Adding some problems
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2024/day21/problem
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Advent of Code
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--- Day 21: Keypad Conundrum ---
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As you teleport onto Santa's [16]Reindeer-class starship, The Historians
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begin to panic: someone from their search party is missing. A quick
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life-form scan by the ship's computer reveals that when the missing
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Historian teleported, he arrived in another part of the ship.
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The door to that area is locked, but the computer can't open it; it can
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only be opened by physically typing the door codes (your puzzle input) on
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the numeric keypad on the door.
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The numeric keypad has four rows of buttons: 789, 456, 123, and finally an
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empty gap followed by 0A. Visually, they are arranged like this:
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+---+---+---+
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| 7 | 8 | 9 |
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+---+---+---+
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| 4 | 5 | 6 |
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+---+---+---+
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| 1 | 2 | 3 |
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+---+---+---+
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| 0 | A |
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+---+---+
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Unfortunately, the area outside the door is currently depressurized and
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nobody can go near the door. A robot needs to be sent instead.
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The robot has no problem navigating the ship and finding the numeric
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keypad, but it's not designed for button pushing: it can't be told to push
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a specific button directly. Instead, it has a robotic arm that can be
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controlled remotely via a directional keypad.
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The directional keypad has two rows of buttons: a gap / ^ (up) / A
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(activate) on the first row and < (left) / v (down) / > (right) on the
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second row. Visually, they are arranged like this:
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+---+---+
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| ^ | A |
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+---+---+---+
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| < | v | > |
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+---+---+---+
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When the robot arrives at the numeric keypad, its robotic arm is pointed
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at the A button in the bottom right corner. After that, this directional
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keypad remote control must be used to maneuver the robotic arm: the up /
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down / left / right buttons cause it to move its arm one button in that
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direction, and the A button causes the robot to briefly move forward,
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pressing the button being aimed at by the robotic arm.
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For example, to make the robot type 029A on the numeric keypad, one
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sequence of inputs on the directional keypad you could use is:
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• < to move the arm from A (its initial position) to 0.
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• A to push the 0 button.
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• ^A to move the arm to the 2 button and push it.
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• >^^A to move the arm to the 9 button and push it.
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• vvvA to move the arm to the A button and push it.
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In total, there are three shortest possible sequences of button presses on
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this directional keypad that would cause the robot to type 029A:
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<A^A>^^AvvvA, <A^A^>^AvvvA, and <A^A^^>AvvvA.
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Unfortunately, the area containing this directional keypad remote control
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is currently experiencing high levels of radiation and nobody can go near
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it. A robot needs to be sent instead.
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When the robot arrives at the directional keypad, its robot arm is pointed
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at the A button in the upper right corner. After that, a second, different
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directional keypad remote control is used to control this robot (in the
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same way as the first robot, except that this one is typing on a
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directional keypad instead of a numeric keypad).
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There are multiple shortest possible sequences of directional keypad
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button presses that would cause this robot to tell the first robot to type
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029A on the door. One such sequence is v<<A>>^A<A>AvA<^AA>A<vAAA>^A.
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Unfortunately, the area containing this second directional keypad remote
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control is currently -40 degrees! Another robot will need to be sent to
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type on that directional keypad, too.
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There are many shortest possible sequences of directional keypad button
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presses that would cause this robot to tell the second robot to tell the
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first robot to eventually type 029A on the door. One such sequence is
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<vA<AA>>^AvAA<^A>A<v<A>>^AvA^A<vA>^A<v<A>^A>AAvA^A<v<A>A>^AAAvA<^A>A.
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Unfortunately, the area containing this third directional keypad remote
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control is currently full of Historians, so no robots can find a clear
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path there. Instead, you will have to type this sequence yourself.
