# Mathematical expression as argument to function?

I'm very much a beginner, so please be gentle.

I am tinkering with some Python exercises, and I have code looking like this.

``````def newton(x0, Tol):
def F(x):
return (x**3)+898
def dF(x):
return 3*x**2
x=[x0]
for n in range(400):
x.append(x[n]-(F(x[n]))/dF(x[n]))
if abs((x[n+1])-(x[n]))<Tol:
conv='Converge'
print n
break
if abs((x[n+1])-(x[n]))>=Tol:
conv='No converge'
return x[n+1], conv
``````

I define a function `F(x)` and its derivative `dF(x)` and add values to a list `x`.

The task is to check if the series converge or not, which I think I have succeeded with.

But the question I have is regarding having the functions `(x**3)+898` and `3*x**2` as arguments to the function `Newton`.

I imagined it would be something like this

``````def newton(f, df, x0, Tol):
def F(x):
return f
def dF(x):
return df
*calculations*
return x[n+1], conv
``````

And you would call it with

``````newton((x**3)+898, 3*x**2, x0=something, Tol=something)
``````

So that the functions `F(x)` and `dF(x)` are defined in the process.

However, `x` is not defined so it does not work.

Note that having f and df as parameters of 'newton' is required in the excercise.

How would you go about solving this?

Thanks.

-

You can use `lambda`s, which are basically simple functions.

You would call it like this:

``````newton(lambda x: (x**3)+898, lambda x: 3*x**2, x0=something, Tol=something)
``````

This would be the same as doing something like this:

``````def f1(x):
return (x**3)+898
def f2(x):
return 3*x**2
newton(f1, f2, x0=something, Tol=something)
``````

The only difference is that you don't "give the lambda a name", ie assign it to a variable. This is handy for functions you only need to use once, especially as key arguments to functions like `sorted` and `max`.

-

Use `lambda`:

``````newton(lambda x: (x**3)+898, lambda x: 3*x**2, x0=something, Tol=something)
``````
-