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

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Answer 1 · 2017-11-19T01:06:36

Concave (Convex) Up on the interval $( -oo,1 )$
Concave (Convex) Down on the interval $( 1, oo )$

We are given the function $f(x) = -x^3 + 3x^2 - 2x + 2$

$color(red)(Step.1)$

Find the First Derivative

$f'(x) = -3x^2 + 6x -2$

$color(red)(Step.2)$

Find the Second Derivative

$f''(x) = -6x + 6$

$color(red)(Step.3)$

Next, set

$f''(x) = -6x + 6 = 0$

Simplifying, we get $x = 1$

$color(red)(Step.4)$

Then, we consider a number larger than 1 and a number smaller than 1 and substitute the values in our Second Derivative.

If the number is Greater than 1, our $f''(x) = -6x + 6"$ will yield a "Negative" number.

If the number is Less than than 1, our $f''(x) = -6x + 6"$ will yield a "Positive" number.

Hence, we observe that $f(x)$ is "Concave Up" on the interval $(-oo, 1)$ and "Concave Down" on the interval $(1, oo)$

Refer to the Number Line as shown below:

:..........................................................*..................................................................:

             Positive                                                  Negative

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