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From SudokuWiki.org, the puzzle solver's site |
XY-Chains
The example here is a very simple XY-Chain of length 4 which removed all 5's highlighted in yellow. The chain ends are 5 A7 and C2 - so all cells that can see both of these are under fire. It's possible to start at either end but lets follow the example from A7. We can reason as follows
- If A7 is 5 then A3/C7/C9 cannot be.
- if A7 is NOT 5 then it's 9, so A5 must be 2, which forces A1 to be 6. If A1 is 6 then C2 is 5.
Which ever choice in A7 the 5's in A3/C7/C9 cannot be 5. The same logic can be traced from C2 to A7 so the strategy is bi-directional, in the jargon.
This next Sudoku puzzle contains an entertaining series of XY-Chains, starting with this rectangular one. It proves that 8 must be in either B3 or B8 and therefore we can remove the other three 8s in row B. Starting on B3 if that cell is either 8 or 6. If it is 6 then D3 must be 4 which pushes 2 into D8 which in turn makes B8 8. You can trace this from B8 back round for the same effect. A nice short XY-Chain, but as the next example shows, these four cells are a rich seam.
Looking at exactly the same starting cell it appears we can make further eliminations, this time 6s in column 3. We go clock-wise, this time, round the rectangle. It proves 6 will either be on B3 or D3.
If you want to finish the puzzle by yourself, look out for a third elimination with those same four cells using 2s on column 8, or step through with the solver.
XY-Chains Exemplars
These puzzles require the XY-Chains strategy at some point but are otherwise trivial.They also require one Naked Pair (except for #5).
They make good practice puzzles.
- Exemplar 1, x1 (score 81)
- Exemplar 2, x1 (score 82)
- Exemplar 3, x4 (score 113)
- Exemplar 4, x4 (score 115)
- Exemplar 5, x9 (score 307) - OMG! 9 chains!