Is $f(x)=-sqrt(e^x -x^3-2x$ concave or convex at $x=-1$ ?

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Answer 1 · 2017-05-15T02:18:54

$f(x)$ is convex at $x=-1$ .

$f(x)=- sqrt(e^x-x^3-2x) = -(e^x-x^3-2x)^(1/2)$

Determine the concavity of a graph by finding the second derivative of the function, and the sign of $f"(-1)$ represents the concavity.

Differentiate using the chain rule:
$f'(x)=-1/2(e^x-x^3-2x)^(-1/2)(e^x-3x^2-2)$

$f'(x)= frac{-(e^x-3x^2-2)}{2(e^x-x^3-2x)}$

Differentiate using the quotient rule:
$f''(x) = frac{-2(e^x-x^3-2x)(e^x-6x)+(e^x-3x^2-2)^2(2)}{4(e^x-x^3-2x)^2}$

Plug in $x=-1$ :
$f''(-1)= frac{-2(1/e +1+2)(1/e +6)+(1/e -3 -2)^2(2)}{4(1/e +3)^2}$

This value is negative because the numerator is negative while the denominator is positive.

Therefore, $f(x)$ is convex at $x=-1$ .

Is f(x)=-sqrt(e^x -x^3-2x f(x)=-sqrt(e^x -x^3-2x concave or convex at x=-1 x=-1 ?