What is the derivative of #f(x) = (x^3-(lnx)^2)/(lnx^2)#?

1 Answer
Apr 27, 2016

Use quotent rule and chain rule. Answer is:

#f'(x)=(3x^3lnx^2-2(lnx)^2-2x^3)/(x(lnx^2)^2)#

This is a simplified version. See Explanation to watch until which point it can be accepted as a derivative.

Explanation:

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

#f'(x)=((x^3-(lnx)^2)'*lnx^2-(x^3-(lnx)^2)(lnx^2)')/(lnx^2)^2#

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

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

At this form, it is actually acceptable. But to further simplify it:

#f'(x)=((3x^2-2lnx/x)*lnx^2-(x^3-(lnx)^2)2/x)/(lnx^2)^2#

#f'(x)=(3x^2lnx^2-2lnx/xlnx^2-x^3*2/x+(lnx)^2*2/x)/(lnx^2)^2#

#f'(x)=(3x^2lnx^2-2lnx/xlnx^2-x^3*2/x+(lnx)^2*2/x)/(lnx^2)^2#

#f'(x)=(3x^3lnx^2-2lnxlnx^2-x^3*2+(lnx)^2*2)/(x(lnx^2)^2)#

#f'(x)=(3x^3lnx^2-4(lnx)^2-2x^3+2(lnx)^2)/(x(lnx^2)^2)#

#f'(x)=(3x^3lnx^2-2(lnx)^2-2x^3)/(x(lnx^2)^2)#