Question

Use the first and second derivatives of the function y = x^3-3x^2-9x+15 to find the intervals of increase and decrease. Help!?

Answer 1

The function is decreasing for `x in [-1, 3]`, and is decreasing for all x outside this interval, `x !in [-1, 3]`.

Explanation:

You may benefit from looking at some videos where the derivatives are explained, for instance

It is always a good idea to start with drawing a graph of your 3rd degree function (I've used Geogebra):

The graph shows that for `x in [-1, 3]` the function is decreasing, and it is decreasing for all x outside this interval, `x !in [-1, 3]`.

Let's use the 1st and 2nd derivatives to find this, as requested in the task:
`y=x^3-3x^2-9x+15`
`y'=3x^2-6x-9=3(x+1)(x-3)`
`y''=6x-6=6(x-1)`

`y'` gives the slope in each point of the curve, and `y''` tels if it's increasing or decreasing in the point. Therefore, for what values of x is `y'=0`?

The first derivative`y'=3(x+1)(x-3)`
We see that `y'=0` when `x=-1` and `x=3`, so the slope changes direction in these points.

Next: the 2nd derivative `y''=6(x-1)`.
`x=-1`: `y''=6(x-1)=6(-2)=-12<0`
A negative value tells us that the slope is changing from an increase to decrease

`x=3`: `y''=6(x-1)=6*2=12>0`
A positive value tells us that the slope is changing from a decrease to increase.

This is actually in agreement with what we could see from the graph.