Prove that # (sin4t)/4 -= cos^3tsint-sin^3tcost #?

1 Answer
Steve M
Feb 14, 2018

We seek to show that:

# (sin4t)/4 -= cos^3tsint-sin^3tcost #

Consider the LHS:

# LHS = (sin4t)/4 #

Using the sine and cosine double angle formulas:

# sin2A -= 2sinAcosA #
# cos2A -= cos^2A-sin^2A #

we have:

# LHS = (sin(2(2t)))/4 #

# \ \ \ \ \ \ \ \ = (2sin2tcos2t)/4 #

# \ \ \ \ \ \ \ \ = (2(2sintcost)(cos^2t-sin^2t))/4 #

# \ \ \ \ \ \ \ \ = sintcost(cos^2t-sin^2t) #

# \ \ \ \ \ \ \ \ = sintcostcos^2t-sintcostsin^2t #

# \ \ \ \ \ \ \ \ = sintcos^3t-costsin^3t #

# \ \ \ \ \ \ \ \ = RHS \ \ \ \ # QED

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