Every business can make use of a good accountant and, if they're not big on
following the law, sometimes a bad one. Bad accountants try to make more money
for their employers by fudging numbers without getting caught.

Sometimes a bad accountant wants to make a number larger, and sometimes
smaller. It is widely known that tax auditors will fail to notice two digits
being swapped in any given number, but any discrepancy more egregious will
certainly be caught. It's also painfully obvious when a number has fewer
digits than it ought to, so a bad accountant will never swap the first digit
of a number with a 0.

Given a number, how small or large can it be made without being found out?

### Input

Input begins with an integer **T**, the number of numbers that need tweaking.
Each of the next **T** lines contains a integer **N**.

### Output

For the _i_th number, print a line containing "Case #_i_: " followed by the
smallest and largest numbers that can be made from the original number **N**,
using at most a single swap and following the rules above.

### Constraints

1 ≤ **T** ≤ 100  
0 ≤ **N** ≤ 999999999  
**N** will never begin with a leading 0 unless **N** = 0