Schrödinger's Pseudoku
(Eingestellt am 27. Februar 2025, 19:37 Uhr von starwarigami)
Normal Sudoku rules (mostly) apply.
Place the digits 0-9 in the grid so that there are 10 digits in each row, column and box (to enable this there is a single Schrödinger cell in each row, column and box that contains two digits) and (almost) no digit repeats in any row, column or box.
(Each unique digit may appear twice in exactly one row, column OR box. No more than one digit may repeat in any row, column, or box.)
The value of a cell is the sum of the digits it contains.
The values of cells separated by a white dot are consecutive.
The values of cells separated by a black dot are in a 2:1 relationship (i.e. one is double the other).
The values of cells separated by an X sum to 10.
The values of cells separated by a V sum to 5.
Not all dots, Xs and Vs are necessarily given.
Sudokupad link
Mini Pseudoku puzzles: Other full-size puzzles in this series:
Lösungscode: Row 9 (left to right) - 10 digits, no spaces
Kommentare
am 28. Februar 2025, 18:08 Uhr von henrypijames
It's got quite a bite at the end - when a hitherto undiscovered principal consequence of the ruleset comes into play ... 4⅓ for me.
am 28. Februar 2025, 14:46 Uhr von gfoot
This was really nicely done - challenging rulesets but I also felt that where to look next was usually fairly clear and allowed me to chip away at it nicely
am 28. Februar 2025, 07:11 Uhr von spectria.limina
An infuriating but beautiful journey into the depths of what happens when you combine two already tricky rulesets that limits the amount of deductions you can make ... And the answer is a really tough nut.
The break in was a lot of fun, and progress was steady in the middle game. The combination of Schrodinger cells and pseudoku really takes a way a lot of the usual sudoku logic... Very cleverly done
