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How do you differentiate #y=lnx(x^5+10x^2-19)#?

1 Answer

Shwetank Mauria

Aug 7, 2016

#(dy)/(dx)=1/x(x^5+10x^2-19)+5x(x^3+4)lnx#

Explanation:

Using product rule, if #y=lnx(x^5+10x^2-19)#

#(dy)/(dx)=1/x(x^5+10x^2-19)+lnx(5x^4+20x)#

= #1/x(x^5+10x^2-19)+5x(x^3+4)lnx#

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