I'd like to define a function *f*(*x*), and then define another function that it its integral.

```
from sympy import *
x = symbols('x')
f = lambda x: x**2
```

I'd like to do something like this:

```
g = lambda x: integrate(f(x),x)
```

Problem is, if I enter

```
g(2)
```

it fails. This is because it's holding the right-hand side of *g*(*x*) unevaluated until I call it. It passes the 2 into the integrate, and tries to integrate with respect to 2.

I can force the right behavior if I write:

```
g = lambda x: integrate(f(s),s).subs(s,x)
```

but that seems really clunky.

Is there a way to evaluate the integral symbolically in terms of *x*, and then define the function *g*(*x*) with that result?

`Integral`

rather than`integrate`

but I'm not really sure what it is you want to do. I think maybe you're confused about the difference between the lambda variable`x`

and the symbol`x`

because those are not the same.`lambda`

variable`x`

with anything (since it's just treated as a local variable). I'd likef(x) to be anything in terms of the symbolx, and defineg(x) to be its integral with respect tox. So when I then enterg(foo), I get the integral off(x) wrtx, evaluated atx=foo.`Integral`

does not work for this purpose.