Complex conjugation: Difference between revisions

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In mathematics, complex conjugation is an operation on complex numbers which reverses the sign of the imaginary part, that is, it sends $z=x+iy$ to the complex conjugate ${\bar {z}}=x-iy$ .

In the geometrical interpretation in terms of the Argand diagram, complex conjugation is represented by reflection in the x-axis. The complex numbers left fixed by conjugation are precisely the real numbers.

Conjugation respects the algebraic operations of the complex numbers: ${\overline {z+w}}={\bar {z}}+{\bar {w}}$ and ${\overline {zw}}={\bar {z}}{\bar {w}}$ . Hence conjugation represents an automorphism of the field of complex numbers over the field of real numbers, and is the only non-trivial automorphism.

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	In [[mathematics]], '''complex conjugation''' is an operation on [[complex number]]s which reverses the sign of the imaginary part, that is, it sends <math>z = x + iy</math> to the '''complex conjugate''' <math>\bar z = x-iy</math>.		In [[mathematics]], '''complex conjugation''' is an operation on [[complex number]]s which reverses the sign of the imaginary part, that is, it sends <math>z = x + iy</math> to the '''complex conjugate''' <math>\bar z = x-iy</math>.

Complex conjugation: Difference between revisions

Revision as of 03:55, 19 November 2008

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