Over what intervals is $f (x) = ln (9 - x^{2})$ $f(x)=ln(9-x^2)$ increasing and decreasing?

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Over what intervals is $f (x) = ln (9 - x^{2})$ $f(x)=ln(9-x^2)$ increasing and decreasing?

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Answer 1 · 2015-12-03T16:16:37

It is increasing on $(- 3, 0)$ $(-3,0)$ and decreasing on $(0, 3)$ $(0,3)$

Explanation:

$f (x) = ln (9 - x^{2})$ $f(x)=ln(9-x^2)$

Observe first that $f$ $f$ is defined (real valued) only when $9 - x^{2}$ $9-x^2$ is positive.

So the domain of $f$ $f$ is $(- 3, 3)$ $(-3,3)$

$f'(x) = (-2x)/(9-x^2)$

Recall that the domain of $f$ includes only values of $x$ for which $9-x^2$ is positive.
Therefore, the sign of $f'$ on the domain of $f$ is the same as that of $-2x$ , which is

positive for $-3 < x < 0$ , so $f$ is increasing on $(-3,0)$ , and

negative for $0 < x < 3$ , so $f$ is decreasing on $(0,3)$ .

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Over what intervals is $f (x) = ln (9 - x^{2})$ $f(x)=ln(9-x^2)$ increasing and decreasing?

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Over what intervals is f(x)=ln(9-x^2) f(x)=ln(9−x2) f(x)=ln(9-x^2) increasing and decreasing?

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Over what intervals is $f (x) = ln (9 - x^{2})$ $f(x)=ln(9-x^2)$ increasing and decreasing?