Logic Masters Deutschland e.V.

Totally Prime Sudoku

(Eingestellt am 21. Oktober 2020, 19:35 Uhr von steelwool)

The coloured grid is symmetrical about column 5. Any coloured (killer) area has a mirrored pair and each coloured area may sum to a different prime number. All the possible coloured areas are shown, and the remaining (white) areas do not meet this constraint.

All the little killer diagonals that sum to a power of a prime number (which includes single diagonals at the corners) are shown.

All the sandwiches (between 1 and 9) that are either zero or sum to a power of a prime number are shown.

To clarify a couple of points.

  • Powers of primes are not p^0=1.
  • The white cells will not mirror as primes (which is not the same as saying that one does not contain a prime).
  • Each coloured area has a prime sum, but the mirror may be the same prime sum, or it may not (they are both prime)
  • A coloured area may have a repeating digit if it overlaps more than one Sudoku 3x3 box.

You can try this puzzle online by copying the url below.
https://tinyurl.com/yxceuol3

Lösungscode: Enter the digits from row 8 and column 3

Zuletzt geändert am 29. Oktober 2020, 12:28 Uhr

Gelöst von Nylimb, SudokuExplorer, NikolaZ, Ours brun
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Kommentare

am 29. Oktober 2020, 19:17 Uhr von SudokuExplorer
Thanks for clarifying the rules, especially that they are not normal killer cages. Nice start which got a bit tricky at the end. Thanks for the puzzle :-)

am 29. Oktober 2020, 12:28 Uhr von steelwool
clarify puzzle can repeat digits

am 29. Oktober 2020, 12:27 Uhr von steelwool
clarify coloured areas can repeat digits

Zuletzt geändert am 27. Oktober 2020, 17:50 Uhr

am 27. Oktober 2020, 11:52 Uhr von Nylimb
The first time I tried this, I assumed that the white cells couldn't be primes, and quickly reached a contradiction. After that was clarified I tried again. At least twice I made mistakes and started over, but I finally got to the solution.
Thanks for the puzzle.
In the end I don't think I ever used the "white cells will not mirror as primes" restriction.
I think that one more clarification should be added to the description: A digit may be repeated in a colored cage; i.e. they're not normal killer sudoku cages.

@Nylimb well done. Agreed, thanks for pointing out about the killer areas, main comments updated now.

am 25. Oktober 2020, 09:46 Uhr von steelwool
Added tinyurl link - thanks @tenaliraman

am 25. Oktober 2020, 09:39 Uhr von steelwool
clarify the significance of the mirroring of the coloured areas.

Zuletzt geändert am 25. Oktober 2020, 11:14 Uhr

am 22. Oktober 2020, 15:00 Uhr von SudokuExplorer
@Luigi The little killer sums are powers of primes (when shown in the diagram)

@steelwool Does 1 count as a power of a prime (p^0)?
-- Hi, no, the powers are one and above - good question, a bit silly of me not to even think of it! The powers are always given, so a p just means 2,3,5,7. The killer areas are p, not p2 etc, so 17 but not 25. The little killer and sandwiches are p, p2, p3 or p4 as shown.

Zuletzt geändert am 26. Oktober 2020, 14:41 Uhr

am 22. Oktober 2020, 14:43 Uhr von Luigi
This cannot be a normal Sudoku.

In the last line 5 single primenumbers have to appear. There are only 2,3,5,7 available.

Hi, let me try to clarify. There are three single cells that are coloured in the last row, so these will be prime numbers. There are diagonals marked as prime (but those are not single cells, they are a sum along the whole diagonal). The white cells could have a single prime but not both - else they would be coloured. The blue areas at either end are four cells that count up to a prime number (but not necessarily the same sum). If you need any further hints, please ask. @steelwool

So what digits may appear in every row or column?

It's still a standard sudoku, 1-9 in each row, colour and 3x3 area.

Zuletzt geändert am 26. Oktober 2020, 14:42 Uhr

am 21. Oktober 2020, 21:05 Uhr von Nylimb
There aren't any thick lines dividing the grid into 3x3 boxes. Should we assume that normal sudoku rules apply anyway?

Yes, this is still normal sudoku in that every row, column and 3x3 area uses 1-9 once each.

am 21. Oktober 2020, 20:20 Uhr von tenaliraman
Here is a tiny url for the puzzle:
https://tinyurl.com/yxceuol3

Schwierigkeit:3
Bewertung:N/A
Gelöst:4 mal
Beobachtet:12 mal
ID:0004K2

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