SudokuSolver Forum

A forum for Sudoku enthusiasts to share puzzles, techniques and software
It is currently Tue Mar 19, 2024 4:31 am

All times are UTC




Post new topic Reply to topic  [ 4 posts ] 
Author Message
 Post subject: Ix Killer 8
PostPosted: Sat Dec 23, 2017 11:18 pm 
Offline
Addict
Addict

Joined: Sat Mar 28, 2015 8:36 pm
Posts: 24
Another puzzle using the near symmetry theme, this time along a different axis.

ImageImage
SS Score: 1.40

I have a V2 for this one as well, which I intend to post at a later point.

Code: paste into solver:
3x3::k:1793:0000:0000:0000:0000:0000:4355:4355:0000:1793:1793:4880:4880:0000:1807:4355:0000:3330:0000:0000:3083:4880:0000:1807:3328:3330:3330:0000:2835:3083:3084:3084:3328:3342:3342:0000:4114:2835:3083:0000:0000:2061:0000:0000:0000:0000:4114:0000:1286:0000:2061:2833:2833:0000:2565:2565:1286:0000:4618:4618:4618:2833:0000:2565:0000:5124:1032:2311:2311:0000:5897:0000:0000:5124:5124:0000:1032:0000:0000:5897:5897:


Solution:
436752918
125894736
978613452
251489673
763521894
894367521
612978345
389145267
547236189


As always, any feedback or suggestions are appreciated.


Top
 Profile  
Reply with quote  
 Post subject: Re: Ix Killer 8
PostPosted: Thu Dec 28, 2017 5:20 am 
Offline
Grand Master
Grand Master

Joined: Wed Apr 23, 2008 6:04 pm
Posts: 1893
Location: Lethbridge, Alberta, Canada
Thanks ixsetf for another challenging killer! It felt quite a lot harder than the SS score to find a way in but, after I'd managed that, I'll agree with the score.

Here's my walkthrough:
Prelims

a) R23C6 = {16/25/34}, no 7,8,9
b) 13(2) cage at R3C7 = {49/58/67}, no 1,2,3
c) R45C2 = {29/38/47/56}, no 1
d) R4C45 = {39/48/57}, no 1,2,6
e) R4C78 = {49/58/67}, no 1,2,3
f) 16(2) cage at R5C1 = {79}
g) R56C6 = {17/26/35}, no 4,8,9
h) 5(2) cage at R6C4 = {14/23}
i) 4(2) cage at R8C4 = {13}
j) R8C56 = {18/27/36/45}, no 9
k) 7(3) cage at R1C1 = {124}
l) 19(3) cage at R2C3 = {289/379/469/478/568}, no 1
m) 11(3) cage at R6C7 = {128/137/146/236/245}, no 9
n) 10(3) cage at R7C1 = {127/136/145/235}, no 8,9
o) 20(3) cage at R8C3 = {389/479/569/578}, no 1,2
p) 23(3) cage at R8C8 = {689}

Steps resulting from Prelims
1a. 7(3) cage at R1C1 = {124}, locked for N1
1b. 16(2) cage at R5C1 = {79}, locked for N4, clean-up: no 2,4 in R45C2
1c. 4(2) cage at R8C4 = {13}, locked for N8, clean-up: no 6,8 in R8C56
1d. 23(3) cage at R8C8 = {689}, locked for N9
1e. 8,9 in R7 only in R7C456, locked for N8

[The order of step 2 has been changed to simplify it.]
2. 20(3) cage at R8C3 + 23(3) cage at R8C8 total 43
2a. Max R8C2389 = 30 -> min R8C38 = 13, no 3 in R8C3
2b. Max R8C38 = 17 -> min R8C2389 = 26 = {3689/4689/4789/5689/5789/6789} (cannot be {3789/4589} because R9C23 must total at least 11, cannot be {4679/5678/5679} because R9C46 = {24/25} clash with R8C56), 8,9 locked for R9
2c. 45 rule on N7 3 innies R7C3 + R8C2 + R9C1 = 15 = {168/249/258/267/348/456} (cannot be {159/357} which clash with 10(3) cage at R7C1)
2d. 8,9 of {168/249/258/348} must be in R8C2 -> no 1,2,3 in R8C2
2e. 8,9 of {249/348} must be in R8C2, 4 of {456} must be in R7C3 -> no 4 in R8C2

