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Question #849cc

1 Answer

Oct 18, 2016

#1/(sinxcosx)-sinx/cosx=cotx#

Explanation:

#1/(sinxcosx)-sinx/cosx#=#1/cosx(1/sinx-sinx)#

=#1/cosx(1/sinx-sin^2x/sinx)#
=#1/(cosxsinx)(1-sin^2x)#

But #1-sin^2x=cos^2x#

So the expression can be written as
#cos^2x/(cosxsinx)#

Cancelling gives
#cosx/sinx#=#cotx#

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