I'm using the following function to approximate the derivative of a function at a point:

```
def prime_x(f, x, h):
if not f(x+h) == f(x) and not h == 0.0:
return (f(x+h) - f(x)) / h
else:
raise PrecisionError
```

As a test I'm passing `f`

as `fx`

and `x`

as 3.0. Where `fx`

is:

```
def fx(x):
import math
return math.exp(x)*math.sin(x)
```

Which has `exp(x)*(sin(x)+cos(x))`

as derivative. Now, according to Google and to my calculator

`exp(3)*(sin(3)+cos(3)) = -17.050059`

.

So far so good. But when I decided to test the function with small values for `h`

I got the following:

```
print prime_x(fx, 3.0, 10**-5)
-17.0502585578
print prime_x(fx, 3.0, 10**-10)
-17.0500591423
print prime_x(fx, 3.0, 10**-12)
-17.0512493014
print prime_x(fx, 3.0, 10**-13)
-17.0352620898
print prime_x(fx, 3.0, 10**-16)
__main__.PrecisionError: Mantissa is 16 digits
```

Why does the error increase when h decreases (after a certain point)? I was expecting the contrary until `f(x+h)`

was equal to `f(x)`

.

`if not a and not b: do this`

`else: do that`

you can usually write:`if a or b: do that`

`else: do this`

and it won't hurt other people's brain to read. – askewchan Sep 25 '13 at 2:37`else`

entirely. You handle the error case in the`if`

, then handle the normal case once it passes. – Mark Ransom Sep 25 '13 at 2:45