Difference between revisions of "Transcendental number"

 
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A '''Transcendental Number''' is a number that cannot be a solution to ''any'' polynomial with ''integer'' coefficients. The most famous ones include <math>\pi</math> and <math>e</math>.
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A '''transcendental number''' is a [[real number | real]] or [[complex number]] that is not a [[Root (polynomials) | root]] of any [[polynomial]] with [[integer|integral]] [[coefficient]]s. Many famous [[constant]]s such as [[pi | <math>\pi</math>]] and [[e | <math>e</math>]] are transcendental.
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== See Also ==
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* The [[Rational_approximation#Liouville_Approximation_Theorem | Liouville Approximation Theorem]] provides one way of showing that certain numbers are transcendental.
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* [[Algebraic number]]
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[[Category:Definition]]
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[[Category:Number theory]]

Latest revision as of 10:52, 9 December 2007

A transcendental number is a real or complex number that is not a root of any polynomial with integral coefficients. Many famous constants such as $\pi$ and $e$ are transcendental.


See Also

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