Question

How do you use the first and second derivatives to sketch `y=x^4-2x`?

Answer 1

minimum `(0.79;-1.19)`
inflection `(0;0)`
convex

Explanation:

The first derivative is:

`f'(x)=4x^3-2`

Let's study the solution of the inequality

`f'(x)>=0`

that's

`4x^3-2>=0`

`x>=root(3)(1/2)~=0.79`

It means that

if `x < root(3)(1/2)` the function is decreasing;

if `x > root(3)(1/2)` the function is increasing;

then if x=if `x < root(3)(1/2)` the function has a minimum and there `f(x)=(root(3)(1/2))^4-2*root(3)(1/2)=(root(3)(1/16))-2*root(3)(1/2)~=-1.19`;

The second derivative is:

`f''(x)=12x^2`

Let's study the solution of the inequality

`f''(x)>=0`

that's

`12x^2>=0` that is verified `AAx in RR`

It tells the function is convex and if `x=0` there is a point of inflection and it is the origin `O(0;0)`

graph{y=x^4-2x [-2, 3, -2, 5]}