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Were you to choose this sequence of button presses, here are all of the
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buttons that would be pressed on your directional keypad, the two robots'
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directional keypads, and the numeric keypad:
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<vA<AA>>^AvAA<^A>A<v<A>>^AvA^A<vA>^A<v<A>^A>AAvA^A<v<A>A>^AAAvA<^A>A
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v<<A>>^A<A>AvA<^AA>A<vAAA>^A
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<A^A>^^AvvvA
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029A
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In summary, there are the following keypads:
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• One directional keypad that you are using.
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• Two directional keypads that robots are using.
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• One numeric keypad (on a door) that a robot is using.
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It is important to remember that these robots are not designed for button
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pushing. In particular, if a robot arm is ever aimed at a gap where no
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button is present on the keypad, even for an instant, the robot will panic
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unrecoverably. So, don't do that. All robots will initially aim at the
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keypad's A key, wherever it is.
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To unlock the door, five codes will need to be typed on its numeric
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keypad. For example:
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029A
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980A
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179A
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456A
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379A
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For each of these, here is a shortest sequence of button presses you could
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type to cause the desired code to be typed on the numeric keypad:
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029A: <vA<AA>>^AvAA<^A>A<v<A>>^AvA^A<vA>^A<v<A>^A>AAvA^A<v<A>A>^AAAvA<^A>A
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980A: <v<A>>^AAAvA^A<vA<AA>>^AvAA<^A>A<v<A>A>^AAAvA<^A>A<vA>^A<A>A
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179A: <v<A>>^A<vA<A>>^AAvAA<^A>A<v<A>>^AAvA^A<vA>^AA<A>A<v<A>A>^AAAvA<^A>A
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456A: <v<A>>^AA<vA<A>>^AAvAA<^A>A<vA>^A<A>A<vA>^A<A>A<v<A>A>^AAvA<^A>A
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379A: <v<A>>^AvA^A<vA<AA>>^AAvA<^A>AAvA^A<vA>^AA<A>A<v<A>A>^AAAvA<^A>A
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The Historians are getting nervous; the ship computer doesn't remember
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whether the missing Historian is trapped in the area containing a giant
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electromagnet or molten lava. You'll need to make sure that for each of
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the five codes, you find the shortest sequence of button presses
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necessary.
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The complexity of a single code (like 029A) is equal to the result of
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multiplying these two values:
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• The length of the shortest sequence of button presses you need to type
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on your directional keypad in order to cause the code to be typed on
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the numeric keypad; for 029A, this would be 68.
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• The numeric part of the code (ignoring leading zeroes); for 029A, this
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would be 29.
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In the above example, complexity of the five codes can be found by
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calculating 68 * 29, 60 * 980, 68 * 179, 64 * 456, and 64 * 379. Adding
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these together produces 126384.
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Find the fewest number of button presses you'll need to perform in order
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to cause the robot in front of the door to type each code. What is the sum
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of the complexities of the five codes on your list?
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Your puzzle answer was 248684.
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--- Part Two ---
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Just as the missing Historian is released, The Historians realize that a
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second member of their search party has also been missing this entire
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time!
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A quick life-form scan reveals the Historian is also trapped in a locked
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area of the ship. Due to a variety of hazards, robots are once again
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dispatched, forming another chain of remote control keypads managing
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robotic-arm-wielding robots.
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This time, many more robots are involved. In summary, there are the
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following keypads:
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• One directional keypad that you are using.
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• 25 directional keypads that robots are using.
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• One numeric keypad (on a door) that a robot is using.
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The keypads form a chain, just like before: your directional keypad
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controls a robot which is typing on a directional keypad which controls a
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robot which is typing on a directional keypad... and so on, ending with
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the robot which is typing on the numeric keypad.
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The door codes are the same this time around; only the number of robots
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and directional keypads has changed.
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Find the fewest number of button presses you'll need to perform in order
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to cause the robot in front of the door to type each code. What is the sum
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of the complexities of the five codes on your list?
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Your puzzle answer was 307055584161760.
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Both parts of this puzzle are complete! They provide two gold stars: **
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At this point, you should [17]return to your Advent calendar and try
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another puzzle.
