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keith
Joined: 19 Sep 2005
Posts: 3355
Location: near Detroit, Michigan, USA
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 Posted: Fri Sep 04, 2009 3:23 pm Post subject: Free Press 4 September, 2009 |
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Not yet done: | Code: | Puzzle: FP090409
+-------+-------+-------+
| 9 5 . | . 3 . | . 2 4 |
| . . . | . 8 . | 9 . 1 |
| . . . | . . . | . 7 . |
+-------+-------+-------+
| . . . | 3 7 1 | . . 6 |
| 5 . . | . . . | . . 7 |
| 2 . . | . 9 6 | . . . |
+-------+-------+-------+
| . 9 . | . . . | . . . |
| 8 . 3 | . 5 . | . . . |
| 7 2 . | . 1 . | . 3 9 |
+-------+-------+-------+ |
Keith |
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Earl
Joined: 30 May 2007
Posts: 677
Location: Victoria, KS
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| Posted: Fri Sep 04, 2009 4:36 pm Post subject: Free |
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A Solution
An xy-chain from R3C5 to R9C4 eliminates the 6 in R1C4 and solves the puzzle.
Earl
of the chain gang |
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arkietech
Joined: 31 Jul 2008
Posts: 1834
Location: Northwest Arkansas USA
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| Posted: Fri Sep 04, 2009 4:39 pm Post subject: |
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One stepper: | Quote: | | xy-chain starting with 16 in B1 and ending with 16 in B2 |
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keith
Joined: 19 Sep 2005
Posts: 3355
Location: near Detroit, Michigan, USA
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| Posted: Fri Sep 04, 2009 6:58 pm Post subject: |
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Well, then. After basics: | Code: | +----------------+----------------+----------------+
| 9 5 16d | 16c 3 7 | 8 2 4 |
| 3 7 2 | 4 8 5 | 9 6 1 |
| 16e 4 8 | 129 26 29 | 35 7 35 |
+----------------+----------------+----------------+
| 4 8 9 | 3 7 1 | 2 5 6 |
| 5 136 16 | 28 24 248 | 13 9 7 |
| 2 13 7 | 5 9 6 | 14 148 38 |
+----------------+----------------+----------------+
| 16f 9 45 | 27 246 3 | 1457 148 58 |
| 8 16g 3 | 679 5 -49 | 1467 14h 2 |
| 7 2 45 | 68b 1 48a |-456 3 9 |
+----------------+----------------+----------------+ |
Keith |
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daj95376
Joined: 23 Aug 2008
Posts: 3854
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| Posted: Fri Sep 04, 2009 10:49 pm Post subject: |
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| Code: | my solver's basics didn't eliminate <3> in [r6c7]
+-----------------------------------------------------------------------+
| 9 5 16 | 16 3 7 | 8 2 4 |
| 3 7 2 | 4 8 5 | 9 6 1 |
| 16 4 8 | 1269 26 29 | 35 7 35 |
|-----------------------+-----------------------+-----------------------|
| 4 8 9 | 3 7 1 | 2 5 6 |
| 5 *13+6 16 | 28 24 248 | *13 9 7 |
| 2 *13 7 | 5 9 6 | *13+4 148 38 |
|-----------------------+-----------------------+-----------------------|
| 16 9 45 | 267 246 3 | 14567 148 58 |
| 8 16 3 | 679 5 49 | 1467 14 2 |
| 7 2 45 | 68 1 48 | 456 3 9 |
+-----------------------------------------------------------------------+
# 50 eliminations remain
*** UR 2x bivalue cells: <13> [r56c27] cand count = 4/2,3,3,2
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From here, I found:
| Code: | <13> UR [r56c27] => [r5c2]=6 or [r6c7]=4
[r5c2]=6 => [r8c2]=1 => [r6c2]=3 => [r6c7]<>3
|| [r8c8]=4 => [r6c8]<>4
[r6c7]=4 => [r6c7]<>3, [r6c8]<>4
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This doesn't crack the puzzle, but it does bypass the XY-Chain by allowing an X-Wing, a turbot fish, and an XY-Wing. |
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keith
Joined: 19 Sep 2005
Posts: 3355
Location: near Detroit, Michigan, USA
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| Posted: Sat Sep 05, 2009 9:23 pm Post subject: |
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Danny:
| Quote: | | my solver's basics didn't eliminate <3> in [r6c7] |
You are correct. The elimination can be made by an insanely long XY-chain. Here is the "correct" "after basics": | Code: | +----------------+----------------+----------------+
| 9 5 16 | 16 3 7 | 8 2 4 |
| 3 7 2 | 4 8 5 | 9 6 1 |
| 16a 4 8 |1-29 26g 29f | 35 7 35 |
+----------------+----------------+----------------+
| 4 8 9 | 3 7 1 | 2 5 6 |
| 5 136 16 | 28 24 248 | 13 9 7 |
| 2 13 7 | 5 9 6 | 134 148 38 |
+----------------+----------------+----------------+
| 16b 9 45 | 27 246 3 | 1457 148 58 |
| 8 16c 3 | 679 5 49e |-1-467 14d 2 |
| 7 2 45 | 68 1 48 | 456 3 9 |
+----------------+----------------+----------------+ |
Sudoku Susser points out the interesting XY loop that is a one-stepper.
