# How to know whether a function is continuous with sympy?

I need to define a function that checks if the input function is continuous at a point with sympy.

I searched the sympy documents with the keyword "continuity" and there is no existing function for that. I think maybe I should consider doing it with limits, but I'm not sure how.

``````def check_continuity(f, var, a):
try:
f = sympify(f)
except SympifyError:
return("Invaild input")
else:
x1 = Symbol(var, positive = True)
x2 = Symbol(var, negative = True)
//I don't know what to do after this
``````

## 2 Answers

Yes, you need to use the limits.

The formal definition of continuity at a point has three conditions that must be met. A function f(x) is continuous at a point where x = c if

• lim x —> c f(x) exists
• f(c) exists (That is, c is in the domain of f.)
• lim x —> c f(x) = f(c)

SymPy can compute symbolic limits with the limit function.

``````>>> limit(sin(x)/x, x, 0)
1
``````

I would suggest you use the function `continuous_domain`. This is defined in the `calculus.util` module.

Example usage:

``````>>> from sympy import Symbol, S
>>> from sympy.calculus.util import continuous_domain
>>> x = Symbol("x")
>>> f = sin(x)/x
>>> continuous_domain(f, x, S.Reals)
Union(Interval.open(-oo, 0), Interval.open(0, oo))
``````

This is documented in the SymPy docs here. You can also view the source code here.