Is $f(x)=-x^5+3x^4-9x^3-2x^2-6x$ concave or convex at $x=8$ ?

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Answer 1 · 2017-04-01T19:40:41

$f(x)$ is concave at $x=8$ . We know this by looking at the second derivative, which tells us about the concavity/shape of the graph.

When looking for the concavity of a function, it's best to find the second derivative, $f''(x)$ , of the function, $f(x)$ .

When $f''(x)<0$ , the $f(x)$ is concave
When $f''(x)>0$ , the $f(x)$ is convex

The first derivative of this function is:
$f'(x)=-5x^4+12x^3-27x^2-4x-6$

The second derivative is:
$f''(x)=-20x^3+36x^2-54x-4$

Plug in $x=8$ to get:
$f''(8)=-20(8)^3+36(8)^2-54(8)-4$
$f''(8)=-8372$

Since $f''(8)<0$ , the $f(x)$ is concave at $x=8$ .

Is f(x)=-x^5+3x^4-9x^3-2x^2-6xf(x)=-x^5+3x^4-9x^3-2x^2-6x concave or convex at x=8x=8?