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Marty R. · Posted: Mon Nov 14, 2011 8:20 pm Post subject:

XY-Chain; 3 in r9c3 proves 6 in r1c1; r89c1<>6

-or-

XY-Wing (672); r7c1<>2

arkietech · Posted: Mon Nov 14, 2011 8:53 pm Post subject:

Marty R. · Posted: Tue Nov 15, 2011 12:39 am Post subject:

I give up, I can't follow this like i could the last one.

What's the W-Wing?
What's the pseudo cell?
What's the strong link?

Question

arkietech · Posted: Tue Nov 15, 2011 12:57 am Post subject:

Marty R. · Posted: Tue Nov 15, 2011 2:03 am Post subject:

tlanglet · Posted: Tue Nov 15, 2011 3:25 am Post subject:

Nice 6-cell AUR does some damage but does not solve the puzzle.
AUR (14)r789c259; internal SIS forces r9c6=1

Another one step solution is the xy-wing (23-6)r49c3+r5c2; r5c3<>6

Still another one stepper is the almost xy-wing(36-7)r59c3+r8c1 with fin (26)r5c3; r5c1<>7
If the xy-wing is true: r5c1<>7
If the fin is true: ls(26)r5c23-(2=3)r5c9-r4c9=r4c3-(3=6)r9c3-(6=7)r8c1; r5c1<>7
In notation form: xy-wing(36-7)r59c3+r8c1= ls(26)r5c23-(2=3)r5c9-r4c9=r4c3-(3=6)r9c3-(6=7)r8c1; r5c1<>7

Ted

ronk · Joined: 07 May 2006 Posts: 398

1-stepper with forgot-the-name-if-it-has-a-name wing:

(7=6)r8c1 - (6=3)r9c3 - (3)r9c1 = (3)r5c1 ==> r5c1<>7

keith · Posted: Tue Nov 15, 2011 7:51 am Post subject:

ronk · Joined: 07 May 2006 Posts: 398