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If you still want to see it, you can [18]get your puzzle input.
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References
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Visible links
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1. https://adventofcode.com/
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2. https://adventofcode.com/2024/about
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3. https://adventofcode.com/2024/events
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4. https://cottonbureau.com/people/advent-of-code
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5. https://adventofcode.com/2024/settings
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6. https://adventofcode.com/2024/auth/logout
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7. Advent of Code Supporter
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https://adventofcode.com/2024/support
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8. https://adventofcode.com/2024
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9. https://adventofcode.com/2024
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10. https://adventofcode.com/2024/support
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11. https://adventofcode.com/2024/sponsors
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12. https://adventofcode.com/2024/leaderboard
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13. https://adventofcode.com/2024/stats
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14. https://adventofcode.com/2024/sponsors
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16. https://adventofcode.com/2019/day/25
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17. https://adventofcode.com/2024
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18. https://adventofcode.com/2024/day/21/input
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2024/day22/problem
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2024/day22/problem
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Advent of Code
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--- Day 22: Monkey Market ---
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As you're all teleported deep into the jungle, a [16]monkey steals The
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Historians' device! You'll need to get it back while The Historians are
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looking for the Chief.
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The monkey that stole the device seems willing to trade it, but only in
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exchange for an absurd number of bananas. Your only option is to buy
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bananas on the Monkey Exchange Market.
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You aren't sure how the Monkey Exchange Market works, but one of The
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Historians senses trouble and comes over to help. Apparently, they've been
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studying these monkeys for a while and have deciphered their secrets.
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Today, the Market is full of monkeys buying good hiding spots.
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Fortunately, because of the time you recently spent in this jungle, you
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know lots of good hiding spots you can sell! If you sell enough hiding
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spots, you should be able to get enough bananas to buy the device back.
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On the Market, the buyers seem to use random prices, but their prices are
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actually only [17]pseudorandom! If you know the secret of how they pick
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their prices, you can wait for the perfect time to sell.
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The part about secrets is literal, the Historian explains. Each buyer
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produces a pseudorandom sequence of secret numbers where each secret is
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derived from the previous.
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In particular, each buyer's secret number evolves into the next secret
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number in the sequence via the following process:
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• Calculate the result of multiplying the secret number by 64. Then, mix
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this result into the secret number. Finally, prune the secret number.
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• Calculate the result of dividing the secret number by 32. Round the
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result down to the nearest integer. Then, mix this result into the
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secret number. Finally, prune the secret number.
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• Calculate the result of multiplying the secret number by 2048. Then,
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mix this result into the secret number. Finally, prune the secret
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number.
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Each step of the above process involves mixing and pruning:
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• To mix a value into the secret number, calculate the [18]bitwise XOR
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of the given value and the secret number. Then, the secret number
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becomes the result of that operation. (If the secret number is 42 and
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you were to mix 15 into the secret number, the secret number would
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become 37.)
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• To prune the secret number, calculate the value of the secret number
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[19]modulo 16777216. Then, the secret number becomes the result of
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that operation. (If the secret number is 100000000 and you were to
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prune the secret number, the secret number would become 16113920.)
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After this process completes, the buyer is left with the next secret
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number in the sequence. The buyer can repeat this process as many times as
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necessary to produce more secret numbers.
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So, if a buyer had a secret number of 123, that buyer's next ten secret
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numbers would be:
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15887950
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16495136
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527345
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704524
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1553684
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12683156
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11100544
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12249484
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7753432
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5908254
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Each buyer uses their own secret number when choosing their price, so it's
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important to be able to predict the sequence of secret numbers for each
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buyer. Fortunately, the Historian's research has uncovered the initial
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secret number of each buyer (your puzzle input). For example:
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1
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10
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100
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2024
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This list describes the initial secret number of four different
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secret-hiding-spot-buyers on the Monkey Exchange Market. If you can
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simulate secret numbers from each buyer, you'll be able to predict all of
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their future prices.