3. R27C2 = {12} (hidden pair in C2)
3a. 7(3) cage at R1C1 = {124}, 4 locked for C1
3b. R9C2 = 4 (hidden single in C2) -> R89C3 = 16 = {79}, locked for C3 and N7, clean-up: no 1 in R6C4
3c. R8C2 = 8 (hidden single in N7), clean-up: no 3 in R45C2
3d. Naked pair {56} in R45C2, locked for C2 and N4
3e. 10(3) cage at R7C1 = {136/235}, 3 locked for C1 and N7, clean-up: no 2 in R6C4
3f. Naked pair {12} in R7C23, locked for R7 and N7
3g. R35C1 = {79} (hidden pair in C1)
3h. R9C57 = {13} (hidden pair in R9)
3i. 3 in C2 only in R13C2, locked for N1
3j. Naked triple {568} in R123C3, locked for C3
3k. 2 in N9 only 2 in N9 only in R8C79, locked for R8, clean-up: no 7 in R8C56
3l. Naked pair {45} in R8C56, locked for R8 and N8
3m. R9C1 = 5 (hidden single in R9)
3n. R78C1 = {36} -> R7C2 = 1 (cage sum), R7C3 = 2 -> R6C4 = 3, R2C2 = 2, R8C4 = 1, R9C5 = 3, R9C7 = 1, clean-up: no 5 in R3C6, no 9 in R4C45, no 5 in R56C6

4. R23C6 = [34/43/52] (cannot be {16} which clashes with R56C6), no 1,6
4a. Killer pair 4,5 in R23C6 and R8C6, locked for C6, clean-up: no 8,9 in R3C7
4b. R4C78 = {49/67} (cannot be {58} which clashes with R4C45), no 5,8
4c. Killer pair 4,7 in R4C45 and R4C78, locked for R4, clean-up: no 6 in R3C7
4d. R4C139 = {123} (hidden triple in R4) -> R46C1 = [28] (hidden pair in C1)
4e. Killer triple 4,5,6 in R4C2, R4C45 and R4C78, locked for R4, clean-up: no 7 in R3C7
4f. 18(3) cage at R7C5 = {378/468/567} (cannot be {369} which clashes with R7C1, cannot be {459} because 4,5 only in R7C7), no 9
4g. R7C4 = 9 (hidden single in R7)
4h. 8 in R7 only in 18(3) cage = {378/468} -> R7C7 = {34}
4i. Killer pair 3,6 in R7C1 and 18(3) cage, locked for R7
4j. 19(3) cage at R2C3 = {478/568}, no 2
4k. 19(3) cage at R2C3 = {478/568}, CPE no 8 in R2C5
4l. 3 in C3 only in 12(3) cage at R3C3 = {138/345}, no 6
4m. 8 in R4 only in R4C456, locked for N5
4n. 11(3) cage at R6C7 = {146/245}, no 7
4o. 11(3) cage at R6C7 = {146/245}, CPE no 4 in R45C8, clean-up: no 9 in R4C7
4p. 1 of {146} must be in R6C8 -> no 6 in R6C8

5. Consider combinations for R4C45 = {48/57}
5a. R4C45 = {48} => R4C6 = 9, R3C7 = 4
or R4C45 = {57} => R4C7 = 4 (hidden single in R4)
-> 4 in R34C7, locked for C7
5b. R7C7 = 3, R78C1 = [61]
5c. Naked pair {27} in R8C79, locked for R8 and N9 -> R89C3 = [97], R8C8 = 6, clean-up: no 7 in R4C7
5d. R56C6 = {17} (cannot be {26} which clashes with R9C6, locked for C6 and N5 -> R7C56 = [78], R4C6 = 9 -> R3C7 = 4, R4C78 = [67], R45C2 = [56], clean-up: no 3 in R2C6
5e. R6C5 = 6 (hidden single in N5)
5f. R5C45 = {25} (hidden pair in N5), locked for R5
5g. 11(3) cage at R6C7 = {245} (only remaining combination), 2, locked for N6
5h. 5 in R67 only in 11(3) cage and R67C9 -> 5 in R67C9, locked for C9

