De moivre's theorem (1 Viewer)

Joshmosh2

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Show that
sin^3x(cos^2x) = 1/16 (2sinx +sin3x -sin5x)

(using the fact that z + 1/z = 2cosx, and z - 1/z = 2isinx)


My approach was to expand LHS into sin^3x (1-sin^2x)
= sin^3x - sin^5x
= (z - 1/z)^3 - (z - 1/z)^5
(then expand and simplify)

Is this a viable method?
The suggested solutions suggest otherwise.
 

Carrotsticks

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That approach is fine. What do the suggested solutions suggest?
 

Carrotsticks

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How do they get from here to the final result? Do they use a trig identity that may look somewhat unfamiliar to you?
 

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