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Not Quite 5 puzzle (simple idea)

(Eingestellt am 21. Mai 2020, 18:00 Uhr von Carrick22)

Not Quite 5 puzzle

Apply classic latin square rules : Each row and column must contain the digits 1-6 once.

In this puzzle, three different types of clues appears and work as follows :

  • A red cell must contain a number that is not quite 5 (i.e. 4 or 6).
  • The digits on the left are to be placed not quite where the 5 should be (i.e. next to the 5 in that row).
  • The numbers on the top refer to the sum of the digits not quite where the 5 should be (i.e. the sum of all orthogonally adjacent squares from the 5 placed in that column).
In addition, 2s act as stars, so they do not touch diagonally.

This is an idea I came up for a sudoku, however the process of making it seems quite hard. This puzzle is for sharing the idea to everyone.

You can use Penpa-edit for solving it on your browser.

Lösungscode: Row 2, then row 3.

Zuletzt geändert -

Gelöst von glum_hippo, skywalker, Amedoru, saskia-daniela, Puzzle_Maestro, Nothere, moss, marcmees, zorant, cdwg2000, jessica6, lutzreimer, ropeko, dm_litv, Rollie, Rollo, Quetzal, Zzzyxas, rimodech, zhergan, ... puzzler05, Joo M.Y, pirx, pokerke, pin7guin, Mody, ffricke, Voyager, Matt, RobertBe, Uhu, Semax, Mathi, Thomster, Raistlen, uvo, CJK, Mark Sweep, Zenryo, Jordan Timm, Kekes, Javier Rebottaro, drf93
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Kommentare

am 24. November 2020, 20:24 Uhr von Semax
Quite not bad. :)

am 2. Juni 2020, 09:32 Uhr von CHalb
Funny combination of rules. I especially like the concept of the numbers of the top.

Zuletzt geändert am 23. Mai 2020, 15:11 Uhr

am 23. Mai 2020, 14:15 Uhr von sf2l
sorry I do not understand the 3rd rule can anybody give an example

- If you have a 16 clue, you can fulfill it with 3/6 over and under the 5, and a 3/4 to its left and right (3+6+3+4 = 16). Digits can be repeated in the sum if they do not see each other.

am 22. Mai 2020, 05:34 Uhr von cdwg2000
The red constraint does not seem to be needed.

am 21. Mai 2020, 18:27 Uhr von glum_hippo
Seems like an interesting set of 'hybrid' constraints. Nothing I haven't seen before, but the combination does look intriguing.

Schwierigkeit:1
Bewertung:78 %
Gelöst:64 mal
Beobachtet:4 mal
ID:0003I8

Rätselvariante Füllrätsel Arithmetikrätsel

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