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Obtain an equation for cosh(3x) in terms of cosh(x) and sinh(x).

Obtain an equation for cosh(3x) in terms of cosh(x) and sinh(x).
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Obtain an equation for cosh(3x) in terms of cosh(x) and sinh(x).

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User Mexus
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\cosh ax+\sinh ax=e^(ax)=(e^x)^a=(\cosh x+\sinh x)^a


\cosh x=\cos ix

\sinh x=-i\sin ix

By DeMoivre's theorem,


\cos3ix-\sin3ix=(\cos ix-i\sin ix)^3=\cos^3ix-3i\cos^2ix\sin ix-3\cos ix\sin^2ix+i\sin^3ix

You then have


\cos3ix=\mathrm{Re}\left[(\cos ix-i\sin ix)^3\right]

\cos3ix=\cos^3ix-3\cos ix\sin^2ix

\cos3ix=\cos^3ix+3\cos ix(-i\sin ix)^2

Converting back to hyperbolic functions, you get


\cosh3x=\cosh^3x+3\cosh x\sinh^2x
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User Andiwin
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