What are the local extrema, if any, of $f (x) = \frac{x^{3} - 3}{x + 6}$ $f (x) =(x^3-3)/(x+6)$ ?

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What are the local extrema, if any, of $f (x) = \frac{x^{3} - 3}{x + 6}$ $f (x) =(x^3-3)/(x+6)$ ?

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Answer 1 · 2015-11-12T15:51:51

The one real number critical point of this function is $x \approx - 9.01844$ $x approx -9.01844$ . A local minimum occurs at this point.

Explanation:

By the Quotient Rule, the derivative of this function is

$f'(x)=((x+6)*3x^2-(x^3-3)*1)/((x+6)^2)=(2x^3+18x^2+3)/((x+6)^2)$

This function equals zero if and only if $2x^3+18x^2+3=0$ . The roots of this cubic include on negative irrational (real) number and two complex numbers.

The real root is $x approx -9.01844$ . If you plug in a number just less than this into $f'$ , you'll get a negative output and if you plug a number just greater than this into $f'$ , you'll get a positive output. Therefore, this critical point gives a local minimum value of $f$ (and $f(-9.01844) approx 244$ is the local minimum value (output).

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What are the local extrema, if any, of $f (x) = \frac{x^{3} - 3}{x + 6}$ $f (x) =(x^3-3)/(x+6)$ ?

1 Answer

Explanation:

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What are the local extrema, if any, of f (x) =(x^3-3)/(x+6)f(x)=x3−3x+6f (x) =(x^3-3)/(x+6)?

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What are the local extrema, if any, of $f (x) = \frac{x^{3} - 3}{x + 6}$ $f (x) =(x^3-3)/(x+6)$ ?