- Code: Select all
*-----------*
|...|..9|5.1|
|2.1|7..|...|
|..3|.1.|...|
|---+---+---|
|...|.5.|293|
|...|941|...|
|795|.3.|...|
|---+---+---|
|...|.7.|3..|
|...|..5|4.6|
|4.2|6..|...|
*-----------*
Play/Print this puzzle online
February 12, 2014
6 posts
• Page 1 of 1
February 12, 2014
by ArkieTech » Wed Feb 12, 2014 12:24 am
Play/Print this puzzle online
dan
-
ArkieTech - Posts: 3355
- Joined: 29 May 2006
- Location: NW Arkansas USA
Re: February 12, 2014
by SteveG48 » Wed Feb 12, 2014 1:12 am
- Code: Select all
*-----------------------------------------------------------------------------*
| 68 4678 467 | 34 a268 9 | 5 b234678 1 |
| 2 5 1 | 7 68 348 | 689 3468 489 |
| 9 4678 3 | 5 1 248 | 678 24678 2478 |
*-------------------------+-------------------------+-------------------------|
| 16 146 46 | 8 5 7 | 2 9 3 |
| 3 2 8 | 9 4 1 | 67 567 57 |
| 7 9 5 | 2 3 6 | 18 148 48 |
*-------------------------+-------------------------+-------------------------|
| 5 168 69 | 14 7 248 | 3 c128 d289 |
| 18 1378 79 | 13 g89-2 5 | 4 c1278 6 |
| 4 1378 2 | 6 f89 38 |e1789 1578 e5789 |
*-----------------------------------------------------------------------------*
(2)r1c5 = r1c8 - r78c8 = (2-9)r7c9 = r9c79 - r9c5 = (9-2)r8c5 => -2 r8c5 ; stte
Steve
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SteveG48 - 2019 Supporter
- Posts: 4479
- Joined: 08 November 2013
- Location: Orlando, Florida
Re: February 12, 2014
by pjb » Wed Feb 12, 2014 3:56 am
- Code: Select all
68 4678 467 | 34 a268 9 | 5 34678-2 1
2 5 1 | 7 68 348 | 689 3468 489
9 4678 3 | 5 1 48-2 | 678 24678 f2478
---------------------+----------------------+---------------------
16 146 46 | 8 5 7 | 2 9 3
3 2 8 | 9 4 1 | 67 567 57
7 9 5 | 2 3 6 | 18 148 48
---------------------+----------------------+---------------------
5 168 d69 | 14 7 248 | 3 128 e289
18 1378 c79 | 13 b289 5 | 4 1278 6
4 1378 2 | 6 89 38 | 1789 1578 5789
(2) r1c5 = (2-9) r8c5 = r8c3 - r7c3 = (9-2) r7c9 = r3c9 => -2 r1c8, r3c6; stte
Phil
- pjb
- 2014 Supporter
- Posts: 2672
- Joined: 11 September 2011
- Location: Sydney, Australia
Re: February 12, 2014
by SteveG48 » Wed Feb 12, 2014 4:16 am
A tighter variant on mine:
(2-9)r7c9 = r9c79 - r9c5 = (9-2)r8c5 = r8c8 => -2 r7c9 ; stte
- Code: Select all
*-----------------------------------------------------------------------------*
| 68 4678 467 | 34 268 9 | 5 234678 1 |
| 2 5 1 | 7 68 348 | 689 3468 489 |
| 9 4678 3 | 5 1 248 | 678 24678 2478 |
*-------------------------+-------------------------+-------------------------|
| 16 146 46 | 8 5 7 | 2 9 3 |
| 3 2 8 | 9 4 1 | 67 567 57 |
| 7 9 5 | 2 3 6 | 18 148 48 |
*-------------------------+-------------------------+-------------------------|
| 5 168 69 | 14 7 248 | 3 128 a89-2 |
| 18 1378 79 | 13 d289 5 | 4 e1278 6 |
| 4 1378 2 | 6 c89 38 |b1789 1578 b5789 |
*-----------------------------------------------------------------------------*
(2-9)r7c9 = r9c79 - r9c5 = (9-2)r8c5 = r8c8 => -2 r7c9 ; stte
Steve
-
SteveG48 - 2019 Supporter
- Posts: 4479
- Joined: 08 November 2013
- Location: Orlando, Florida
Re: February 12, 2014
by Leren » Wed Feb 12, 2014 4:47 am
- Code: Select all
*-----------------------------------------------------------------------*
| 68 4678 467 | 34 268 9 | 5 234678 1 |
| 2 5 1 | 7 68 348 | 689 3468 489 |
| 9 4678 3 | 5 1 248 | 678 24678 2478 |
|-----------------------+-----------------------+-----------------------|
| 16 146 46 | 8 5 7 | 2 9 3 |
| 3 2 8 | 9 4 1 | 67 567 57 |
| 7 9 5 | 2 3 6 | 18 148 48 |
|-----------------------+-----------------------+-----------------------|
| 5 168 d69 | 14 7 a248 | 3 128 e89-2 |
| 18 1378 c79 | 13 b289 5 | 4 1278 6 |
| 4 1378 2 | 6 89 38 | 1789 1578 5789 |
*-----------------------------------------------------------------------*
L2 Wing: (2) r7c6 = (2-9) r8c5 = r8c3 - r7c3 = (9) r7c9 => - 2 r7c9; stte
Leren
- Leren
- Posts: 5117
- Joined: 03 June 2012
Re: February 12, 2014
by tlanglet » Wed Feb 12, 2014 2:30 pm
- Code: Select all
*-----------------------------------------------------------------------------*
| 68 4678 467 | 34 268 9 | 5 234678 1 |
| 2 5 1 | 7 68 348 | 689 3468 489 |
| 9 4678 3 | 5 1 248 | 678 24678 2478 |
|-------------------------+-------------------------+-------------------------|
| 16 146 46 | 8 5 7 | 2 9 3 |
| 3 2 8 | 9 4 1 | 67 567 57 |
| 7 9 5 | 2 3 6 | 18 148 48 |
|-------------------------+-------------------------+-------------------------|
| 5 168 69 | 14 7 248 | 3 128 289 |
| 18 1378 79 | 13 289 5 | 4 *17=28 6 |
| 4 1378 2 | 6 *89 3-8 |*1789 *1578 *5789 |
*-----------------------------------------------------------------------------*
So I wanted to do something different today and found what I believe could be an Almost Almost Sue de Coq but the second almost is a part of the first almost. I will try to explain...............
Almost Sue de Coq(15789)r9c789 with (89)r9c5 & (17=28)r8c8
SdC(15789)r9c789 with (89)r9c5 & (17)r8c8 => r9c6 <>8
We now have the extra (28)r8c8 to resolve which involves an Almost AIC with (28=9)r7c9. First we deal with the (28)r7c9, thus
LS(28)r8c8,r7c9-(28=1)r7c8-1r7c4=(1-3)r8c4=3r9c6 =>r9c6<>8
Finally we now address the extra 9 in r7c9
(9-2)r7c9=2r3c9-2r3c6=2r7c6-(2=89)r89c5 =>r9c6<>8
So , this was great fun but it required a short AIC to complete the puzzle.
Ted
- tlanglet
- 2010 Supporter
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- Joined: 29 May 2010
6 posts
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