What is the derivative of $f(x)=ln(secx)$ ?

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What is the derivative of $f(x)=ln(secx)$ ?

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Answer 1 · 2015-11-09T20:20:03

$tan(x)$

Explanation:

We can use the chain rule here and substitute the inside of the ln function as u. So:

$ln(u), u=sec(x)$

We know the derivative of a ln function is in the form of $(u')/u$ . So we need to find the derivative of $sec(x)$ . This is a trig identity and so $(d(u))/dx=(d(sec(x)))/dx=sec(x)tan(x)=u'$

Putting this into our equation for the derivative of an ln function we get:

$(u')/u=(sec(x)tan(x))/sec(x)=tan(x)$

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What is the derivative of $f(x)=ln(secx)$ ?

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