Question

Is `f(x)=x^4-4x^3+x-4` concave or convex at `x=-1`?

Answer 1

convex

Explanation:

To find that out, we need to get the second derivative first.

Getting the first derivative.

`[1]" "f'(x)=d/dx(x^4-4x^3+x-4)`

We can easily find this using power rule.

`[2]" "f'(x)=4x^3-12x^2+1`

Getting the second derivative.

`[1]" "f''(x)=d/dx(4x^3-12x^2+1)`

Use power rule again.

`[2]" "f''(x)=12x^2-24x`

Now that we know the second derivative, we will evaluate `f''(x)` at `x=-1` to check its concavity.

• If `f''(x)>0`, then it is concave up or convex
• If `f''(x)<0`, then it is concave down or concave

`[1]" "f''(-1)=12(-1)^2-24(-1)`

`[2]" "f''(-1)=12+24`

`[3]" "f''(-1)=36`

Since `f(x)` is 36 at `x=-1` and 36 is greater than 0, then `f(x)` is convex at `x=-1`.