- Code: Select all
*-----------*
|..3|6..|28.|
|..5|..4|.9.|
|6..|...|..3|
|---+---+---|
|...|..9|...|
|5..|.8.|.21|
|...|...|64.|
|---+---+---|
|1..|8.3|..5|
|.4.|...|...|
|...|.7.|3..|
*-----------*
Play/Print this puzzle online
January 27, 2018
9 posts
• Page 1 of 1
January 27, 2018
by ArkieTech » Sat Jan 27, 2018 11:32 am
Play/Print this puzzle online
dan
-
ArkieTech - Posts: 3355
- Joined: 29 May 2006
- Location: NW Arkansas USA
Re: January 27, 2018
by eleven » Sat Jan 27, 2018 1:25 pm
- Code: Select all
*--------------------------------------------------------------------------*
| b479 179 3 | 6 159 157 | 2 8 c47 |
| 278 1278 5 | 1237 123 4 | 17 9 6 |
| 6 1279 12479 | 1279 129 8 | d147 5 3 |
|---------------------------+-------------------------+--------------------|
| a2478 12678 124678 | 1247 126-4 9 | 5 3 78 |
| 5 3679 4679 | 347 8 67 | 79 2 1 |
| 2789 123789 12789 | 12357 1235 1257 | 6 4 789 |
|---------------------------+-------------------------+--------------------|
| 1 2679 2679 | 8 f2469 3 | e49 67 5 |
| 3 4 2679 | 1259 12569 1256 | 8 167 29 |
| 289 5 2689 | 1249 7 126 | 3 16 249 |
*--------------------------------------------------------------------------*
3 strong lnks
4r4c1 = r1c1 - r1c9 = r3c7 - r7c7 = r7c5 => -4r4c5, stte
- eleven
- Posts: 3153
- Joined: 10 February 2008
Re: January 27, 2018
by Cenoman » Sat Jan 27, 2018 1:27 pm
- Code: Select all
+---------------------------+-------------------------+--------------------+
| 479* 179 3 | 6 159 157 | 2 8 47* |
| 278 1278 5 | 1237 123 4 | 17 9 6 |
| 6 1279 12479 | 1279 129 8 | 147 5 3 |
+---------------------------+-------------------------+--------------------+
| 278-4 12678 124678 | 1247 1246* 9 | 5 3 78 |
| 5 3679 4679 | 347 8 67 | 79 2 1 |
| 2789 123789 12789 | 12357 1235 1257 | 6 4 789 |
+---------------------------+-------------------------+--------------------+
| 1 2679 2679 | 8 2469* 3 | 49 67 5 |
| 3 4 2679 | 1259 12569 1256 | 8 167 29 |
| 289 5 2689 | 1249* 7 126 | 3 16 249* |
+---------------------------+-------------------------+--------------------+
Simple coloring in the 4s (4)r1c1 = r1c9 - r9c9 = r9c4 - r7c5 = r4c5 => -4 r4c1; stte
Cenoman
- Cenoman
- Posts: 2977
- Joined: 21 November 2016
- Location: France
Re: January 27, 2018
by SteveG48 » Sat Jan 27, 2018 4:57 pm
Hodoku says finned swordfish, base c149, cover r149, fin r5c4 => -4 r4c5 ; stte
Can't argue with that, but I would never have spotted it. I like Cenoman's coloring.
Can't argue with that, but I would never have spotted it. I like Cenoman's coloring.
Steve
-
SteveG48 - 2019 Supporter
- Posts: 4483
- Joined: 08 November 2013
- Location: Orlando, Florida
Re: January 27, 2018
by 200e200w » Sat Jan 27, 2018 7:22 pm
Sorry for being late this time.
A Kraken Cell (r5c7) variant of eleven's solution.
200e200w
- Code: Select all
.------------------------.------------------------.-------------------------.
|E479 179 3 | 6 159 157 | 2 8 D47 |
| 278 1278 5 | 1237 123 4 | b17 9 6 |
| 6 1279 12479 | 1279 129 8 |bC147 5 3 |
:------------------------+------------------------+-------------------------:
|F2478 12678 124678 | 1247 eG126-4 9 | 5 3 78 |
| 5 3679 4679 | 347 8 67 |aA79 2 1 |
| 2789 123789 12789 | 12357 1235 1257 | 6 4 789 |
:------------------------+------------------------+-------------------------:
| 1 2679 2679 | 8 d2469 3 |cB49 67 5 |
| 3 4 2679 | 1259 12569 1256 | 8 167 29 |
| 289 5 2689 | 1249 7 126 | 3 16 249 |
'------------------------'------------------------'-------------------------'
A Kraken Cell (r5c7) variant of eleven's solution.
