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[Victor]

M6368062 (95)

[storm_norm]

[storm_norm]

[storm_norm]

xyz- wing on {4,5,7} in boxes 1 and 2, takes out the 4 in r2c2

doesn't solve it

[storm_norm]

[ravel]

[ravel]

There are exactly 2 ways, how the missing 5 8's can be placed. So i started to color them red and green. Then i first followed the red numbers - ah this pair then this and that single and so on - until the puzzle was solved.
Good luck or bad luck ?

[Victor]

Storm_norm, you can remove a 7 from R5C7 because of the UR, but I think that's it. (In this type, when there's a strong link in one number at right-angles to the naked pairs, you can remove the other number from the other corner -mentally put in the 7 and run it round clockwise.)

Ravel: is that what's known as Medusa colouring, which I haven't yet attempted?

(Guess I was thinking that somebody would come up with a sort of AIC, which I'm not good at seeing.)

[nataraj]

Medusa. I did exactly what ravel proposed - i.e. to look at those "8"s



any candidate that sees both red and green can be eliminated, which gets rid of 4 in r4c2 and 1 in r4c3.

now with the "4" gone, the cell r4c2 becomes bi-value and the 1 in it can be colored green.

Again, there is a candidate that sees red and green: 1 in r4c8.
Another: 1 in r8c2.

This almost solves the puzzle.

I had to use an w-wing later on:
with 1 gone from r4c8 there is only {2,4} so a simple chain
24-47-47-24 ending in r5c3 (at that time r5c3 has lost the "1", too) makes r5c8=1 and we're done.

It turns out that 1 is indeed in r79c7 but I could not see the reasoning behind Norm's UR argument. But I am notoriously weak in URs ...

[nataraj]

I should have added that the nice thing with (Medusa-) Coloring is that ANY combination of red and green can be seen as a strong link to complete a nice loop.

So - the first two eliminations could indeed be written as follows:

-(4-8)r4c2=[red to green]=(4)r4c7-; r4c2<>4
-(1-8)r4c3=[green to red]=(1)r4c7-; r4c3<>1

Those are 2 examples of chains that connect different numbers in the same house (see Victor's post in the solving techniques forum
http://www.dailysudoku.com/sudoku/forums/viewtopic.php?t=2289

[Victor]

Storm_norm, being careless again, I wrote that you can kill the 7 in R7C5. That's wrong: you can kill the 1 in this cell, because there's a strong link in 7s in C7.

Nataraj, thanks. I do get your last post, tho' reading Eureka is a bit of a struggle for me. I guess everybody finds some techniques 'comfortable', others less so. I certainly prefer your chain-type explanation to Medusa colouring, even tho' they're equivalent.

[ravel]

[nataraj]

[Asellus]

nataraj,

Why did you stop Medusa coloring after those few eliminations? Continuing where you left off, the grid has become:

[Asellus]

I, for one, sure find some of the recent discussions to be interesting!

Regarding the comments about "extending" Medusa coloring, I recommend that conventional Medusa coloring be carried as far as possible before using the "extension" approach. In the puzzle above, conventional Medusa was able to proceed quite far.

Also, I recommend that when the "extension" approach is used it be used for both colors when possible, not just a single color.

ravel's comment about extending only a single color from a limited Medusa start piqued my curiosity. So, I began with storm_norm's {17} UR grid and colored only digit <8> (a highly limited form of Medusa!). Then, I extended only one of the colors. I was still able to solve the puzzle using only this approach... though it was slightly trickier than following my recommended approach.

[storm_norm]

[nataraj]

[Victor]

Thanks guys, I found this very helpful & revealing. Maybe I'll try to overcome my (quite unreasonable) prejudice against Medusa - I do take your point Nataraj about using Medusa to help to find chains.

(I pulled out my sheet and had another look at why the 4 gets killed in R4C2. Seems easy now - why didn't I spot it? !)