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Hoe do you differentiate #f(x)=ln(1/x) #?

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Konstantinos Michailidis

Nov 3, 2015

It is

#f(x)=ln(1/x)=>d/dxf(x)=(d/dx(1/x))/(1/x)=>f'(x)=-1/x#

Remember that if #f(x)=lng(x)# then

#f'(x)=(g'(x))/g(x)#

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