How do you determine whether the function $f (x) = \frac{2 x - 3}{x^{2}}$ $f(x)=(2x-3) / (x^2)$ is concave up or concave down and its intervals?

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How do you determine whether the function $f (x) = \frac{2 x - 3}{x^{2}}$ $f(x)=(2x-3) / (x^2)$ is concave up or concave down and its intervals?

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Answer 1 · 2015-07-28T17:24:22

$f (x) = \frac{2 x - 3}{x^{2}}$ $f(x)=(2x-3)/(x^2)$ is concave up when $x > \frac{9}{2}$ $x > 9/2$ and concave down when $x < \frac{9}{2}$ $x < 9/2$ (and $x \neq 0$ $x!=0$ ).

Explanation:

By the Quotient Rule, for $x \neq 0$ $x!=0$ , the first derivative is $f'(x)=(x^2*2-(2x-3)*2x)/(x^4)=(-2x^2+6x)/(x^4)=(-2x+6)/(x^3)$

and the second derivative is
$f''(x)=(x^3*(-2)-(-2x+6)*3x^2)/(x^6)=(4x^3-18x^2)/(x^6)=(4x-18)/(x^4)$

Since $x^4\geq 0$ for all $x$ , the sign of $f''(x)$ is the same as the sign of its numerator $4x-18$ . This expression is positive when $4x>18\Leftrightarrow x > 9/2$ and negative when $4x < 18 \Leftrightarrow x < 9/2$ .

The value $x=9/2$ is the first coordinate of the unique inflection point of the graph of $f$ . The second coordinate is $f(9/2) = (9-3)/((9/2)^2)=6/(81/4)=24/81=8/27$

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How do you determine whether the function $f (x) = \frac{2 x - 3}{x^{2}}$ $f(x)=(2x-3) / (x^2)$ is concave up or concave down and its intervals?

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Explanation:

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How do you determine whether the function f(x)=(2x-3) / (x^2)f(x)=2x−3x2f(x)=(2x-3) / (x^2) is concave up or concave down and its intervals?

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Explanation:

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How do you determine whether the function $f (x) = \frac{2 x - 3}{x^{2}}$ $f(x)=(2x-3) / (x^2)$ is concave up or concave down and its intervals?