What is the derivative of $cos(tan x)$ ?

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What is the derivative of $cos(tan x)$ ?

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Answer 1 · 2016-09-17T10:05:30

$(dy)/(dx)=-sin(tanx)sec^2x$

Explanation:

Chain Rule - In order to differentiate a function of a function, say $y, =f(g(x))$ , where we have to find $(dy)/(dx)$ , we need to do (a) substitute $u=g(x)$ , which gives us $y=f(u)$ . Then we need to use a formula called Chain Rule, which states that $(dy)/(dx)=(dy)/(du)xx(du)/(dx)$ . In fact if we have something like $y=f(g(h(x)))$ , we can have $(dy)/(dx)=(dy)/(df)xx(df)/(dg)xx(dg)/(dh)$

Here we have $y=cosu$ , where $u=tanx$

Hence, $(dy)/(dx)=(dy)/(du)xx(du)/(dx)$

= $d/(du)cosuxxd/dx(tanx)$

= $-sinuxxsec^2x=-sin(tanx)sec^2x$

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What is the derivative of $cos(tan x)$ ?

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