Take a pen and paper and try to divide 22/7. It will look like this

```
03,142857142857
---
22:7
0
--
22
21
--- < now we calculate fractal part so we will add zeros at the end
10 # 10 contains 7 only one time -> 1
7
---
30 # 30 contains 7 four times -> 4
28
---
20 ->2
14
---
60 ->8
56
---
40 ->5
35
---
50 ->7
49
---
10 # but wee already calculated this state of fractal part
# so from now on it will repeat again and again and again...
# giving ...142857|142857|142857...
```

So `22/7 = 3,(142857)`

. Knowing that periodic part starts at first position of fractal part, and it contains six digits we can calculate that `10th`

digit is `8`

(forth digit of periodic part), `20th`

position is `4`

(second digit of periodic part). It is easy to notice that if periodic part starts at first position then n-th digit will be (n)mod(number of digits in period) so `10 % 6 = 4`

and fourth digit in periodic part is `8`

, `20 % 6 = 2`

and second digit in periodic part is `4`

.

So you probably can implement your own algorithm that will cache (lets say in some map that remembers order of placed key->value pairs) and will try to calculate that fractal part until

- it finds repeating part
- at some point (like in 5/4 = 1.250000) fractal part will end
- will calculate
`n-th`

digit without finding periodic part (2nd digit of 22/7 can be returned before finding period)

Additional info. Period can't be longer then number you used to divide since `minimal value of X%Y`

is `0`

(and in that case we would stop dividing) and `max value of X%Y`

is `Y-1`

, so only digits between 1 and Y-1 can be used in periodic part so its max length will be `Y-1`

`22/7`

is rational. It's not difficult to compute to one million places. Computing`pi`

to one million places would be harder. – Jan Dvorak Mar 3 '13 at 19:28`22/7`

is exactly`3.(142857)`

where parentheses denote the periodic part. – Jan Dvorak Mar 3 '13 at 19:31`103993/33102 = 3.1(415926530119026040722614947737296840070086399613316)`

; see wolframalpha.com/input/?i=103993%2F33102 – Jan Dvorak Mar 3 '13 at 19:40