for each non-negative real number, but additionally makes such a representation unique.
The number defined by a decimal representation is often written more briefly as
 
:<math>r=a_0.a_1 a_2 a_3\dots.\,</math>
 
That is to say, ''a''<sub>0</sub> is the integer part of ''r'', not necessarily between 0 and 9, and  ''a''<sub>1</sub>, ''a''<sub>2</sub>, ''a''<sub>3</sub>, … are the digits forming the fractional part of ''r''.
 
Both notations above are, by definition, the following [[limit of a sequence]]:
:<math> r=\lim_{n\to \infty} \sum_{i=0}^n \frac{a_i}{10^i}</math>.
 
== Finite decimal approximations ==
 
Any real number can be approximated to any desired degree of accuracy by [[rational number]]s with finite decimal representations.
 
Assume <math>x\geq 0</math>. Then for every integer <math>n\geq 1</math> there is a finite decimal <math>r_n=a_0.a_1a_2\cdots a_n</math> such that
 
:<math>r_n\leq x < r_n+\frac{1}{10^n}.\,</math>
 
Proof:
 
Let <math>r_n = \textstyle\frac{p}{10^n}</math>, where <math>p = \lfloor 10^nx\rfloor</math>.
Then <math>p \leq 10^nx < p+1</math>, and the result follows from dividing all sides by <math>10^n</math>.
(The fact that <math>r_n</math> has a finite decimal representation is easily established.)
 
==Non-uniqueness of decimal representation==
{{Main|0.999...}}
Some real numbers have two infinite decimal representations. For example, the number 1 may be equally represented by 1.000... as by [[0.999...]] (where the infinite sequences of digits 0 and 9, respectively, are represented by "..."). Conventionally, the version with zero digits is preferred; by omitting the infinite sequence of zero digits, removing any final zero digits and a possible final decimal point, a normalized finite decimal representation is obtained. {{Citation needed|date=November 2009}}
 
==Finite decimal representations==
 
The decimal expansion of non-negative real number ''x'' will end in zeros (or in nines) if, and only if, ''x'' is a rational number whose denominator is of the form 2<sup>''n''</sup>5<sup>''m''</sup>, where ''m'' and ''n'' are non-negative integers.
 
'''Proof''':
 
If the decimal expansion of ''x'' will end in zeros, or <math>x=\sum_{i=0}^n\frac{a_i}{10^i}=\sum_{i=0}^n10^{n-i}a_i/10^n</math>
for some ''n'',
then the denominator of ''x'' is of the form 10<sup>''n''</sup> = 2<sup>''n''</sup>5<sup>''n''</sup>.
 
Conversely, if the denominator of ''x'' is of the form 2<sup>''n''</sup>5<sup>''m''</sup>,
<math>x=\frac{p}{2^n5^m}=\frac{2^m5^np}{2^{n+m}5^{n+m}}=
\frac{2^m5^np}{10^{n+m}}</math>
for some ''p''.
While ''x'' is of the form <math>\textstyle\frac{p}{10^k}</math>,
<math>p=\sum_{i=0}^{n}10^ia_i</math> for some ''n''.
By <math>x=\sum_{i=0}^n10^{n-i}a_i/10^n=\sum_{i=0}^n\frac{a_i}{10^i}</math>,
''x'' will end in zeros.
 
==Recurring decimal representations==
{{Main|Repeating decimal}}
Some real numbers have decimal expansions that eventually get into loops, endlessly repeating a sequence of one or more digits:
:<sup>1</sup>/<sub>3</sub> = 0.33333...
:<sup>1</sup>/<sub>7</sub> = 0.142857142857...
:<sup>1318</sup>/<sub>185</sub> = 7.1243243243...
Every time this happens the number is still a [[rational number]] (i.e. can alternatively be represented as a ratio of an integer and a positive integer).
 
==See also==
*[[Decimal]]
*[[Series (mathematics)]]
*[[IEEE 754]]
*[[Simon Stevin]]
 
==References==
*{{cite book|author=[[Tom Apostol]]|title=Mathematical analysis|edition=Second edition|publisher=Addison-Wesley|year=1974}}
 
<references/>
 
 
[[Category:Mathematical notation]]
[[Category:Articles containing proofs]]
 
[[br:Dispakadur dekredel]]
[[ckb:نواندنی دەدەیی]]

Latest revision as of 09:00, 2 December 2014

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