6. All cells of 19(3) cage at R2C3 (step 4k) = {478/568} ‘see’ R2C6 = {45} -> 4 in R2C46, locked for R2 and N2, also no 5 in R2C5
6a. R12C1 = [41], R2C5 = 9
6b. 3 in R2 only in R2C89, locked for N3
6c. 45 rule on N3 2 remaining innies R1C9 + R2C8 = 11 = [65/83]
6d. 17(3) cage at R1C7 = {179/278}, no 5, 7 locked for C7 and N3 -> R8C79 = [27], R6C7 = 5, R67C8 = [24]
6e. 17(3) cage = {179} -> R12C7 = [97], R1C8 = 1
6f. R3C9 = 2 (hidden single in N3), R3C6 = 3 -> R2C6 = 4, R8C45 = [45], R4C45 = [48]
6g. R3C4 = 6 (hidden single in R3), R9C46 = [26], R5C45 = [52], R2C23 = [58]
6h. R3C3 = 8 -> R45C3 = 4 = {13}

and the rest is naked singles.

Rating Comment:
I'll rate my walkthrough at Easy 1.5. I used a short forcing chain for my second breakthrough and then what I'll describe as an extended CPE, or it might be called a CPE killer pair, for the final wrapping up step.

I'll look forward to trying the V2 but no hurry; I've got lots of other things to catch up on.


Top
 Profile  
Reply with quote  
 Post subject: Re: Ix Killer 8
PostPosted: Sun Jan 07, 2018 4:57 pm 
Offline
Addict
Addict

Joined: Sat Mar 28, 2015 8:36 pm
Posts: 24
A V2 of this puzzle as promised.

ImageImage
SS Score: 2.10

Code: paste into solver:
3x3::k:1793:0000:0000:5907:5907:5907:4355:4355:0000:1793:1793:4880:4880:5907:1807:4355:3350:3330:0000:0000:3083:4880:5140:1807:3350:3330:3330:0000:2822:3083:3084:3084:5140:3342:3342:4373:4114:2822:3083:0000:5140:2061:5140:4373:4373:0000:4114:0000:0000:0000:2061:2833:2833:4373:2565:2565:2560:0000:4618:4618:4618:2833:0000:2565:2560:5124:1032:2311:2311:0000:5897:0000:0000:5124:5124:0000:1032:0000:0000:5897:5897:


Solution:
135967842
246813579
987524631
452391768
763482915
891756423
318679254
629145387
574238196
(Moderator) Note that this V2 has a different solution.

As always, any feedback or suggestions are appreciated.


Top
 Profile  
Reply with quote  
 Post subject: Re: Ix Killer 8
PostPosted: Mon Apr 02, 2018 10:14 pm 
Offline
Grand Master
Grand Master

Joined: Wed Apr 23, 2008 6:04 pm
Posts: 1893
Location: Lethbridge, Alberta, Canada
Thanks ixsetf for this V2. Quite a hard one, definitely harder than Ix Killer 7 V2. It took me a while to find some steps, but I didn't need to use any technically difficult steps.

Here is my walkthrough for Ix Killer 8 V2:
Prelims

a) R23C6 = {16/25/34}, no 7,8,9
b) 13(2) cage at R2C8 = {49/58/67}, no 1,2,3
c) R45C2 = {29/38/47/56}, no 1
d) R4C45 = {39/48/57}, no 1,2,6
e) R4C78 = {49/58/67}, no 1,2,3
f) 16(2) cage at R5C1 = {79}
g) R56C6 = {17/26/35}, no 4,8,9
h) 10(2) cage at R7C3 = {19/28/37/46}, no 5
i) 4(2) cage at R8C4 = {13}
j) R8C56 = {18/27/36/45}, no 9
k) 7(3) cage at R1C1 = {124}
l) 19(3) cage at R2C3 = {289/379/469/478/568}, no 1
m) 11(3) cage at R6C7 = {128/137/146/236/245}, no 9
n) 10(3) cage at R7C1 = {127/136/145/235}, no 8,9
o) 20(3) cage at R8C3 = {389/479/569/578}, no 1,2
p) 23(3) cage at R8C8 = {689}

Steps resulting from Prelims
1a. 7(3) cage at R1C1 = {124}, locked for N1
1b. 16(2) cage at R5C1 = {79}, locked for N4, clean-up: no 2,4 in R45C2
1c. 4(2) cage at R8C4 = {13}, locked for N8, clean-up: no 6,8 in R8C56
1d. 23(3) cage at R8C8 = {689}, locked for N9

