When differentiating an exponential function: d/dx a^x=a^xln(a),(a>0) Why does differentiating x^x result in x^x(1+lnx) and not x^x lnx?

limunom623

limunom623

Answered question

2022-11-15

When differentiating an exponential function:
d d x a x = a x ln ( a ) , ( a > 0 )
Why does differentiating x x result in x x ( 1 + ln x ) and not x x ln x?

Answer & Explanation

smeachtaczm

smeachtaczm

Beginner2022-11-16Added 14 answers

By definition, x x = exp ( x ln ( x ) ). Thus,
( x x ) = ( x ln ( x ) ) exp ( x ln ( x ) ) = ( x ln ( x ) + x ln ( x ) ) x x = ( ln ( x ) + 1 ) x x .
Dylan Benitez

Dylan Benitez

Beginner2022-11-17Added 2 answers

The rule you stated only works when the base is a fixed constant like 2 x or 7 x . In the expression x x , the base is a variable. So your quoted rule does not apply here. To differentiate the function f ( x ) = x x i think you understand how to do so. So I will not include that in my answer.

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