- Code: Select all
*-----------*
|..7|9.8|.65|
|5..|.1.|..9|
|.92|...|...|
|---+---+---|
|...|.23|5..|
|..4|...|3..|
|..5|16.|...|
|---+---+---|
|...|...|42.|
|2..|.8.|..7|
|48.|7.2|9..|
*-----------*
5-16-2023
4 posts
• Page 1 of 1
5-16-2023
by SteveG48 » Tue May 16, 2023 11:25 am
A little harder today.
Steve
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SteveG48 - 2019 Supporter
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Re: 5-16-2023
by Cenoman » Tue May 16, 2023 4:50 pm
Not a hard puzzle:
1. (3)r9c9 = r3c9 - r3c45 = r1c5 => -3 r9c5
2. (8=4)r4c4 - (4=351)r8c248 - (1=398)r278c3 => -8 r4c3; lclste
...but challenging for a one-step solution
1. (3)r9c9 = r3c9 - r3c45 = r1c5 => -3 r9c5
2. (8=4)r4c4 - (4=351)r8c248 - (1=398)r278c3 => -8 r4c3; lclste
...but challenging for a one-step solution
- Code: Select all
+-----------------------+-----------------------+---------------------+
| 13 134 7 | 9 34 8 | 2 6 5 |
| 5 346 Di38 | 2 1 h67 | h78 E3478 9 |
| C368 9 2 | gf356 3457 567 | 1 FB3478 Fe34 |
+-----------------------+-----------------------+---------------------+
| 16789 167 j189 | k48 2 3 | 5 14789 146 |
| a16789 1267 4 |zlb8-5 b579 b579 | 3 Ab1789 126 |
| 3789 237 5 | 1 6 479 | 78 4789 24 |
+-----------------------+-----------------------+---------------------+
| 1379 1357 139 | 356 359 1569 | 4 2 8 |
| 2 135 139 | 345 8 1459 | 6 35 7 |
| 4 8 6 | 7 35 2 | 9 c135 d13 |
+-----------------------+-----------------------+---------------------+
Double kraken row (8)r5c148 & cell (356)r3c4
(8)r5c1 (8=5791)r5c4568 - r9c8 = (1-3)r9c9 = (3)r3c9 - (3)r3c4 = [(5=6)r3c4 - (6=78)r2c67 - r2c3 = r4c3 - r4c4 = (8)r5c4]
|| /
(8)r5c8 - r3c8 = r3c1 - (8=3)r2c3 - r2c8 = (3)r3c89 -
||
(8)r5c4
---------
=> -5 r5c4; ste
Cenoman
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Re: 5-16-2023
by P.O. » Tue May 16, 2023 5:34 pm
basics:
Hidden Text: Show
- Code: Select all
13 134 7 9 34 8 2 6 5
5 346 38 2 1 67 78 3478 9
368 9 2 356 3457 567 1 3478 34
16789 167 189 48 2 3 5 14789 146
16789 1267 4 58 579 579 3 1789 126
3789 237 5 1 6 479 78 4789 24
1379 1357 139 356 359 1569 4 2 8
2 135 139 345 8 1459 6 35 7
4 8 6 7 35 2 9 135 13
4r8c4 => r5c8 <> 1,7,8,9
r8c4=4 - c6n4{r8 r6} - b5n9{r6c6 r5c56}
r8c4=4 - r4c4{n4 n8} - c3n8{r4 r2} - c7n8{r2 r6}
r8c4=4 - c6n4{r8 r6} - b5n7{r6c6 r5c56}
r8c4=4 - r4c4{n4 n8} - c3n8{r4 r2} - r2c7{n8 n7} - r2c6{n7 n6} - c4n6{r3 r7} - c4n3{r7 r3} - c9n3{r3 r9} - r9n1{c9 c8}
=> r8c4 <> 4
ste.
- P.O.
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Re: 5-16-2023
by SteveG48 » Thu May 18, 2023 1:06 am
- Code: Select all
*----------------------------------------------------------------------*
| 13 134 7 | 9 34 8 | 2 6 5 |
| 5 346 bL38 | 2 1 c67 |ck78 3478 9 |
| 368 9 2 |de356 3457 567 | 1 3478 e34 |
*----------------------+-----------------------+-----------------------|
| 16789 167 am189 | 4-8 2 3 | 5 14789 f146 |
| 1679-8 1267 4 |dh58 h579 h579 | 3 ghi1789 f126 |
| 3789 237 5 | 1 6 479 | j78 4789 f24 |
*----------------------+-----------------------+-----------------------|
| 1379 1357 139 | 356 359 1569 | 4 2 8 |
| 2 135 139 | 345 8 1459 | 6 35 7 |
| 4 8 6 | 7 35 2 | 9 135 13 |
*----------------------------------------------------------------------*
Almost-almost AIC:
[[8r4c3 = (786)r2c367 - 6r3c4 = (5*8)r25c4] = (*34)r3c49 - (4=261)r456c9 - 1r5c8 = (579,8)**r5c5684] = **8r5c8 - r6c7 = r2c7 - r2c3 = 8r4c3 => -8 r4c4,r5c1 ; ste
Steve
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4 posts
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