Parse your string into an S-expression (even though this is usually taken in Lisp context, you can do an equivalent thing in pretty much any language), easiest with lex/yacc or equivalent, then write a recursive "derive" function. In OCaml-ish dialect, something like this:

```
let rec derive var = function
| Const(_) -> Const(0)
| Var(x) -> if x = var then Const(1) else Deriv(Var(x), Var(var))
| Add(x, y) -> Add(derive var x, derive var y)
| Mul(a, b) -> Add(Mul(a, derive var b), Mul(derive var a, b))
...
```

(If you don't know OCaml syntax - `derive`

is two-parameter recursive function, with first parameter the variable name, and the second being mathched in successive lines; for example, if this parameter is a structure of form `Add(x, y)`

, return the structure `Add`

built from two fields, with values of derived `x`

and derived `y`

; and similarly for other cases of what `derive`

might receive as a parameter; `_`

in the first pattern means "match anything")

After this you might have some clean-up function to tidy up the resultant expression (reducing fractions etc.) but this gets complicated, and is not necessary for derivation itself (i.e. what you get without it is still a correct answer).

When your transformation of the s-exp is done, reconvert the resultant s-exp into string form, again with a recursive function