How do you use the chain rule to differentiate $y=root5(x^2-3)/(-x-5)$ ?

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How do you use the chain rule to differentiate $y=root5(x^2-3)/(-x-5)$ ?

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Answer 1 · 2017-11-21T07:55:37

Separate into components

Explanation:

$y = (root(5)(x^2-3))/(-x-5)$
Let $u = root(5)(x^2-3)$ and $v =-1/(x+5)$

$y' = udv+vdu$
$y' = root(5)(x^2-3)\times1/(x+5)^2-1/(x+5)(1/5)(x^2-3)^(-4/5) 2x$
$y' = root(5)(x^2-3)\times1/(x+5)^2(1-(2x(x+5))/(x^2-3))$
$y' = root(5)(x^2-3)\times1/(x+5)^2(-(x^2+10x+3))/(x^2-3)$
$y' = (root(5)(x^2-3))^4 \times(1+22/(x+5)^2)$

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How do you use the chain rule to differentiate $y=root5(x^2-3)/(-x-5)$ ?

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