For what values of x is $f(x)=3x^3-7x^2-5x+9$ concave or convex?

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Answer 1 · 2016-06-05T19:21:27

$f$ is concave (concave down) on $(-oo,7/9)$ and is convex (concave up) on $(7/9,oo)$ .

The convexity and concavity of the function $f$ can be determined by looking at the sign of the second derivative:

To find the function's second derivative, use the power rule.

$f(x)=3x^3-7x^2-5x+9$

$f'(x)=9x^2-14x-5$

$f''(x)=18x-14$

So, the convexity and concavity are determined by the sign of $f''(x)=18x-14$ .

The second derivative equals $0$ when $18x-14=0$ , which is at $x=7/9$ .

When $x>7/9$ , $f''(x)>0$ , so $f(x)$ is convex on $(7/9,oo)$ .

When $x<7/9$ , $f''(x)<0$ , so $f(x)$ is concave on $(-oo,7/9)$ .

For what values of x is f(x)=3x^3-7x^2-5x+9f(x)=3x^3-7x^2-5x+9 concave or convex?