# python - how to find area under curve? [closed]

would like to ask if it is possible to calculate the area under curve for a fitted distribution curve?

The curve would look like this I've seen some post online regarding the usage of trapz, but i'm not sure if it will work for a curve like that. Please enlighten me and thank you for the help!

## closed as too broad by Martin Thoma, Schorsch, Don't Panic, Jesse Jashinsky, Hanlet EscañoDec 21 '15 at 18:52

Please edit the question to limit it to a specific problem with enough detail to identify an adequate answer. Avoid asking multiple distinct questions at once. See the How to Ask page for help clarifying this question. If this question can be reworded to fit the rules in the help center, please edit the question.

• what is your input? function or set of points? – HadiRj Dec 21 '15 at 8:29
• – albert Dec 21 '15 at 8:33
• It's math stuff, just integrate the function. – Netwave Dec 21 '15 at 10:17
• Please give the (minimal) code you have so far. – Martin Thoma Dec 21 '15 at 10:31
• I'd guess the sum is exactly 1 and the answer to your question is yes. – Ulrich Eckhardt Dec 21 '15 at 10:33

If your distribution, `f`, is discretized on a set of points, `x`, that you know about, then you can use `scipy.integrate.trapz` or `scipy.integrate.simps` directly (pass `f`, `x` as arguments in that order). For a quick check (e.g. that your distribution is normalized), just sum the values of `f` and multiply by the grid spacing:

``````import numpy as np
from scipy.integrate import trapz, simps

x, dx = np.linspace(-100, 250, 50, retstep=True)
mean, sigma = 90, 20
f = np.exp(-((x-mean)/sigma)**2/2) / sigma / np.sqrt(2 * np.pi)
print('{:18.16f}'.format(np.sum(f)*dx))
print('{:18.16f}'.format(trapz(f, x)))
print('{:18.16f}'.format(simps(f, x)))
``````

Output:

``````1.0000000000000002
0.9999999999999992
1.0000000000000016
``````

Firstly, you have to find a function from a graph. You can check here. Then you can use integration in python with scipy. You can check here for integration. It is just math stuff as Daniel Sanchez says.