1 Answer

Augustin Popa · Answer 1 · 2020-07-25T07:40:42+0000

ANSWER

$(dy)/(dx) = x{(3x)}^{ {x}^(2) } (ln(9 {x}^(2) ) + 1)$

Step-by-step explanation

The given equation is;

$y = {(3x)}^{ {x}^(2) }$

Take natural log of both sides:

$ln(y) = ln({(3x)}^{ {x}^(2) } )$

This implies that,

$ln(y) = {x}^(2) ln({(3x)})$

We differentiate to get,

$(1)/(y) (dy)/(dx) = ln(3x) (2x) + {x}^(2) ( (1)/(x) )$

This simplifies to

(dy)/(dx) =y (2x ln(3x) + x) We substitute for y to get:

$(dy)/(dx) = {(3x)}^{ {x}^(2) } (2x ln(3x) + x)$

Or

$(dy)/(dx) = x{(3x)}^{ {x}^(2) } (2ln(3x) + 1)$

$(dy)/(dx) = x{(3x)}^{ {x}^(2) } (ln(9 {x}^(2) ) + 1)$

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