Difference between revisions of "Complex conjugate"

Revision as of 09:59, 4 December 2007

The complex conjugate of a complex number $z = a + bi$ is the complex number $\overline{z} = a - bi$ .

Geometrically, if $z$ is a point in the complex plane, $\overline z$ is the reflection of $z$ across the real axis.

Properties

Conjugation is its own functional inverse and commutes with the usual operations on complex numbers:

$\overline{(\overline z)} = z$
$\overline{(w \cdot z)} = \overline{w} \cdot \overline{z}$ ( $\overline{(\frac{w}{z})}$ is the same as $\overline{(w \cdot \frac{1}{z})}$ )
$\overline{(w + z)} = \overline{w} + \overline{z}$ ( $\overline{(w + z)}$ is the same as $\overline{(w + (-z))}$ )

It also interacts in simple ways with other operations on $\mathbb{C}$ :

$|\overline{z}| = |z|$
$\overline{z}\cdot z = |z|^2$
If $z = r\cdot e^{it}$ for $r, t \in \mathbb{R}$ , $\overline z = r\cdot e^{-it}$ . That is, $\overline z$ is the complex number of same absolute value but opposite argument of $z$ .
$z + \overline z = 2 \mathrm{Re}(z)$ where $\mathrm{Re}(z)$ is the real part of $z$ .
$z - \overline{z} = 2i \mathrm{Im}(z)$ where $\mathrm{Im}(z)$ is the imaginary part of $z$ .

This article is a stub. Help us out by expanding it.

@@ Line 6: / Line 6: @@
 Conjugation is its own [[Function/Introduction#The_Inverse_of_a_Function | functional inverse]] and [[commutative property | commutes]] with the usual [[operation]]s on complex numbers:
 * <math>\overline{(\overline z)} = z</math>
-* <math>\overline{(w \cdot z)} = \overline{w} \cdot \overline{z}</math> (<math>\overline{(w \cdot z)}</math> is the same as <math>\overline{(w \cdot \frac{1}{z})})</math>
+* <math>\overline{(w \cdot z)} = \overline{w} \cdot \overline{z}</math> (<math>\overline{(\frac{w}{z})}</math> is the same as <math>\overline{(w \cdot \frac{1}{z})}</math>)
-* <math>\overline{(w + z)} = \overline{w} + \overline{z}</math> (<math>\overline{(w + z)}</math> is the same as <math>\overline{(w + (-z))})
+* <math>\overline{(w + z)} = \overline{w} + \overline{z}</math> (<math>\overline{(w + z)}</math> is the same as <math>\overline{(w + (-z))}</math>)
-It also interacts in simple ways with other operations on </math>\mathbb{C}<math>:
+It also interacts in simple ways with other operations on <math>\mathbb{C}</math>:
-* </math>|\overline{z}| = |z|<math>
+* <math>|\overline{z}| = |z|</math>
-* </math>\overline{z}\cdot z = |z|^2<math>
+* <math>\overline{z}\cdot z = |z|^2</math>
-* If </math>z = r\cdot e^{it}<math> for </math>r, t \in \mathbb{R}<math>, </math>\overline z = r\cdot e^{-it}<math>.  That is, </math>\overline z<math> is the complex number of same [[absolute value]] but opposite [[argument]] of </math>z<math>.
+* If <math>z = r\cdot e^{it}</math> for <math>r, t \in \mathbb{R}</math>, <math>\overline z = r\cdot e^{-it}</math>.  That is, <math>\overline z</math> is the complex number of same [[absolute value]] but opposite [[argument]] of <math>z</math>.
-* </math>z + \overline z = 2 \mathrm{Re}(z)<math> where </math>\mathrm{Re}(z)<math> is the [[real part]] of </math>z<math>.
+* <math>z + \overline z = 2 \mathrm{Re}(z)</math> where <math>\mathrm{Re}(z)</math> is the [[real part]] of <math>z</math>.
-* </math>z - \overline{z} = 2i \mathrm{Im}(z)<math> where </math>\mathrm{Im}(z)<math> is the [[imaginary part]] of </math>z$.
+* <math>z - \overline{z} = 2i \mathrm{Im}(z)</math> where <math>\mathrm{Im}(z)</math> is the [[imaginary part]] of <math>z</math>.
 {{stub}}
 [[Category:Number Theory]]

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Difference between revisions of "Complex conjugate"

Revision as of 09:59, 4 December 2007

Properties