What is the derivative of $tan^5(x)$ ?

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What is the derivative of $tan^5(x)$ ?

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Answer 1 · 2018-03-21T18:03:38

$y=tan^5x=(tanx)^5=>dy/dx=5(tanx)^4d/(dx)(tanx)$
$=>dy/dx=5tan^4x*sec^2x$

Explanation:

Let,
$y=tan^5x=(tanx)^5$
We take,
$y=u^5,$ where, $u=tanx$
$=>(dy)/(du)=5u^4 and (du)/(dx)=sec^2x$
Applying chain rule
$dy/dx=dy/(du)*(du)/dx$
$=>dy/dx=5u^4*sec^2x$
$=>dy/dx=5(tanx)^4*sec^2x$
$=>dy/dx=5tan^4xsec^2x$

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What is the derivative of $tan^5(x)$ ?

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