What is the derivative of #y=x^2+x^x#?

1 Answer
Feb 19, 2016

#2x + x^x (1+lnx)#

Explanation:

The required derivative would be the sum of the derivative of #x^2# and #x^x#.

The derivative of #x^2# is 2x. The derivative of #x^x# can arrived at as follows:

Let #f=x^x#. Tale log on both sides, ln f= x ln x. Now differentiate both sides, # (1/f) (df)/dx = ln x +x(1/x)# (product rule).

Thus #(df)/dx= x^x (1+lnx)#.

#(dy)/dx= 2x + x^x (1+lnx)#