Solving for x values of polynomial with known y in scipy / numpy

I am trying to solve for the x values with a known y. I was able to get the polynomial to fit my data, and now I want to know the x value that a chosen y would land on the curve.

``````import numpy as np

x = [50, 25, 12.5, 6.25, 0.625, 0.0625, 0.01]
y = [0.00, 0.50, 0.68, 0.77, 0.79, 0.90, 1.00]

poly_coeffs = np.polyfit(x, y, 3)

f = np.poly1d(poly_coeffs)
``````

I want to do 0.5 = f and solve for the x values.

I can solve this in WolframAlpha by typing:

``````0.5 = -9.1e-6*x^3 + 5.9e-4*x^2 - 2.5e-2*x + 9.05e-1
``````

The real x value is ~26

-

``````In [1]: from numpy.polynomial import Polynomial as P

In [2]: x = [50, 25, 12.5, 6.25, 0.625, 0.0625, 0.01]

In [3]: y = [0.00, 0.50, 0.68, 0.77, 0.79, 0.90, 1.00]

In [4]: p = P.fit(x, y, 3)

In [5]: (p - .5).roots()
Out[5]:
array([ 19.99806935-37.92449551j,  19.99806935+37.92449551j,
25.36882693 +0.j        ])
``````

Looks like the root you want is 25.36882693.

-

You can solve the equation `f(x) - y = 0` using `np.roots`. Consider the function:

``````def solve_for_y(poly_coeffs, y):
pc = poly_coeffs.copy()
pc[-1] -= y
return np.roots(pc)
``````

Then you can use it to solve your polynomial for any `y` you want:

``````>>> print solve_for_y(poly_coeffs, 0.5)
[ 19.99806935+37.92449551j  19.99806935-37.92449551j  25.36882693 +0.j        ]
>>> print solve_for_y(poly_coeffs, 1.)
[ 40.85615395+50.1936152j  40.85615395-50.1936152j -16.34734226 +0.j       ]
``````
-
Your method appears to modify `poly_coeffs`, so the second call to the method will actually give the wrong answer, i.e. it's solving for `y = 1` for `x` in a different polynomial than the original one. –  Amit Kumar Gupta May 31 '13 at 8:34
Use copy –  Amit Kumar Gupta May 31 '13 at 8:41
@Amit: Yes, my bad. I thought that function parameters are passed by value, and it seems to be true only for immutable types. Since `np.array` is mutable, it is passed by reference. I'll edit the post, thank you. –  Andrey Sobolev May 31 '13 at 9:02