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

I took a diversion on the two <8> pincer cells of the idle [28-29-89] xy-wing@. Both or either of the pincer cells (A,B) must contain digit <8>.
When R9C1=8 => R8C1=4 => R7C3=3 => R5C3=6(c)
Or R6C6=8 => R6C3=6(d)
Now I have two new <6> pincers in R5C3(c) and in R6C4(d), which eliminate <6> in R6C2, that solves the puzzle.

ravel · Joined: 21 Apr 2006 Posts: 536

storm_norm · Joined: 18 Oct 2007 Posts: 1741

Asellus · Posted: Sat Jan 12, 2008 6:49 pm Post subject:

Some extended Medusa coloring (what else?) revealed the following AIC that solves the puzzle:
(2)r6c1-(2)r9c1=(2-3)r7c2=(3)r7c3-(3)r5c3=(3-9)r5c1=(9-2)r6c1; r6c1<>2

In ordinary language: If r6c1 is <2>, then r7c2 is <2>, r7c3 is <3>, r5c1 is <3>, and r6c1 is <9>, contradicting the assumption that r6c1 is <2>. So, r6c1 cannot be <2>.