This is one possible implementation:

```
def mysin(x, order):
a = x
s = a
for i in range(1, order):
a *= -1 * x**2 / ((2 * i) * (2 * i + 1))
s += a
return s
```

This is just for plotting:

```
import numpy as np
vmysin = np.vectorize(mysin, excluded=['order'])
x = np.linspace(-80, 80, 500)
y2 = vmysin(x, 2)
y10 = vmysin(x, 10)
y100 = vmysin(x, 100)
y1000 = vmysin(x, 1000)
y = np.sin(x)
import matplotlib.pyplot as plt
plt.plot(x, y, label='sin(x)')
plt.plot(x, y2, label='order 2')
plt.plot(x, y10, label='order 10')
plt.plot(x, y100, label='order 100')
plt.plot(x, y1000, label='order 1000')
plt.ylim([-3, 3])
plt.legend()
plt.show()
```

It suffers from numerical instability and underflow, since after a while (~100 loops, dependig on `x`

) `a`

becomes 0.

`math.factorial(1999)`

istoo large to convert to a float. It is approximately 10^5733. The max value of`float`

is`sys.float_info.max`

, which I'll wager is about 10^308 on your system. – Steve Jessop Nov 14 '13 at 23:07`a`

s using recursion:`a[i] = -a[i-1] x**2 / 2i / (2i + 1)`

– Ruggero Turra Nov 14 '13 at 23:18`factorial(1999)`

(as well as a bunch of other numbers that are too big to convert to`float`

) regardless of the input value. When you divide a`float`

by an integer, Python tries to convert the integer to a float. It fails. – Steve Jessop Nov 15 '13 at 0:44