[Two easy placements which the original version didn’t have.]
2a. 45 rule on N3 1 innie R1C9 = 2
2b. 45 rule on N7 1 innie R9C1 = 5
2c. 7(3) cage at R1C1 = {124}, 2 locked for R2, clean-up: 5 in R3C6
2d. 10(3) cage at R7C1 = {127/136}, no 4, 1 locked for N7, clean-up: no 9 in 10(2) cage at R7C3
2e. 7 of {127} must be in R78C1 (R78C1 cannot be {12} which clashes with R12C1, ALS block), no 7 in R7C2
2f. 20(3) cage at R8C3 = {389/479}, no 6
2g. 10(2) cage at R7C3 = {28/46} (cannot be {37} which clashes with 20(3) cage), no 3,7
2h. 9 in R7 only in R7C456, locked for N8
2i. 2 in N9 only in R789C7 + R7C8, CPE no 2 in R6C7

3. 20(3) cage at R8C3 + 23(3) cage at R8C8 total 43
3a. Max R9C2389 = 30 -> min R8C38 = 13, no 3 in R8C3
3b. Max R8C38 = 17 -> min R9C2389 = 26 -> R9C2389 = {3689/4679/4689/4789/6789} (cannot be {3789} because R9C23 must total at least 11)
3c. R9C46 = {26/27/28} (other combinations clash with R8C2389 and/or with R8C56), no 4, 2 locked for R9 and N8, clean-up: no 7 in R8C56
3d. Naked pair {45} in R8C56, locked for R8 and N8, clean-up: no 6 in R7C3
3e. R9C2389 = {3689/4679/4689/4789} (cannot be {6789} which clashes with R9C46)
3f. Killer triple 6,7,8 in R9C2389 and R9C46, locked for R9
3g. Min R7C56 = 13 -> max R7C7 = 5

4. 45 rule on N2 1 outie R2C3 = 1 innie R3C5 + 4, no 3 in R2C3, no 6,7,8,9 in R4C2
4a. 23(4) cage at R1C4 = {1589/1679/3479/3578} (cannot be {3569/4568} which clash with R23C6)
4b. 23(4) = {1679/3479/3578} (cannot be {1589} because 19(3) cage at R2C3 cannot be 6{67}), 7 locked for N2
4c. Consider placement of 2 in N2
R3C4 = 2 => R2C34 = {89}
or R3C5 = 2 => R2C3 = 6
or R3C6 => R2C6 = 5
-> no 5 in R2C3, no 1 in R3C5

5. Combined cages R23C6 + R56C6 + R8C6 = {16}{35}4/{34}{17}5/{34}{26}5/[52]{17}4, 4,5 locked for C6

6. 7(3) cage at R1C1 = {124}, 10(3) cage at R7C1 (step 2d) = {127/136}, 10(2) cage at R7C3 = [28/46/82], 20(3) cage at R8C3 (step 2f) = {389/479}
6a. Consider placement for 4 in N4
4 in R46C1 => R12C1 = {12}, locked for C1 => 10(3) cage = {136} (cannot be {127}, ALS block)
or 4 in R456C3 => 10(2) cage = {28}, locked for N7 => 10(3) cage = {136}
-> 10(3) cage = {136}, locked for N7, 10(2) cage = {28}, 20(3) cage at R8C3 = {479}, 4 locked for R9
6b. R35C1 = {79} (hidden pair in C1)
6c. 8 in C1 only in R46C1, locked for N4, clean-up: no 3 in R45C2
6d. Naked pair {56} in R45C2, locked for C2 and N4
6e. Max R45C3 = 7 -> min R3C3 = 5
6f. 1 in C3 only in R456C3, locked for N4

7. 45 rule on N6 1 innie R5C7 = 1 outie R7C8 + 4, no 1,2,3,4 in R5C7, no 7 in R7C8
7a. 2 in C7 only R789C7, locked for N9, clean-up: no 6 in R5C7
7b. 17(4) cage at R4C9 = {1259/1268/1349/1358/1367/2348/2357} (cannot be {1457/2456} which clash with R4C78)

8. R4C2 = {56}, R4C45 = {39/48/57}, R4C78 = {49/58/67} -> combined cage R4C24578 = 5{39}{67}/5{48}{67}/6{39}{58}/6{57}{49}, 5,6 locked for R4

