Normal Sudoku rules apply.
Counting Circles: A digit in a circle indicates how many circles contain that digit.
Palindrome Lines: Digits along a grey line form a palindrome, i.e. they read the same forwards and backwards.
Between Lines: Digits on a blue line between two circles have values between the digits in those circles.
Kropki Pairs: Digits separated by a black dot are in a 2:1 ratio.
A clever puzzle can only be appreciated by those who discover the solution. I don't intend for this puzzle to be unapproachable for anyone, but the nature of its design means it may feel impossible to those who aren't struck by what my favorite math professor would call "divine inspiration" to see the path forward. If you are feeling hopelessly stuck, highlight the text below to reveal a few hints that should help give everyone a fighting chance to solve this puzzle. Each hint is more explicit than the last, so highlight one hint at a time and only move onto the next hint if needed.
1. This puzzle requires Set Equivalence Theory to solve. In other words, it's possible to identify two sets of cells that each contain exactly the same collection of digits, and this knowledge somehow helps in deducing the solution.
2. One set of cells is the union of rows 2, 4, 6, and 8. We know that these 36 cells contain exactly 4 copies of each digit 1-9. Now, find another set of cells that contains exactly the same collection of digits. Anytime you can prove that one cell in each set of cells contains the same digit, you can remove those cells from each set and it will still be true that the remaining cells in each set still contain exactly the same collection of digits.
3. The other set of cells is the union of columns 2, 4, 6, and 8. Color rows 2468 in one color and columns 2468 in a different color. Remove the coloring from any cell with both colors. Anytime a palindrome line forces a cell of one color to contain the same digit of a cell of the other color, remove the coloring from both cells. The remaining cells of one color must contain exactly the same collection of digits as the remaining cells of the other color. What does that tell you about the nature of the digits in the Counting Circles?
Good luck!
Solution code: Row 6. (9 digits)
on 13. July 2024, 23:44 by SudokuHero
I rated this 5* because although I finished it pretty quickly, if I didn't know how to do the break in, it would have taken me a lot longer to find it.
on 10. July 2024, 15:11 by sockerbecca
Such an amazing puzzle! I needed the first hint, but after that I managed it myself. Definitely a tricky one!
on 10. July 2024, 04:03 by Allagem
Thank you everyone for the wonderful comments! I've added a link to Cracking The Cryptic's showcase of this puzzle :)
on 9. July 2024, 23:24 by psams
I just wanted to post another comment expressing appreciation for this puzzle. I did not find the break in on my own. The degrees of freedom in the counting circles had me scratching my head, and could not be reduced with just the Kropki pairs. Humbling, and excellent.
on 9. July 2024, 02:39 by antiknight
Great break-in!
on 9. July 2024, 01:48 by Playmaker6174
This puzzle caught my attention quite suddenly earlier so I decided to binge solve it for once x)
An elegant and lovely opening idea followed by a flurry of fun deductions afterwards! (and proper scanning was required too heh)
on 25. June 2024, 17:20 by Isael
Thank you for the hints, lovely puzzle!
on 25. June 2024, 10:11 by botteur
Beautiful puzzle. Thank you so much for providing hints that made it more approachable, and yet still very challenging.
on 21. June 2024, 14:49 by Snookerfan
One of the best break-ins I have ever witnessed. Thank you
on 21. June 2024, 13:19 by samuel1997
What a nice combination of Circle and Palindrome! Excellent!
on 20. June 2024, 20:03 by wisty
great puzzle! thanks :)
on 20. June 2024, 14:33 by mormagli
Extremely smooth and satisfying.
on 20. June 2024, 13:00 by Myxo
Fantastic execution of this idea!
Difficulty: | |
Rating: | 98 % |
Solved: | 74 times |
Observed: | 7 times |
ID: | 000ILO |