- Code: Select all
(7)r5c7 - (7=14)r23c7 - r7c7 = r7c5 - r4c5
||
(9)r5c7 - (9=4)r7c7 - r3c7 = r1c9 - r1c1 = r4c1 - r4c5
=> -4 r4c5; stte
200e200w
- 200e200w
- Posts: 208
- Joined: 20 January 2018
Re: January 27, 2018
by Sudtyro2 » Sat Jan 27, 2018 7:28 pm
I see four finned Sashimi 1-Fish with base 4r5. Here's a sample...
r5\c7 + rfr5c34:
4r5c3 - r3c3 = r3c7 - 4r7c7;
4r5c4 - r4c5 = r7c5 - 4r7c7; stte.
SteveC
r5\c7 + rfr5c34:
4r5c3 - r3c3 = r3c7 - 4r7c7;
4r5c4 - r4c5 = r7c5 - 4r7c7; stte.
Caution: Show
SteveC
Last edited by Sudtyro2 on Sun Sep 08, 2019 7:57 pm, edited 1 time in total.
- Sudtyro2
- Posts: 754
- Joined: 15 April 2013
Re: January 27, 2018
by pjb » Sat Jan 27, 2018 8:14 pm
When a sashimi swordfish can be represented by a simple chain (X-cycle), that's a simpler representation to my mind. Interestingly there are 5 different ones there:
(4)r4c1 = r1c1 - r1c9 = r3c7 - r7c7 = r7c5 => -4 r4c5
(4)r4c5 = r7c5 - r7c7 = r3c7 - r1c9 = r1c1 => -4 r4c1
(4)r7c5 = r4c5 - r4c1 = r1c1 - r1c9 = r3c7 => -4 r7c7
(4)r5c3 = r5c4 - r4c5 = r7c5 - r7c7 = r3c7 => -4 r3c3
(4)r5c4 = r5c3 - r3c3 = r1c1 - r1c9 = r9c9 => -4 r9c4
First 3 involve same 7 cells, but last 2 are each different.
This eliminates something other than 4s:
(7=4)r1c9 - r1c1 = r4c1 - r4c5 = r7c5 - (4=9)r7c7 - (9=7)r5c7 => -7 r23c7, r46c9; stte
Phil
(4)r4c1 = r1c1 - r1c9 = r3c7 - r7c7 = r7c5 => -4 r4c5
(4)r4c5 = r7c5 - r7c7 = r3c7 - r1c9 = r1c1 => -4 r4c1
(4)r7c5 = r4c5 - r4c1 = r1c1 - r1c9 = r3c7 => -4 r7c7
(4)r5c3 = r5c4 - r4c5 = r7c5 - r7c7 = r3c7 => -4 r3c3
(4)r5c4 = r5c3 - r3c3 = r1c1 - r1c9 = r9c9 => -4 r9c4
First 3 involve same 7 cells, but last 2 are each different.
This eliminates something other than 4s:
(7=4)r1c9 - r1c1 = r4c1 - r4c5 = r7c5 - (4=9)r7c7 - (9=7)r5c7 => -7 r23c7, r46c9; stte
Phil
- pjb
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- Location: Sydney, Australia
Re: January 27, 2018
by Cenoman » Sat Jan 27, 2018 10:09 pm
I expected at least one oddagon solution, but SteveC chose another strategy.
Here are four 7-link oddagons in the 4s (*). First three are Phil's sashimi swordfish configurations. The last one comes from my own coloring.
Curiously, all four have the same two guardians (#) 4r4c3==4r4c4 => -4 r4c15; stte
7-link oddagons in the 4s (*) with two guardians (#) 4r4c3==4r4c4 => -4 r4c15; stte
Here are four 7-link oddagons in the 4s (*). First three are Phil's sashimi swordfish configurations. The last one comes from my own coloring.