9. 12(3) cage at R3C3 = {129/138/237/246/345} (cannot be {147} which clashes with 20(3) cage at R8C3, ALS block, cannot be {156} because 5,6 only in R3C3)
9a. 12(3) cage = {129/138/237/345} (cannot be {246} because R3789C3 = 68{79} clash with R2C3), no 6 in R3C3
9b. Consider combinations for 12(3) cage
12(3) cage = {129/138/237} => R12C3 = [56] (hidden pair in C3)
or 12(3) cage = {345} => R67C3 = [12] (hidden pair in C3) => R12C3 = {68} (hidden pair in C3)
-> R12C3 = [56/68/86], clean-up: no 3,5 in R3C5 (step 4)
9c. 19(3) cage at R2C3 = {289/469/568}, no 3
9d. R2C3 + R3C5 (step 4) = [62/84]
9e. {568} must be 6{58} (cannot be 8{56} because R23C4 + R3C5 = {56}4 clashes with R23C6)
9f. 19(3) cage = 6{49}/6{58}/[892], no 6 in R23C4
9g. 19(3) cage + R3C5 = 6{49}2/6{58}2/[892]4 -> 2 in R3C45, locked for R3, clean-up: no 5 in R2C6
9h. R23C6 = {16/34}, R56C6 = {17/26/35} -> combined cage R2356C6 = {16}{35}/{34}{17}/{34}{26}, 3 locked for C6
9i. 3 in N1 only in R13C2, locked for C2 -> R7C2 = 1, R78C1 = {36}, locked for C1, clean-up: no 5 in R5C7 (step 7)
9j. 17(4) cage at R4C9 (step 7b) = {1259/1268/1349/1358/1367/2348/2357}
9k. Killer triple 7,8,9 in R4C78, 17(4) cage and R5C7, locked for N6
9l. 11(3) cage at R6C7 = {146/236/245} = [164/425/524/614/623], no 3 in R6C7, no 3,4,5 in R6C8
9m. 3 in N6 only in 17(4) cage = {1349/1358/1367/2348/2357}
9n. 17(4) cage = {1349/1358/1367/2357} (cannot be {2348} which combined with R4C78 = {67} clashes with 11(3) cage)
9o. 17(4) cage = {1349/1358/1367} (cannot be {2357} which combined with R7C9 = {3457} clashes with 11(3) cage), no 2, 1 locked for N6
9p. R6C8 = 2 (hidden single in N6) -> 11(3) cage = [425/524/623], clean-up: no 6 in R5C6

10. 18(3) cage at R7C5 = {279/378/468/567) (cannot be {369} which clashes with R7C1)
Consider combinations for 18(3) cage
18(3) cage = {279} => R7C3 = 8, R7C4 = 6
or 18(3) cage = {378/468/567} => R7C4 = 9 (hidden single in R7)
-> R7C4 = {69}
10a. Killer triple 3,6,9 in R7C1, R7C4 and 18(3) cage, locked for R7, clean-up: no 7 in R5C7 (step 7)
10b. 11(3) cage at R6C7 (step 9p) = [425/524], no 6, CPE no 4,5 in R45C8 + R7C7, clean-up: no 8,9 in R4C7
10c. 18(3) cage = {279/378}, no 6, 7 locked for R7 and N8
10d. R9C23 = {47} (hidden pair in R9) -> R8C3 = 9
10e. 12(3) cage at R3C3 (step 9a) = {138/237/345}, 3 locked for C3

11. 20(4) cage at R3C5 = {1289/1478/2378/2468} (cannot be {1379/1568} because R3C5 only contains 2,4, cannot be {2567/3467} because R5C7 only contains 8,9, cannot be {2369} because 3,6 only in R5C5, cannot be {2459} which clashes with R8C5, cannot be {3458} because 3,5 only in R5C5, cannot be {1469} which clashes with R23C6), no 5, CPE no 8 in R5C4
11a. R35C5 cannot be {24} because R4C6 + R5C7 cannot total 14, R3C5 = {24} -> no 2,4 in R5C5
11b. R3C5 = 2 (hidden single in C5) -> R2C3 = 6 (step 4), clean-up: no 1 in R3C6, no 7 in R3C7
11c. R3C5 = 2 -> 20(4) cage = {1289/2378}
11d. 3 of {2378} must be in R4C6 -> no 7 in R5C5
11e. 20(4) cage = {1289} (cannot be {2378} = [2738] which clashes with combined cage R4C45 + R4C78 = {48}{67}/{57}[49]) -> R4C6 + R5C57 = {189}, 1 locked for N5, CPE no 9 in R5C4, clean-up: no 7 in R56C6
11f. Killer pair 3,6 in R23C6 and R56C6, locked for C6
11g. 2 in N5 only in R5C46, locked for R5
11h. 1 in R3 only in R3C89, locked for N3
11i. 13(3) cage at R2C9 = {139/148/157}, no 6
11j. 1 in C7 only in R89C7, locked for N9

