Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I am looking for a way to add together multiple mathematical functions before assigning the numerical values for the variables in the equations.
I am doing it this way because I need to optimize my code, and I want to assign different values to the variables each time. An example of what I am trying to do:

  1. f(x, y) = x + 2y

  2. g(x, y) = 3x - y

  3. adds f(x, y) + g(x, y) to get h(x, y), so f(x, y) + g(x, y) = h(x, y) = 4x + y

  4. Now that I have h(x, y), I need multiple values from h(x, y)

x = 4; y = 3, h(x, y) = 19
x = 1, y = 0, h(x, y) = 4


Is this possible? I was trying to create them as strings, add the strings, then remove the quotes to evaluate the sum but this did not work. I am trying to do my method this way because I want to optimize my code. It would help very much if I am able to create my final function before evaluating it (it would be h(x, y) in this case).

EDIT: I'm doing additions of (e ** (x + y)), so linear solutions using matrices don't work :/

share|improve this question
You are basically looking for a parser. Check out PLY - python's version of lex and yacc –  Sudipta Chatterjee Feb 3 '13 at 1:36
Even with e**(x+y), a matrix solution might work for cases where the exponential can be transformed appropriately. e.g. e**(x+y) == ex * ey so, if each of the terms is a vector, the two vectors could be multiplied together, giving a much faster solution than I expect sympy could give. For the general case where there isn't an appropriate transformation, though, @unutbu's solution is very attractive. –  Simon Feb 3 '13 at 7:58
How would I use matrices to do this? I'm working with equations that might look like... e^ipi(4x - 2y) + e^ipi(10x + 3y) + e^ipi(x + 24y)... –  Paul Terwilliger Feb 3 '13 at 17:23

3 Answers 3

up vote 7 down vote accepted

SymPy can do this:

import sympy as sym

x, y = sym.symbols('xy')
f = x + 2*y
g = 3*x - y
h = f + g

This shows that SymPy has simplified the expression:

# y + 4*x

And this shows how you can evaluate h as a function of x and y:

print(h.subs(dict(x=4, y=3)))
# 19
print(h.subs(dict(x=1, y=0)))
# 4
share|improve this answer

If the functions are all linear combinations of the variables, as shown in the examples, there is no need for a parser or the sympy solution suggested by @unutbu (which seems to be absolutely the right answer for complicated functions).

For linear combinations, I'd use numpy arrays to contain the coefficients of the variables, as follows:

import numpy as np
f = np.array([1,2])
g = np.array([3,-1])
h = f + g
x = np.array([4,3])

... which gives the answer 19, as in your example.

share|improve this answer

You can also use lambda functions.

f=lambda x,y:x+2*y
g=lambda x,y:3*x-y
h=lambda x,y:f(x,y)+g(x,y)

and evaluate h(x,y)

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.