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How do you differentiate #f(x)=cotx# using the quotient rule?

1 Answer

Jul 22, 2016

# f'(x)=-csc^2x#.

Explanation:

#f(x)=cotx=cosx/sinx#

#:. f'(x)=d/dx(cosx/sinx)= (sinx(d/dxcosx)-cosxd/dx(sinx))/(sinx)^2#

#={sinx(-sinx)-cosx(cosx)}/sin^2x#

#=-(sin^2x+cos^2x)/sin^2x=-1/sin^2x#

#-csc^2x#.

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