# How can I solve multivariable linear equation in python?

I have 10,000 variables. for 100 of them, I do know the exact value.

others are given like:

``````a = 0.x_1 * b + 0.y_2 * c+ 0.z_1 * d + (1 - 0.x_1 - 0.y_1 - 0.z_1) * a
b = 0.x_2 * c + 0.y_2 * d+ 0.z_2 * e + (1 - 0.x_2 - 0.y_2 - 0.z_2) * b

...

q = 0.x_10000 * p + 0.y_10000 * r+ 0.z_10000 * s + (1 - 0.x_10000 - 0.y_10000 - 0.z_10000) * q
``````

yes I know exact value of 0.x_n, 0.y_n, 0.z_n ... (the point of having 0. as a prefix means it is less than 1 while bigger than 0)

How can I solve this in python? I'd really appreciate if you can provide me some example, with simple equations like this :

``````x - y + 2z =  5
y -  z = -1
z =  3
``````

(Using numpy) If we rewrite the system of linear equations

``````x - y + 2z =  5
y -  z = -1
z =  3
``````

as the matrix equation

``````A x = b
``````

with

``````A = np.array([[ 1, -1,  2],
[ 0,  1, -1],
[ 0,  0,  1]])
``````

and

``````b = np.array([5, -1, 3])
``````

then `x` can be found using `np.linalg.solve`:

``````import numpy as np

A = np.array([(1, -1, 2), (0, 1, -1), (0, 0, 1)])
b = np.array([5, -1, 3])
x = np.linalg.solve(A, b)
``````

yields

``````print(x)
# [ 1.  2.  3.]
``````

We can check that `A x = b`:

``````print(np.dot(A,x))
# [ 5. -1.  3.]

assert np.allclose(np.dot(A,x), b)
``````
• Could you please explain why you change A to a 1d array later in the code? – steven Feb 3 at 2:21
• `A = np.array([(1, -1, 2), (0, 1, -1), (0, 0, 1)])` is a 2D array, just written on one line. – unutbu Feb 3 at 4:49