Difference between revisions of "De Moivre's Theorem"

Latest revision as of 23:56, July 14, 2018

De Moivre’s Theorem is a fundamental statement of complex analysis:

\text{[math]}

De Moivre's formula is a trivial extension of Euler's formula:

\text{[math]}

Because

\text{[math]}

Therefore, from Euler's formula:

\text{[math]}

Revision as of 15:23, July 15, 2016 (view source) DavidB4-bot (Talk \| contribs) (→‎Extension of Euler's formula: Spelling/Grammar Check, typos fixed: Therefore → Therefore,) ← Older edit		Latest revision as of 23:56, July 14, 2018 (view source) SamHB (Talk \| contribs) (Don't need to define "i"--it's fundamental. It's primordial. The fact that it's one of the square roots of -1 (and -i is the other) is a theorem.)
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−	'''De Moivre’s Theorem''' is a fundamental statement of [[complex analysis]]~~, where ''i'' represents the square root of (-1)~~:	+	'''De Moivre’s Theorem''' is a fundamental statement of [[complex analysis]]:

	:<math>\left(\cos x+i\sin x\right)^n=\cos\left(nx\right)+i\sin\left(nx\right)\,</math>		:<math>\left(\cos x+i\sin x\right)^n=\cos\left(nx\right)+i\sin\left(nx\right)\,</math>