How do you find the derivative of the function: $\frac{arccos x}{x + 1}$ $(arccosx)/(x+1)$ ?

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How do you find the derivative of the function: $\frac{arccos x}{x + 1}$ $(arccosx)/(x+1)$ ?

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Answer 1 · 2016-12-19T17:32:24

$f'(x) = (-(x+ 1)/sqrt(1 - x^2) - arccosx)/(x +1)^2$

Explanation:

Step 1: Determine the derivative of $y = arccosx$

The notation $y = arccosx$ signifies that $cosy = x$ . Therefore:

$-siny(dy/dx) = x$

$dy/dx= - 1/siny$

We know that $sin^2y + cos^2y = 1 -> sin^2y = 1 - cos^2y$ and that $siny = sqrt(1 -cos^2y)$ . We saw above that if $y = arccosx$ , then $cosy = x$ , so $siny = sqrt(1 - x^2)$ .

The derivative is hence $dy/dx = -1/sqrt(1 - x^2)$ .

Step 2: Determine the derivative of the entire function

Use the quotient rule.

Call the function $f(x)$ :

$f'(x) = (-1/sqrt(1 - x^2) xx (x + 1) - 1(arccosx))/(x + 1)^2$

$f'(x) = (-(x+ 1)/sqrt(1 - x^2) - arccosx)/(x +1)^2$

Hopefully this helps!

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How do you find the derivative of the function: $\frac{arccos x}{x + 1}$ $(arccosx)/(x+1)$ ?

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Explanation:

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How do you find the derivative of the function: $\frac{arccos x}{x + 1}$ $(arccosx)/(x+1)$ ?