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In a single day, buyers each have time to generate 2000 new secret
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numbers. In this example, for each buyer, their initial secret number and
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the 2000th new secret number they would generate are:
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1: 8685429
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10: 4700978
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100: 15273692
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2024: 8667524
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Adding up the 2000th new secret number for each buyer produces 37327623.
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For each buyer, simulate the creation of 2000 new secret numbers. What is
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the sum of the 2000th secret number generated by each buyer?
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Your puzzle answer was 14082561342.
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--- Part Two ---
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Of course, the secret numbers aren't the prices each buyer is offering!
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That would be ridiculous. Instead, the prices the buyer offers are just
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the ones digit of each of their secret numbers.
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So, if a buyer starts with a secret number of 123, that buyer's first ten
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prices would be:
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3 (from 123)
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0 (from 15887950)
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6 (from 16495136)
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5 (etc.)
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4
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4
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6
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4
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4
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2
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This price is the number of bananas that buyer is offering in exchange for
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your information about a new hiding spot. However, you still don't speak
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[20]monkey, so you can't negotiate with the buyers directly. The Historian
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speaks a little, but not enough to negotiate; instead, he can ask another
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monkey to negotiate on your behalf.
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Unfortunately, the monkey only knows how to decide when to sell by looking
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at the changes in price. Specifically, the monkey will only look for a
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specific sequence of four consecutive changes in price, then immediately
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sell when it sees that sequence.
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So, if a buyer starts with a secret number of 123, that buyer's first ten
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secret numbers, prices, and the associated changes would be:
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123: 3
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15887950: 0 (-3)
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16495136: 6 (6)
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527345: 5 (-1)
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704524: 4 (-1)
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1553684: 4 (0)
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12683156: 6 (2)
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11100544: 4 (-2)
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12249484: 4 (0)
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7753432: 2 (-2)
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Note that the first price has no associated change because there was no
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previous price to compare it with.
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In this short example, within just these first few prices, the highest
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price will be 6, so it would be nice to give the monkey instructions that
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would make it sell at that time. The first 6 occurs after only two
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changes, so there's no way to instruct the monkey to sell then, but the
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second 6 occurs after the changes -1,-1,0,2. So, if you gave the monkey
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that sequence of changes, it would wait until the first time it sees that
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sequence and then immediately sell your hiding spot information at the
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current price, winning you 6 bananas.
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Each buyer only wants to buy one hiding spot, so after the hiding spot is
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sold, the monkey will move on to the next buyer. If the monkey never hears
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that sequence of price changes from a buyer, the monkey will never sell,
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and will instead just move on to the next buyer.
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Worse, you can only give the monkey a single sequence of four price
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changes to look for. You can't change the sequence between buyers.
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You're going to need as many bananas as possible, so you'll need to
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determine which sequence of four price changes will cause the monkey to
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get you the most bananas overall. Each buyer is going to generate 2000
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secret numbers after their initial secret number, so, for each buyer,
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you'll have 2000 price changes in which your sequence can occur.
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Suppose the initial secret number of each buyer is:
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1
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2
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3
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2024
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There are many sequences of four price changes you could tell the monkey,
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but for these four buyers, the sequence that will get you the most bananas
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is -2,1,-1,3. Using that sequence, the monkey will make the following
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sales:
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• For the buyer with an initial secret number of 1, changes -2,1,-1,3
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first occur when the price is 7.
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• For the buyer with initial secret 2, changes -2,1,-1,3 first occur
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when the price is 7.
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• For the buyer with initial secret 3, the change sequence -2,1,-1,3
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does not occur in the first 2000 changes.
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• For the buyer starting with 2024, changes -2,1,-1,3 first occur when
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the price is 9.
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So, by asking the monkey to sell the first time each buyer's prices go
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down 2, then up 1, then down 1, then up 3, you would get 23 (7 + 7 + 9)
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bananas!
