# How to define a mathematical function in SymPy?

I've been trying this now for hours. I think I don't understand a basic concept, that's why I couldn't answer this question to myself so far.

What I'm trying is to implement a simple mathematical function, like this:

``````f(x) = x**2 + 1
``````

After that I want to derive that function.

I've defined the symbol and function with:

``````x = sympy.Symbol('x')
f = sympy.Function('f')(x)
``````

Now I'm struggling with defining the equation to this function `f(x)`. Something like `f.exp("x**2 + 1")` is not working.

I also wonder how I could get a print out to the console of this function after it's finally defined.

• i think you want lambdas? i am not familiar with sympy though. – Amit Gold May 8 '16 at 12:59
• I would love to use lambdas, but the task says, that I have to solve this with sympy. – Robin May 8 '16 at 13:00
• Perhaps you are looking for `f = x**2 + 1`? – unutbu May 8 '16 at 13:05

`sympy.Function` is for undefined functions. Like if `f = Function('f')` then `f(x)` remains unevaluated in expressions.

If you want an actual function (like if you do `f(1)` it evaluates `x**2 + 1` at `x=1`, you can use a Python function

``````def f(x):
return x**2 + 1
``````

Then `f(Symbol('x'))` will give a symbolic `x**2 + 1` and `f(1)` will give `2`.

Or you can assign the expression to a variable

``````f = x**2 + 1
``````

and use that. If you want to substitute `x` for a value, use `subs`, like

``````f.subs(x, 1)
``````
• Thanks for this. Do you still need to do `f = Function('f')` before defining the function or is that implicit from the python function definition? – Bill Sep 10 at 15:04
• @Bill `def f(...)` sets the variable `f` to be the Python function defined by the def. If you do `f = Function('f')`, that will override the variable `f` to be the SymPy object `Function('f')`. The two options I show here do not use `Function` at all. That is only if you want something that is completely unevaluated. See also the section in the SymPy tutorial on symbols. – asmeurer Sep 10 at 19:45

``````>>> import sympy
>>> x = sympy.symbols('x')
>>> f = x**2 + 1
>>> sympy.diff(f, x)
2*x
``````
• For what is sympy.Function uses, when not for defining functions? – Robin May 8 '16 at 14:19
• I suppose it's a base class for a whole range of standard functions. – enedil May 8 '16 at 14:23
• @Robin `sympy.Function` is for undefined functions. Like if `f = Function('f')` then `f(x)` remains unevaluated in expressions. – asmeurer May 9 '16 at 17:25

Another possibility (`isympy` command prompt):

``````>>> type(x)
<class 'sympy.core.symbol.Symbol'>
>>> f = Lambda(x, x**2)
>>> f
2
x ↦ x
>>> f(3)
9
``````

Calculating the derivative works like that:

``````>>> g = Lambda(x, diff(f(x), x))
>>> g
x ↦ 2x
>>> g(3)
6
``````

You can define it according to ways:

• a python function with def as describe above
• a python expression g=x**2 + 1
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