# integrating orbital trajectories 2

The original second order ODEs are

``````x'' - 2 * omega * y' - omega ** 2 * x = - mue * (x + pi2 * r12) / np.sqrt((x + pi2 * r12) ** 2 + y ** 2) ** 3 - mum * (x - pi1 * r12) / np.sqrt((x - pi1 * r12) ** 2 + y ** 2)
y'' + 2 * omega * x' - omega **2 * y = - mue * y / np.sqrt((x + pi2 * r12) ** 2 + y ** 2) ** 3 - mum * y / np.sqrt((x - pi1 * r12) ** 2 + y ** 2)
z'' = 0
``````

So here is the code I used to solve the ODE but first I broke it up into 2 first orders.

I am receiving the error that the module on line 61 is not callable.

Line 61 is `u = odeint(deriv, u0, dt)`

``````#!/usr/bin/env python

import numpy as np
import scipy.integrate as odeint
import matplotlib.pyplot as plt
from mpl_toolkits.mplot3d import Axes3D

me = 5.974 * 10 ** (24)  #  mass of the earth
mm = 7.348 * 10 ** (22)  #  mass of the moon
G = 6.67259 * 10 ** (-20)  #  gravitational parameter
re = 6378.0  #  radius of the earth in km
rm = 1737.0  #  radius of the moon in km
r12 = 384400.0  #  distance between the CoM of the earth and moon
M = me + mm

pi1 = me / M
pi2 = mm / M
mue = 398600.0  #  gravitational parameter of earth km^3/sec^2
mum = G * mm  #  grav param of the moon
mu = mue + mum
omega = np.sqrt(mu / r12 ** 3)
nu = 0.0  #  flight path angle

x = 327156.0  #  x location where the moon's SOI effects the spacecraft
y = 33050.0   #  y location

vbo = 10.85  #  velocity at burnout

gamma = -141.868 * np.pi / 180  #  angle in radians of true anomaly

vx = vbo * (np.sin(gamma) * np.cos(nu) - np.cos(gamma) * np.sin(nu))
#  velocity of the bo in the x direction
vy = vbo * (np.sin(gamma) * np.sin(nu) + np.cos(gamma) * np.cos(nu))
#  velocity of the bo in the y direction

xrel = (re + 300.0) * np.cos(gamma)
#  spacecraft x location relative to the earth
yrel = (re + 300.0) * np.sin(gamma)

#  r0 = [xrel, yrel, 0]
#  v0 = [vx, vy, 0]
u0 = [xrel, yrel, 0, vx, vy, 0]

def deriv(u, dt):
n1 = -((mue * (u[0] + pi2 * r12) / np.sqrt((u[0] + pi2 * r12) ** 2
+ u[1] ** 2) ** 3)
- (mum * (u[0] - pi1 * r12) / np.sqrt((u[0] - pi1 * r12) ** 2
+ u[1] ** 2) ** 3))
n2 = -((mue * u[1] / np.sqrt((u[0] + pi2 * r12) ** 2 + u[1] ** 2) ** 3)
- (mum * u[1] / np.sqrt((u[0] - pi1 * r12) ** 2 + u[1] ** 2) ** 3))
return [u[3],  #  dotu[0] = u[3]
u[4],  #  dotu[1] = u[4]
u[5],  #  dotu[2] = u[5]
2 * omega * u[5] + omega ** 2 * u[0] + n1,  #  dotu[3] = that
omega ** 2 * u[1] - 2 * omega * u[4] + n2,  #  dotu[4] = that
0]  #  dotu[5] = 0

dt = np.arange(0.0, 250000.0, .1)
u = odeint(deriv, u0, dt)
x, y, z, x2, y2, z2 = u.T

fig = plt.figure()
ax.plot(x, y, z)
plt.show()
``````
-

Assuming you mean this error:

``````~/coding\$ python orbit1.py
Traceback (most recent call last):
File "orbit1.py", line 61, in <module>
u = odeint(deriv, u0, dt)
TypeError: 'module' object is not callable
``````

This is because you want the function named `odeint` in `scipy.integrate`. Your line

``````import scipy.integrate as odeint
``````

imports the entire module and gives it the name `odeint`. Try

``````from scipy.integrate import odeint
``````

``````import scipy.integrate