Curiously, all four have the same two guardians (#) 4r4c3==4r4c4 => -4 r4c15; stte
- Code: Select all
+---------------------------+-------------------------+--------------------+
| 479* 179 3 | 6 159 157 | 2 8 47* |
| 278 1278 5 | 1237 123 4 | 17 9 6 |
| 6 1279 12479 | 1279 129 8 | 147* 5 3 |
+---------------------------+-------------------------+--------------------+
| 278-4* 12678 124678# | 1247# 126-4* 9 | 5 3 78 |
| 5 3679 4679 | 347 8 67 | 79 2 1 |
| 2789 123789 12789 | 12357 1235 1257 | 6 4 789 |
+---------------------------+-------------------------+--------------------+
| 1 2679 2679 | 8 2469* 3 | 49* 67 5 |
| 3 4 2679 | 1259 12569 1256 | 8 167 29 |
| 289 5 2689 | 1249 7 126 | 3 16 249 |
+---------------------------+-------------------------+--------------------+
From Phil's first 3 swordfishes
+---------------------------+-------------------------+--------------------+
| 479 179 3 | 6 159 157 | 2 8 47 |
| 278 1278 5 | 1237 123 4 | 17 9 6 |
| 6 1279 12794* | 1279 129 8 | 147* 5 3 |
+---------------------------+-------------------------+--------------------+
| 278-4 12678 124678# | 1247# 126-4* 9 | 5 3 78 |
| 5 3679 4679* | 347* 8 67 | 79 2 1 |
| 2789 123789 12789 | 12357 1235 1257 | 6 4 789 |
+---------------------------+-------------------------+--------------------+
| 1 2679 2679 | 8 2469* 3 | 49* 67 5 |
| 3 4 2679 | 1259 12569 1256 | 8 167 29 |
| 289 5 2689 | 1249 7 126 | 3 16 249 |
+---------------------------+-------------------------+--------------------+
From Phil's 4th swordfish
+---------------------------+-------------------------+--------------------+
| 479* 179 3 | 6 159 157 | 2 8 47* |
| 278 1278 5 | 1237 123 4 | 17 9 6 |
| 6 1279 12794* | 1279 129 8 | 147* 5 3 |
+---------------------------+-------------------------+--------------------+
| 278-4 12678 124678# | 1247# 126-4* 9 | 5 3 78 |
| 5 3679 4679* | 347* 8 67 | 79 2 1 |
| 2789 123789 12789 | 12357 1235 1257 | 6 4 789 |
+---------------------------+-------------------------+--------------------+
| 1 2679 2679 | 8 2469* 3 | 49* 67 5 |
| 3 4 2679 | 1259 12569 1256 | 8 167 29 |
| 289 5 2689 | 1249* 7 126 | 3 16 249* |
+---------------------------+-------------------------+--------------------+
From Phil's 5th swordfish
+---------------------------+-------------------------+--------------------+
| 479* 179 3 | 6 159 157 | 2 8 47* |
| 278 1278 5 | 1237 123 4 | 17 9 6 |
| 6 1279 12479 | 1279 129 8 | 147 5 3 |
+---------------------------+-------------------------+--------------------+
| 278-4* 12678 124678# | 1247# 126-4* 9 | 5 3 78 |
| 5 3679 4679 | 347 8 67 | 79 2 1 |
| 2789 123789 12789 | 12357 1235 1257 | 6 4 789 |
+---------------------------+-------------------------+--------------------+
| 1 2679 2679 | 8 2469* 3 | 49 67 5 |
| 3 4 2679 | 1259 12569 1256 | 8 167 29 |
| 289 5 2689 | 1249* 7 126 | 3 16 249* |
+---------------------------+-------------------------+--------------------+
From my own simple coloring
7-link oddagons in the 4s (*) with two guardians (#) 4r4c3==4r4c4 => -4 r4c15; stte
Cenoman
- Cenoman
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- Joined: 21 November 2016
- Location: France
Re: January 27, 2018
by Ngisa » Sun Jan 28, 2018 5:00 pm
- Code: Select all
+-------------------------------+----------------------------+------------------------+
|f479 179 3 | 6 159 157 | 2 8 g47 |
| 278 1278 5 | 1237 123 4 | 17 9 6 |
| 6 1279 e12479 | 1279 129 8 | 147 5 3 |
+-------------------------------+----------------------------+------------------------+
| 2478 12678 124678 | 1247 1246 9 | 5 3 78 |
| 5 3679 d4679 | c347 8 67 | 79 2 1 |
| 2789 123789 12789 | 12357 1235 1257 | 6 4 789 |
+-------------------------------+----------------------------+------------------------+
| 1 2679 2679 | 8 2469 3 | 49 67 5 |
| 3 4 2679 | 1259 12569 1256 | 8 167 279 |
| 289 5 2689 | b1249 7 126 | 3 16 ha4-29|
+-------------------------------+----------------------------+------------------------+
It might be almost like the others
(4)r9c9 = r9c4 - r5c4 = r5c3 - r3c3 = r1c1 - r1c9 = (4)r9c9 => - 29 r9c9; stte
Clement
- Ngisa
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- Joined: 18 November 2012
9 posts
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