Complex number/Citable Version: Difference between revisions

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==Algebraic Closure==
==Algebraic Closure==


An important property of <math>\mathbb{C}</math> is that it is [[algebraically closed]]. This means that any non-constant real [[polynomial]] must have a root in </mathbb{C}</math>.
An important property of <math>\mathbb{C}</math> is that it is [[algebraically closed]]. This means that any non-constant real [[polynomial]] must have a root in <math>\mathbb{C}</math>.

Revision as of 22:13, 1 April 2007

The complex numbers are obtained by adjoining the imaginary unit to the real numbers. Of course, since the product of two negative numbers is positive, there is no (read real number x) such that , but if there were such a number, we could define the complex numbers to be the set



We then define addition and multiplication in the obvious way, using to rewrite results in the form :



It turns out that with addition and multiplication defined this way, satisfies the axioms for a field, and is called the field of complex numbers. If is a complex number, we call the real part of and write . Similarly, is called the imaginary part of and we write . If the imaginary part of a complex number is , the number is said to be real, and we write instead of . We thus identify with a subset (and, in fact, a subfield) of .

Algebraic Closure

An important property of is that it is algebraically closed. This means that any non-constant real polynomial must have a root in .