How do you find the derivative of the function: ${(arccos (\frac{x}{6}))}^{2}$ $(arccos(x/6))^2$ ?

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How do you find the derivative of the function: ${(arccos (\frac{x}{6}))}^{2}$ $(arccos(x/6))^2$ ?

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Answer 1 · 2017-01-23T17:49:37

Let $h (x) = \frac{x}{6}$ $h(x) = x/6$
Let $g (h) = arccos (h)$ $g(h) = arccos(h)$
Let $f (g) = g^{2}$ $f(g) = g^2$
To differentiate, use the chain rule with a function nested within a function within a function.

Explanation:

The chain rule with a function nested within a function within a function:

$\frac{d (({arccos (\frac{x}{6})}^{2}))}{d x} = \frac{d (f (g (h (x))))}{d x}$ $(d((arccos(x/6)^2)))/dx = (d(f(g(h(x)))))/dx$

$\frac{d (({arccos (\frac{x}{6})}^{2}))}{d x} = \frac{d f}{d g} \frac{d g}{d h} \frac{d h}{d x} [1]$ $(d((arccos(x/6)^2)))/dx = (df)/(dg)(dg)/(dh)(dh)/dx" [1]"$

$\frac{d f}{d g} = 2 g = 2 arccos (h) = 2 arccos (\frac{x}{6})$ $(df)/(dg) = 2g = 2arccos(h) = 2arccos(x/6)$

$\frac{d g}{d h} = - \frac{1}{\sqrt{1 - h^{2}}} = - \frac{1}{\sqrt{1 - {(\frac{x}{6})}^{2}}}$ $(dg)/(dh) = -1/sqrt(1 - h^2) = -1/sqrt(1 - (x/6)^2)$

$\frac{d h}{d x} = \frac{1}{6}$ $(dh)/dx = 1/6$

Substituting into equation [1]

$\frac{d (({arccos (\frac{x}{6})}^{2}))}{d x} = (2 arccos (\frac{x}{6})) ⎛ ⎜ ⎜ ⎜ ⎜ ⎝ - \frac{1}{\sqrt{1 - {(\frac{x}{6})}^{2}}} ⎞ ⎟ ⎟ ⎟ ⎟ ⎠ (\frac{1}{6})$ $(d((arccos(x/6)^2)))/dx = (2arccos(x/6))(-1/sqrt(1 - (x/6)^2))(1/6)$

$\frac{d (({arccos (\frac{x}{6})}^{2}))}{d x} = \frac{- 2 arccos (\frac{x}{6})}{6 \sqrt{1 - {(\frac{x}{6})}^{2}}}$ $(d((arccos(x/6)^2)))/dx = (-2arccos(x/6))/(6sqrt(1 - (x/6)^2))$

$\frac{d (({arccos (\frac{x}{6})}^{2}))}{d x} = \frac{- 2 arccos (\frac{x}{6})}{\sqrt{36 - x^{2}}}$ $(d((arccos(x/6)^2)))/dx = (-2arccos(x/6))/sqrt(36 - x^2)$

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How do you find the derivative of the function: ${(arccos (\frac{x}{6}))}^{2}$ $(arccos(x/6))^2$ ?

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Explanation:

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