For what values of x is $f(x)=(-2x)/(x-1)$ concave or convex?

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Answer 1 · 2016-01-02T12:43:04

Study the sign of the 2nd derivative.

For $x<1$ the function is concave.
For $x>1$ the function is convex.

You need to study curvature by finding the 2nd derivative.

$f(x)=-2x/(x-1)$

The 1st derivative:

$f'(x)=-2((x)'(x-1)-x(x-1)')/(x-1)^2$

$f'(x)=-2(1*(x-1)-x*1)/(x-1)^2$

$f'(x)=-2(x-1-x)/(x-1)^2$

$f'(x)=2*1/(x-1)^2$

The 2nd derivative:

$f''(x)=(2*(x-1)^-2)'$

$f''(x)=2((x-1)^-2)'$

$f''(x)=2*(-2)(x-1)^-3$

$f''(x)=-4/(x-1)^3$

Now the sign of $f''(x)$ must be studied. The denominator is positive when:

$-(x-1)^3>0$
$(x-1)^3<0$
$(x-1)^3<0^3$
$x-1<0$
$x<1$

For $x<1$ the function is concave.
For $x>1$ the function is convex.

Note: the point $x=1$ was excluded because the function $f(x)$ can not be defined for $x=1$ , since the denumirator would become 0.

Here is a graph so you can see with your eyes:

graph{(-2x)/(x-1) [-14.08, 17.95, -7.36, 8.66]}

For what values of x is f(x)=(-2x)/(x-1)f(x)=(-2x)/(x-1) concave or convex?