How can the following formula be simplified in Maxima:
` diff(h((x-1)^2),x,1)`

Mathematically it should be : 2*(x-1)*h'((x-1)^2)
But maxima gives : d/dx h((x-1)^2)

## 1 Answer

Maxima doesn't apply the chain rule by default, but there is an add-on package named `pdiff`

(which is bundled with the Maxima installation) which can handle it.

`pdiff`

means "positional derivative" and it uses a different, more precise, notation to indicate derivatives. I'll try it on the expression you gave.

```
(%i1) load ("pdiff") $
(%i2) diff (h((x - 1)^2), x);
2
(%o2) 2 h ((x - 1) ) (x - 1)
(1)
```

The subscript `(1)`

indicates a first derivative with respect to the argument of `h`

. You can convert the positional derivative to the notation which Maxima usually uses.

```
(%i3) convert_to_diff (%);
!
d !
(%o3) 2 (x - 1) (----- (h(g485))! )
dg485 ! 2
!g485 = (x - 1)
```

The made-up variable name `g485`

is just a place-holder; the name of the variable could be anything (and if you run this again, chances are you'll get a different variable name).

At this point you can substitute for `h`

or `x`

to get some specific values. Note that `ev(something, nouns)`

means to call any quoted (evaluation postponed) functions in `something`

; in this case, the quoted function is `diff`

.

```
(%i4) ev (%, h(u) := sin(u));
!
d !
(%o4) 2 (x - 1) (----- (sin(g485))! )
dg485 ! 2
!g485 = (x - 1)
(%i5) ev (%, nouns);
2
(%o5) 2 cos((x - 1) ) (x - 1)
```