Here's a line-by-line breakdown:

```
def intF(n, d, l=40):
```

Pretty obvious. `n`

is a number, `d`

is another number (the divisor) and `l`

is the number of digits to print after the decimal point.

```
s=str(n*10**l / d)
```

This does something a bit unusual. Rather than relying on floating point arithmetic, this multiplies `n`

by `10 ** l`

, i.e. by a `1`

followed by `l`

digits. That way the final result won't have any floating point error -- assuming `d`

is always an integer. (But of course any remaining digits get truncated. Also, replace `/`

with `//`

in Python 3 to get the same behavior.)

At this point, `s`

will be a string representation of a whole number -- again assuming `d`

is an integer -- but it will have the same *digits* as the result of `float(n) / d`

. So now we just have to insert the decimal point in the right place.

```
if len(s) < l:
return '0.{:0>{width}}'.format(s,width=l)
```

If the length of `s`

is less than `l`

, then we need to pad it and prepend a `0.`

. That's what this does. The `{:0>{width}}`

field says to create a zero-padded field of `width`

width, and insert a value into it on the right (`>`

) side. Then `s`

is passed in via `format`

, and we have our result.

```
if len(s) > l:
return s[0:len(s)-l]+'.'+s[len(s)-l:]
```

If the length of `a`

is greater than `l`

, then we need to insert the decimal point in the correct spot. That's what this does. It removes the trailing `l`

digits from `s`

, appends a `.`

, and then appends the remaining `l`

digits.

```
return '0.'+s
```

The final possibility is that `s`

is exactly `l`

digits long. In that case, we don't need to do any padding; we can just prepend a `0`

and a decimal point.

As a final note: if you pass anything but integers to this function, it will not work as expected. Consider this:

```
>>> intF(10, 10.1, 10)
'990.0990099.01'
```

Or this:

```
>>> intF(10.1, 10, 10)
'101.00000000.0'
```