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How do you differentiate f(x) = x² ln(x) ?

1 Answer

Lovecraft · Jim H

Oct 9, 2015

Using the product rule,

$f^'(x) = x(2ln(x) + 1)$

Explanation:

We have that for every $f(x)$ such that $f(x) = g(x)h(x)$ , $f^'(x) = g^'(x)h(x) + g(x)h^'(x)$ ,

We know that $(x^2)^' = 2x$ and that $(ln(x))^' = 1/x$ , so we just evaluate it

$f^'(x) = 2x*ln(x) + x^2*1/x = 2x*ln(x) + x$

Or, putting $x$ in evidence

$f^'(x) = x(2ln(x) + 1)$

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