How do you find the derivative of $\sqrt{tan x}$ $sqrt(tan x)$ ?

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How do you find the derivative of $\sqrt{tan x}$ $sqrt(tan x)$ ?

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Answer 1 · 2016-06-21T19:17:59

$\frac{{sec}^{2} x}{2 \sqrt{tan x}}$ $(sec^2x)/(2sqrt(tanx)$

Explanation:

differentiate using the $chain rule$ $color(blue)"chain rule"$

$d/dx[f(g(x))]=f'(g(x)).g'(x)........ (A)$
$"------------------------------------------"$
Express $sqrttanx=(tanx)^(1/2)$

$f(g(x))=(tanx)^(1/2)rArrf'(g(x))=1/2(tanx)^(-1/2)$

$g(x)=tanxrArrg'(x)=sec^2x$
$"------------------------------------------"$
Substitute these values into (A)

$rArrd/dx(sqrttanx)=1/2(tanx)^(-1/2).sec^2x=sec^2x/(2sqrttanx$

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How do you find the derivative of $\sqrt{tan x}$ $sqrt(tan x)$ ?

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How do you find the derivative of $\sqrt{tan x}$ $sqrt(tan x)$ ?