MIT Mystery Hunt 2020/Catenoid: Difference between revisions
CoreyPlover (talk | contribs) m (CoreyPlover moved page MIT Mystery Hunt (2020)/Catenoid to MIT Mystery Hunt 2020/Catenoid without leaving a redirect) |
(existence) |
||
(One intermediate revision by one other user not shown) | |||
Line 6: | Line 6: | ||
|image_width = <!-- include "px", defaults to 200px --> |
|image_width = <!-- include "px", defaults to 200px --> |
||
|image_caption = |
|image_caption = |
||
|author = |
|author = Mark Gottlieb |
||
|solves = |
|solves = 11 |
||
|guesses = |
|guesses = 82 |
||
|link = |
|link = https://puzzles.mit.edu/2020/puzzle/catenoid/ |
||
|solution_link = |
|solution_link = https://puzzles.mit.edu/2020/puzzle/catenoid/solution/ |
||
|checker_link = |
|checker_link = |
||
|stats_link = |
|stats_link = |
||
|answer = BELL BOTTOMS |
|||
}} |
}} |
||
'''Catenoid''' is a [ |
'''Catenoid''' is a [[crossword]] from the {{l|Yesterdayland}} round of the [[MIT Mystery Hunt 2020|2020 MIT Mystery Hunt]]. |
||
==Solve Path== |
|||
[INSERT SOLVE PATH] |
|||
[INSERT PICTURE] |
|||
==Puzzle Elements== |
==Puzzle Elements== |
||
[[Flavortext]] - ''You can find a 3D schematic for this ride in one of the two display cases containing prototype rides as you climb up CHORD. This ride is Model 40.'' |
|||
* [INSERT ELEMENTS] |
|||
{{spoiler|label=Spoiler-y Elements}} |
|||
[[Hint in Flavortext]] - The flavortext mostly is there to point solvers towards the grid used in the puzzle. |
|||
[[I Have Traveled Forty Parsecs]] - While the hunt was live, solvers had to access the grid by physically going to the [https://whereis.mit.edu/?go=2 Building 2] stairwell (home to the artwork ''Chord'') and walking up to the second floor, which has a display case housing a number of 3D models, including the subject of the puzzle (Model 40). |
|||
[[Task Completion]] - Remote solvers could instead submit a sonnet about a catenoid (or a cat, annoyed) in order to obtain pictures of the model. |
|||
[[Something Different]] - The clues solve to not-necessarily dictionary-nature phrases. |
|||
[[Crossword]] (Special Grid, [[Cylindrical]]) - The crossword clues are to be filled into the grid on the catenoid's surface, which reduces down to a [https://en.wikipedia.org/wiki/Tetrakis_square_tiling Tetrakis square tiling] with 16 columns and 10 rows that wrap around in a cylindrical fashion. As such, entries cross two letters at a time in potentially opposite directions. |
|||
[[Positional Extraction]] - In a twist on extraction from double letters, this puzzle extracts from a continuous diagonal of cells that form diamond-shapes containing the same letter. |
|||
{{spoiler-end}} |
Latest revision as of 09:20, 11 June 2022
Catenoid | |
---|---|
MIT Mystery Hunt 2020 | |
Yesterdayland | |
Author(s) | Mark Gottlieb |
Answer | Click to revealBELL BOTTOMS |
Statistics | |
No. solves | 11 |
No. total guesses | 82 |
Links | |
Puzzle | Link |
Solution | Link |
Catenoid is a crossword from the Yesterdayland round of the 2020 MIT Mystery Hunt.
Puzzle Elements[edit | edit source]
Flavortext - You can find a 3D schematic for this ride in one of the two display cases containing prototype rides as you climb up CHORD. This ride is Model 40.
Hint in Flavortext - The flavortext mostly is there to point solvers towards the grid used in the puzzle.
I Have Traveled Forty Parsecs - While the hunt was live, solvers had to access the grid by physically going to the Building 2 stairwell (home to the artwork Chord) and walking up to the second floor, which has a display case housing a number of 3D models, including the subject of the puzzle (Model 40).
Task Completion - Remote solvers could instead submit a sonnet about a catenoid (or a cat, annoyed) in order to obtain pictures of the model.
Something Different - The clues solve to not-necessarily dictionary-nature phrases.
Crossword (Special Grid, Cylindrical) - The crossword clues are to be filled into the grid on the catenoid's surface, which reduces down to a Tetrakis square tiling with 16 columns and 10 rows that wrap around in a cylindrical fashion. As such, entries cross two letters at a time in potentially opposite directions.
Positional Extraction - In a twist on extraction from double letters, this puzzle extracts from a continuous diagonal of cells that form diamond-shapes containing the same letter.