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Figure out the best sequence to tell the monkey so that by looking for
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that same sequence of changes in every buyer's future prices, you get the
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most bananas in total. What is the most bananas you can get?
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Your puzzle answer was 1568.
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Both parts of this puzzle are complete! They provide two gold stars: **
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At this point, you should [21]return to your Advent calendar and try
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||||
another puzzle.
|
||||
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If you still want to see it, you can [22]get your puzzle input.
|
||||
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References
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Visible links
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||||
1. https://adventofcode.com/
|
||||
2. https://adventofcode.com/2024/about
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3. https://adventofcode.com/2024/events
|
||||
4. https://cottonbureau.com/people/advent-of-code
|
||||
5. https://adventofcode.com/2024/settings
|
||||
6. https://adventofcode.com/2024/auth/logout
|
||||
7. Advent of Code Supporter
|
||||
https://adventofcode.com/2024/support
|
||||
8. https://adventofcode.com/2024
|
||||
9. https://adventofcode.com/2024
|
||||
10. https://adventofcode.com/2024/support
|
||||
11. https://adventofcode.com/2024/sponsors
|
||||
12. https://adventofcode.com/2024/leaderboard
|
||||
13. https://adventofcode.com/2024/stats
|
||||
14. https://adventofcode.com/2024/sponsors
|
||||
16. https://adventofcode.com/2022/day/11
|
||||
17. https://en.wikipedia.org/wiki/Pseudorandom_number_generator
|
||||
18. https://en.wikipedia.org/wiki/Bitwise_operation#XOR
|
||||
19. https://en.wikipedia.org/wiki/Modulo
|
||||
20. https://adventofcode.com/2022/day/21
|
||||
21. https://adventofcode.com/2024
|
||||
22. https://adventofcode.com/2024/day/22/input
|
150
2024/day23/problem
Normal file
150
2024/day23/problem
Normal file
@ -0,0 +1,150 @@
|
||||
[1]Advent of Code
|
||||
|
||||
--- Day 23: LAN Party ---
|
||||
|
||||
As The Historians wander around a secure area at Easter Bunny HQ, you come
|
||||
across posters for a [16]LAN party scheduled for today! Maybe you can find
|
||||
it; you connect to a nearby [17]datalink port and download a map of the
|
||||
local network (your puzzle input).
|
||||
|
||||
The network map provides a list of every connection between two computers.
|
||||
For example:
|
||||
|
||||
kh-tc
|
||||
qp-kh
|
||||
de-cg
|
||||
ka-co
|
||||
yn-aq
|
||||
qp-ub
|
||||
cg-tb
|
||||
vc-aq
|
||||
tb-ka
|
||||
wh-tc
|
||||
yn-cg
|
||||
kh-ub
|
||||
ta-co
|
||||
de-co
|
||||
tc-td
|
||||
tb-wq
|
||||
wh-td
|
||||
ta-ka
|
||||
td-qp
|
||||
aq-cg
|
||||
wq-ub
|
||||
ub-vc
|
||||
de-ta
|
||||
wq-aq
|
||||
wq-vc
|
||||
wh-yn
|
||||
ka-de
|
||||
kh-ta
|
||||
co-tc
|
||||
wh-qp
|
||||
tb-vc
|
||||
td-yn
|
||||
|
||||
Each line of text in the network map represents a single connection; the
|
||||
line kh-tc represents a connection between the computer named kh and the
|
||||
computer named tc. Connections aren't directional; tc-kh would mean
|
||||
exactly the same thing.
|
||||
|
||||
LAN parties typically involve multiplayer games, so maybe you can locate
|
||||
it by finding groups of connected computers. Start by looking for sets of
|
||||
three computers where each computer in the set is connected to the other
|
||||
two computers.
