dailysudoku.com

[Victor]

M3980837 (160)

[Steve R]

OK, Victor, I give up.

I did manage to solve the puzzle using the fact that r2c1 has two conjugates in the second row. One, with respect to 6, is r2c5; the other, with respect to 9, is r2c6. So r2c5 contains 6 or r2c6 contains 9. Either places 7 in r3c4 and reduces the puzzle to singles.

I don’t know if this is the trick you had in mind. However I’m intrigued by your “bouncing ER,” useless though it may be. Would you care to elaborate?

Steve

[ravel]

Suppose, you mean 7 in r3c4.

I had a longer way for the same: From the w-wing one of r3c1 and r4c6 must be 2.
r3c1=2 => r1c4=2 => r7c5=2
==> r4c5<>2

[Victor]

I'd forgotten about this! I do love your smart solution, Steve.

[Steve R]

Victor

Wow! No wonder I didn’t twig what you had in mind. Thanks for the explanation and the kind remark.

How many hinges? Should it be three?

Box 2: row 2 and column 4
Box 3: row 2 (shared with box 2) and column 8
Box 8: row 7 and column 4 (shared with box 2)
Conclusion: eliminate from the row 7 column 8 intersection.

Actually box 8 is a something of a shady character because its column and row are not well defined. Perhaps it’s twins plus a conjugate. Good find, anyway.

ravel

You’re right, of course. Thanks for the correction, now edited into the original post.

Steve

[Victor]

You are working from a grid with the 2 gone from r3c6? Two hinges then, in b2 & b3. When I first read up about ERs I found an explanation in another forum which made a big deal out of it, but actually it's a pretty simple idea - no technical knowledge required, no need to even think about empty rectangles per se. Here, you can just say that r8c4 = 2 => b2r2 = 2 => r3c8 = 2 => * <>2.

PS I'm about to post a puzzle with an ER that uses 3 hinges.

[ravel]

[Asellus]

[Victor]

Asellus says: