P = NP
(Eingestellt am 4. März 2024, 23:08 Uhr von damasosos92)
Rules
Normal sudoku rules apply.
Every cage in the grid is either a P pentomino or a N pentomino. Every pentomino is completely filled by either a renban line or a thermometer, hidden behind the pentomino. Cells along a renban line contain a set of consecutive, non-repeating digits in any order. Digits on a thermometer must strictly increase as they move away from the bulb. The position of the bulb has to be deduced by the solver. Thermometers only make vertical or horizontal turns inside the pentominous and don't branch.
All the cages of the same shape hide the same constraint: the solver has to deduce which constraint is hidden behind each shape.
P = NP is also available online on CTC-App.
Have fun solving and please, leave a comment after your solve! It helps a lot!
Lösungscode: Row 7, from left to right (9 digits)
Kommentare
am 15. März 2024, 22:12 Uhr von Kawkaz
This was a super-fun puzzle!
am 15. März 2024, 21:57 Uhr von samuel1997
Fantastic!
am 6. März 2024, 18:17 Uhr von Fra314
It never ends! Cool deduction after cool deduction after cool deduction! Insanely good puzzle, bravo damasosos92!
am 6. März 2024, 04:17 Uhr von yttrio
Incredibly fun puzzle! Not too difficult, but still had to make clever deductions throughout.
am 6. März 2024, 02:22 Uhr von sacklunch
Wow, what a beautiful puzzle! Clever interactions, tough but doable. Loved it, thanks!
am 5. März 2024, 22:18 Uhr von Nordy
Beautiful interactions!
am 5. März 2024, 22:16 Uhr von wisty
Wonderful geometry! I love this puzzle! <3
am 5. März 2024, 21:59 Uhr von Chad
wonderful logic up to the very last digit!
am 5. März 2024, 19:40 Uhr von marcmees
fun rules. Fun solve. thanks.
am 5. März 2024, 14:34 Uhr von Lokeil
very nice puzzle.
am 5. März 2024, 10:23 Uhr von I_love_carrie273
If one cage can be obtained from another by mirroring and/or rotating, does it count as the same shape?
- yes, absolutely
am 5. März 2024, 01:08 Uhr von bansalsaab
Very nice.
am 4. März 2024, 23:57 Uhr von anyeyeball
Truly enjoyable puzzle. Thanks for sharing.
am 4. März 2024, 23:50 Uhr von damasosos92
Edited the rules to better clarify that the pentominous entirely hide renbans and thermos.
am 4. März 2024, 23:30 Uhr von sanabas
"Every pentomino hides either a renban line or a thermometer."
A 5-cell long renaban/thermo?
reply: yes, I'll edit the rules a little bit, but yes, the renban/thermo touches every cell of the pentomino.
