0.999... - Misplaced Pages

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In mathematics, one could easily fall in the trap of thinking that while 0.999... is certainly close to 1, nevertheless the two are not equal. Here's a proof that they actually are.

Proof

$0.999\ldots$	$={\frac {9}{10}}+{\frac {9}{100}}+{\frac {9}{1000}}+\cdots$
	$=-9+{\frac {9}{1}}+{\frac {9}{10}}+{\frac {9}{100}}+{\frac {9}{1000}}+\cdots$
	$=-9+9\times \sum _{k=0}^{\infty }\left({\frac {1}{10}}\right)^{k}$
	$=-9+9\times {\frac {1}{1-{\frac {1}{10}}}}$
	$=1.\,$

Explanation

The key step to understanding this proof is to recognize that the following infinite geometric series is convergent:

\sum _{k=0}^{\infty }\left({\frac {1}{10}}\right)^{k}={\frac {1}{1-{\frac {1}{10}}}}.

Alternative proofs

A less mathematical proof goes as follows. Let x equal 0.999... Then,

10x−x = 9.999... − 0.999...

and so

9x = 9,

which implies that x = 1.

The following proof relies on a property of real numbers. Assume that 0.999... and 1 are in fact distinct real numbers. Then, there must exist infinitely many real numbers in the interval (0.999..., 1). No such numbers exist; therefore, our original assumption is false: 0.999... and 1 are not distinct, and so they are equal.

External proofs

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Proofs

Proof

Explanation

Alternative proofs

See also

External proofs