12. Consider combinations for R23C6 = [16]/{34}
R23C6 = {16} => R56C6 = {35}, locked for N5 => R4C45 = {48}, locked for N5 => R4C6 = 9
or R23C6 = {34} => R56C6 = [26] => R9C6 = 8 => R4C6 = {19}
-> R4C6 = {19}
12a. R4C6 + R5C57 (step 11e) = {189}, 8 locked for R5

13. 45 rule on R1 2 outies R2C57 = 3 innies R1C123 + 3
13a. Max R2C57 = 17 -> max R123C3 = 14, min R1C13 = 6 -> max R1C2 = 8
13b. 9 in N1 only in R3C12, locked for R3, clean-up: no 4 in R2C4 (step 9g), no 4 in R2C8
13c. 13(3) cage at R2C9 (step 11h) = {139/148/157}
13d. 9 of {139} must be in R2C9 -> no 3 in R2C9

14. R5C7 + R7C8 (step 7) = [84/95]
14a. R35C7 cannot be [89] because R3C7 + R2C8 = [85] would clash with R5C7 + R7C8 = [95], R5C7 = {89} -> no 8 in R3C7, clean-up: no 5 in R2C8
14b. Hidden killer pair 8,9 in 17(3) cage at R1C7 and R5C7 for C7, R5C7 = {89} -> 17(3) cage must contain one of 8,9 in R12C7 = {359/368/458} (cannot be {467} which doesn’t contain one of 8,9), no 7
14c. One of 8,9 must be in R12C7 -> no 8,9 in R1C8
14d. 4 of {458} must be in R1C78 (R1C78 cannot be {58} which clashes with R1C3), no 4 in R2C7
14e. 13(2) cage at R2C8 = [94/76] (cannot be [85] which clashes with 17(3) cage)
14f. Naked quad {6789} in R2489C8, locked for C8
14g. 7 in C8 only in R2C8 + R3C7 = [76] or R4C78 = [67] -> 6 in R34C7, locked for C7
14h. 17(3) cage = {359/458}, 5 locked for N3
14i. 13(3) cage at R2C9 (step 11i) = {139/148}, no 7
14j. R2C8 = 7 (hidden single in N3) -> R3C7 = 6, clean-up: no 1 in R2C5

15a. Naked pair {34} in R23C6, locked for C6 and N2, R8C56 = [45], R56C6 = [26], R9C6 = 8, R9C4 = 2 (hidden single in R9), clean-up: no 9 in R2C4 (step 9g), no 8 in R4C4
15b. Naked pair {58} in R23C4, locked for C4 and N2, clean-up: no 7 in R4C5
15c. 18(3) cage at R7C5 (step 10c) = {279} (only remaining combination) -> R7C7 = 2, R7C56 = {79}, locked for R7
15d. 10(2) cage at R7C3 = [82], R2C2 = 4, R23C6 = [34]
15e. 13(3) cage at R2C9 (step 14i) = {139} (only remaining combination) -> R2C9 = 9, R3C89 = {13}, locked for R3 and N3, 23(3) cage at R8C8 = [896], R4C8 = 6 -> R4C7 = 7, clean-up: no 5 in R4C5
15f. R139C3 = [574], R3C3 = 7 -> R45C3 = 5 = [23]

and the rest is naked singles.

Rating Comment:
I'll also rate this V2 at Hard 1.5, well maybe Very Hard 1.5. There were a lot more 1.5 level steps needed than for Ix Killer 7 V2. The start of step 14 was the hardest part for me to find.


Top
 Profile  
Reply with quote  
Display posts from previous:  Sort by  
Post new topic Reply to topic  [ 4 posts ] 

All times are UTC


Who is online

Users browsing this forum: No registered users and 7 guests


You cannot post new topics in this forum
You cannot reply to topics in this forum
You cannot edit your posts in this forum
You cannot delete your posts in this forum
You cannot post attachments in this forum

Search for:
Jump to:  
Powered by phpBB® Forum Software © phpBB Group