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daj95376 · Joined: 23 Aug 2008 Posts: 3854

Probably easy for an XY_nn puzzle.

storm_norm · Joined: 18 Oct 2007 Posts: 1741

this grid is after the xy-wing {3,4,6} that very nicely removes the 3's from r89c5, in the UR pattern on {4,8} in r89c35... notice the xy-wing that is formed from the extra candidates?

tlanglet · Posted: Thu Jun 11, 2009 1:05 pm Post subject:

My first step was an extended xyz-wing 346 in r4c5 to delete 3 in r5c6. The extension is: If r4c5=6 then r2c5=3 so r89c5<>3 and r9c6=3 which means r5c6<>3. Or, as a chain: (6)r4c5 - (6=3)r2c5 - (3)r89c5 = (3)r9c6; r5c6<>3. This step resulted in identical code as posted by Norm after his initial xy-wing 346.

Then I noticed the UR48 (also described by Norm) which provided the subset 27 to form the xy-wing 247 with pivot 27 in r89c3 that deleted the 4 in r4c2.

Ted

arkietech · Posted: Thu Jun 11, 2009 1:21 pm Post subject:

Nice find Norm. Cool

two w-wings will solve it also:
w-wing 34
w-wing 42

Marty R. · Posted: Mon Jun 15, 2009 3:45 pm Post subject:

I started with a W-Wing on 34. Then the UR on 48 worked out just like a little Mixed W-Wing. In the grid shown, if r8c3 = 7 then r3c1 = 2 and the 2 is eliminated from r3c3.