This should give you a good starting point :

```
def leading(start, end):
leading = []
hundreds = start // 100
while (end - hundreds * 100) > 100:
i = hundreds * 100
leading.append(range(i,i+100))
hundreds += 1
c = hundreds * 100
tens = 1
while (end - c - tens * 10) > 10:
i = c + tens * 10
leading.append(range(i, i + 10))
tens += 1
c += tens * 10
ones = 1
while (end - c - ones) > 0:
i = c + ones
leading.append(i)
ones += 1
leading.append(end)
return leading
```

Ok, the whole could be one loop-level deeper. But I thought it might be clearer this way. Hope, this helps you...

**Update :**
Now I see what you want. Furthermore, maria's code doesn't seem to be working for me. (Sorry...)
So please consider the following code :

```
def leading(start, end):
depth = 2
while 10 ** depth > end : depth -=1
leading = []
const = 0
coeff = start // 10 ** depth
while depth >= 0:
while (end - const - coeff * 10 ** depth) >= 10 ** depth:
leading.append(str(const / 10 ** depth + coeff) + "X" * depth)
coeff += 1
const += coeff * 10 ** depth
coeff = 0
depth -= 1
leading.append(end)
return leading
print leading(199,411)
print leading(2169800, 2171194)
print leading(1000, 1453)
print leading(1,12)
```

Now, let me try to explain the approach here.
The algorithm will try to find "end" starting from value "start" and check whether "end" is in the next 10^2 (which is 100 in this case). If it fails, it will make a leap of 10^2 until it succeeds. When it succeeds it will go one depth level lower. That is, it will make leaps one order of magnitude smaller. And loop that way until the depth is equal to zero (= leaps of 10^0 = 1). The algorithm stops when it reaches the "end" value.

You may also notice that I have the implemented the wrapping loop I mentioned so it is now possible to define the starting depth (or leap size) in a variable.

The first while loop makes sure the first leap does not overshoot the "end" value.

If you have any questions, just feel free to ask.

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