|
||||
|
||||
In this example, there are 12 such sets of three inter-connected
|
||||
computers:
|
||||
|
||||
aq,cg,yn
|
||||
aq,vc,wq
|
||||
co,de,ka
|
||||
co,de,ta
|
||||
co,ka,ta
|
||||
de,ka,ta
|
||||
kh,qp,ub
|
||||
qp,td,wh
|
||||
tb,vc,wq
|
||||
tc,td,wh
|
||||
td,wh,yn
|
||||
ub,vc,wq
|
||||
|
||||
If the Chief Historian is here, and he's at the LAN party, it would be
|
||||
best to know that right away. You're pretty sure his computer's name
|
||||
starts with t, so consider only sets of three computers where at least one
|
||||
computer's name starts with t. That narrows the list down to 7 sets of
|
||||
three inter-connected computers:
|
||||
|
||||
co,de,ta
|
||||
co,ka,ta
|
||||
de,ka,ta
|
||||
qp,td,wh
|
||||
tb,vc,wq
|
||||
tc,td,wh
|
||||
td,wh,yn
|
||||
|
||||
Find all the sets of three inter-connected computers. How many contain at
|
||||
least one computer with a name that starts with t?
|
||||
|
||||
Your puzzle answer was 1485.
|
||||
|
||||
--- Part Two ---
|
||||
|
||||
There are still way too many results to go through them all. You'll have
|
||||
to find the LAN party another way and go there yourself.
|
||||
|
||||
Since it doesn't seem like any employees are around, you figure they must
|
||||
all be at the LAN party. If that's true, the LAN party will be the largest
|
||||
set of computers that are all connected to each other. That is, for each
|
||||
computer at the LAN party, that computer will have a connection to every
|
||||
other computer at the LAN party.
|
||||
|
||||
In the above example, the largest set of computers that are all connected
|
||||
to each other is made up of co, de, ka, and ta. Each computer in this set
|
||||
has a connection to every other computer in the set:
|
||||
|
||||
ka-co
|
||||
ta-co
|
||||
de-co
|
||||
ta-ka
|
||||
de-ta
|
||||
ka-de
|
||||
|
||||
The LAN party posters say that the password to get into the LAN party is
|
||||
the name of every computer at the LAN party, sorted alphabetically, then
|
||||
joined together with commas. (The people running the LAN party are clearly
|
||||
a bunch of nerds.) In this example, the password would be co,de,ka,ta.
|
||||
|
||||
What is the password to get into the LAN party?
|
||||
|
||||
Your puzzle answer was cc,dz,ea,hj,if,it,kf,qo,sk,ug,ut,uv,wh.
|
||||
|
||||
Both parts of this puzzle are complete! They provide two gold stars: **
|
||||
|
||||
At this point, you should [18]return to your Advent calendar and try
|
||||
another puzzle.
|
||||
|
||||
If you still want to see it, you can [19]get your puzzle input.
|
||||
|
||||
References
|
||||
|
||||
Visible links
|
||||
1. https://adventofcode.com/
|
||||
2. https://adventofcode.com/2024/about
|
||||
3. https://adventofcode.com/2024/events
|
||||
4. https://cottonbureau.com/people/advent-of-code
|
||||
5. https://adventofcode.com/2024/settings
|
||||
6. https://adventofcode.com/2024/auth/logout
|
||||
7. Advent of Code Supporter
|
||||
https://adventofcode.com/2024/support
|
||||
8. https://adventofcode.com/2024
|
||||
9. https://adventofcode.com/2024
|
||||
10. https://adventofcode.com/2024/support
|
||||
11. https://adventofcode.com/2024/sponsors
|
||||
12. https://adventofcode.com/2024/leaderboard
|
||||
13. https://adventofcode.com/2024/stats
|
||||
14. https://adventofcode.com/2024/sponsors
|
||||
16. https://en.wikipedia.org/wiki/LAN_party
|
||||
17. https://adventofcode.com/2016/day/9
|
||||
18. https://adventofcode.com/2024
|
||||
19. https://adventofcode.com/2024/day/23/input
|
Loading…
Reference in New Issue
Block a user