I don't recall ever seeing a loop that makes two eliminations in a cell.
Keith |
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daj95376
Joined: 23 Aug 2008
Posts: 3854
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| Posted: Sat Sep 05, 2009 11:53 pm Post subject: |
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| keith wrote: | | daj wrote: | | my solver's basics didn't eliminate <3> in [r6c7] |
You are correct. The elimination can be made by an insanely long XY-chain.
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If you combine the strong links on <3> in the UR with the bivalue <13> cells in the UR, then you can deduce [r6c7]<>3 by itself. However, this doesn't advance the solution, so I needed to use logic that also performed [r6c8]<>4.
| keith wrote: | I don't recall ever seeing a loop that makes two eliminations in a cell.
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This is why I use only one minus "-" sign in a cell and place the elimination(s) after it.
| Code: | Ted's Insane puzzle for Sep. 4, 2009
+-----------------------------------------------------------------------+
| 4 16 3 | 8 b17 2 | 5 c67 9 |
| 58 68 2 | 567 9 e36 | 4 d3678 1 |
| 158 9 7 | 156 f134 146-3 | 68 368 2 |
|-----------------------+-----------------------+-----------------------|
| 2 5 4 | 3 8 7 | 9 1 6 |
| 6 3 8 | 12 12 9 | 7 4 5 |
| 9 7 1 | 4 6 5 | 3 2 8 |
|-----------------------+-----------------------+-----------------------|
| 138 1248 5 | 1267 ag37-124 1346 | 68 9 47 |
| 138 148 9 | 167 5 1346 | 2 68 47 |
| 7 24 6 | 9 24 8 | 1 5 3 |
+-----------------------------------------------------------------------+
# 55 eliminations remain
(7)r7c5 = r1c5 - r1c8 = (7-3)r2c8 = r2c6 - r3c5 = (3)r7c5; => r7c5<>124,[r3c6]<>3
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Now you've seen one that does three eliminations in a cell. |
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Asellus
Joined: 05 Jun 2007
Posts: 865
Location: Sonoma County, CA, USA
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| Posted: Sat Sep 19, 2009 10:22 pm Post subject: |
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As an alternative to the loops and long chains, you might like to note that that 13 UR creates a 46 "pseudo-bivalue" that forms a a 146 "XY-Wing" with r8c28. The <4> pincers are at r6c7 and r8c8.
Or, 13UR[(4)r6c7=(6)r5c2] - (6=1)r8c2 - (1=4)r8c8; r6c8|r789c7<>4
After this there is a Finned X-Wing on 1 and a 268 XY-Wing. |
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keith
Joined: 19 Sep 2005
Posts: 3355
Location: near Detroit, Michigan, USA
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| Posted: Sun Sep 20, 2009 6:37 pm Post subject: |
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| Asellus wrote: | As an alternative to the loops and long chains, you might like to note that that 13 UR creates a 46 "pseudo-bivalue" that forms a a 146 "XY-Wing" with r8c28. The <4> pincers are at r6c7 and r8c8.
Or, 13UR[(4)r6c7=(6)r5c2] - (6=1)r8c2 - (1=4)r8c8; r6c8|r789c7<>4
After this there is a Finned X-Wing on 1 and a 268 XY-Wing. |
Asellus,
Very impressive!
Keith |
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