Difference between revisions of "Cis"

Latest revision as of 19:59, 11 July 2023

Cis notation is a polar notation for complex numbers. For all complex numbers $z$ , we can write $z=r\mathrm{cis }(\theta)=r\cos \theta + ir\sin \theta$ . Notice that $\mathrm{cis}$ is made up by the first letter of $\cos$ , $i$ , and the first letter of $\sin$ .

Once one gets used to the notation, it is almost always preferred to write $re^{i\theta}$ rather than $r\mathrm{cis }(\theta)$ , as Euler's formula states that

$e^{i\theta} = \cos \theta + i \sin \theta.$

This is so that one can more naturally use the properties of the complex exponential. One important example is De Moivre's Theorem, which states that

$\mathrm{cis}(r\theta) = (\mathrm{cis}(\theta))^r.$

This is more easily understood in the complex exponential form:

$e^{i(r\theta)} = (e^{i\theta})^r.$

@@ Line 5: / Line 5: @@
 <math>e^{i\theta} = \cos \theta + i \sin \theta.</math>
-This is so that one can more naturally use the properties of the complex [[exponential]].  One important example is [[De Moivre's Theorem]], which states that
+This is so that one can more naturally use the properties of the complex [[Exponential form|exponential]].  One important example is [[De Moivre's Theorem]], which states that
 <math>\mathrm{cis}(r\theta) = (\mathrm{cis}(\theta))^r.</math>

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Difference between revisions of "Cis"

Latest revision as of 19:59, 11 July 2023

See also