How do you find the intervals which are concave up and concave down for $f(x) = x/x^2 - 5$ ?

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How do you find the intervals which are concave up and concave down for $f(x) = x/x^2 - 5$ ?

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Answer 1 · 2015-10-18T00:17:08

Assuming that this should be $f(x) = x/(x^2 - 5)$ , see below.

Explanation:

To determine concavity, investigate the sign of the second derivative.

$f''(x) = (2x(x^2+15))/(x^2-5)^3$

$f''$ is zero at $0$ and undefined at $+-sqrt5$ , so we investigate the sign in four intervals:

${: (bb "Interval", bb"Sign of "f'',bb" Concavity"), ((-oo,-sqrt5)," " -" ", " "" Down"), ((-sqrt5,0), " " +, " " " Up"), ((0,sqrt5), " " -, " " " Down"), ((sqrt5,oo), " " +, " "" Up") :}$

The only inflection point is $(0,0)$ .

( $f$ is undefined at $+-sqrt5$ , so there is no point on the graph at $x = +-sqrt5$ .)

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How do you find the intervals which are concave up and concave down for $f(x) = x/x^2 - 5$ ?

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Explanation:

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Science

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Humanities

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How do you find the intervals which are concave up and concave down for f(x) = x/x^2 - 5f(x) = x/x^2 - 5?

1 Answer

Explanation:

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How do you find the intervals which are concave up and concave down for $f(x) = x/x^2 - 5$ ?