| Melody is visiting the beautiful city of Stockholm, Sweden! Stockholm has a | |
| number of waterways flowing through it, dividing the city up into a number of | |
| islands. Like most visitors, Melody was surprised to learn that there are in | |
| fact an infinite number of waterways and an infinite number of islands! | |
| The waterways flow between an infinite number of junctions, which are numbered | |
| with non-negative integers starting from 0. There's an infinitely-long | |
| waterway flowing into junction 0, and then for each junction _j_, there are | |
| two waterways flowing out of it into junctions 2_j_+1 and 2_j_+2. This results | |
| in each junction having exactly three incident waterways. | |
| An island is a connected region of land. Each waterway is adjacent to two | |
| different islands (one on each side of it), and has a bridge connecting those | |
| two islands together. Each junction is adjacent to three different islands | |
| (the distinct islands adjacent to its incident waterways). | |
| A portion of Stockholm (including junctions 0 to 14) is illustrated below, | |
| with islands represented as contiguous regions filled with various shades of | |
| grey, and bridges between them represented as brown curves: | |
|  | |
| Melody is currently aboard a friend's boat parked at some junction **A**, but | |
| she wants to visit another friend's boat which is parked at a different | |
| junction **B**. She'll begin by getting out of the first boat onto any of the | |
| three islands of her choice which are adjacent to junction **A**. She'll then | |
| walk on land until she arrives at any of the three islands which are adjacent | |
| to junction **B**, potentially crossing some bridges between islands along the | |
| way. Finally, she'll board the second boat from that island. | |
| Melody's not a big fan of walking on Stockholm's rather unevenly cobbled | |
| bridges, so she'd like to cross as few of them as possible along the way. Help | |
| her determine the minimum number of bridges which she must cross to walk from | |
| junction **A** to junction **B**! | |
| For example, the following illustration indicates the only optimal path from | |
| junction 8 to junction 5 in red (crossing only 1 bridge), and one of the | |
| optimal paths from junction 12 to junction 3 in yellow (crossing only 2 | |
| bridges): | |
|  | |
| ### Input | |
| Input begins with an integer **T**, the number of times Melody needs to travel | |
| between two junctions. For each trip, there is a single line containing the | |
| space-separated integers **A** and **B**. | |
| ### Output | |
| For the _i_th trip, output a line containing "Case #_i_: " followed by the | |
| minimum number of bridges which Melody must cross to walk from junction **A** | |
| to junction **B**. | |
| ### Constraints | |
| 1 ≤ **T** ≤ 2,000 | |
| 0 ≤ **A**, **B** ≤ 1018 | |
| **A** ≠ **B** | |
| ### Explanation of Sample | |
| The first two cases are described above. | |
| In the third and fourth cases, it's unnecessary for Melody to cross any | |
| bridges. | |