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How do you find the Limit of #(sin^3 x )/ (sin x - tan x)# as x approaches 0?

1 Answer

Jul 22, 2016

#-2#

Explanation:

#(sin^3 x )/ (sin x - tan x)=(sin x cdot sin^2x)/(sinx(1-1/cosx))=sin^2x/(1-1/cosx)#
#=((1-cos^2x)cosx)/(cosx-1)=-((1-cosx)(1+cosx)cosx)/(1-cosx)#

#=-(1+cosx)cosx#

then

#lim_{x->0}(sin^3 x )/ (sin x - tan x)=lim_{x->0}(-(1+cosx)cosx) = -2#

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