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comparison 2017/day12/problem @ 34:049fb8e56025
Add problem statements and inputs
| author | Jordi Gutiérrez Hermoso <jordigh@octave.org> |
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| date | Tue, 09 Jan 2018 21:51:44 -0500 |
| parents | |
| children |
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| 33:bc652fa0a645 | 34:049fb8e56025 |
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| 1 --- Day 12: Digital Plumber --- | |
| 2 | |
| 3 Walking along the memory banks of the stream, you find a small village | |
| 4 that is experiencing a little confusion: some programs can't | |
| 5 communicate with each other. | |
| 6 | |
| 7 Programs in this village communicate using a fixed system of pipes. | |
| 8 Messages are passed between programs using these pipes, but most | |
| 9 programs aren't connected to each other directly. Instead, programs | |
| 10 pass messages between each other until the message reaches the | |
| 11 intended recipient. | |
| 12 | |
| 13 For some reason, though, some of these messages aren't ever reaching | |
| 14 their intended recipient, and the programs suspect that some pipes are | |
| 15 missing. They would like you to investigate. | |
| 16 | |
| 17 You walk through the village and record the ID of each program and the | |
| 18 IDs with which it can communicate directly (your puzzle input). Each | |
| 19 program has one or more programs with which it can communicate, and | |
| 20 these pipes are bidirectional; if 8 says it can communicate with 11, | |
| 21 then 11 will say it can communicate with 8. | |
| 22 | |
| 23 You need to figure out how many programs are in the group that | |
| 24 contains program ID 0. | |
| 25 | |
| 26 For example, suppose you go door-to-door like a travelling salesman | |
| 27 and record the following list: | |
| 28 | |
| 29 0 <-> 2 | |
| 30 1 <-> 1 | |
| 31 2 <-> 0, 3, 4 | |
| 32 3 <-> 2, 4 | |
| 33 4 <-> 2, 3, 6 | |
| 34 5 <-> 6 | |
| 35 6 <-> 4, 5 | |
| 36 | |
| 37 In this example, the following programs are in the group that contains | |
| 38 program ID 0: | |
| 39 | |
| 40 Program 0 by definition. | |
| 41 | |
| 42 Program 2, directly connected to program 0. | |
| 43 | |
| 44 Program 3 via program 2. | |
| 45 | |
| 46 Program 4 via program 2. | |
| 47 | |
| 48 Program 5 via programs 6, then 4, then 2. | |
| 49 | |
| 50 Program 6 via programs 4, then 2. | |
| 51 | |
| 52 | |
| 53 Therefore, a total of 6 programs are in this group; all but program 1, | |
| 54 which has a pipe that connects it to itself. | |
| 55 | |
| 56 How many programs are in the group that contains program ID 0? | |
| 57 | |
| 58 Your puzzle answer was 141. | |
| 59 | |
| 60 --- Part Two --- | |
| 61 | |
| 62 There are more programs than just the ones in the group containing | |
| 63 program ID 0. The rest of them have no way of reaching that group, and | |
| 64 still might have no way of reaching each other. | |
| 65 | |
| 66 A group is a collection of programs that can all communicate via pipes | |
| 67 either directly or indirectly. The programs you identified just a | |
| 68 moment ago are all part of the same group. Now, they would like you to | |
| 69 determine the total number of groups. | |
| 70 | |
| 71 In the example above, there were 2 groups: one consisting of programs | |
| 72 0,2,3,4,5,6, and the other consisting solely of program 1. | |
| 73 | |
| 74 How many groups are there in total? | |
| 75 | |
| 76 Your puzzle answer was 171. | |
| 77 | |
| 78 Both parts of this puzzle are complete! They provide two gold stars: ** |