Transcendental number: Difference between revisions

Latest revision as of 12:27, 8 May 2008

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In mathematics, a transcendental number is any complex number that is not algebraic, i.e. it is not a root of any polynomial whose coefficients are integers, or, equivalently, it is not a root of any polynomial whose coefficients are rational.

Transcendental numbers are necessarily irrational, but there are many irrational numbers that are not transcendental. For instance, ${\sqrt {2}}$ is irrational. However it is algebraic, since it is a root of the polynomial $x^{2}-2$ . It is thus irrational but not transcendental.

Proving a number to be transcendental is generally much more difficult than just proving it is irrational. Examples of real numbers known to be transcendental are $\pi$ and $e$ .

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 In [[mathematics]], a '''transcendental number''' is any [[complex number]] that is not [[algebraic number|algebraic]], i.e. it is not a root of any [[polynomial]] whose coefficients are [[integer]]s, or, equivalently, it is not a root of any polynomial whose coefficients are [[rational number|rational]].
+Transcendental numbers are necessarily [[irrational number|irrational]], but there are many irrational numbers that are not transcendental.  For instance, <math> \sqrt{2} </math> is irrational.  However it is algebraic, since it is a root of the polynomial <math> x^2-2 </math>.  It is thus irrational but not transcendental.
+Proving a number to be transcendental is generally much more difficult than just proving it is irrational.  Examples of real numbers known to be transcendental are [[pi|<math>\pi</math>]] and [[e (mathematics)|<math>e</math>]].

Transcendental number: Difference between revisions

Latest revision as of 12:27, 8 May 2008

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