How do you find the derivative of ln(ln x^2)?

uelhonai3

uelhonai3

Answered question

2023-03-02

How to find the derivative of ln ( ln x 2 ) ?

Answer & Explanation

trinijovenvy5

trinijovenvy5

Beginner2023-03-03Added 6 answers

Step 1
We have:
d d x ( ln ( ln x 2 ) )
According to the chain rule, d d x f ( g ( x ) ) = d d x ( f ) d d x g ( x )
Here, f ( u ) = ln u where u = ln x 2
Since d d u ln u = 1 u , we now have:
1 u d d x ln x 2
Here, f ( v ) = ln v where v = x 2 , so we have:
1 u 1 v 2 x
Since u = ln x 2 and v = x 2 , we have:
2 x ln ( x 2 ) x 2
Since ln x n = n ln x , we get:
2 x 2 x 2 ln x
1 x ln x
trkshkjf

trkshkjf

Beginner2023-03-04Added 3 answers

Step 1
We can use chain rule here. We can write f ( x ) = ln ( ln x 2 ) as
f ( x ) = ln ( g ( x ) ) , g ( x ) = ln ( h ( x ) ) and h ( x ) = x 2 then d f d g = 1 g ( x ) , d g d h = 1 h ( x ) and d g d h = 2 x
and using chain rule as d f d x = d f d g × d g d h × d h d x
1 g ( x ) × 1 h ( x ) × 2 x
1 ln x 2 1 x 2 2 x
2 x ln x 2
Hence
d d x ln ( ln x 2 ) = 2 x ln x 2 = 2 x 2 ln x = 1 x ln x

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