# python scipy.optimize.newton says it does not converge, however it seems as it would

I am using python with scipy for writing some code to converge Cartesian coordinates to Kepler elements and the other way round.

For converting Cartesian to Kepler I use the following expression:

``````E = scopt.newton(self.f, self.M, self.df, args=(), tol=10^(-10), maxiter=10000)
``````

with

``````self.f = lambda x: x-self.e*scipy.sin(x)-self.M
self.df= lambda x: 1-self.e*scipy.cos(x)
``````

When running the entire code I get the error:

``````RuntimeError: Failed to converge after 10000 iterations, value is 5.25182613825
``````

If I run it for less iterations (50), I get:

``````RuntimeError: Failed to converge after 50 iterations, value is 5.25182613825
``````

Comparing the two values it obviously converges. Even if I reduce the tolerance to 10^(-2) i still get the same runtime error.

Does anybody knows why this error occurs?

-
If you run it 51 iterations, do you get the same value? Or is it flipping two values? –  WolframH Feb 13 '12 at 13:12
RuntimeError: Failed to converge after 51 iterations, value is 5.25182613825 So it's the same value... –  Zwähnia Feb 13 '12 at 13:21
Is 5.25182613825 a correct solution? What are the values of self.e and self.M? –  Janne Karila Feb 13 '12 at 13:29
it looks like 5.25182613825 is a correct solution. At least the results I get by just setting E=5.25182613825 seem to be ok. M =301.149932402*(math.pi/180) and e =0.004932091570 ( mean anomaly and eccentricity) –  Zwähnia Feb 13 '12 at 13:38

The exponentiation operator in Python is `**`. Use `tol=10**(-10)` or `1E-10`.
`^` is bitwise XOR.