dailysudoku.com

Victor · Joined: 29 Sep 2005 Posts: 207 Location: NI

M1115024 (122)

Asellus · Posted: Thu Apr 03, 2008 7:44 am Post subject:

You can also see those <1> eliminations as a Finned X-Wing in r34 with the otherwise useless remote Fin transported to r9c3 and r7c9.

While it is "tidiest" as a Finned Swordfish, the Finned X-Wing is probably easier for most to spot. It is worthwhile to check for transportation options in such cases.

Victor · Joined: 29 Sep 2005 Posts: 207 Location: NI

Thanks. I didn't really understand the idea of transporting x-wing fins: now I do (I think).

ravel · Joined: 21 Apr 2006 Posts: 536

Nice application of transports.

After that i saw a useless, but interesting elimination.

Marty R. · Posted: Fri Apr 04, 2008 12:14 am Post subject:

Would someone like to give me a brief explanation on transporting an X-Wing fin?

Asellus · Posted: Sat Apr 05, 2008 12:50 am Post subject:

Asellus · Posted: Sat Apr 05, 2008 1:03 am Post subject:

Ravel,

Your interesting elimination can be seen, slightly differently, as a Sue de Coq. The 6 digits {123568} are confined to the 6 cells r7c89|r9c4789 with <8> locked in r9c789, and a {136} locked set in r7c89|r9c789 overlapping with a {25} locked set in r9c4789. It would eliminate <1>, <3> and <6> in any other cell in b9 and <2>, <5> and <8> in any other cell in r9. The only such elimination is that <2> in r9c1.

By the way... since those {25}s are a complementary pair, there is an extended M-Wing that also eliminates that <2> based on the strongly linked <2>s in c8, r2 and c2 (or b1).

Marty R. · Posted: Sun Apr 06, 2008 3:52 am Post subject: