For what values of x is $f (x) = \frac{4}{x^{2}} + 1$ $f(x)=4/x^2+1$ concave or convex?

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For what values of x is $f (x) = \frac{4}{x^{2}} + 1$ $f(x)=4/x^2+1$ concave or convex?

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Answer 1 · 2016-04-14T18:33:46

$f$ $f$ is convex on the interval $(- \infty, 0) \cup (0, + \infty)$ $(-oo,0)uu(0,+oo)$ .

Explanation:

The determine when a function is concave or convex, analyze the sign, positive or negative, of the function's second derivative:

When $f''>0$ , then $f$ is convex.
When $f''<0$ , then $f$ is concave.

So, we first must find $f''$ .

Note that we can write $f$ as

$f(x)=4x^-2+1$

Now, through the power rule, we see that

$f'(x)=-8x^-3$

$f''(x)=24x^-4=24/x^4$

We must now determine when $24/x^4$ is positive or negative.

It's necessary to note that $x^4$ will always be positive, so $24/x^4$ will also always be positive. Recall that the domain of $f$ excludes $0$ , so we know that

$f$ is convex on the interval $(-oo,0)uu(0,+oo)$ .

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For what values of x is $f (x) = \frac{4}{x^{2}} + 1$ $f(x)=4/x^2+1$ concave or convex?

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Explanation:

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For what values of x is f(x)=4/x^2+1f(x)=4x2+1f(x)=4/x^2+1 concave or convex?

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Explanation:

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For what values of x is $f (x) = \frac{4}{x^{2}} + 1$ $f(x)=4/x^2+1$ concave or convex?