How do you take the derivative of ${tan}^{2} (5 x)$ $tan^2(5x)$ ?

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How do you take the derivative of ${tan}^{2} (5 x)$ $tan^2(5x)$ ?

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Answer 1 · 2015-08-06T13:09:39

$= 10 tan 5 x {sec}^{2} 5 x$ $= 10tan 5x sec^2 5x$

Explanation:

Let $t = 5 x$ $t = 5x$ .

$\frac{d}{d x} {tan}^{2} 5 x = \frac{d t}{d x} \frac{d}{d t} {tan}^{2} t$ $frac{d}{dx}tan^2 5x = frac{dt}{dx}frac{d}{dt}tan^2 t$ .

Product rule: $\frac{d}{d t} {tan}^{2} t = 2 tan t \frac{d}{d t} tan t$ $frac{d}{dt}tan^2 t = 2tan t\frac{d}{dt}tan t$ .
Now $\frac{d}{d t} tan t = {sec}^{2} t$ $\frac{d}{dt} tan t = sec^2 t$ .

Hence $\frac{d}{d x} {tan}^{2} 5 x = 10 tan 5 x {sec}^{2} 5 x$ $frac{d}{dx}tan^2 5x = 10tan 5x sec^2 5x$

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How do you take the derivative of ${tan}^{2} (5 x)$ $tan^2(5x)$ ?

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