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keith

I have not yet completed it ...

Earl · Joined: 30 May 2007 Posts: 677 Location: Victoria, KS

I's stuck here. Help!

Earl

*-----------------------------------------------------------*
| 139 13 49 | 7 148 18 | 2 5 6 |
| 16 2 7 | 9 156 156 | 3 8 4 |
| 68 5 48 | 46 2 3 | 1 9 7 |
|-------------------+-------------------+-------------------|
| 89 68 1 | 2 7 4 | 69 3 5 |
| 4 7 59 | 156 3 156 | 69 2 8 |
| 23 36 25 | 8 56 9 | 7 4 1 |
|-------------------+-------------------+-------------------|
| 5 4 6 | 3 9 7 | 8 1 2 |
| 7 18 3 | 14 148 2 | 5 6 9 |
| 12 9 28 | 156 1568 1568 | 4 7 3 |
*-----------------------------------------------------------*

TKiel · Joined: 22 Feb 2006 Posts: 292 Location: Kalamazoo, MI

From earl's position there is an extended XY-wing with <13> pivot in r1c2 that excludes 8 from r4c1.

(Edit: Sorry about the wrong cell reference.)

Marty R. · Posted: Sat Sep 15, 2007 4:00 pm Post subject:

Earl's grid:

Johan · Joined: 25 Jun 2007 Posts: 206 Location: Bornem Belgium

From Earl's grid there is a 5-cell xy-chain that eliminates <8> in R4C1

TKiel · Joined: 22 Feb 2006 Posts: 292 Location: Kalamazoo, MI

XY-wing with pivot in r1c2 <13>, pincers at r2c1 <16> and r6c2 <36>. R2c1 extends to r3c1 <68>, r6c2 extends to r4c2 <68>. Probably same XY-chain used by Johan.

Marty R. · Posted: Sat Sep 15, 2007 10:04 pm Post subject:

Ruud · Joined: 18 Jan 2006 Posts: 31

It would be interesting to know how earl eliminated 8 from r9c1. The best move I could find is a Sue-De-Coq on box 1 and column 1. A rare, but beautiful move.

Ruud

Johan · Joined: 25 Jun 2007 Posts: 206 Location: Bornem Belgium

The 5-cell xy-chain could also be defined like Tracy said as an extended xy-wing.
But you can also define the xy-wing as a short 3-cell xy-chain, either both ways uses the pincer-cells effect, to eliminate a candidate that can be seen by both cells.

The 5-cell xy-chain, which erases <8> in R4C1, starting with <6> in R3C1.

[86][61][13][36][68]

TKiel · Joined: 22 Feb 2006 Posts: 292 Location: Kalamazoo, MI

Ruud,

I'm not sure how earl did it, but there is a lowly old XY-chain that does it.

<82><25><56><63><31><18> (forgive my improper notation).

Earl · Joined: 30 May 2007 Posts: 677 Location: Victoria, KS

I used the (8) pincers of R3C1 and R8C2 (by an xy-chain 1-4-6-8) to eliminate 8 from R9C1. But I failed to see the xy-chain from R3C1 to R4C2 (6-1-3-6-8) that eliminates 8 from R4C1 and solves the puzzle.

Earl

(Edited by keith to disable smilies)

keith · Posted: Sun Sep 16, 2007 8:39 pm Post subject: What is this called?

I've been away for the weekend, driving by Tracy's town, to Chicago and back. I apologize if this has been covered. This is the pinch point:

Asellus · Posted: Mon Sep 17, 2007 12:50 am Post subject:

I'd call it an AIC (Alternate Implication Chain) that uses end-to-end strong ("conjugate") links. In Eureka notation it can be written:

[1-4]R1C5=[4-8]R8C5=[8-1]R8C2=[1]R1C2-[1]R1C5; R1C5<>1

The three links are 4=4 in C5, 8=8 in R8, and 1=1 in C2.

Asellus · Posted: Mon Sep 17, 2007 1:08 am Post subject:

Medusa coloring easily produces an interesting result with Keith's grid: