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

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

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Answer 1 · 2015-09-23T15:21:06

Refer to explanation

Explanation:

We have that $f(x)=x/(x^2+2)$ calculating its second derivative we find that

$d^2 f(x)/(d^2x)=(2x(x^2-6))/(x^2+2)^3$ .

So we need to see how the signs change of $2x(x^2-6)$ as x goes
from $-oo$ to $+oo$

So from $(-oo,-sqrt6]$ we have that $f''(x)<0$

from $[-sqrt6,0]$ we have that $f''(x)>0$

from $[0,sqrt6]$ we have that $f''(x)<0$

from $[sqrt6,+oo)$ we have that $f''(x)>0$

In order to determine concavity we use the following theorem

Concavity Theorem:

If the function $f$ is twice differentiable at $x=c$ , then the graph of f is concave upward at $(c;f(c))$ if $f''(c)>0$ and concave downward if $f''(c)<0$ .

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

1 Answer

Explanation:

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Science

Math

Humanities

... and beyond

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