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How do you differentiate #x^(6x)#?

1 Answer

Konstantinos Michailidis

May 16, 2016

You can write this as

#x^(6*x)=e^(6x*lnx)#

Hence

#d(x^(6x))/dx=d(e^(6x*lnx)/dx)=e^(6x*lnx)*(6*lnx+6)= 6*x^(6x)*(lnx+1)#

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