Question

What are the points of inflection, if any, of `f(x)= x^5+ x^3- x^2-2`?

Answer 1

The point of inflection is `=(0.269, -2.051)`

Explanation:

Calculate the first and second derivatives

`f(x)=x^5+x^3-x^2-2`

`f'(x)=5x^4+3x^2-2x`

`f''(x)=20x^3+6x-2`

The points of inflection are when

`f''(x)=0`

`20x^3+6x-2=0`

`<=>`, `10x^3+3x-1=0`

The solution of this equation is obtained graphically

`x=0.269`

The point of inflection is `=(0.269, -2.051)`

graph{(y-(x^5+x^3-x^2-2))(y-(10x^3+6x-2))=0 [-2.712, 4.217, -4.075, -0.61]}