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If #y=ln(2x^2-6x)#, then what is #dy/dx#?

1 Answer

Dec 19, 2016

The answer is #=(2x-3)/(x(x-3))#

Explanation:

This is a chain differentiation

#y=ln u(x)#

#dy/dx=1/(u(x))*u'(x)#

#y=ln(2x^2-6x)#

#dy/dx=1/(2x^2-6x)*(4x-6)#

#=(2x-3)/(x^2-3x)=(2x-3)/(x(x-3))#

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