How do you determine whether the function $f (x) = 3 x^{5} - 20 x^{3}$ $f(x)=3x^5 - 20x^3$ is concave up or concave down and its intervals?

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How do you determine whether the function $f (x) = 3 x^{5} - 20 x^{3}$ $f(x)=3x^5 - 20x^3$ is concave up or concave down and its intervals?

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Answer 1 · 2015-09-07T21:17:44

We use the second derivative test and find that
f is concave down on $(- \infty; - \sqrt{2}) \cup (0; \sqrt{2})$ $(-oo ; -sqrt2)uu(0;sqrt2)$ and concave up on $(- \sqrt{2}; 0) \cup (\sqrt{2}; \infty)$ $(-sqrt2;0)uu(sqrt2;oo)$

Explanation:

For concavity we use the second derivative test.

$f'(x)=15x^4-60x^2$
$f''(x)=60x^3-120x =60x(x^2-2)$

This second derivative equals zero if $x = 0$ or $x = - sqrt2$ or $x = sqrt2$ .

These are then the possible inflection points of the function where concavity could change.
We now investigate the sign of the second derivative around these points :

____ -root2 __ 0 ___root2 _______
F''(x) ; - + - +

$therefore f$ is concave down on $(-oo ; -sqrt2)uu(0;sqrt2)$ and concave up on $(-sqrt2;0)uu(sqrt2;oo)$

graph{3x^5-20x^3 [-10, 10, -5.21, 5.21]}

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How do you determine whether the function $f (x) = 3 x^{5} - 20 x^{3}$ $f(x)=3x^5 - 20x^3$ is concave up or concave down and its intervals?

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Science

Math

Humanities

... and beyond

How do you determine whether the function f(x)=3x^5 - 20x^3f(x)=3x5−20x3f(x)=3x^5 - 20x^3 is concave up or concave down and its intervals?

1 Answer

Explanation:

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How do you determine whether the function $f (x) = 3 x^{5} - 20 x^{3}$ $f(x)=3x^5 - 20x^3$ is concave up or concave down and its intervals?