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How do you verify the identity #sin4x= 4sinxcosx(1-sin^2x)#?

1 Answer

Apr 23, 2015

Remember
#sin(2theta) = 2*sin(theta)*cos(theta)#
and
#cos(2theta) = 1 - 2*sin^2(theta)#

So
#sin(4x)#

#= 2*sin(2x)*cos(2x)#

#=2 * (2 * sin(x) * cos(x) )* (1-2 * sin^2(x))#

#=4sin(x)cos(x)(1-sin^2(x))#

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