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How do you differentiate #f(x)=ln(1/sin(3x))# using the chain rule?

1 Answer

Nov 15, 2015

#f'(x)= -3cot3x#

Explanation:

#f'(x)=(ln(1/(sin3x)))'=1/((1/(sin3x))) * (1/(sin3x))'#

#f'(x)=sin3x * ((sin3x)^-1)' = sin3x * (-1)(sin3x)^-2 * (sin3x)'#

#f'(x)=-sin3x * 1/(sin3x)^2 * cos3x * (3x)'#

#f'(x)=-1/(sin3x) * cos3x * 3#

#f'(x)= -3cot3x#

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