I am new to Python so at this moment in time, I can only very basic problems.

How do I numerically solve an ODE in Python?

Consider

```
\ddot{u}(\phi) = -u + \sqrt{u}
```

with the following conditions

```
u(0) = 1.49907
```

and

```
\dot{u}(0) = 0
```

with the constraint

```
0 <= \phi <= 7\pi.
```

Then finally I want to produce a parametric plot where the x and y coordinates are generated as a function of u.

The problem is I need to run odeint twice since this is a second order differential equation. I tried having it run again after the first time but it comes back with a Jacobian error. There must be away to run the twice all at once.

Here is the error:

```
odepack.error: The function and its Jacobian must be callable functions
```

which the code below generates. The line in question is the sol = odeint.

```
import numpy as np
from scipy.integrate import odeint
import matplotlib.pyplot as plt
from numpy import linspace
def f(u, t):
return -u + np.sqrt(u)
times = linspace(0.0001, 7 * np.pi, 1000)
y0 = 1.49907
yprime0 = 0
yvals = odeint(f, yprime0, times)
sol = odeint(yvals, y0, times)
x = 1 / sol * np.cos(times)
y = 1 / sol * np.sin(times)
plot(x,y)
plt.show()
```

**Edit**

I am trying to construct the plot on page 9

Here is the plot with Mathematica

```
In[27]:= sol =
NDSolve[{y''[t] == -y[t] + Sqrt[y[t]], y[0] == 1/.66707928,
y'[0] == 0}, y, {t, 0, 10*\[Pi]}];
In[28]:= ysol = y[t] /. sol[[1]];
In[30]:= ParametricPlot[{1/ysol*Cos[t], 1/ysol*Sin[t]}, {t, 0,
7 \[Pi]}, PlotRange -> {{-2, 2}, {-2.5, 2.5}}]
```