This is a great place to use the `diff`

function.

Your first step will be to do the following:
`B = [0 diff(a)]`

The reason we add the 0 there is to keep the matrix the same length because of the way the `diff`

function works. It will start with the first element in the matrix and then report the difference between that and the next element. There's no leading element before the first one so is just truncates the matrix by one element. We add a zero because there is no change there as it's the starting element.

If you look at the results in `B`

now it is quite obvious where the inflection points are (where you go from positive to negative numbers).

To pull this out programatically there are a number of things you can do. I tend to use a little multiplication and the `find`

command.

`Result = find(B(1:end-1).*B(2:end)<0)`

This will return the index where you are on the cusp of the inflection. In this case it will be:

```
ans =
4 7 13
```